56157 23 ch23 p305-334academic.brooklyn.cuny.edu/physics/liu/phys2/hmwk_ans/...23.12 Realize that...
Transcript of 56157 23 ch23 p305-334academic.brooklyn.cuny.edu/physics/liu/phys2/hmwk_ans/...23.12 Realize that...
310 Chapter 23
12. (a) No. The screen is needed to refl ect the light toward your eye.
(b) Yes. The light is traveling toward your eye and diverging away from the position of the image, the same as if the object was located at that position.
14. (d). The entire image would appear because any portion of the lens can form the image. The image would be dimmer because the card reduces the light intensity on the screen by 50%.
PROBLEM SOLUTIONS
23.1 If you stand 40 cm in front of the mirror, the time required for light scattered from your face to travel to the mirror and back to your eye is
Δtd
c= =
( )×
= × −2 2 0 40
3 0 102 7 108
9.
..
m
m s s
Thus, the image you observe shows you ~10 9− s younger than your current age.
23.2 (a) With the palm located 1.0 m in front of the nearest mirror, that mirror forms an image, IP1,
of the palm located 1.0 m behind the nearest mirror .
(b) The farthest mirror forms an image, IB1, of the back of the hand located 2.0 m behind this mirror and 5.0 m in front of the nearest mirror. This image serves and an object for
the nearest mirror, which then forms an image, IB2, of the back of the hand located
5.0 m behind the nearest mirror .
(c) The image IP1 (see part a) serves as an object located 4.0 m in front of the farthest mirror, which forms an image IP2 of the palm, located 4.0 m behind that mirror and 7.0 m in front of the nearest mirror. This image then serves as an object for the nearest mirror, which
forms an image IP3 of the palm , located 7.0 m behind the nearest mirror .
(d) Since all images are located behind the mirror, all are virtual images .
23.3 (1) The fi rst image in the left-hand mirror is 5.00 ft behind the mirror,
or 10.0 ft from the person .
(2) The fi rst image in the right-hand mirror serves as an object for the left-hand mirror. It is located 10.0 ft behind the right-hand mirror, which is 25.0 ft from the left-hand mirror. Thus, the second image in the left-hand mirror is 25.0 ft behind the mirror,or 30.0 ft from the person .
(3) The fi rst image in the left-hand mirror serves as an object for the right-hand mirror. It is located 20.0 ft in front of the right-hand mirror and forms an image 20.0 ft behind that mirror. This image then serves as an object for the left-hand mirror. The distance from this object to the left-hand mirror is 35.0 ft. Thus, the third image in the left-hand mirror is 35.0 ft behind the mirror, or 40.0 ft from the person .
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Mirrors and Lenses 311
23.4 The virtual image is as far behind the mirror as the choir is in front of the mirror. Thus, the image is 5.30 m behind the mirror.
The image of the choir is
0 800 5 30 6 10. . . m m m+ =
from the organist. Using similar triangles gives
′ =h
0 600
6 10
0 800.
.
. m
m
m
or ′ = ( )⎛⎝⎜
⎞⎠⎟ =h 0 600
6 10
0 8004 58.
.
.. m
m
m m
23.5 In the fi gure at the right, ′ =θ θ since they are vertical angles formed by two intersecting straight lines. Their complementary angles are also equal or ′ =α α . The right triangles PQRand ′P QR have the common side QR and are then congruent by the angle-side-angle theorem. Thus, the corresponding sides PQ and ′P Q are
equal, or the image is as far behind the mirror as the object is in front of it.
23.6 (a) Since the object is in front of the mirror, p > 0. With the image behind the mirror, q < 0. The mirror equation gives the radius of curvature as
2 1 1 1
1 00
1
10 0 10 0R p q= + = − = −
. . . cm cm
10 1
cm
or R = ⎛⎝⎜
⎞⎠⎟ = +2
10 02 22
..
cm
9 cm
(b) The magnifi cation is Mq
p= − = − − = +( .
.. .
10 0
1 0010 0
cm)
cm
23.7 (a) Since the mirror is concave, R > 0. Because the object is located in front of the mirror, p > 0. The mirror equation, 1 1 2p q R+ = , then gives the image distance as
qpR
p R=
−=
( )( )( ) −2
40 0 20 0
2 40 0 20 0
. .
. .
cm cm
cm ccm cm= +13 3.
Since q > 0, the image is located 13 3. cm in front of the mirror .
continued on next page
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312 Chapter 23
(b) Mq
p= − = − = −13 3
0 333.
. cm
40.0 cm cm
Because q > 0, the image is real and since M < 0, the image is inverted .
23.8 The lateral magnifi cation is given by M q p= − . Therefore, the image distance is
q Mp= − = −( )( ) = −0 013 0 30 0 0 390. . . cm cm.
The mirror equation: 2 1 1
R p q= + or R
pq
p q=
+2
gives R =−( )( )
−= −
2 0 390 30 0
30 0 0 3900
. .
. ..
cm cm
cm cm7790 cm
The negative sign tells us that the surface is convex. The magnitude of the radius of curvature of the cornea is
R = =0 790 7 90. . cm mm
23.9 (a) For a convex mirror, the focal length is f R= <2 0, and with the object in front of the
mirror, p > 0. The mirror equation, 1 1 2 1p q R f+ = = , then gives
qpf
p f=
−=
( ) −( )− −
30 0 10 0
30 0 10 0
. .
. .
cm cm
cm cm(( ) = −7 50. cm
With q < 0, the image is located 7.50 cm behind the mirror .
(b) The magnifi cation is
Mh
h
q
p= ′ = − = −
−( ) = +7 50
30 00 250
.
..
cm
cm
Since q < 0 and M > 0, the image is virtual and upright . Its height is
′ = = ( )( ) =h Mh 0 250 2 0 0 50. . . cm cm
23.10 The image was initially upright but became inverted when Dina was more than 30 cm from the mirror. From this information, we know that the mirror must be concave because a convex mirror will form only upright, virtual images of real objects.
When the object is located at the focal point of a concave mirror, the rays leaving the mirror are parallel, and no image is formed. Since Dina observed that her image disappeared when
she was about 30 cm from the mirror, we know that the focal length must be f ≈ 30 cm .
Also, for spherical mirrors, R f= 2 . Thus, the radius of curvature of this concave mirror must
be R ≈ 60 cm .
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Mirrors and Lenses 313
23.11 The magnifi ed, virtual images formed by a concave mirror are upright, so M > 0.
Thus, Mq
p
h
h= − = ′ = = +5 00
2 50.
