Question

A man requires bifocals to correct both his near and far vision problems. Consider the bifocals to be a pair of glasses with a "main" lens and an additional "add-on" lens placed at the bottom. The main lens corrects his vision of distant objects. The add-on lens corrects his vision for reading. Looking through only the main lens, our man can read a book no closer than 35 cm away. But, he would like to read at a distance of 25 cm. What is the absolute value of the power of the add-on lens which will permit him to do this

Answer 1

The power of the lens = 1.143 D

Step-by-step explanation:

In the question it is required that the object placed at distance of 35cm should be viewed at 25cm distance by man. So,

Distance of object = p = 35cm

Distance of image = q = 25cm

According to lens formula

1/q - 1/p = 1/f

1/f = 1/25 – 1/35

1/f = 0.0114

f = 87.5 cm = 0.875 m

Power of lens is defined as the reciprocal of focal length so,

Power = 1/f = 1/0.875

Power = 1.143 D

Hence, power of the lens will be 1.143 D.

Answer 2

Step-by-step explanation:

If objects placed at 35 cm is viewed to be placed at 25 cm through the lens then he can see them correctly. That means the image of object place at 35 will be formed at 25 cm .

u = 35 cm , v = 25 cm , f = ?

1/v - 1/u = 1/f

1/25 - 1/35 = 1/f

.04 - .0285 = .0115 = 1/f

f = 87 cm.= .87m

Power = 1/.87 = 1.15 D.( + ve)