A block of mass 2 kg initially at rest is dropped from a height of 1m into a vertical spring having force constant `490 Nm^(-1)`. Calculate the maximum distance through which the spring will be compressed.

A block of massm, initally at rest is dropped from a height h onto a spring whose force constant is K. Find the maximum distance x through which the spring will be compressed.

A block of mass 2kg is propped from a height of 40cm on a spring where force constant is 1960Nm^(-1) The maximum distance thought which the spring compressed by

A block of mass m initially at rest is dropped from a height h on to a spring of force constant k . the maximum compression in the spring is x then

A block of mass m = 2.0 kg is dropped from height h = 40 cm onto a spring of spring constant k = 1960 N//s . Find the maximum distance through which the spring is compressed. Take g = 9.8 m//s^(2)

A block of 200 g mass is dropped from a height of 2 m on to a spring and compress the spring to a distance of 50 cm. The force constant of the spring is

A 2-kg block is dropped from a height of 0.4 m on a spring of force constant k=1960 N . Find the maximum distance the spring will be compressed. (Take g = 9.8 ms^(-2) ) [Hint : Consider conservation of energy]

A solid cylinder of mass 3 kg is rolling on a horizontal surface with velocity 4 ms^(-1) . It collides with a horizontal spring of force constant 200 Nm^(-1) . The maximum compression producec in the spring will be :

A spring gets compressed when a body of mass 5 g is dropped on it from a height of 2 m . Calculate the maximum distance s through whichthe spring is compressed. The force constant of spring is 100 Nm^(-1) .

A block is released from height h , find the maximum compression of spring of spring constant k .