. cm
2.00 cm, giving
q p= − = − +( ) = −2 50 2 50 3 00 7 50. . . . cm cm
The mirror equation then gives
1 2 1 1 1
3 00
1
7 7f R p q= = + = − = −
. cm .50 cm
2.50 1
.50 cm
or f = =7 505 00
..
cm
1.50 cm
23.12 Realize that the magnitude of the radius of curvature, R , is the same for both sides of the hubcap. For the convex side, R R= − ; and for the concave side, R R= + . The object distance p is positive (real object) and has the same value in both cases. Also, we write the virtual image distance as q q= − in each case. The mirror equation then gives:
For the convex side, 1 2 1
−=
−−
q R p or q
R p
R p=
+ 2 [1]
For the concave side, 1 2 1
−= −
q R p or qR p
R p=
− 2 [2]
Comparing Equations [1] and [2], we observe that the smaller magnitude image distance, q = 10 0. cm, occurs with the convex side of the mirror. Hence, we have
1
10 0
2 1
−=
−−
. cm R p [3]
and for the concave side, q = 30 0. cm gives
1
30 0
2 1
−= −
. cm R p [4]
(a) Adding Equations [3] and [4] yields 2 3 1
30 015 0
pp= + = +
..
cm or cm
(b) Subtracting [3] from [4] gives 4 3 1
30 060 0
RR= − =
..
cm or cm
23.13 The image is upright, so M > 0, and we have
Mq
p= − = + 2 0. , or q p= − = − ( ) = −2 0 2 0 2 50. . 5 cm cm
The radius of curvature is then found to be
2 1 1 1
2
1
5 5R p q= + = − = −
5 cm 0 cm
2 1
0 cm, or R =
⎛⎝⎜
⎞⎠⎟
=20
1 0.50 m
+1 m.
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314 Chapter 23
23.14 (a) Your ray diagram should be carefully drawn to scale and look like the diagram given below:
(b) From the mirror equation with p = +10 0. cm and f = −15 0. , cm the image distance is
qpf
p f=
−=
( ) −( )− −
10 0 15 0
10 0 15 0
. .
. .
cm cm
cm cm(( ) = −+
= − <150
25 06 00 0
cm
cm cm
..
and the magnifi cation is M q p= − = − −( ) ( ) = + >6 00 10 0 0 600 0. . . . cm cm Thus, you should fi nd that the image is
upright, located cm behind the mirror,6 00. six-tenths the size of the object .
23.15 The focal length of the mirror may be found from the given object and image distances as 1 1 1f p q= + , or
fp q
p q=
+=
( )( )+
= +152 18 0
152 18 016
cm cm
cm cm
.
...1 cm
For an upright image twice the size of the object, the magnifi cation is
M q p= − = +2 00. , giving q p= − 2 00.
Then, using the mirror equation again, 1 1 1p q f+ = becomes
1 1 1 1
2 00 2 00
1
p q p p p f+ = − = − =
. .
2 1
or pf= = =
2 00
16 1
2 008 05
.
.
..
cm cm
23.16 (a) The mirror is convex, so f < 0, and we have f f= − = −8 0. cm. The image is virtual, so q < 0, or q q= − . Since we also know that q p= 3, the mirror equation gives
1 1 1 3 1
p q p p f+ = − = or − =
−2 1
8 0p . cm and p = +16 cm
This means that we have a real object located 16 cm in front of the mirror .
(b) The magnifi cation is M q p q p= − = + = +1 3 . Thus, the image is upright and one-third the size of the object.
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Mirrors and Lenses 315
23.17 (a) We know that the object distance is p = +10 0. cm. Also, M > 0 since the image is upright, and M = 1 2 since the image is half the size of the object. Thus, we have
Mq
p
q= − = − = +10 0
1
2. cm or q = −5 00. cm
and the image is seen to be located 5.00 cm behind the mirror .
(b) From the mirror equation, 1 1 1p q f+ = , we fi nd the focal length to be
fpq
p q=
+=
( ) −( )+ −
10 0 5 00
10 0 5 00
. .
. .
cm cm
cm cm(( ) = −10 0. cm
23.18 (a) Since the mirror is concave, R > 0, giving R = +24 cm and f R= = +2 12 cm. Because the image is upright ( )M > 0 and three times the size of the object M =( )3 , we have
Mq
p= − = +3 and q p= −3
The mirror equation then gives
1 1
3
2
3
1
12p p p− = =
cm or p = +8 0. cm
(b) The needed ray diagram, with the object 8.0 cm in front of the mirror, is shown below:
From a carefully drawn scale drawing, you should fi nd that the image is
upright, virtual, 24 cm behind the mirror, aand three times the size of the object .
23.19 (a) An image formed on a screen is a real image. Thus, the mirror must be concave since, of mirrors, only concave mirrors can form real images of real objects.
(b) The magnifi ed, real images formed by concave mirrors are inverted, so M < 0 and
Mq
p= − = − 5, or p
q= = =5
5 01 0
..
m
5 m
The object should be 1 0. . m in front of the mirror
(a — revisited) The focal length of the mirror is
1 1
1 0
1
5 0
6
5 0f= + =
. . . m m m, or f = =5 0
60 83
..
m m
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316 Chapter 23
23.20 (a) From 1 1 2
p q R+ = , we fi nd q
R p
p R
p
p=
−=
( )−2
1 00
2 1 00
.
.
m
m.
The table gives the image position at a few critical points in the motion. Between p = 3 00. m and p = 0 500. m, the real image moves from 0.600 m to positive infi nity. From
ObjectDistance, p
ImageDistance, q
3.00 m 0.600 m
0.500 m ±∞
0 0
p = 0 500. cm to p = 0, the virtual image moves from negative infi nity to 0.
Note the “jump” in the image position as the ball passes through the focal point of the mirror.
(b) The ball and its image coincide when p = 0 and when
1 1 2 2p p p R+ = = , or p R= = 1 00. m
From Δ =y t a ty yv021
2+ , with v0 0y = , the times for the ball to fall from p = 3 00. m to these
positions are found to be
ty
ay
=( ) =
−( )−
=2 2 2 00
9 800 639
Δ .
..
m
m s s2 and
t =−( )
−=
2 3 00
9 800 782
.
..
m
m s s2
23.21 From n
p
n
q
n n
R1 2 2 1+ = −
, with R → ∞, the image position is found to be
qn
np= − = − ⎛
⎝⎜⎞⎠⎟ ( ) = −2
1
1 00
1 30950 0 38 2
.
.. . cm cm
or the virtual image is 38 2. cm below the upper surface of the ice .
23.22 The center of curvature of a convex surface is located behind the surface, and the sign convention for refracting surfaces (Table 23.2 in the textbook) states that R > 0, giving R = + 8 00. cm. The object is in front of the surface ( p > 0) and in air (n1 1 00= . ), while the second medium is glass ( n2 1 50= . ). Thus, n p n q n n R1 2 2 1+ = −( ) becomes
1 00 1 50 1 50 1 00
8 00
. . . .
.p q+ = −
cm and reduces to q
p
p=
( )−
24 0
16 0
.
.
cm
cm
(a) If p = 20 0. cm, q =( )( )
−= +
24 0 20 0
20 0 16 0120
. .
