We are given -30°-60°-90° as shown in the above figure. The refractive index of an optical material is expressed by n and represents the speed of light in the material. The prism is dropped by a drop of liquid and the ray is totally reflected; therefore, the incident angle is 90degree as the ray is incident normally. Snell’s is given by the equation

                                                               $n_a\sin {\theta }_a=n_b\sin {\theta }_b$

Where ${\theta }_a$ represents the critical angle which is 60°. $n_a$ is the refractive index of the liquid. Now, solve Snell’s law for and substitute the values for $n_a,{\theta }_a,{\theta }_b$

                                                                  $$\begin{gathered} n_b\&=\frac{n_a\sin {\theta }_a}{\sin {\theta }_b} \\ =\left(1.56\right)\left(\frac{\sin 60°}{\sin 90°}\right) \\ =1.35 \end{gathered}$$

Hence, the maximum index is 1.35 that the liquid must have for the light to be totally reflected.