Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of...
Transcript of Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of...
![Page 1: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/1.jpg)
Demonstration of animated graphics 1
Seminar demonstration files
Animated graphics
Denis Girou
June 2002
With Acroread, CTRL-L switchbetween full screen and window mode
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 2: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/2.jpg)
Demonstration of animated graphics 2
1 – Introduction . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 3
2 – Communication ring . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 8
3 – Commutative diagram . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 9
4 – Results of the year . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 10
5 – Clock . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 11
6 – Clock with split-second hand . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 13
7 – Random walk . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 14
8 – Text shown through a lens . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 15
9 – Text progressively shown . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 16
10 – Text progressively vanished . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 17
11 – Building of a regular polygon of seventeen sides . . . . . . . . . . . . . . . . . . . . . . 18
12 – External files inclusion . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 19
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 3: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/3.jpg)
Demonstration of animated graphics 3
1 – Introduction
☞ A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless, this
feature is not very sophisticated, as we will not have real control on these animationsa.
☞ It require only to use the standard mechanism of Seminar for overlays (which in fact is based on the
PSTricks one)b.
☞ But take care that, if this underlying mechanism is well adapted for this kind of simple animations, it is
not at all optimized. This is not a problem for the paper version, as overlays are inhibited in this case,
and as we can also keep easily only one step, but it can generate huge files for the screen versions, as
all the material of the slide is included in each overlay, just putting it outside the visible region when this
is not the required overlayc.aVTEX supported the animated GIF format, (see the file animgif.pdf in CTAN:systems/vtex/common/vtex-doc.zip) in it version
7, but announce new (proprietary) support of animated graphics in it version 8.bWe have modified it slightly to increase the default limit to 10 overlays, which was obviously not enough for animations.cFor technical explanations, see the pages 243–244 in Timothy VAN ZANDT and Denis GIROU,
Inside PSTricks, TUGboat, Volume 15, Number 3, September 1994, pages 239–246, available on
http://www.tug.org/TUGboat/Articles/tb15-3/tb44tvz.ps
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 4: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/4.jpg)
Demonstration of animated graphics 4
☞ As usual, don’t forget to think to the paper version. As it will be only the result of all the overlays
superimposed, it could be just what we want, if the final graphic is only the sum of all the previous
states. But in some other cases, we must keep only one state (so one overlay) for the paper version,
introducing a simple test. Look at the various examples demonstrated here.
☞ To stop the animation mode inside a document, just force a long time as duration of each page
(it seem that we cannot put a too huge value, but 500 seconds seems accepted):
1 \hypersetup{pdfpageduration=500}
☞ With Acroread, it require first a configuration change of the reader to view such animations:
➳ in the Preferences option of the File menu, first choose the Full Screen panel,
➳ in it, active the first entry Advance every N seconds (which is inactivated by default). Put a high
value (in the Linux version, this is convenient to put 1000 seconds, but on the Windows version we
can’t put more than 59 seconds).
➳ then validate this change with the OK button.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 5: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/5.jpg)
Demonstration of animated graphics 5
☞ To simulate the inclusion of files of the animated GIF format, we can include external files
(nevertheless, this will not offer any control on these animations, as in the previous examples). And we
must be really careful here, because this is very easy to gerenate huge files:
➳ with the same basic technique, we can include external files, as the ones resulting of the
disassembling of animated GIFa ones, or probably MNGb ones
1 \begin{slide}2 \begin{figure}[htbp]3 \centering4 \multido{\iImage=1+1}{20}{%5 \overlay{\iImage}%6 \ifnum\iImage<107 \makebox[0mm]{\includegraphics[width=15truecm]8 {Images/wcome0\iImage}}9 \else
10 \makebox[0mm]{\includegraphics[width=15truecm]11 {Images/wcome\iImage}}12 \fi}13 \caption{External files inclusion}14 \end{figure}15 \end{slide}
aIn my example, I use the gifsicle tool (see http://www.lcdf.org/˜eddietwo/gifsicle) with the
--explode option, convert each resulting GIF file to a JPEG one, then to a compressed encapsulated PostScript one.bSee http://www.libpng.org/pub/png/png-sitemap.html#animation
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 6: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/6.jpg)
Demonstration of animated graphics 6
➳ nevertheless, this way would provide a non acceptable huge overhead in the size of the output file if
the converter or compiler used is not able to load only one time each file, but load all of them for
each overlay (which is to say in my example 20× 20× 8 KB = 3.2 MB rather than 20× 8 KB
= 160 KB!)
