If a particle takes `t` second less and acquire a velocity of `vms^(-1)` more in falling through the same disance on two planets where the accelerations due to gravity are `2g` and `8g` respectively, then `v=xgt`. Find value of `x`

A particle takes n seconds less and acquires a velocity u m/sec. higher at one place than at another place in falling through the same distance. Calculate the product of the acceleration due to gravity at these two places.

The velocity of a freely falling body changes as g^ph^q where g is acceleration due to gravity and h is the height. The values of p and q are

Two planets have the same average density but their radii are R_(1) and R_(2) . If acceleration due to gravity on these planets be g_(1) and g_(2) respectively, then

Two particles are projected vertically upward with the same velocity on two diferent planes with accelerations due to gravities g_(1) and g_(2) respectively. If they fall back to their initial points of projection after lapse of time t_(1) and t_(2) respectively. Then

The values of the acceleration due to gravity on two planets are g_(1) - g_(2) , then the two planets must have the same

The velocity of a freely falling body is a function of the distance fallen through (h) and acceleration due to gravity g . Show by the method of dimensions that v = Ksqrt(gh) .

A spherical uniform planet is rotating about its axis. The velocity of a point on its equator is V . Due to the rotation of planet about its axis the acceleration due to gravity g at equator is 1//2 of g at poles. The escape velocity of a particle on the planet in terms of V .

The displacement of a body is given by s=(1)/(2)g t^(2) where g is acceleration due to gravity. The velocity of the body at any time t is

An object falls through a distance h in certain time on the earth. The same object falls through a distance 4h in the same time on a planet. If 'g' is acceleration dur to gravity on the earth then acceleration due to gravity on that planet will be