`F = (Gm_(1)m_(2))/(r^(2))` is valid

Assertion : Mass of the rod AB is m_(1) and of particle P is m_(2) . Distance between centre of rod and particle is r. Then the gravitational force between the rod and the particle is F=(Gm_(1)m_(2))/(r^(2)) Reason : The relation F=(Gm_(1)m_(2))/(r^(2)) can be applied directly only to find force between two particles.

The gravitational force F between two masses m_(1) and m_(2) separeted by a distance r is given by F = (Gm_(1)m_(2))/(r^(2)) Where G is the universal gravitational constant. What are the dimensions of G ?

Find the dimensional formula of the following question : (a) Surface tension T (b) Universal constant of gravitation , G (c ) Impulse ,J (d) Torque tau The equation involving these equations are : T = Fil F = (Gm_(1)m_(2))/(r^(2)), J = F xx t and tau = F xx 1

Assertion : The centres of two cubes of masses m_(1) and m_(2) are separated by a distance r. The gravitational force between these two cubes will be (Gm_(1)m_(2))/(r^(2)) Reason : According to Newton's law of gravitation, gravitational force between two point masses m_(1) and m_(2) separated by a distance r is (Gm_(1)m_(2))/(r^(2)) .

int_r^infty (Gm_1m_2)/(r^2) dr is equal to

Statement I: The force of gravitation between a sphere and a rod of mass M_(2) is =(GM_(1)M_(2))//r . Statement II: Newton's law of gravitation holds correct for point masses.

If f: R to R is defined by f(x)=(1-x^(2))/(1+x^(2)) then show that f(tantheta)=cos2theta.

Two satellites A and B of masses m_(1) and m_(2)(m_(1)=2m_(2)) are moving in circular orbits of radii r_(1) and r_(2)(r_(1)=4r_(2)) , respectively, around the earth. If their periods are T_(A) and T_(B) , then the ratio T_(A)//T_(B) is

Let f(r) = sum_(j=2)^(2008) (1)/(j^(r)) = (1)/(2^(r))+(1)/(3^(r))+"…."+(1)/(2008^(r)) . Find sum_(k=2)^(oo) f(k)

Two satellites of masses of m_(1) and m_(2)(m_(1)gtm_(2)) are revolving round the earth in circular orbits of radius r_(1) and r_(2)(r_(1)gtr_(2)) respectively. Which of the following statements is true regarding their speeds v_(1) and v_(2) ?