➳ if the compiler or converter used can include only one copy of each file, the CPU time could
nevertheless be significant (for instance, the following example alone require 45 sec. with the VTEX
compiler and a recent processor –but it will produce a file of only 400 KB, including the
backgrounds, etc.)
➳ so, if the compiler or converter used does not allow to manage overlays for such tasks, we must use
a simple loop on the slide environments, putting each image on it own slide. Nevertheless, this
cause various annex problems with counters, etc., which must be solved conveniently
1 \multido{\iImage=1+1}{20}{%2 \begin{slide}3 \ifnum\multidocount>14 % Only one time in the list of slides!5 \renewcommand{\slideheading}[1]{\makeslideheading{#1}}%6 \fi7 \slideheading{External files inclusion}%
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 7: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/7.jpg)
Demonstration of animated graphics 7
8 \vspace{1cm}9 \begin{figure}[htbp]
10 \centering11 \ifnum\iImage<1012 \includegraphics[width=15truecm]{Images/wcome0\iImage}13 \else14 \includegraphics[width=15truecm]{Images/wcome\iImage}15 \fi16 \caption{External files inclusion}17 \end{figure}18 \end{slide}19 \addtocounter{figure}{-1}%20 \addtocounter{slide}{-1}}21
22 % If other slides followed...23 \addtocounter{figure}{1}24 \addtocounter{slide}{1}
☞ Now, if you switch to Full Screen mode now then go to the next page, the visualization of the next
slides will be automatic...
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 8: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/8.jpg)
Demonstration of animated graphics 8
End of animation
2 – Communication ring
0
1
2
34
5
6
1000
1001
1002
1003
1004
1005
1006
Figure 1: Communication ring
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 9: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/9.jpg)
Demonstration of animated graphics 8
End of animation
2 – Communication ring
0
1
2
34
5
6
1000
1001
1002
1003
1004
1005
1006
Figure 1: Communication ring
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 10: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/10.jpg)
Demonstration of animated graphics 8
End of animation
2 – Communication ring
0
1
2
34
5
6
1000
1001
1002
1003
1004
1005
1006
Figure 1: Communication ring
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 11: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/11.jpg)
Demonstration of animated graphics 8
End of animation
2 – Communication ring
0
1
2
34
5
6
1000
1001
1002
1003
1004
1005
1006
Figure 1: Communication ring
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 12: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/12.jpg)
Demonstration of animated graphics 8
End of animation
2 – Communication ring
0
1
2
34
5
6
1000
1001
1002
1003
1004
1005
1006
Figure 1: Communication ring
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 13: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/13.jpg)
Demonstration of animated graphics 8
End of animation
2 – Communication ring
0
1
2
34
5
6
1000
1001
1002
1003
1004
1005
1006
Figure 1: Communication ring
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 14: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/14.jpg)
Demonstration of animated graphics 8
End of animation
2 – Communication ring
0
1
2
34
5
6
1000
1001
1002
1003
1004
1005
1006
Figure 1: Communication ring
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 15: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/15.jpg)
Demonstration of animated graphics 8
End of animation
2 – Communication ring
0
1
2
34
5
6
1000
1001
1002
1003
1004
1005
1006
Figure 1: Communication ring
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 16: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/16.jpg)
Demonstration of animated graphics 9
End of animation
3 – Commutative diagram
ΣL
ΣR
L Lr R
Lm Kr,m Rm∗
ΣG
ΣH
G Gr∗ H
i1 r
i2
i3
i4 i6
r
m
i5
m
r∗
m∗
λL
ϕr
λR
ϕm
λGϕr
∗
ϕm∗
λH
Figure 2: Commutative diagram
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 17: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/17.jpg)
Demonstration of animated graphics 9
End of animation
3 – Commutative diagram
ΣL
ΣR
L Lr R
Lm Kr,m Rm∗
ΣG
ΣH
G Gr∗ H
i1 r
i2
i3
i4 i6
r
m
i5
m
r∗
m∗
λL
ϕr
λR
ϕm
λGϕr
∗
ϕm∗
λH
Figure 2: Commutative diagram
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 18: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/18.jpg)
Demonstration of animated graphics 9
End of animation
3 – Commutative diagram
ΣL
ΣR
L Lr R
Lm Kr,m Rm∗
ΣG
ΣH
G Gr∗ H
i1 r
i2
i3
i4 i6
r
m
i5
m
r∗
m∗
λL
ϕr
λR
ϕm
λGϕr
∗
ϕm∗
λH
Figure 2: Commutative diagram
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 19: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/19.jpg)
Demonstration of animated graphics 9
End of animation
3 – Commutative diagram
ΣL
ΣR
L Lr R
Lm Kr,m Rm∗
ΣG
ΣH
G Gr∗ H
i1 r
i2
i3
i4 i6
r
m
i5
m
r∗
m∗
λL
ϕr
λR
ϕm
λGϕr
∗
ϕm∗
λH
Figure 2: Commutative diagram
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 20: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/20.jpg)
Demonstration of animated graphics 9
End of animation
3 – Commutative diagram
ΣL
ΣR
L Lr R
Lm Kr,m Rm∗
ΣG
ΣH
G Gr∗ H
i1 r
i2
i3
i4 i6
r
m
i5
m
r∗
m∗
λL
ϕr
λR
ϕm
λGϕr
∗
ϕm∗
λH
Figure 2: Commutative diagram
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 21: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/21.jpg)
Demonstration of animated graphics 9
End of animation
3 – Commutative diagram
ΣL
ΣR
L Lr R
Lm Kr,m Rm∗
ΣG
ΣH
G Gr∗ H
i1 r
i2
i3
i4 i6
r
m
i5
m
r∗
m∗
λL
ϕr
λR
ϕm
λGϕr
∗
ϕm∗
λH
Figure 2: Commutative diagram
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 22: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/22.jpg)
Demonstration of animated graphics 9
End of animation
3 – Commutative diagram
ΣL
ΣR
L Lr R
Lm Kr,m Rm∗
ΣG
ΣH
G Gr∗ H
i1 r
i2
i3
i4 i6
r
m
i5
m
r∗
m∗
λL
ϕr
λR
ϕm
λGϕr
∗
ϕm∗
λH
Figure 2: Commutative diagram
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 23: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/23.jpg)
Demonstration of animated graphics 9
End of animation
3 – Commutative diagram
ΣL
ΣR
L Lr R
Lm Kr,m Rm∗
ΣG
ΣH
G Gr∗ H
i1 r
i2
i3
i4 i6
r
m
i5
m
r∗
m∗
λL
ϕr
λR
ϕm
λGϕr
∗
ϕm∗
λH
Figure 2: Commutative diagram