. .
cm cm
cm cm cm
(b) If p = 8 00. cm, q =( )( )
−= −
24 0 8 00
8 00 16 024 0
. .
. ..
cm cm
cm cm cmm
continued on next page
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Mirrors and Lenses 317
(c) If p = 4 00. cm, q =( )( )
−= −
24 0 4 00
4 00 16 08 00
. .
. ..
cm cm
cm cm cmm
(d) If p = 2 00. cm, q =( )( )
−= −
24 0 2 00
2 00 16 03 43
. .
. ..
cm cm
cm cm cmm
23.23 Since the center of curvature of the surface is on the side the light comes from, R < 0, giving
R = − 4 0. cm. Then, n
p
n
q
n n
R1 2 2 1+ = − becomes
1 00 1 00 1 50
4 0
1 50
4 0
. . .
.
.
.q= −
−−
cm cm, or q = − 4 0. cm
Thus, the magnifi cation Mh
h
n
n
q
p= ′ = −
⎛⎝⎜
⎞⎠⎟
1
2
gives
′ = −⎛⎝⎜
⎞⎠⎟
= −−( )(h
n q
n ph1
2
1 50 4 0
1 00 4 0
. .
. .
cm
cm)) ( ) =2 5 3 8. . mm mm
23.24 For a plane refracting surface R →( )∞
n
p
n
q
n n
R1 2 2 1+ = −
becomes qn
np= − 2
1
(a) When the pool is full, p = 2 00. m and
q = − ⎛⎝⎜
⎞⎠⎟ ( ) = −1 00
1 3332 00 1 50
.
.. . m m
or the pool appears to be 1 50. m deep.
(b) If the pool is half fi lled, then p = 1 00. m and q = − 0 750. m. Thus, the bottom of the pool
appears to be 0.75 m below the water surface or 1 75. m below ground level.
23.25 As parallel rays from the Sun object distance, p → ∞( ) enter the transparent sphere from air n1 1 00=( ). , the center of curvature of the surface is on the side the light is going toward (back
side). Thus, R > 0. It is observed that a real image is formed on the surface opposite the Sun, giving the image distance as q R= +2 .
Then n
p
n
q
n n
R1 2 2 1+ = −
becomes 02
1 00+ = −n
R
n
R
.
which reduces to n n= −2 2 00. and gives n = 2 00.
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318 Chapter 23
23.26 Light scattered from the bottom of the plate undergoes two refractions, once at the top of the plate and once at the top of the water. All surfaces are planes R →( )∞ , so the image distance for each refraction is q n n p= − ( )2 1 . At the top of the plate,
qn
np1 1
1 333
1 66Bwater
glassB= −
⎛
⎝⎜⎞
⎠⎟= − ⎛
⎝⎜⎞⎠⎟
.
.88 00 6 42. . cm cm( ) = −
or the fi rst image is 6.42 cm below the top of the plate. This image serves as a real object for the refraction at the top of the water, so the fi nal image of the bottom of the plate is formed at
q
n
np
n
n2 1Bair
water2B
air
water
= −⎛⎝⎜
⎞⎠⎟
= −⎛⎝⎜
⎞⎠⎟
22 0. cm 1B+( )q
= − ⎛⎝⎜
⎞⎠⎟ ( ) = −1 00
1 3331 13 8
.
..8.4 cm cm or 13.8 cm below the water surface.
Now, consider light scattered from the top of the plate. It undergoes a single refraction, at the top of the water. This refraction forms an image of the top of the plate at
q
n
npT
air
waterT 2 .0= −
⎛⎝⎜
⎞⎠⎟
= − ⎛⎝⎜
⎞⎠⎟
1 00
1 3331
.
. cm cm( ) = − 9 00.
or 9.00 cm below the water surface.
The apparent thickness of the plate is then
Δy q q= − = − =2B T cm cm cm13 8 9 00 4 8. . .
23.27 In the drawing at the right, object O (the jellyfi sh) is located distance p in front of a plane water-glass interface. Refraction at that interface produces a vir-tual image ′I at distance ′q in front it. This image serves as the object for refraction at the glass-air interface. This object is located distance
′ = ′ +p q t in front of the second interface, where t is the thickness of the layer of glass. Refraction at the glass-air interface produces a fi nal virtual image, I, located distance q in front of this interface.
From n p n q n n R1 2 2 1+ = −( ) with R → ∞ for a plane, the relation between the object and image distances for refraction at a fl at surface is q n n p= − ( )2 1 . Thus, the image distance for the refraction at the water-glass interface is ′ = − ( )q n n pg w . This gives an object distance for the
refraction at the glass-air interface of ′ = +p n n p tg w( ) and a fi nal image position (measured from the glass-air interface) of
qn
np
n
n
n
np t
n
na
g
a
g
g
w
a
w
= − ′ = −⎛⎝⎜
⎞⎠⎟
+⎡
⎣⎢
⎤
⎦⎥ = −
⎛⎝⎜
⎞⎞⎠⎟
+⎛
⎝⎜⎞
⎠⎟⎡
⎣⎢⎢
⎤
⎦⎥⎥
pn
nta
g
continued on next page
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Mirrors and Lenses 319
(a) If the jellyfi sh is located 1.00 m (or 100 cm) in front of a 6.00 cm thick pane of glass, then p t= + =100 6 00 cm and cm. and the position of the fi nal image relative to the glass-air interface is
q = − ⎛
⎝⎜⎞⎠⎟ ( ) + ⎛
⎝⎜⎞⎠⎟
1 00
1 333100
1 00
1 506
.
.
.
.. cm 000 79 0 0 790 cm cm m( )⎡
⎣⎢⎤⎦⎥
= − = −. .
(b) If the thickness of the glass is negligible ( )t → 0 , the distance of the fi nal image from the glass-air interface is
qn
n
n
np
n
npa
g
g
w
a
w
= −⎛⎝⎜
⎞⎠⎟
+⎡
⎣⎢
⎤
⎦⎥ = −
⎛⎝⎜
⎞⎠⎟
= −01.000
1 333100 75 0 0 750
.. .⎛
⎝⎜⎞⎠⎟ ( ) = − = − cm cm m
so we see that the 6.00 cm thickness of the glass in part (a) made a 4.00 cm difference in the apparent position of the jellyfi sh.
(c) The thicker the glass, the greater the distance between the fi nal image and the outer surface of the glass.
23.28 The wall of the aquarium (assumed to be of negligible thickness) is a plane ( )R → ∞ refract-
ing surface separating water ( . )n1 1 333= and air ( . )n2 1 00= . Thus, n
p
n
q
n n
R1 2 2 1+ = − gives the
image position as qn
np
p= −⎛⎝⎜
⎞⎠⎟
= −2
1 1 333.. When the object position changes by Δp , the change in
the image position is Δ Δq
p= −1 333.
