A block of mass `100 g` attached to a spring ofstiffness `100 N//Mis` lying on a frictionless floor as shown. The block is moved to compress the spring by `10 cm` and released. If the collation with the wall is elastic then find the time period of oscillations.

A block of mass 100 g attached to a spring of stiffness 100 N//m is lying on a frictionless floor as shown. The block is moved to compress the spring by 10 cm and released. If the collision with the wall is elastic then find the time period of oscillations.

A block of mass 0.9 kg attached to a spring of force constant k is lying on a frictionless floor. The spring is compressed to sqrt(2) cm and the block is at a distance 1//sqrt(2) cm from the wall as shown in the figure. When the block is released, it makes elastic collision with the wall and its period of motion is 0.2 sec . Find the approximate value of k

A block of mass 0.9 kg attached to a spring of force constant k is lying on a frictionless floor. The spring is compressed to sqrt(2) cm and the block is at a distance 1//sqrt(2) cm from the wall as shown in the figure. When the block is released, it makes elastic collision with the wall and its period of motion is 0.2 sec . Find the approximate value of k

A block of mass 0.9 kg attached to a spring of force constant k is lying on a frictionless floor. The spring is compressed to sqrt(2) cm and the block is at a distance 1//sqrt(2) cm from the wall as shown in the figure. When the block is released, it makes elastic collision with the wall and its period of motion is 0.2 sec . Find the approximate value of k

In the figure, the block of mass m, attached to the spring of stiffness k is in correct with the completely elastic wall, and the compression in the spring is e. The spring is compressed further by e by displacing the block towards left and is then released. If the collision between the block and the wall is completely eleastic then the time period of oscillation of the block will be

In the figure, the block of mass m, attached to the spring of stiffness k is in correct with the completely elastic wall, and the compression in the spring is e. The spring is compressed further by e by displacing the block towards left and is then released. If the collision between the block and the wall is completely eleastic then the time period of oscillation of the block will be

A block is attached to a spring and is placed on a horizontal smooth surface as shown in which spring is unstretched. Now the spring is given an initial compression 2x_(0) an block is released from rest. Collision with the wall PQ are elastic. Find the time period of motion of the block:

A block of mass 'm' is released on the top of a frictionless incline as shown in the figure. The time period of the oscillation of the block is

A block of mass M connected to an ideal spring of force constant k, is placed on a smooth surface. The block is pushed to the left so as to compress the spring by a length A and then it is released. The block hits an elastic wall at a distance (3A)/(2) from its point of release. Assume the collision to be instantaneous. (a) Calculate the time required by the block to complete one oscillation (b) Draw the velocity - time graph for one oscillation of the block. (c) Find the value of k for which average force experienced by the wall due to repeated hitting of the block is F_(0) .