derive a relation for acceleration due to gravity how its value vary with mass of the planet
Answers
Answer:
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Answer:
The acceleration produced in a freely falling body by the gravitational pull of the earth is called the acceleration due to gravitation.
We know that,
Force = Mass × Acceleration
F=m×a
a=
m
F
…..1
Where F is the force on the object of mass m dropped from a distance r from the centre of earth of mass M.
So, force exerted by the earth on the object is
F=G
r
2
M×m
...2
M = Mass of Earth
m = mass of object
r = distance of object from centre of earth
Now, from equation 1 and 2,
a=G
r
2
×m
M×m
a=G
r
2
M
Now, from above,
a=g= Acceleration due to gravity
We also see that, although force is depending on the mass of the object,
F=G
r
2
M×m
But acceleration due to gravity is independent of the mass.
g=G
r
2
M
Factors on which g depends are:
(i) Value of gravitational constant (G)
(ii) Mass of Earth (M)
(iii) Radius of Earth (r)
As gravitational constant G and mass of earth M are always constant, so the value of acceleration due to gravity g is constant as long as the radius of earth remains constant.
At the surface of earth also, the value of g is not constant. (g∝
r
2
1
) .
At the poles, radius of earth is minimum, hence the g is maximum. Similarly at the equator, the radius of earth is maximum, and hence the value of g is minimum. Also as we go up from the surface of the earth, distance from the centre of the earth increases and hence value of g decreases.
The value of g also decreases as we go inside the surface of earth and g is zero at the centre of earth, as at the centre of the earth the object has mass around it, so net force cancels and thus net acceleration becomes zero.