Problems on Mirror Formula and Magnification Formula
Problem 1: An object is placed at a distance of 2 times of focal length from the pole of the convex mirror, Calculate the linear magnification.
Solution:
Let the Focal length of mirror = f
So, the object distance, u = -2f
The formula to calculate image distance we use mirror formula as,
1 / v + 1 / u = 1 / f
Therefore,
1 / v + 1 / -2f = 1 / f
1 / v = 1 / f + 1 / 2f
1 / v = 3 / 2f
or
v = 2f / 3
Magnification is given as,
m = – v / u
= -(2f/3) / (-2f)
= 1/3
Problem 2. If the image is a distance of 6 cm and the object is at 12 cm in the front of the concave mirror, Calculate the magnification formed.
Solution:
Given that,
The distance of object, u = – 12 cm
The distance of image, v = – 6 cm
Since,
Magnification is given by,
m = – v / u
Therefore,
m = – (-6 / -12)
= -0.5
Hence, the image will be diminished by nearly half as size of object.
Problem 3: In the experiment height of the image is 12 cm whereas the height of the object is 3 cm, would you determine the magnification formed.
Solution:
Given that,
Height of image = 12 cm
Height of object = 3 cm
Magnification in terms of height is given by,
m = height of image / height of object
= 12 / 3
= 4
Therefore magnification is 4.
Problem 4: In the case of a concave mirror if the object is placed at the distance of 12 cm. Determine the image distance from the mirror if the height of the object to image ratio is 1:2.
Solution:
Given that,
The object distance, u = -12 cm
Ratio of object to image height = 1/2
Magnification = height of image / height of object
= 1/ (1/2)
= 2
Now, magnification in terms of distance of object and image from the mirror,
m = – v / u
= – v / -12
2 = v / 12
or
v = 12 × 2
= 24
Therefore the distance of image from the mirror is equal to 24 cm.
Problem 5: Calculate the change in the size of the image formed, if the object distance is 18 cm and the distance of the image is 6 cm from the concave mirror.
Solution:
Given that,
The object distance, u = -12 cm
Image distance, v = – 6cm
Magnification, m = – v/u
= – (-6 / -18)
= -1/3
which means that size of image is 1/3rd of the size of object.
Problem 6: The radius of curvature of the rear view convex mirror of the truck is 6 m. If the car is 8 m from the mirror of the truck. Calculate the distance at which the image is formed.
Solution:
Given that,
Radius of curvature, R = 6 m
Object distance, u = -8 m
Focal length is half of Radius of curvature,
f = R/2
= 6/2
= 3 m
Using mirror formula
1 / v + 1 / u = 1 / f
1 / v + 1 / -8 = 1 / 3
1 / v = 1 / 3 + 1 / 8
= 11 / 24
v = 24 / 11 m
The image is formed at distance of 24 / 11 behind the mirror.
Problem 7: A concave mirror produces an image of size n times that of the object and of focal length f. If the image is real then find the distance of the object from the mirror.
Solution:
Given that
Size of image = n × size of object
n = Size of image / size of object = magnification
Since the image is real, it must be inverted hence magnification will be negative,
m = -n
Let d is the distance of object then,
m = -v/u
-n = -v / d
or
v = nd
Therefore, the mirror formula:
1 / f = 1/v + 1/u
becomes,
1/f = 1/nd + 1/d
or
1/f = 1/d(1/n + 1)
or
1/d = n/ f(n + 1)
Therefore,
d = f (n + 1)/ n
Problem 8: Where should the object be placed to obtain a magnification of 1/3? If an object is placed at a distance of 60 cm from a convex mirror, then the magnification produced is 1/2.
Solution:
Given that,
u = -60 cm
m = 1/2
So,
-v/u = 1/2
and
v/60 = 1/2
or
v = 30 cm
Since, the mirror formula is:
1 / v + 1 / u = 1 / f
Therefore,
1 / 30 + 1 / (-60) = 1/f
1/f = ( 2-1 ) / 60 = 1 / 60
f = 60 cm
Now for magnification = 1 / 3,
– v / u = 1 / 3
or
v = – u / 3
using mirror formula
1 / v + 1 / u = 1 / f
1 / (-u/3) + 1/ u = 1/ 60
-3/ u + 1/u = 1/60
-2/ u = 1/60
or
u = -120 cm
object should be placed at 120 cm in front of mirror to get magnification of 1/3.
Problem 9: In the case of a concave mirror, if the object distance is 11 cm, its focal length is 11 cm then, Calculate the image distance.
Solution:
Given that,
Distance of object, u = -11 cm
Focal length, f = -11cm
Using mirror formula,
1 / v + 1 / u = 1 / f
Therefore,
1 / v + 1 / -11 = 1/ -11
So,
1/v = 0
or
v = infinity
This means that image will be at infinity if object is present at the focal length.
Problem 10: If the object distance is 32 cm in front of the concave mirror, the focal length of the mirror is 16 cm. State the nature and the size of the image formed.
Solution:
Given that,
Object distance, u = -32 cm
Focal length , f = -16 cm
For image distance use mirror formula,
1 / v + 1 / u = 1 / f
Therefore,
1/ v + 1/ -32 = 1/ -16
or
1/ v = 1/ -16 + 1/ 32
or
1/ v = (-2 + 1) / 32
So,
v = -32 cm
Hence the image is located 16 cm in front of the mirror. and the image formed is real and inverted.
Size of image will be same as that of object, as it is located at center of curvature.
Solve Problems on Mirror and Magnification Formula
Mirror and magnification formulas are fundamental equations used in optics to describe the formation of images by mirrors. These formulas are commonly applied in geometrical optics, which deals with the behavior of light rays using the principles of geometry. This article contains mirror and magnification formula and problems based on it in detail.