. The apparent speed of the fi sh is then given by
vimage
cm s = =
( )= =Δ
ΔΔ Δq
t
p t
1 333
2 00
1 3331 50
.
.
.. ccm s
23.29 With R R1 22 00 2 50= + = +. . cm and cm, the lens maker’s equation gives the focal length as
11
1 11 50 1
1
2 00
1
2 51 2fn
R R= −( ) −
⎛⎝⎜
⎞⎠⎟
= −( ) −.. . cm 00
0 050 0 cm
cm 1⎛⎝⎜
⎞⎠⎟
= −.
or f = =−
1
0 050 020 0
..
cm cm1
23.30 The lens maker’s equation is used to compute the focal length in each case.
(a) 1
11 1
1 2fn
R R= −( ) −
⎡
⎣⎢
⎤
⎦⎥
11 44 1
1
12 0
1
18 016 4
ff= −( ) −
−( )⎡
⎣⎢
⎤
⎦⎥ =.
. ..
cm cm cm
(b) 1
1 44 11
18 0
1
12 0f= −( ) −
−( )⎡
⎣⎢
⎤
⎦⎥.
. . cm cm f = 16 4. cm
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320 Chapter 23
23.31 The focal length of a converging lens is positive, so f = +10 0. cm. The thin lens equation then yields a focal length of
q
pf
p f
p
p=
−=
( )−10 0
10 0
.
.
cm
cm
(a) When p = +20 0. cm ,
q =( )( )
−= +
20 0 10 0
20 0 10 020 0
. .
. ..
cm cm
cm cm cmm and M
q
p= − = − = −20 0
20 01 00
.
..
cm
cm
so the image is located 20.0 cm beyond the lens , is real (q > 0) , is inverted (M < 0) ,
and is the same size as the object M =( )1 00. .
(b) When p f= = +10 0. cm , the object is at the focal point and no image is formed .
Instead, parallel rays emerge from the lens .
(c) When p = 5 00. cm,
q =( )( )
−= −
5 00 10 0
5 00 10 010 0
. .
. ..
cm cm
cm cm cmm and M
q
p= − = − − = +10 0
5 002 00
.
..
cm
cm
so the image is located 10.0 cm in front of the lens , is virtual (q < 0) , is upright (M > 0) ,
and is twice the size of the object M =( )2 00. .
23.32 (a) and (b) Your scale drawings should look similar to those given below:
Figure (a) Figure (b)
A carefully drawn-to-scale version of Figure (a) should yield a real, inverted image that is located 20 cm in back of the lens and the same size as the object. Similarly, a carefully drawn-to-scale version of Figure (b) should yield an upright, virtual image located 10 cm in front of the lens and twice the size of the object.
(c) The accuracy of the graph depends on how accurately the ray diagrams are drawn. Sources of uncertainty: a parallel line from the tip of the object may not be exactly parallel; the focal points may not be exactly located; lines through the focal points may not be exactly the correct slope; the location of the intersection of two lines cannot be determined with complete accuracy.
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Mirrors and Lenses 321
23.33 From the thin lens equation, 1 1 1
p q f+ = , the image distance is found to be
q
f p
p f
p
p
p=
−=
−( )− −( ) = −
( )20 0
20 0
20 0.
.
. cm
cm
cm
pp + 20 0. cm
(a) If p = 40 0. cm, then q = −13 3. cm and Mq
p= − = −
−( ) = +13 3
40 01 3
.
.
cm
cm.
The image is virtual, upright, and 13.3 cm in front of thhe lens .
(b) If p = 20 0. cm, then q = −10 0. cm and
M
q
p= − = −
−( )= +
10 0
20 01 2
.
.
cm
cm
The image is virtual, upright, and 10.0 cm in front of thhe lens .
(c) When p = 10 0. cm , q = − 6 67. cm and Mq
p= − = −
−( )= +
6 67
10 02 3
.
.
cm
cm.
The image is virtual, upright, and 6.67 cm in front of thhe lens .
23.34 (a) and (b). Your scale drawings should look similar to those given below:
Figure (a)
Figure (b)
A carefully drawn-to-scale version of Figure (a) should yield an upright, virtual image located 13.3 cm in front of the lens and one-third the size of the object. Similarly, a care-fully drawn-to-scale version of Figure (b) should yield an upright, virtual image located 6.7 cm in front of the lens and two-thirds the size of the object.
(c) The results of the graphical solution are consistent with the algebraic answers found in Problem 23.33, allowing for small deviances due to uncertainties in measurement. Graphical answers may vary, depending on the size of the graph paper and accuracy of the drawing.
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322 Chapter 23
23.35 (a) The real image case is shown in the ray diagram. Notice that p q+ = 12 9. cm, or q p= −12 9. cm . The thin lens equation, with f = 2 44. cm , then gives
1 1
12 9
1
2 44p p+
−=
. . cm cm
or p p2 12 9 31 5 0− ( ) + =. . cm cm2
Using the quadratic formula to solve gives
p p= =9 63 3 27. . cm or cm
Both are valid solutions for the real image case.
(b) The virtual image case is shown in the second diagram. Note that in this case, q p= − +( )12 9. cm , so the thin lens equation gives
1 1
12 9
1
2 44p p−
+=
. . cm cm
or p p2 12 9 31 5 0+ ( ) − =. . cm cm2
The quadratic formula then gives p p= = −2 10 15 0. . cm or cm.
Since the object is real, the negative solution must be rejected, leaving p = 2 10. cm .
23.36 We must fi rst realize that we are looking at an upright, magnifi ed, virtual image. Thus, we have a real object located between a converging lens and its front-side focal point, so q p f< > >0 0 0, , and .
The magnifi cation is Mq
p= − = + 2, giving q p= − 2 . Then, from the thin lens equation,
1 1
2
1
2
1
p p p f− = + = or f p= = ( ) =2 2 2 84 5 68. . cm cm
23.37 It is desired to form a magnifi ed, real image on the screen using a single thin lens. To do this, a converging lens must be used and the image will be inverted. The magnifi cation then gives
Mh
h
q
p= ′ = −
×= −−
1 80. m
24.0 10 m3 , or q p= 75 0.
Also, we know that p q+ = 3 00. m. Therefore, p p+ =75 0 3 00. . m, giving
(b) p = = × =−3 00
76 03 95 10 39 52.
.. .
m m mm
continued on next page
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Mirrors and Lenses 323
(a) The thin lens equation then gives 1 1
75 0
76 0
75 0
1
p p p f+ = =
.
.
.
or f p= ⎛⎝⎜
⎞⎠⎟ = ⎛
⎝⎜⎞⎠⎟ ( ) =75 0
76 0
75 0
76 039 5 3
.
.
.
.. mm 99 0. mm
23.38 To have a magnifi cation of M q p= − = +3 00. , it is necessary that q p= −3 00. . The thin lens equation, with f = +18 0. cm for the convergent convex lens, gives the required object distance as
1 1
3 00
2
3 00
1
18 0p p p− = =
. . . cm or p =
( ) =2 18 0
3 0012 0
.
