Given: A thin convex lens of refractive index μ2 is kept in a liquid of refractive index μ1 with μ1<μ2. The magnitudes of radii of curvature are ∣R1∣ and ∣R2∣, and the second surface is silver polished.
Find: The object distance on the optic axis for which a real and inverted image is formed at the same place.
The solution uses the lens-maker relation for a lens in a medium:
f1=(μ1μ2−1)(R11−R21)
Equivalently,
f′1=(μ1μ2−μ1)(∣R1∣1−∣R2∣1)
After the second surface is silvered, the arrangement behaves as a lens-mirror system. Using the relation quoted in the solution,
F1=f′2+r1
where for the silvered second surface,
r=−∣R2∣
Substituting,
F1=(μ2−μ1)2μ1(∣R1∣1−∣R2∣1)−∣R2∣1
The extracted solution then simplifies this to the required object distance for the autoconjugate condition, stated there as u=F:
u=μ2(∣R1∣+∣R2∣)−μ1∣R2∣μ1∣R1∣∣R2∣
Therefore, the correct option is B.