Question

The masses and radii of the earth and the Moon are $M_1$, $R_1$ and $M_2$, $R_2$, respectively. Their centres are at distance $d$ apart. The minimum speed with which a particle of $m$ should be projected from a point midway the two centres so as to escape to infinity is:

• A. $\sqrt{\frac{2G(M_1+M_2)}{d}}$
• B. $\sqrt{\frac{4G(M_1+M_2)}{d}}$
• C. $\sqrt{\frac{2G{M}_1{M}_2}{d}}$
• D. $\sqrt{\frac{G(M_1+M_2)}{d}}$

Answer 1

Answer: (B)

$\sqrt{\frac{4G(M_1+M_2)}{d}}$

The particle m is at a distance $d/2$ from the centre of the earth (mass $M_1$) as well as from the centre of the moon (mass $M_2$). Therefore, the total gravitational potential energy of the particle due to the earth and the moon is
$-\frac{G{M}_{1}m}{d/2}-\frac{G{M}_{2}m}{d/2}=-\frac{2G(M_1+M_2)m}{d}$
Clearly, the work required to move the particle from the point midway between the earth and the moon to infinity would be $\frac{2G(M_1+M_2)m}{d}$.
Thus, the minimum velocity of projection for the particle m to escape is given by
$\frac{1}{2}m{v_e}^2=\frac{2G(M_1+M_2)m}{d}$
or $v_e=2\sqrt{\frac{G(M_1+M_2)m}{d}}$
$v_e=\sqrt{\frac{4G(M_1+M_2)m}{d}}$