NVAEasyJEE 2026Refraction & Lenses

JEE Physics 2026 Question with Solution

The size of the images of an object, formed by a thin lens are equal when the object is placed at two different positions 8cm8 \, \text{cm} and 24cm24 \, \text{cm} from the lens. The focal length of the lens is _____ cm.

Answer

Correct answer:16

Step-by-step solution

Standard Method

Given: The object is placed at two different positions 8cm8 \, \text{cm} and 24cm24 \, \text{cm} from the lens, and the image sizes are equal.

Find: The focal length ff of the thin lens.

The magnification is given by

m=ff+um = \frac{f}{f+u}

For the image sizes to be equal at different object positions, one image must be real and the other virtual, so the magnifications are equal in magnitude and opposite in sign.

Let

u1=8cm,u2=24cmu_1 = -8 \, \text{cm}, \qquad u_2 = -24 \, \text{cm}

Then

m1=m2    ff8=ff24|m_1| = |m_2| \implies \frac{f}{f-8} = -\frac{f}{f-24}

So,

f24=(f8)f - 24 = -(f - 8) f24=f+8f - 24 = -f + 8 2f=322f = 32 f=16cmf = 16 \, \text{cm}

Therefore, the focal length of the lens is 16cm16 \, \text{cm}.

Direct Relation

Given: The two object distances are 8cm8 \, \text{cm} and 24cm24 \, \text{cm}.

Find: The focal length ff.

If magnification magnitudes are equal for object distances d1d_1 and d2d_2, then

f=d1+d22f = \frac{d_1 + d_2}{2}

Substituting,

f=8+242=322=16cmf = \frac{8 + 24}{2} = \frac{32}{2} = 16 \, \text{cm}

Therefore, the focal length is 16cm16 \, \text{cm}.

Common mistakes

  • Using the two distances directly in the lens formula without applying the equal-image-size condition is incorrect. The key condition is equality of magnification magnitudes. First relate the magnifications, then solve for ff.

  • Taking both magnifications with the same sign is wrong. For equal image sizes at two different object positions, one image is real and the other virtual, so the magnifications are equal in magnitude but opposite in sign.

  • Ignoring the sign convention for object distance can lead to an incorrect equation. Use the Cartesian sign convention consistently, with object distances taken as negative here.

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