..
cm cm
23.39 Since the light rays incident to the fi rst lens are parallel, p1 = ∞ and the thin lens equation gives q f1 1 10 0= = − . cm.
The virtual image formed by the fi rst lens serves as the object for the second lens, sop q2 130 0 40 0= + =. . cm cm. If the light rays leaving the second lens are parallel, then q2 = ∞
and the thin lens equation gives f p2 2 40 0= = . cm .
23.40 (a) Solving the thin lens equation for the image distance q gives
1 1 1
q f p
p f
p f= − = −
or qpf
p f=
−
(b) For a real object, p > 0 and p p= . Also, for a diverging lens, f < 0 and f f= − . The result of part (a) then becomes
qp f
p f
p f
p f=
−( )− −( ) = −
+
Thus, we see that q p f< 0 for all numeric values of and . Since negative image
distances mean virtual images, we conclude that a diverging lens will always form virtual images of real objects.
(c) For a real object, p > 0 and p p= . Also, for a converging lens, f > 0 and f f= . The result of part (a) then becomes
q
p f
p fp f=
−> − >0 0 if
Since q must be positive for a real image, we see that a converging lens will form real
images of real objects only when p f> (or p f> since both p and f are positive in this situation).
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324 Chapter 23
23.41 The thin lens equation gives the image position for the fi rst lens as
q
p f
p f11 1
1 1
30 0 15 0
30 0 15 0=
−=
( )( )−
. .
. .
cm cm
cm cm cm= + 30 0.
and the magnifi cation by this lens is Mq
p11
1
30 0
30 01 00= − = − = −.
..
cm
cm.
The real image formed by the fi rst lens serves as the object for the second lens, so p q2 140 0 10 0= − = +. . cm cm. Then, the thin lens equation gives
q
p f
p f22 2
2 2
1 15 0
1 15 0=
−=
( )( )−
0.0 cm cm
0.0 cm
.
. cm cm= − 30 0.
and the magnifi cation by the second lens is
M
q
p22
2
30 0
1 03 00= − = −
−( )= +
.
..
cm
0 cm
Thus, the fi nal, virtual image is located 30 0. cm in front of the second lens and the
overall magnifi cation is M M M= = −( ) +( ) = −1 2 1 00 3 00 3 00. . . .
23.42 (a) With p1 15 0= + . cm, the thin lens equation gives the position of the image formed by the fi rst lens as
q
p f
p f11 1
1 1
15 0 10 0
15 0 10 0=
−=
( )( )−
. .
. .
cm cm
cm cm cm= + 30 0.
This image serves as the object for the second lens, with an object distance of p q2 110 0 10 0 30 0 20 0= − = − = −. . . . cm cm cm cm (a virtual object). If the image formed by this lens is at the position of O1, the image distance is
q p2 110 0 10 0 15 0 25 0= − +( ) = − +( ) = −. . . . cm cm cm cmm
The thin lens equation then gives the focal length of the second lens as
f
p q
p q22 2
2 2
20 0 25 0
20 0 2=
+=
−( ) −( )− −
. .
.
cm cm
cm 55 011 1
..
cm cm= −
(b) The overall magnifi cation is
M M Mq
p
q
p= = −
⎛⎝⎜
⎞⎠⎟
−⎛⎝⎜
⎞⎠⎟
= −1 21
1
2
2
30 0
15 0
.
.
cm
ccm
cm
cm⎛⎝⎜
⎞⎠⎟ −
−( )−( )
⎡
⎣⎢
⎤
⎦⎥ = +
25 0
20 02 50
.
..
(c) Since q2 0< , the fi nal image is virtual ; and since M > 0 , it is upright .
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Mirrors and Lenses 325
23.43 From the thin lens equation, qp f
p f11 1
1 1
4 00 8 00
4 00 8 00=
−=
( )( )−
. .
. .
cm cm
cm cm cm= − 8 00. .
The magnifi cation by the fi rst lens is Mq
p11
1
8 00
4 002 00= − = −
−( )= +
.
..
cm
cm.
The virtual image formed by the fi rst lens is the object for the second lens, so p q2 16 00 14 0= + = +. . cm cm and the thin lens equation gives
q
p f
p f22 2
2 2
1 16 0
1=
−=
( ) −( )− −
4.0 cm cm
4.0 cm 16
.
..0 cm cm( ) = − 7 47.
The magnifi cation by the second lens is Mq
p22
2
7 47
14 00 533= − = −
−( )= +
.
..
cm
cm, so the overall
magnifi cation is M M M= = +( ) +( ) = +1 2 2 00 0 533 1 07. . . .
The position of the fi nal image is 7 47. cm in front of the second lens , and its height is
′ = = +( )( ) =h M h 1 07 1 00 1 07. . . cm cm .
Since M > 0, the fi nal image is upright ; and since q2 0< , this image is virtual .
23.44 (a) We start with the fi nal image and work backward. From Figure P23.44, observe thatq2 50 0 31 0 19 0= − −( ) = −. . . cm cm cm. The thin lens equation
then gives pq f
q f22 2
2 2
19 20 0
20=
−=
−( )( )− −
.0 cm cm
19.0 cm
.
...
09 74
cm cm= +
The image formed by the fi rst lens serves as the object for the second lens and is located 9.74 cm in front of the second lens.
Thus, q1 50 0 9 74 40 3= − =. . . cm cm cm and the thin lens equation gives
p
q f
q f11 1
1 1
4 10 0
4 10 0=
−=
( )( )−
0.3 cm cm
0.3 cm
.
. cm cm= +13 3.
The original object should be located 13 3. cm in front of the fi rst lens.
(b) The overall magnifi cation is
M M Mq
p
q
p= = −
⎛⎝⎜
⎞⎠⎟
−⎛⎝⎜
⎞⎠⎟
= −1 21
1
2
2
40 3. cm
13.3 ccm
cm
cm⎛⎝⎜
⎞⎠⎟ −
−( )⎛⎝⎜
⎞⎠⎟
= −19 0
9 745 91
.
..
(c) Since M < 0, the fi nal image is inverted ; and since q2 0< , it is virtual .
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326 Chapter 23
23.45 Note: Final answers to this problem are highly sensitive to round-off error. To avoid this, we retain extra digits in intermediate answers and round only the fi nal answers to the correct number of signifi cant fi gures.
Since the fi nal image is to be real and in the fi lm plane, q d2 = + .
Then, the thin lens equation gives pq f
q f
d
d22 2
2 2
13 0
13 0=
−=
( )−
.
.
cm
cm.
From Figure P23.45, observe that d < 12 0. cm. The above result then shows that p2 0< , so the object for the second lens will be a virtual object.
