Suppose the gravitational force varies inversely as the `n^(th) `power of distance. Then the time period of a planet in circular orbit of radius R around the sun will be proportional to-

Suppose the gravitational force varies inversely as the nth power of distance. Then the time period of a planet in circular orbit of radius 'R' around the sun will be proportional to

Suppose the gravitational force varies inversely as then n th power of distance then the time period of a planet in circular orbit of radius r around the sun will be propotinal to

Suppose the gravitational force varies inverseley as the nth power of the distance. Show that the time period of a planet in circular orbit of raidus r arount the sun will be proportional to r^(n+1)//^(2) .

if the gravitaional force ware to vary inversely as m^(th) power of the distance then the time period of a planet in circular orbit of radius r aroung the sun will be proportional to

Suppose gravitational pull varies inversely as nth power of the distance. Show that the time period of a planet in circular orbit of radius R around the sun will be proportinal to R^((n+1)//2)

For motiion of planets in ellipticla orbits around the sun the central force is

Suppose the gravitational attraction varies inversely as the distance from the earth. The orbital velocity of a satellite in such a case varies as nth power of distance where n is equal to

Suppose that the gravitational force between two bodies separated by a distance R becomes inversely proportional to R (and not as (1)/(R^(2)) as given by Newton's law of gravitation). Then the speed of a particle moving in a circular orbit of radius R under such a force would be proportional to