Q. Knowing that mass of Moon is $\frac{M}{81}$ where $M$ is the mass of Earth, find the distance of the point where gravitational field due to Earth and Moon cancel each other, from the Moon. Given that distance between Earth and Moon is $60\, R$, where $R$ is the radius of Earth.
Solution:
Let C be the point where the gravitational field due to earth and the moon be equal. C is at a distance x from the moon and (60R - x) from the earth. We know that the gravitational field at a distance r from mass M is given by
$E=G\frac{M}{r^{2}}$
In our case
E1 = E2
$G \frac{M}{\left(60R-x\right)^{2}}=\frac{M}{G\frac{81}{x^{2}}}$
$\Rightarrow 81x^{2} = \left(60R - x\right)^{2}$
$\Rightarrow \left(9x\right)^{2} = \left(60R - x\right)^{2}$
$\therefore 9x = \pm \left(60R - x\right)
\therefore 9x = 60R - x or 9x = x - 60R$
$\Rightarrow 10x = 60R or 8x = -60R$
$\Rightarrow x = 6R$ or $x=-\frac{60}{8}R$
which is not possible as distance cannot be negative.
