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Geometric Optics Flat Mirrors Spherical Mirrors Images Formed by Refraction Thin Lenses Optical Instruments
Images - Terminologyp: Object Distance
q: Image Distance
Real Images: When light rays pass through and diverge from the image point.
Virtual Images: When light rays do not pass through but appear to diverge from the image point.
h
hM
HeightObject
Height ImageMagnification
qp
For flat mirrors, M = 1
• The image distance is equal to the object distance.• The image is unmagnified, virtual and upright.• The image has front-back reversal.
Images Formed by Flat Mirrors
The image is virtual
An observer O, facing a mirror, observes a light source S. Where does O perceive the mirror image of S to be located?
1. 12. 23. 34. 45. Some other location.6. The image of S cannot be seen by
O when O and S are located as shown.
Concept Question
Multiple Images Formed by Two Mirrors
Rearview Mirror
Some Examples
Concave Spherical Mirrors
Spherical Concave Mirror
A real image is formed by a concave mirror
Spherical Aberration
Paraxial Approximation: Only consider rays making a small angle with the principal axis
q
h
p
h tan
p
q
h
hM
qR
h
Rp
h
tan
Rp
qR
h
h
p
q
Rp
qR
Rqp
211
Focal Point2
Rf
fqp
111
Image Formation
Convex Spherical Mirrors
The image formed is upright and virtual
p
q
h
hM
fqp
111
Sign Conventions for Mirrors p is positive if object is in front of mirror (real
object). p is negative if object is in back of mirror
(virtual object).
q is positive if image is in front of mirror (real image).
q is negative if image is in back of mirror (virtual image).
Both f and R are positive if center of curvature is in front of mirror (concave mirror).
Both f and R are negative if center of curvature is in back of mirror (convex mirror).
If M is positive, image is upright. If M is negative, image is inverted.
Ray Diagrams For Mirrors Ray 1 is drawn from the top of the object
parallel to the principal axis and is reflected through the focal point F.
Ray 2 is drawn from the top of the object through the focal point and is reflected parallel to the principal axis.
Ray 3 is drawn from the top of the object through the center of curvature C and is reflected back on itself.
Image is real, inverted and smaller than the object
Image is virtual, upright and larger than the object
Image is virtual, upright and smaller than the object
Image From a Mirrorf = +10 cm Concave Mirror
(a) p = 25 cm
fqp
111
10
11
25
1
q
668.0
p
q
h
hM
cmq 7.16
(b) p = 10 cm
10
11
10
1
q
q
(c) p = 5 cm
10
11
5
1
q
cmq 10
2
p
q
h
hM
Images Formed By Refraction
2211 SinnSinn
2211 nn
1
2
1221 nnnn
p
dtan
R
dtan
q
dtan
R
dnn
q
dn
p
dn 1221
R
nn
q
n
p
n 1221
Sign Conventions for Refracting Surfaces
p is positive if object is in front of surface (real object). p is negative if object is in back of surface (virtual
object).
q is positive if image is in back of surface (real image). q is negative if image is in front of surface (virtual
image).
R is positive if center of curvature is in back of convex surface.
R is negative if center of curvature is in front of concave surface.
Flat Refracting Surface
R
021 q
n
p
n
pn
nq
1
2
The image is on the same side of the surface as the object.
Apparent Depth
ddq
pn
nq
752.033.1
11
2
dp
The image is virtual
Thin LensesThe image formed by the first surface acts as the object for the second surface
111
11
R
n
q
n
p
222
11
R
n
qp
n
where, q1 < 0
112 qtqp
221
11
R
n
n
2121
111
11
RRn
qp
21
111
11
RRn
qp
21
111
1
RRn
f
Lens Makers’ Equation
fqp
111
p
q
h
hM
A parallel beam of light is sent through an aquarium. If a convex glass lens is held in the water, it focuses the beam
1. closer to the lens than2. at the same position as3. farther from the lens than
outside the water.
Concept Question
Lens Types
Converging Lenses
Diverging Lenses
f1: object focal pointf2: image focal point
Sign Conventions for Thin Lenses p is positive if object is in front of lens (real object). p is negative if object is in back of lens (virtual object).
q is positive if image is in back of lens (real image). q is negative if image is in front of lens (virtual image).
R1 and R2 are positive if center of curvature is in back of lens. R1 and R2 are negative if center of curvature is in front of lens.
f is positive if the lens is converging. f is negative if the lens is diverging.
Ray Diagrams for a Converging Lens Ray 1 is drawn parallel to the principal axis. After
being refracted, this ray passes through the focal point on the back side of the lens.
Ray 2 is drawn through the center of the lens and continues in a straight line.
Ray 3 is drawn through the focal point on the front side of the lens (or as if coming from the focal point if p < f) and emerges from the lens parallel to the principal axis.
The image is virtual and upright
The image is real and inverted
Ray Diagrams for a Diverging Lens Ray 1 is drawn parallel to the principal axis. After
being refracted, this ray emerges such that it appears to have passed through the focal point on the front side of the lens.
Ray 2 is drawn through the center of the lens and continues in a straight line.
Ray 3 is drawn toward the focal point on the back side of the lens and emerges from the lens parallel to the principal axis.
The image is virtual and upright
ExamplesA diverging lens with f = -20 cmh = 2 cm, p = 30 cm
fqp
111
20
11
30
1
q
cmq 12
The image is virtual and upright
p
q
h
hM
cmh
hM
8.0
4.030
12
2
A converging lens with f = 10 cm
(a) p = 30 cm
cmq
q
15
10
11
30
1
5.030
15
p
qM
(b) p = 10 cm
q
(c) p = 5 cm
cmq
q
10
10
11
5
1
25
10
p
qM
The image is real and inverted
The image is virtual and upright
The image is at infinity
Java Applet for Lens and Mirrors http://www.phy.ntnu.edu.tw/java/index.html
Combination of Thin Lenses First find the image created by the first lens as if the second
lens is not present. Then draw the ray diagram for the second lens with the
image from the first lens as the object. The second image formed is the final image of the system.
f2f1
O
I1
I2
f2 = 20 cmf1 = 10 cm
O
I1I2
cmq
q
fqp
30
10
11
15
1
111
1
1
111
15 cm 20 cm 10 cm
cmq
q
fqp
67.6
20
11
10
1
111
2
2
222
2
15
30
1
11
p
qM
667.010
67.6
2
22
p
qM
33.1667.0221 MMM
Example
Converging Lens
Diverging Lens
Object and Image Distances
The Simple MagnifierUse a lens near the eye to make an object seem larger
(occupy a larger angle at the eye).
mf
cmm
25
Compound MicroscopeUse a lens combination to make small objects near the
objective seem more visible.
of
L
p
qm
eo f
cm
f
LmmM
25
Refracting TelescopeUse a lens combination to make distant objects more
visible
ey
ob
f
fm
For Next Class Midterm 3 Review on Friday Midterm 3 on Monday Reading Assignment for Tuesday
Chapter 37: Interference of Light Waves
WebAssign: Assignment 14