The object of the second lens L2( ) is the image formed by the fi rst lens L1( ) , so
q d p d
d1 212 0 12 0 113 0= −( ) − = − +−
. ..
cm cm cm
13.0 ccm cm
13.0 cm⎛⎝⎜
⎞⎠⎟ = −
−12 0
2
.d
d
If d = 5 00. cm, then q1 15 125= + . cm; and when d = 10 0. cm, q1 45 333= + . cm.
From the thin lens equation, pq f
q f
q
q11 1
1 1
1
1
15 0
15 0=
−=
( )−
.
.
cm
cm.
When q1 15 125= + . cm d =( )5 00. cm , then p131 82 10 18 2= × =. . cm m.
When q1 45 333= + . cm d =( )10 0. cm , then p1 22 4 0 224= =. . cm m.
Thus, the range of focal distances for this camera is 0 m to 18.2 m.224 .
23.46 (a) From the thin lens equation, the image distance for the fi rst lens is
q
p f
p f11 1
1 1
15 0 10 0
15 0 10 0=
−=
( )( )−
. .
. .
cm cm
cm cm cm= +30 0.
(b) With q1 30 0= + . cm, the image of the fi rst lens is located 30.0 cm in back of that lens. Since the second lens is only 10.0 cm beyond the fi rst lens, this means that the fi rst lens is trying
to form its image at a location 20.0 cm beyond the second lens .
(c) The image the fi rst lens forms (or would form if allowed to do so) serves as the object for the second lens. Considering the answer to part (b) above, we see that this will be a virtual
object, with object distance p2 20 0= − . cm .
(d) From the thin lens equation, the image distance for the second lens is
q
p f
p f22 2
2 2
20 0 5 00
20 0 5=
−=
−( )( )− −
. .
. .
cm cm
cm 0004 00
cm cm= + .
(e) Mq
p11
1
30 02 00= − = − = −..
cm
15.0 cm
(f) Mq
p22
2
4 000 200= − = −
−( ) = +..
cm
20.0 cm
(g) M M M= = −( ) +( ) = −1 2 2 00 0 200 0 400. . .
(h) Since q2 0> , the fi nal image is real , and since M < 0, that image is inverted .
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Mirrors and Lenses 327
23.47 Since q = + 8 00. cm when p = +10 0. cm, we fi nd that
1 1 1 1
10 0
1
8 00
18 0
80 0f p q= + = + =
. .
.
. cm cm cm
Then, when p = 20 0. cm,
1 1 1 18 0
80 0
1
20 0
18 0 4 00
80 0q f p= − = − = −.
. .
. .
. cm cm cm cm= 14 0
80 0
.
.
or q = = +80 0
14 05 71
.
..
cm cm
Thus, a real image is formed 5 cm in front of the mirror.71 .
23.48 (a) We are given that p f= 5 , with both p fand being positive. The thin lens equation then gives
q
pf
p f
f f
f f
f=−
=( )
−=
5
5
5
4
(b) Mq
p
f
f= − = −
( )= −
5 4
5
1
4
(c) Since q > 0, the image is real . Because M < 0 , the image is inverted . Since the object is real, it is located in front of the lens, and with q > 0 , the image is located in back of the
lens. Thus, the image is on the opposite side of the lens from the object.
23.49 Since the object is very distant p → ∞( ), the image distance equals the focal length, orq = +50 0. mm. Now consider two rays that pass undeviated through the center of the thin lens to opposite sides of the image as shown in the sketch below.
From the sketch, observe that
tan
.
..
α2
1
235 0
50 00 350⎛
⎝⎜⎞⎠⎟ =
( )=
mm
mm
Thus, the angular width of the image is
α = ( ) =−2 0 350 38 61tan . . °
23.50 (a) Using the sign convention from Table 23.2, the radii of curvature of the surfaces are R R1 15 0 10 0= − = +. . cm and cm2 . The lens maker’s equation then gives
1
11 1
1 50 11
15 0
1
101 2fn
R R= −( ) −
⎛⎝⎜
⎞⎠⎟
= −( )−
−.. cm ..0 cm
⎛⎝⎜
⎞⎠⎟
or f = −12 0. cm
(b) If p → ∞, then q f= = −12 0. cm .
The thin lens equation gives qpf
p f
p
p=
−=
−( )+
12 0
12 0
.
.
cm
cm and the following results:
continued on next page
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328 Chapter 23
(c) If p f= = +3 36 0. cm, q = − 9 00. cm .
(d) If p f= = +12 0. cm, q = − 6 00. cm .
(e) If p f= = +2 6 00. cm, q = − 4 00. cm .
23.51 As light passes left to right through the lens, the image position is given by
qp f
p f11 1
1 1
1 0 8
1 8=
−=
( )( )−
0 cm 0.0 cm
00 cm 0.0 cmm cm= + 400
This image serves as an object for the mirror with an object distance of p q2 1100 300= − = − cm cm (virtual object). From the mirror equation, the position of the image
formed by the mirror is
qp f
p f22 2
2 2
00 50 0
00 0=
−=
−( ) −( )− − −
3 cm cm
3 cm 5
.
...
060 0
cm cm( ) = −
This image is the object for the lens as light now passes through it going right to left. The object distance for the lens is p q3 2100 100 60 0= − = − −( )cm cm cm. , or p3 160= cm. From the thin lens equation,
q
p f
p f33 3
3 3
160 80 0
160 80 0=
−=
( )( )−
cm cm
cm c
.
. mm cm= +160
Thus, the fi nal image is located 160 cm to the left of the lens .
The overall magnifi cation is M M M Mq
p
q
p
q
p= = −
⎛⎝⎜
⎞⎠⎟
−⎛⎝⎜
⎞⎠⎟
−⎛⎝⎜
⎞⎠⎟1 2 3
1
1
2
2
3
3
, or
M = −⎛⎝⎜
⎞⎠⎟ −
−( )−( )
⎡
⎣
400
100
60 0
300
cm
cm
cm
cm
.⎢⎢
⎤
⎦⎥ −⎛
⎝⎜⎞⎠⎟ = −160
1600 800
cm
cm.
Since M < 0, the fi nal image is inverted .
23.52 Since the object is midway between the lens and mirror, the object distance for the mirror is p1 12 5= + . cm . The mirror equation gives the image position as
1 2 1 2
20 0
1
12 5
5 4
50 0
1
501 1q R p= − = − = − =
. . . cm cm cm ..0 cm, or q1 50 0= + . cm
This image serves as the object for the lens, so p q2 125 0 25 0= − = −. . cm cm. Note that since p2 0< , this is a virtual object. The thin lens equation gives the image position for the lens as
qp f
p f22 2
2 2
16 7=
−=
−( ) −( )− − −
25.0 cm cm
25.0 cm
.
116.7 cm cm( ) = − 50 3.