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 24: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/24.jpg)
Demonstration of animated graphics 9
End of animation
3 – Commutative diagram
ΣL
ΣR
L Lr R
Lm Kr,m Rm∗
ΣG
ΣH
G Gr∗ H
i1 r
i2
i3
i4 i6
r
m
i5
m
r∗
m∗
λL
ϕr
λR
ϕm
λGϕr
∗
ϕm∗
λH
Figure 2: Commutative diagram
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 25: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/25.jpg)
Demonstration of animated graphics 9
End of animation
3 – Commutative diagram
ΣL
ΣR
L Lr R
Lm Kr,m Rm∗
ΣG
ΣH
G Gr∗ H
i1 r
i2
i3
i4 i6
r
m
i5
m
r∗
m∗
λL
ϕr
λR
ϕm
λGϕr
∗
ϕm∗
λH
Figure 2: Commutative diagram
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 26: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/26.jpg)
Demonstration of animated graphics 9
End of animation
3 – Commutative diagram
ΣL
ΣR
L Lr R
Lm Kr,m Rm∗
ΣG
ΣH
G Gr∗ H
i1 r
i2
i3
i4 i6
r
m
i5
m
r∗
m∗
λL
ϕr
λR
ϕm
λGϕr
∗
ϕm∗
λH
Figure 2: Commutative diagram
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 27: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/27.jpg)
Demonstration of animated graphics 9
End of animation
3 – Commutative diagram
ΣL
ΣR
L Lr R
Lm Kr,m Rm∗
ΣG
ΣH
G Gr∗ H
i1 r
i2
i3
i4 i6
r
m
i5
m
r∗
m∗
λL
ϕr
λR
ϕm
λGϕr
∗
ϕm∗
λH
Figure 2: Commutative diagram
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 28: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/28.jpg)
Demonstration of animated graphics 9
End of animation
3 – Commutative diagram
ΣL
ΣR
L Lr R
Lm Kr,m Rm∗
ΣG
ΣH
G Gr∗ H
i1 r
i2
i3
i4 i6
r
m
i5
m
r∗
m∗
λL
ϕr
λR
ϕm
λGϕr
∗
ϕm∗
λH
Figure 2: Commutative diagram
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 29: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/29.jpg)
Demonstration of animated graphics 9
End of animation
3 – Commutative diagram
ΣL
ΣR
L Lr R
Lm Kr,m Rm∗
ΣG
ΣH
G Gr∗ H
i1 r
i2
i3
i4 i6
r
m
i5
m
r∗
m∗
λL
ϕr
λR
ϕm
λGϕr
∗
ϕm∗
λH
Figure 2: Commutative diagram
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 30: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/30.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 31: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/31.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723
723723
723723
723723
723723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 32: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/32.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723
723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 33: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/33.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723
723723
723723
723723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 34: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/34.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723
723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 35: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/35.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723
723723
723723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 36: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/36.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723
723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 37: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/37.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723
723723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 38: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/38.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723
723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 39: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/39.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 40: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/40.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819
819819
819819
819819
819819
+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 41: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/41.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819
819
819819
819819
819819
819
+ 13 %
+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 42: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/42.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819
819819
819819
819819
+ 13 %+ 13 %
+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 43: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/43.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819
819
819819
819819
819
+ 13 %+ 13 %
+ 13 %
+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 44: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/44.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819
819819
819819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 45: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/45.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819
819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 46: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/46.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819
819819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
+ 13 %+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 47: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/47.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819
819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 48: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/48.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 49: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/49.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter687
687 687 687 687 687 687 687 687
– 16.1 %
– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 50: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/50.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687
687
687 687 687 687 687 687 687 – 16.1 %
– 16.1 %
– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 51: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/51.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687
687
687 687 687 687 687 687 – 16.1 %– 16.1 %
– 16.1 %
– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 52: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/52.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687
687
687 687 687 687 687 – 16.1 %– 16.1 %– 16.1 %
– 16.1 %
– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 53: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/53.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687
687
687 687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %
– 16.1 %
– 16.1 %– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 54: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/54.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687
687
687 687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
– 16.1 %
– 16.1 %– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 55: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/55.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687
687
687 687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
– 16.1 %
– 16.1 %– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 56: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/56.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687
687
687 – 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
– 16.1 %
– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 57: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/57.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687
687
– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 58: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/58.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687
687
– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 59: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/59.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687
687
– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 60: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/60.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687
687
– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 61: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/61.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687
687
– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 62: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/62.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687
687
– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 63: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/63.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687
687
– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 64: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/64.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687
687
– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 65: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/65.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687
687
– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 66: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/66.jpg)
Demonstration of animated graphics 10
End of animation
4 – Results of the year
Table 1: Results of the year
1st Quarter
723723
723723
723723
723723
723
2nd Quarter
819819
819819
819819
819819
819
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %+ 13 %
+ 13 %
3rd Quarter
687 687 687 687 687 687 687 687
687
– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %– 16.1 %
– 16.1 %
4th Quarter
894
894
894
894
894
894
894
894
894
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
+ 30.1 %
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 67: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/67.jpg)
Demonstration of animated graphics 11
End of animation
5 – Clock
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 68: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/68.jpg)
Demonstration of animated graphics 11
End of animation
5 – Clock
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 69: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/69.jpg)
Demonstration of animated graphics 11
End of animation
5 – Clock
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 70: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/70.jpg)
Demonstration of animated graphics 11
End of animation
5 – Clock
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 71: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/71.jpg)
Demonstration of animated graphics 11
End of animation
5 – Clock
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 72: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/72.jpg)
Demonstration of animated graphics 11
End of animation
5 – Clock
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 73: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/73.jpg)
Demonstration of animated graphics 11
End of animation
5 – Clock
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 74: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/74.jpg)
Demonstration of animated graphics 11
End of animation
5 – Clock
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 75: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/75.jpg)
Demonstration of animated graphics 11
End of animation
5 – Clock
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 76: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/76.jpg)
Demonstration of animated graphics 11
End of animation
5 – Clock
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 77: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/77.jpg)
Demonstration of animated graphics 11
End of animation
5 – Clock
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 78: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/78.jpg)
Demonstration of animated graphics 11
End of animation
5 – Clock
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 79: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/79.jpg)
Demonstration of animated graphics 11
End of animation
5 – Clock
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 80: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/80.jpg)
Demonstration of animated graphics 11
End of animation
5 – Clock
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 81: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/81.jpg)
Demonstration of animated graphics 12
End of animation
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Hurry!
I’m late...
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 82: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/82.jpg)
Demonstration of animated graphics 12
End of animation
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Hurry!
I’m late...
