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Transcript of Geometry
![Page 1: Geometry](https://reader036.fdocuments.us/reader036/viewer/2022062720/5681332b550346895d9a1fa8/html5/thumbnails/1.jpg)
Geometry
9.1 An Introduction to Circles
![Page 2: Geometry](https://reader036.fdocuments.us/reader036/viewer/2022062720/5681332b550346895d9a1fa8/html5/thumbnails/2.jpg)
Please turn to your vocab page.Try to draw each vocab word in the boxes afteryou hear the definition but before you see the picture.
![Page 3: Geometry](https://reader036.fdocuments.us/reader036/viewer/2022062720/5681332b550346895d9a1fa8/html5/thumbnails/3.jpg)
Circle
•The set of all points in a plane at a given distance from a given point.
.P
P is the center of the circle.The circle is the set of all points in the plane of the screen 3 away from P.
3
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Radius Plural is radii
•A segment that joins the center of the circle to any point on the circle.
.P
radi
us
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Chord
•A segment whose endpoints lie on a circle.
.P
chord
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Diameter
•A chord that passes through the center of the circle.
diameter.P
The diameter is _________ as long as the radius.
twice
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Secant
•A line that contains a chord of a circle.
SECANT .P
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Tangent
•A line in the plane of a circle that intersects the circle in exactly one point.
Tangent .P.Point of tangency
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• Try #1-9
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From the Packet, Name:
1) The center:
D
A
F
E
C
B
A
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Name:
2) Two diameters:
D
A
F
E
C
B
DBand
FC
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Name:
3) A point of tangency:
D
A
F
E
C
B
D
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Name:
4) Four radii:
D
A
F
E
C
B
ABand
AFand
AC and AD
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Name:
5) A tangent:
D
A
F
E
C
B
ED
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Name:
6) A secant:
D
A
F
E
C
B
FC
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Name:
7) Six chords:
D
A
F
E
C
B
FBand
DFand
BC
and
DCand
DBand
FC
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8) Why is AC not aChord of A:
D
A
F
E
C
B
.
A chord is a segment with both endpoints on the circle.
AC has only one endpoint on the circle.
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9) Why is BD not aChord of A:
D
A
F
E
C
B
.
A chord is a segment not a line.
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Please turn back to your vocab page.Try to draw each vocab word in the boxes afteryou hear the definition but before you see the picture.
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Sphere• Sphere: The set of all points in space given distance
from any given point is a sphere. • Many of the terms used with circles are also used with
spheres.• For example, sphere X has a… center:
radii:
chords: diameter: secants: tangent: point of tangency:
J
L I
K
X
F
G
H
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Congruent Circles
congruent circles/spheres Circles (or spheres) are congruent if they have congruent radii.
44
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Concentric Circles
concentric circles: Circles that lie in the same plane and have the same center are concentric.
concentric spheres: Concentric spheres have the same center.
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Inscribed Polygon• A polygon is inscribed in a circle if each vertex of the
polygon lies on the circle.
• A circle is circumscribed about a polygon if each vertex of the polygon lies on the circle.
The polygon is inscribed in the circle.
Thus, the circle is circumscribed about the polygon.
These two sentences have the same meaning.
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Try # 10-13.
Screen up!!
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10. a diameter, BC 11. a chord, DE
12. a tangent, CF#$$$$$$$$$$$$$ $
13. a secant, DG#$$$$$$$$$$$$$ $
In sphere A, draw:
14. Draw two concentric circles. Draw a tangent to one of the circles. Is it tangent to the other circle?
15. Draw a large circle. Inscribe an isosceles triangle in the circle.
16. Draw a rectangle. Circumscribe a circle about the rectangle.
A
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In sphere A, draw:
10. a diameter, BC
11. a chord, DE
12. a tangent, CF
13. a secant, DG
A
B C
D E
F
G
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• 14. Draw two concentric circles. Draw a tangent to one of the circles. Is it tangent to the other circle?
• 15. Draw a large circle. Inscribe an isosceles triangle in the circle.
• 16. Draw a rectangle. Circumscribe a circle about the rectangle.
No.
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Find the value of x.
O
Bx
6
6
120120
12060
30
6
3√3
3
3√33√3
x = 6√3
90
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O4
x
x
8
O
60
O
x
1045
4 4
3x
O
x
Find the value of x. O is the center of each circle.
17. 18.
19. 20.
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O4
x
x
8
O
60
O
x
1045
4
3x
O
x
Find the value of x. O is the center of each circle.
17. 18.
19. 20.
x = 5
x = 8
x = 4√2
x = 5√2
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HW
• P. 330-331 CE 1-11 WE 1-15