Since q2 0< , this is a virtual image that is located 50.3 cm in front of the lens or
2 cm behind the mirror5 3. . The overall magnifi cation is
M M Mq
p
q
p= = −
⎛⎝⎜
⎞⎠⎟
−⎛⎝⎜
⎞⎠⎟
= −1 21
1
2
2
50 0. cm
12 .5 ccm
cm
25.0 cm+
⎛⎝⎜
⎞⎠⎟
−−( )−( )
⎡
⎣⎢
⎤
⎦⎥ =
50 38 05
..
Since M > 0, the fi nal image is upright .
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Mirrors and Lenses 329
23.53 A hemisphere is too thick to be described as a thin lens. The light is undeviated on entry into the fl at face. We next consider the light’s exit from the curved surface, for which R = − 6 00. cm.
The incident rays are parallel, so p = ∞ .
Then, n
p
n
q
n n
R1 2 2 1+ = −
becomes 01 00 1 00 1 56
6 00+ = −
−. . .
.q cm
from which q = 10 7. cm .
23.54 (a) The thin lens equation gives the image distance for the fi rst lens as
qp f
p f11 1
1 1
40 0 20 0
40 0 20 0=
−=
( )( )−
. .
. .
cm cm
cm cm cm= + 40 0.
The magnifi cation by this lens is then Mq
p11
1
40 0
40 01 00= − = − = −.
..
cm
cm.
The real image formed by the fi rst lens is the object for the second lens. Thus, p q2 150 0 10 0= − = +. . cm cm and the thin lens equation gives
qp f
p f22 2
2 2
1 5 00
1 5 00=
−=
( )( )−
0.0 cm cm
0.0 cm
.
. cm cm= +10 0.
The fi nal image is 10 0. cm in back of the second lens .
(b) The magnifi cation by the second lens is Mq
p22
2
1 0
1 01 00= − = − = −0 cm
0 cm
.
.. , so the overall
magnifi cation is M M M= = −( ) −( ) = +1 2 1 00 1 00 1 00. . . . Since this magnifi cation has a value of unity, the fi nal image is the same size as the original object, or
′ = = +( )( ) =h M h1 1 00 2 00 2 00. . . cm cm .
The image distance for the second lens is positive, so the fi nal image is real .
(c) When the two lenses are in contact, the focal length of the combination is
1 1 1 1
20 0
1
5 001 2f f f= + = +
. . cm cm, or f = 4 00. cm
The image position is then
qpf
p f=
−=
( )( )−
= +5 4 00
5 4 00
.00 cm cm
.00 cm cm
.
.220 0. cm
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330 Chapter 23
23.55 With light going through the piece of glass from left to right, the radius of the fi rst surface is positive and that of the second surface is negative according to the sign convention of Table 23.2. Thus, R R1 22 00 4 00= + = −. . cm and cm.
Applying n
p
n
q
n n
R1 2 2 1+ = −
to the fi rst surface gives
1 00
1 00
1 50 1 50 1 00
2 001
.
.
. . .
. cm cm+ = −
+q
which yields q1 2 00= − . cm. The fi rst surface forms a virtual image 2.00 cm to the left of that surface and 16.0 cm to the left of the second surface.
The image formed by the fi rst surface is the object for the second surface, so p2 16 0= + . cm and n
p
n
q
n n
R1 2 2 1+ = −
gives
1 50
16 0
1 00 1 00 1 50
4 002
.
.
. . .
. cm cm+ = −
−q or q2 32 0= + . cm
The fi nal image formed by the piece of glass is a real image located
32 0. cm to the right of the second surface .
23.56 Consider an object O1 at distance p1 in front of the fi rst lens. The thin lens equation gives the image position for this lens as
1 1 1
1 1 1q f p= −
The image, I1, formed by the fi rst lens
serves as the object, O2 , for the second lens. With the lenses in contact, this will be a virtual object if I1 is real and will be a real object if I1 is virtual. In either case, if the thicknesses of the lenses may be ignored,
p q2 1= − and 1 1 1 1
2 1 1 1p q f p= − = − +
Applying the thin lens equation to the second lens, 1 1 1
2 2 2p q f+ = becomes
− + + =1 1 1 1
1 1 2 2f p q f or
1 1 1 1
1 2 1 2p q f f+ = +
Observe that this result is a thin lens type equation relating the position of the original object O1 and the position of the fi nal image I2 formed by this two lens combination. Thus, we see that we may treat two thin lenses in contact as a single lens having a focal length, f, given by
1 1 1
1 2f f f= +
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Mirrors and Lenses 331
23.57 From the thin lens equation, the image distance for the fi rst lens is
qp f
p f11 1
1 1
4 3
4 3=
−=
( )( )−
0.0 cm 0.0 cm
0.0 cm 0.0 cm cm= +120
and the magnifi cation by this lens is Mq
p11
1
1
40 03 00= − = − = −20 cm
cm.. .
The real image formed by the fi rst lens serves as the object for the second lens, with object dis-tance of p q2 1110 10 0= − = − cm cm. (a virtual object). The thin lens equation gives the image distance for the second lens as
qp f
p f
f
f22 2
2 2
2
2
=−
=−( )
− −10.0 cm
10.0 cm
(a) If f2 20 0= − . cm, then q2 20 0= + . cm and the magnifi cation by the second lens is
M q p2 2 2 20 0 2 00= − = − ( ) −( ) = +. . cm 10.0 cm .
The fi nal image is located 20.0 cm to the right of the second lens and the overall
magnifi cation is M M M= = −( ) +( ) = −1 2 3 00 2 00 6 00. . . .
(b) Since M < 0, the fi nal image is inverted .
(c) If f2 20 0= + . cm, then q2 6 67= + . cm
and Mq
p22
2
6 670 667= − = −
−( ) = +..
cm
10.0 cm
The fi nal image is 6 cm to the right of the second lens.67 and the overall magnifi cation is
M M M= = −( ) +( ) = −1 2 3 00 0 667 2 00. . . .
Since M < 0, the fi nal image is inverted .
23.58 The object is located at the focal point of the upper mirror. Thus, the upper mirror creates an image at infi nity (that is, parallel rays leave this mirror). The lower mirror focuses these parallel rays at its focal point, located at the hole in the upper mirror. Thus, the
image is real, inverted, and actual size .
For the upper mirror:
1 1 1 1
7 50
1 1
7 501p q f q+ = ⇒ + =
cm cm. .: q1 = ∞
For the lower mirror:
1 1 1
7 502∞+ =
q . cm: q2 7 50= . cm
Light directed into the hole in the upper mirror refl ects as shown, to behave as if it were refl ecting from the hole.
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332 Chapter 23
23.59 (a) The lens maker’s equation, 1
11 1
1 2fn
R R= −( ) −
⎛⎝⎜
⎞⎠⎟
, gives
1
5 001
1
9 00
1
11 0. . . cm cm cm= −( ) −
−⎛⎝⎜
⎞⎠⎟
n
which simplifi es to n = ++
⎛⎝⎜
⎞⎠⎟ =1
1
5 00
99 0
11 0 9 001 99
.
