Question:
A satellite is moving with a constant speed $v$ in a circular orbit about the earth. An object of mass '$m$' is ejected from the satellite such that it just escapes from the gravitational pull of the earth. At the time of its ejection, the kinetic energy of the object is :
A satellite is moving with a constant speed $v$ in a circular orbit about the earth. An object of mass '$m$' is ejected from the satellite such that it just escapes from the gravitational pull of the earth. At the time of its ejection, the kinetic energy of the object is :
Updated On: Jun 14, 2022
- $\frac{3}{2} m v^2$
- $ m v^2$
- $2 m v^2$
- $ \frac{1}{2}m v^2$
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The Correct Option is B
Solution and Explanation
At height $r$ from center of earth. orbital velocity
$
=\sqrt{\frac{ GM }{ r }}
$
$\therefore$ By energy conservation
$KE$ of $'m ^{\prime}+\left(-\frac{ GMm }{ r }\right)=0+0$
(At infinity, $PE = KE =0$ )
$
' m^{\prime}=\frac{G M m}{r}=\left(\sqrt{\frac{G M}{r}}\right)^{2} m=m v^{2}
$
$
=\sqrt{\frac{ GM }{ r }}
$
$\therefore$ By energy conservation
$KE$ of $'m ^{\prime}+\left(-\frac{ GMm }{ r }\right)=0+0$
(At infinity, $PE = KE =0$ )
$
' m^{\prime}=\frac{G M m}{r}=\left(\sqrt{\frac{G M}{r}}\right)^{2} m=m v^{2}
$
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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].