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 83: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/83.jpg)
Demonstration of animated graphics 12
End of animation
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Hurry!
I’m late...
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 84: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/84.jpg)
Demonstration of animated graphics 12
End of animation
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Hurry!
I’m late...
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 85: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/85.jpg)
Demonstration of animated graphics 12
End of animation
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Hurry!
I’m late...
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 86: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/86.jpg)
Demonstration of animated graphics 12
End of animation
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Hurry!
I’m late...
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 87: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/87.jpg)
Demonstration of animated graphics 12
End of animation
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Hurry!
I’m late...
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 88: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/88.jpg)
Demonstration of animated graphics 12
End of animation
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Hurry!
I’m late...
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 89: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/89.jpg)
Demonstration of animated graphics 12
End of animation
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Hurry!
I’m late...
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 90: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/90.jpg)
Demonstration of animated graphics 12
End of animation
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Hurry!
I’m late...
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 91: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/91.jpg)
Demonstration of animated graphics 12
End of animation
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Hurry!
I’m late...
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 92: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/92.jpg)
Demonstration of animated graphics 12
End of animation
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Hurry!
I’m late...
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 93: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/93.jpg)
Demonstration of animated graphics 12
End of animation
I
II
III
IV
VVI
VII
VIII
IX
X
XIXII
Hurry!
I’m late...
Figure 3: Clock
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 94: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/94.jpg)
Demonstration of animated graphics 13
End of animation
6 – Clock with split-second hand
Document compiled at: 22h 29m 01s02s03s04s05s06s07s08s09s10s11s12s13s14s15s
I
II
III
IV
VVIVII
VIII
IX
X
XI XII
Figure 4: Clock with split-second hand
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 95: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/95.jpg)
Demonstration of animated graphics 13
End of animation
6 – Clock with split-second hand
Document compiled at: 22h 29m 01s02s03s04s05s06s07s08s09s10s11s12s13s14s15s
I
II
III
IV
VVIVII
VIII
IX
X
XI XII
Figure 4: Clock with split-second hand
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 96: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/96.jpg)
Demonstration of animated graphics 13
End of animation
6 – Clock with split-second hand
Document compiled at: 22h 29m 01s02s03s04s05s06s07s08s09s10s11s12s13s14s15s
I
II
III
IV
VVIVII
VIII
IX
X
XI XII
Figure 4: Clock with split-second hand
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 97: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/97.jpg)
Demonstration of animated graphics 13
End of animation
6 – Clock with split-second hand
Document compiled at: 22h 29m 01s02s03s04s05s06s07s08s09s10s11s12s13s14s15s
I
II
III
IV
VVIVII
VIII
IX
X
XI XII
Figure 4: Clock with split-second hand
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 98: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/98.jpg)
Demonstration of animated graphics 13
End of animation
6 – Clock with split-second hand
Document compiled at: 22h 29m 01s02s03s04s05s06s07s08s09s10s11s12s13s14s15s
I
II
III
IV
VVIVII
VIII
IX
X
XI XII
Figure 4: Clock with split-second hand
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 99: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/99.jpg)
Demonstration of animated graphics 13
End of animation
6 – Clock with split-second hand
Document compiled at: 22h 29m 01s02s03s04s05s06s07s08s09s10s11s12s13s14s15s
I
II
III
IV
VVIVII
VIII
IX
X
XI XII
Figure 4: Clock with split-second hand
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 100: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/100.jpg)
Demonstration of animated graphics 13
End of animation
6 – Clock with split-second hand
Document compiled at: 22h 29m 01s02s03s04s05s06s07s08s09s10s11s12s13s14s15s
I
II
III
IV
VVIVII
VIII
IX
X
XI XII
Figure 4: Clock with split-second hand
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 101: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/101.jpg)
Demonstration of animated graphics 13
End of animation
6 – Clock with split-second hand
Document compiled at: 22h 29m 01s02s03s04s05s06s07s08s09s10s11s12s13s14s15s
I
II
III
IV
VVIVII
VIII
IX
X
XI XII
Figure 4: Clock with split-second hand
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 102: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/102.jpg)
Demonstration of animated graphics 13
End of animation
6 – Clock with split-second hand
Document compiled at: 22h 29m 01s02s03s04s05s06s07s08s09s10s11s12s13s14s15s
I
II
III
IV
VVIVII
VIII
IX
X
XI XII
Figure 4: Clock with split-second hand
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 103: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/103.jpg)
Demonstration of animated graphics 13
End of animation
6 – Clock with split-second hand
Document compiled at: 22h 29m 01s02s03s04s05s06s07s08s09s10s11s12s13s14s15s
I
II
III
IV
VVIVII
VIII
IX
X
XI XII
Figure 4: Clock with split-second hand
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 104: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/104.jpg)
Demonstration of animated graphics 13
End of animation
6 – Clock with split-second hand
Document compiled at: 22h 29m 01s02s03s04s05s06s07s08s09s10s11s12s13s14s15s
I
II
III
IV
VVIVII
VIII
IX
X
XI XII
Figure 4: Clock with split-second hand
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 105: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/105.jpg)
Demonstration of animated graphics 13
End of animation
6 – Clock with split-second hand
Document compiled at: 22h 29m 01s02s03s04s05s06s07s08s09s10s11s12s13s14s15s
I
II
III
IV
VVIVII
VIII
IX
X
XI XII
Figure 4: Clock with split-second hand
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 106: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/106.jpg)
Demonstration of animated graphics 13
End of animation
6 – Clock with split-second hand
Document compiled at: 22h 29m 01s02s03s04s05s06s07s08s09s10s11s12s13s14s15s
I
II
III
IV
VVIVII
VIII
IX
X
XI XII
Figure 4: Clock with split-second hand
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 107: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/107.jpg)
Demonstration of animated graphics 13
End of animation
6 – Clock with split-second hand
Document compiled at: 22h 29m 01s02s03s04s05s06s07s08s09s10s11s12s13s14s15s
I
II
III
IV
VVIVII
VIII
IX
X
XI XII
Figure 4: Clock with split-second hand
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 108: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/108.jpg)
Demonstration of animated graphics 13
