The mass of the moon is $\frac{1}{81}\mathrm{th}$ of earth's mass and it's radius $\frac{1}{4}\mathrm{th}$ that of the earth. If the escape velocity from the earth's surface is $11.2\mathrm{ }\mathrm{k}\mathrm{m} {\mathrm{s}}^{-1}$, its value for the moon will be

A spherically uniform planet of $mass8\times {10}^{24} \mathrm{kg}$ and or radius $6\times {10}^6 \mathrm{m}$ is orbiting around the Sun. The escape velocity for the planet is close to (Take,$G=6\times {10}^{-11} \mathrm{N}-{\mathrm{m}}^2/{\mathrm{kg}}^2)$

Given below are two statements : one is labelled as Assertion $A$ and the other is labelled as Reason $R$.

Assertion $A$ : The escape velocities of planet  $A$ and $B$ are same. But $A$ and $B$ are of unequal mass.

Reason $R$: The product of their mass and radius must be same. $M_1{R}_1=M_2{R}_2$ In the light of the above statements, choose the most appropriate answer from the options given below :