Answer:
[tex]g_2=6.8125 m^2/sec[/tex]
Explanation:
We know that
Acceleration due to gravity g is given by the formula
[tex]g= \frac{GM}{r^2}[/tex]
G= gravitational constant
M= mass of the Earth
r= radius of the earth
[tex]g_1 = GM/r_1^2[/tex]
Let acc. due to gravity after radius is 20% greater be g_2
then
[tex]g_2=GM/r_2^2[/tex]
=> g1/g2 = (r_2/r_1)^2 => g2 = 9.81/1.2^2 = 6.8125
Answer:
6.81 m/s^2
Explanation:
Radius of planet, Rp = R + 0.2R = 1.2 R
where, R is the radius of earth
Mass of planet = mass of earth = M
Let g be the acceleration due to gravity and g' be the acceleration due to gravity on planet.
the formula for acceleration due to gravity on earth
[tex]g=\frac{GM}{R^{2}}[/tex] .... (1)
the formula for acceleration due to gravity on planet
[tex]g'=\frac{GM}{1.44R^{2}}[/tex] .... (2)
Divide equation (2) be equation (1)
g' = g / 1.44
g' = 9.8 / 1.44 = 6.81 m/s^2
Thus, the acceleration due to gravity on surface of planet is 6.81 m/s^2.