.
. .. .
(b) As light passes from left to right through the lens, the thin lens equation gives the image distance as
qp f
p f11
1
8 5
8 5 00=
−=
( )( )−
.00 cm .00 cm
.00 cm c. mm cm= +13 3.
This image formed by the lens serves as an object for the mirror with object distance p q2 120 0 6 67= − = +. . cm cm. The mirror equation then gives
qp R
p R22
22
6 8 00
2 6 8=
−=
( )( )( ) −
.67 cm cm
.67 cm
.
.00010 0
cm cm= + .
This real image, formed 10.0 cm to the left of the mirror, serves as an object for the lens as light passes through it from right to left. The object distance is p q3 220 0 10 0= − = +. . cm cm, and the thin lens equation gives
qp f
p f31
3
1 5
1 5 00=
−=
( )( )−
0.0 cm .00 cm
0.0 cm c. mm cm= +10 0.
The fi nal image is located 10 0. cm to the left of the lens and its overall magnifi cation is
M M M Mq
p
q
p
q
p= = −
⎛⎝⎜
⎞⎠⎟
−⎛⎝⎜
⎞⎠⎟
−⎛⎝⎜
⎞⎠⎟
=1 2 21
1
2
2
3
3
−−⎛⎝⎜
⎞⎠⎟ −⎛
⎝⎜⎞⎠⎟ −⎛
⎝⎜13 3
8 00
10 0
6 67
10 0
10 0
.
.
.
.
.
.⎞⎞⎠⎟ = − 2 50.
(c) Since M < 0, the fi nal image is inverted .
23.60 From the thin lens equation, the object distance is pq f
q f=
−.
(a) If q f= + 4 , then pf f
f f
f=( )
−=
4
4
4
3.
(b) When q f= − 3 , we fi nd pf f
f f
f=−( )
− −=
3
3
3
4.
(c) In case (a), Mq
p
f
f= − = − = −4
4 33
and in case (b), Mq
p
f
f= − = − − = +3
3 44 .
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Mirrors and Lenses 333
23.61 If R1 3 00= − . m and R2 6 00= − . m, the focal length is given by
m m
11
1
3 00
1
6 001
2
1
f
n
n
n n= −⎛⎝⎜
⎞⎠⎟ −
+⎛⎝⎜
⎞⎠⎟
= −. .
22
2
1
6 00n
⎛⎝⎜
⎞⎠⎟
−⎛⎝⎜
⎞⎠⎟. m
or fn
n n=
( )−
6 00 2
2 1
. m [1]
(a) If n1 1 50= . and n2 1 00= . , then f =( )( )
−= −
6 00 1 00
1 00 1 5012 0
. .
. ..
m m.
The thin lens equation gives qp f
p f=
−=
( ) −( )+
= −1
15 4
0.0 m 12 .0 m
0.0 m 12 .0 m. 55 m.
A virtual image is formed 5.45 m to the left of the lens .
(b) If n1 1 50= . and n2 1 33= . , the focal length is
f =( )( )
−= −
6 00 1 33
1 33 1 5046 9
. .
. ..
m m
and qp f
p f=
−=
( ) −( )+
= −1 6 9
1 6 98 2
0.0 m 4 m
0.0 m 4 m
.
.. 44 m
The image is located 8 m to the left of the lens.24 .
(c) When n1 1 50= . and n2 2 00= . , f =( )( )
−= +
6 00 2 00
2 00 1 5024 0
. .
. ..
m m
and qp f
p f=
−=
( )( )−
= −1 2
1 24 017 1
0.0 m 4.0 m
0.0 m m.. m
The image is 17 1. m to the left of the lens .
(d) Observe from Equation [1] that f < 0 if n n1 2> and f > 0 when n n1 2< . Thus, a diverg-ing lens can be changed to converging by surrounding it with a medium whose index of refraction exceeds that of the lens material.
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334 Chapter 23
23.62 The inverted image is formed by light that leaves the object and goes directly through the lens, never having refl ected from the mirror. For the formation of this inverted image, we have
Mq
p= − = −1
1
1 50. giving q p1 11 50= + .
The thin lens equation then gives
1 1
1 50
1
10 01 1p p+ =
. . cm or p1 10 0 1
1
1 5016 7= ( ) +⎛
⎝⎜⎞⎠⎟ =.
.. cm cm
The upright image is formed by light that passes through the lens after refl ecting from the mirror. The object for the lens in this upright image formation is the image formed by the mirror. In order for the lens to form the upright image at the same location as the inverted image, the image formed by the mirror must be located at the position of the original object (so the object distances, and hence image distances, are the same for both the inverted and upright images formed by the lens). Therefore, the object distance and the image distance for the mirror are equal, and their common value is
q p pmirror mirror cm cm cm= = − = − =40 0 40 0 16 71. . . ++23 3. cm
The mirror equation, 1 1 2 1
p q R fmirror mirror mirror
+ = = , then gives
1 1
23 3
1
23 3
2
23 3fmirror cm cm cm= + = +
. . . or fmirror
cm cm= + = +23 3
211 7
..
23.63 (a) The lens maker’s equation for a lens made of material with refractive index n1 1 55= . and immersed in a medium having refractive index n2 is
1
11 1 1 551
2 1 2
2
2f
n
n R R
n
n= −
⎛⎝⎜
⎞⎠⎟
−⎛⎝⎜
⎞⎠⎟
= −⎛⎝⎜
⎞⎠
.⎟⎟ −
⎛⎝⎜
⎞⎠⎟
1 1
1 2R R
Thus, when the lens is in air, we have 1 1 55 1 00
1 00
1 1
1 2f R Rair
= −⎛⎝⎜
⎞⎠⎟ −
⎛⎝⎜
⎞⎠⎟
. .
. [1]
and when it is immersed in water, 1 1 55 1 33
1 33
1 1
1 2f R Rwater
= −⎛⎝⎜
⎞⎠⎟ −
⎛⎝⎜
⎞⎠⎟
. .
. [2]
Dividing Equation [1] by Equation [2] gives
f
fwater
air
= ⎛⎝⎜
⎞⎠⎟
−−
1 33
1 00
1 55 1 00
1 55 1 33
.
.
. .
. .⎛⎛⎝⎜
⎞⎠⎟ = ⎛
⎝⎜⎞⎠⎟1 33
0 55
0 22.
.
.
If fair cm= 79 0. , the focal length when immersed in water is
fwater cm cm= ( ) ⎛⎝⎜
⎞⎠⎟ =79 0 1 33
0 55
0 22263. .
.
.
(b) The focal length for a mirror is determined by the law of refl ection, which is independent of the material of which the mirror is made and of the surrounding medium. Thus, the focal length depends only on the radius of curvature and not on the material making up the mirror or the surrounding medium. This means that, for the mirror,
f fwater air cm= = 79 0.
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