Given: Two interfaces involving refractive indices n1,n2,n3 with n1>n2>n3, n3n2=52, and sinθc2−sinθc1=21.
Find: θc1.
For critical angle from a denser medium to a rarer medium,
sinθc=ndensernrarer
Hence,
sinθc1=n1n2,sinθc2=n1n3
Using the given relation,
sinθc2−sinθc1=n1n3−n1n2=21
So,
n1n3−n2=21
Given
n3n2=52⇒n2=52n3
Substituting,
n1n3−52n3=21
n153n3=21
n1n3=65
Then,
sinθc1=n1n2=52⋅n1n3=52⋅65=31
Thus,
θc1=sin−1(31)
the solution working gives this value, but it does not match the listed options exactly. The solution still marks Option A as correct. Therefore, the extracted answer is kept as A, while noting the discrepancy between the working and the options.