
⇒(R+h)2GMm=(R+h)mv2 ⇒(R+h)GM=v2 ....(1) ⇒v=(R+h)ω ⇒v=(R+h)T2π ....(2) ⇒R2GM=g ⇒GM=gR2 ....(3) Put value from (2) & (3) in eq. (1) $\begin{aligned}
& \Rightarrow \frac{\mathrm{gR}^2}{(\mathrm{R}+\mathrm{h})}=(\mathrm{R}+\mathrm{h})^2\left(\frac{2 \pi}{\mathrm{T}}\right)^2 \
& \Rightarrow \frac{\mathrm{T}^2 \mathrm{R}^2 \mathrm{g}}{(2 \pi)^2}=(\mathrm{R}+\mathrm{h})^3 \
& \Rightarrow\left[\frac{\mathrm{T}^2 \mathrm{R}^2 \mathrm{g}}{(2 \pi)^2}\right]^{1 / 3}-\mathrm{R}=\mathrm{h}
\end{aligned}$