A block slides down a slope of angle `theta` with constant velocity. It is then projected up with a velocity of `10ms^(-1), g=10ms^(-2)` & `theta` = 30°. The maximum distance it can go up the plane before coming to stop is

A block slides down a rough inclined plane of slope angle theta with a constnat velocity. It is then projected up the same plane with an intial velocity v the distance travelled by the block up the plane coming to rest is .

A particle is projected at an angle theta =30^@ with the horizontal, with a velocity of 10ms^(-1) . Then

A body is projected at an angle 30° with a velocity 42 ms^(-1) Its maximum height is

A block kept on a inclined plane slides down the plane with constant velocity when the slope angle of the plane is theta . It is then projected up with an initial velocity u. How far up the incline will it move before coming to rest ? Will it slide down again ?

A ball is thrown vertically upwards with a velocity of 10 ms^(-1) . It returns to the ground with a velocity of 9 ms^(-1) . If g=9.8 ms^(-2) , then the maximum height attained by the ball is nearly (assume air resistance to be uniform)

A body projected with velocity 30 ms^(-1) reaches its maximum height in 1.5 s. Its range is (g= 10ms^(-2) )

A body is projected from the ground with a velocity v = (3hati +10 hatj)ms^(-1) . The maximum height attained and the range of the body respectively are (given g = 10 ms^(-2))

The three block shown in fig. move with constant velocities. Find the velocity of blocks A and B. given V_(P2)=10ms^(-1) darr, V_(C)=2ms^(-1) uarr .

A body is projected with a velocity vecv =(3hati +4hatj) ms^(-1) The maximum height attained by the body is: (g=10 ms^(-2))

At what angle of elevation , should a projectile be projected with velocity with velocity 20 ms^(-1) , so as to reach a maximum height of 10 m ?