End of animation
6 – Clock with split-second hand
Document compiled at: 22h 29m 01s02s03s04s05s06s07s08s09s10s11s12s13s14s15s
I
II
III
IV
VVIVII
VIII
IX
X
XI XII
Figure 4: Clock with split-second hand
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 109: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/109.jpg)
Demonstration of animated graphics 13
End of animation
6 – Clock with split-second hand
Document compiled at: 22h 29m 01s02s03s04s05s06s07s08s09s10s11s12s13s14s15s
I
II
III
IV
VVIVII
VIII
IX
X
XI XII
Figure 4: Clock with split-second hand
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 110: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/110.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 111: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/111.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 112: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/112.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 113: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/113.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 114: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/114.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 115: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/115.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 116: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/116.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 117: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/117.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 118: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/118.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 119: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/119.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 120: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/120.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 121: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/121.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 122: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/122.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 123: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/123.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 124: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/124.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 125: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/125.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 126: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/126.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 127: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/127.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 128: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/128.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 129: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/129.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 130: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/130.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 131: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/131.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 132: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/132.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 133: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/133.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 134: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/134.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 135: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/135.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 136: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/136.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 137: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/137.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 138: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/138.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 139: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/139.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 140: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/140.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 141: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/141.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 142: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/142.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 143: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/143.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 144: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/144.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 145: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/145.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 146: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/146.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 147: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/147.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 148: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/148.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 149: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/149.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 150: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/150.jpg)
Demonstration of animated graphics 14
End of animation
7 – Random walk
�
Figure 5: Random walk
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 151: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/151.jpg)
Demonstration of animated graphics 15
End of animation
8 – Text shown through a lens
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 152: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/152.jpg)
Demonstration of animated graphics 15
End of animation
8 – Text shown through a lens
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 153: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/153.jpg)
Demonstration of animated graphics 15
End of animation
8 – Text shown through a lens
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 154: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/154.jpg)
Demonstration of animated graphics 15
End of animation
8 – Text shown through a lens
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 155: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/155.jpg)
Demonstration of animated graphics 15
End of animation
8 – Text shown through a lens
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 156: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/156.jpg)
Demonstration of animated graphics 15
End of animation
8 – Text shown through a lens
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 157: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/157.jpg)
Demonstration of animated graphics 15
End of animation
8 – Text shown through a lens
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 158: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/158.jpg)
Demonstration of animated graphics 15
End of animation
8 – Text shown through a lens
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 159: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/159.jpg)
Demonstration of animated graphics 15
End of animation
8 – Text shown through a lens
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 160: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/160.jpg)
Demonstration of animated graphics 15
End of animation
8 – Text shown through a lens
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 161: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/161.jpg)
Demonstration of animated graphics 15
End of animation
8 – Text shown through a lens
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
L’Eternite
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Ame sentinelle
Murmurons l’aveu
De la nuit si nulle
Et du jour en feu.
