This question involves the concept of Newton's Law of Gravitation, Gravitational Force, and Weight.
(a) The Gravitational Force on satellite is "1.682 x 10⁴ N (OR) 16.82 KN".
(b) This Gravitational Force is "0.8 times" the satellite's weight at the surface of the earth.
(a)
We will use the formula of Newton's Gravitational Law here to find out the Gravitational Force:
[tex]F = \frac{Gm_1m_2}{r^2}[/tex]
where,
F = Gravitational Force = ?
G = Universal Gravitational Constant = 6.67 x 10⁻¹¹ N.m²/kg²
m₁ = mass of earth = 6 x 10²⁴ kg
m₂ = mass of satellite = 2150 kg
r = distance between center of earth and the center of the satellite
r = distance of satellite from the surface of earth + radius if earth
r = 780000 km + 6371000 m = 7151000 m
Therefore,
[tex]F = \frac{(6.67\ x\ 10^{-11}\ N.m^2/kg^2)(6\ x\ 10^{24}\ kg)(2150\ kg)}{(7151000\ m)^2}[/tex]
F = 1.682 x 10⁴ N = 16.82 KN
(b)
Now we will divide this force by the weight of the satellite on the surface of the earth:
[tex]\frac{F}{Weight} = \frac{1.682\ x\ 10^4\ N}{mg}\\\\\frac{F}{W} = \frac{1.682\ x\ 10^4\ N}{(2150\ kg)(9.81\ m/s^2)}\\\\[/tex]
F = 0.8 W
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