The gravitational field, due to the 'left over part' of a uniform sphere (from which a part as shown, has been 'removed out'), at a very far off point, $P$, located as shown, would be (nearly):

Updated On: Jul 13, 2024

$\frac{5}{6} \frac{GM}{x^{2}}$
$\frac{8}{9} \frac{GM}{x^{2}}$
$\frac{7}{8} \frac{GM}{x^{2}}$
$\frac{6}{7} \frac{GM}{x^{2}}$

Hide Solution

Verified By Collegedunia

The Correct Option is C

Solution and Explanation

Let mass of smaller sphere (which has to be removed) is m
Radius $=\frac{R}{2}$ (from figure)
$\frac{M}{\frac{4}{3}\pi R^{3}}= \frac{m}{\frac{4}{3}\pi\left(\frac{R}{2}\right)^{3}}$
$\Rightarrow m = \frac{M}{8}$
Mass of the left over part of the sphere
$M' =M - \frac{M}{8} = \frac{7}{8}M$
Therefore gravitational field due to the left over part of the sphere
$= \frac{GM'}{X^{2}} = \frac{7}{8} \frac{GM}{x^{2}}$

Was this answer helpful?

Questions Asked in JEE Main exam

View More Questions

Concepts Used:

Gravitation

In mechanics, the universal force of attraction acting between all matter is known as Gravity, also called gravitation, . It is the weakest known force in nature.

Newton’s Law of Gravitation

According to Newton’s law of gravitation, “Every particle in the universe attracts every other particle with a force whose magnitude is,

F ∝ (M₁M₂) . . . . (1)
(F ∝ 1/r²) . . . . (2)

On combining equations (1) and (2) we get,

F ∝ M₁M₂/r²

F = G × [M₁M₂]/r² . . . . (7)

Or, f(r) = GM₁M₂/r²

The dimension formula of G is [M^-1L³T^-2].

SUBSCRIBE TO OUR NEWS LETTER

COLLEGE NOTIFICATIONS

EXAM NOTIFICATIONS

NEWS UPDATES

Download the Collegedunia app on

The gravitational field, due to the 'left over part' of a uniform sphere (from which a part as shown, has been 'removed out'), at a very far off point, \(P\), located as shown, would be (nearly):