Des humains suffrages
Des communs elans
La tu te degages
Et voles selon.
Puisque de vous seules,
Braises de satin,
Le devoir s’exhale
Sans qu’on dise : enfin.
La pas d’esperance,
Nul orietur.
Science avec patience,
Le supplice est sur.
Elle est retrouvee.
Quoi ? — L’Eternite.
C’est la mer allee
Avec le soleil.
Arthur Rimbaud
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 162: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/162.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do not do like me!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 163: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/163.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
D
o not do like me!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 164: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/164.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do
not do like me!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 165: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/165.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do
not do like me!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 166: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/166.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do n
ot do like me!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 167: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/167.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do no
t do like me!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 168: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/168.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do not
do like me!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 169: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/169.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do not
do like me!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 170: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/170.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do not d
o like me!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 171: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/171.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do not do
like me!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 172: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/172.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do not do
like me!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 173: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/173.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do not do l
ike me!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 174: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/174.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do not do li
ke me!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 175: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/175.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do not do lik
e me!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 176: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/176.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do not do like
me!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 177: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/177.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do not do like
me!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 178: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/178.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do not do like m
e!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 179: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/179.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do not do like me
!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 180: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/180.jpg)
Demonstration of animated graphics 16
End of animation
9 – Text progressively shown
Do not do like me!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 181: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/181.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 182: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/182.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 183: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/183.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 184: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/184.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 185: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/185.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 186: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/186.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 187: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/187.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 188: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/188.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 189: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/189.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 190: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/190.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 191: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/191.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 192: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/192.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 193: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/193.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 194: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/194.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 195: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/195.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 196: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/196.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 197: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/197.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 198: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/198.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 199: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/199.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 200: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/200.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 201: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/201.jpg)
Demonstration of animated graphics 17
End of animation
10 – Text progressively vanished
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Oh! my dear friends...
It is time to tell you
good bye!
See you again soon!
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 202: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/202.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
O
2: Definition of the point P 1 at 5 units from O
P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
PP1
5: Definition of the point B, with P 1-O-B a right angle
B
6: Definition of the point J, as 0.25 of O-B
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
F
12: Definition of the point MFP1, as middle of the line F-P 1
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
P6
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 203: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/203.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
PP1
5: Definition of the point B, with P 1-O-B a right angle
B
6: Definition of the point J, as 0.25 of O-B
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
F
12: Definition of the point MFP1, as middle of the line F-P 1
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
P6
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 204: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/204.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
PP1
5: Definition of the point B, with P 1-O-B a right angle
B
6: Definition of the point J, as 0.25 of O-B
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
F
12: Definition of the point MFP1, as middle of the line F-P 1
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
P6
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 205: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/205.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
PP1
5: Definition of the point B, with P 1-O-B a right angle
B
6: Definition of the point J, as 0.25 of O-B
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
F
12: Definition of the point MFP1, as middle of the line F-P 1
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
P6
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 206: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/206.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
B
6: Definition of the point J, as 0.25 of O-B
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
F
12: Definition of the point MFP1, as middle of the line F-P 1
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
P6
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 207: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/207.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
F
12: Definition of the point MFP1, as middle of the line F-P 1
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
P6
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 208: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/208.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
F
12: Definition of the point MFP1, as middle of the line F-P 1
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
P6
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 209: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/209.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
F
12: Definition of the point MFP1, as middle of the line F-P 1
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
P6
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 210: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/210.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
F
12: Definition of the point MFP1, as middle of the line F-P 1
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
P6
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 211: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/211.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
F
12: Definition of the point MFP1, as middle of the line F-P 1
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
P6
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 212: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/212.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
F
12: Definition of the point MFP1, as middle of the line F-P 1
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
P6
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 213: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/213.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
P6
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 214: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/214.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
P6
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 215: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/215.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
P6
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 216: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/216.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
P6
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 217: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/217.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
P6
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 218: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/218.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
P6
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 219: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/219.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 220: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/220.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 221: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/221.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 222: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/222.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 223: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/223.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 224: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/224.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 225: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/225.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 226: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/226.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 227: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/227.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 228: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/228.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 229: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/229.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 230: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/230.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 231: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/231.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 232: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/232.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 233: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/233.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 234: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/234.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 235: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/235.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 236: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/236.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 237: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/237.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 238: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/238.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 239: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/239.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 240: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/240.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 241: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/241.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 242: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/242.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 243: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/243.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 244: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/244.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 245: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/245.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 246: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/246.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 247: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/247.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 248: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/248.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 249: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/249.jpg)
Demonstration of animated graphics 18
End of animation
11 – Building of a regular polygon of seventeen sides
1: Definition of the center O of the polygon
�
O
2: Definition of the point P 1 at 5 units from O
� P1
3: Circle of center O with the point P 1 on it4: Definition of the point PP 1, symmetric to the point P 1
�PP1
5: Definition of the point B, with P 1-O-B a right angle
�
B
6: Definition of the point J, as 0.25 of O-B
�
J
7: Line between the points J and P 18: Bissectrisse of the angle defined by the points J, O, and P 1, which define the point PE19: Bissectrisse of the angle defined by the points J, O, and PE1, which define the point PE210: Definition of the point E, as intersection of the two lines O-P 1 and J-PE2
�
E
11: Definition of the point F, as intersection of the two lines O-P 1 and J-PF1, with PF1 defined by J and E
�
F
12: Definition of the point MFP1, as middle of the line F-P 1
�
MFP1
// //
13: Circle of center MFP1 with point P 1 on it14: Definition of the point K, as intersection of the line O-B and the circle of center MFP1 and radius P 1
�
K
15: Circle of center E with point K on it16: Definition of the points N 4 and N 6, as intersection of the line P 1-E and the circle of center E radius K
N4 N6
17: Definition of the points P 6 and P 13, as intersection of the line N 6-PP 6 and the original circle
�
P6
�
P13
∧∧
18: Definition of the points P 4 and P 15, as intersection of the line N 4-PP 4 and the original circle
P4
�
P15
∪∪
19: Bissectrisse of the angle defined by the points P 4, O, and P 6, which define the point P 5
�
P5
20: Definition of the point P 14 on the original circle, by orthogonal symmetry with the point P 5
�
P14
////
21: Definition of the point P 3 on the original circle, by intersection of two circles
�
P3
22: Definition of the point P 16 on the original circle, by orthogonal symmetry with the point P 3
�
P16
//
23: Definition of the point P 2 on the original circle, by intersection of two circles
�
P2
24: Definition of the point P 17 on the original circle, by orthogonal symmetry with the point P 2
�
P17
//////
25: Definition of the point P 7 on the original circle, by intersection of two circles
�
P7
26: Definition of the point P 12 on the original circle, by orthogonal symmetry with the point P 7
�
P12
◦◦
27: Definition of the point P 8 on the original circle, by intersection of two circles
�
P8
28: Definition of the point P 11 on the original circle, by orthogonal symmetry with the point P 8
�
P11
××
29: Definition of the point P 9 on the original circle, by intersection of two circles
�P9
30: Definition of the point P 10 on the original circle, by orthogonal symmetry with the point P 9
�
P10
≡≡
31: Side number 1 of the polygon32: Side number 2 of the polygon33: Side number 3 of the polygon34: Side number 4 of the polygon35: Side number 5 of the polygon36: Side number 6 of the polygon37: Side number 7 of the polygon38: Side number 8 of the polygon39: Side number 9 of the polygon40: Side number 10 of the polygon41: Side number 11 of the polygon42: Side number 12 of the polygon43: Side number 13 of the polygon44: Side number 14 of the polygon45: Side number 15 of the polygon46: Side number 16 of the polygon47: Side number 17 of the polygon
Figure 6: Building of a regular polygon of seventeen sides, according to the method introduced by CarlFriedrich GAUSS.This code is from Dominique RODRIGUEZ, part of the examples of his ‘pst-eucl’ PSTricks packagefor Euclidian geometry.
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 250: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/250.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 251: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/251.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 252: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/252.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 253: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/253.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 254: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/254.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 255: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/255.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 256: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/256.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 257: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/257.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 258: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/258.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 259: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/259.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 260: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/260.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 261: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/261.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 262: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/262.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 263: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/263.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 264: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/264.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 265: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/265.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 266: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/266.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 267: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/267.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 268: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/268.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou
![Page 269: Demonstration of animated graphicsDemonstration of animated graphics 3 1 – Introduction A kind of simple animated graphics can be easily obtained (at least with Acroread). Nevertheless,](https://reader034.fdocuments.us/reader034/viewer/2022051900/5fef1a5b5eb8380ee01022ef/html5/thumbnails/269.jpg)
Demonstration of animated graphics 19
End of animation
12 – External files inclusion
Figure 7: External files inclusion
Seminar demonstration files – Animated graphics Version 1.0 – June 2002Denis Girou