Assertion: A block of small mass `m` attached to a stiff spring will have large oscillation frequency.
Reason: Stiff springs have high value of spring constant.

A body of mass 20 g connected to a spring of spring constant k, executes simple harmonic motion with a frequency of (5//pi) Hz. The value of spring constant is

Derive an experession for the period of oscillation of a mass attached to a spring executing simple harmonic motion. Given that the period of oscillation depends on the mass m and the force constant k, where k is the force required to stretch the spring by unit length?

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

Find the time period of oscillation of block of mass m. Spring, and pulley are ideal. Spring constant is k.

A block of mass m suspended from a spring of spring constant k . Find the amplitude of S.H.M.

A mass M=5 kg is attached to a string as shown in the figure and held in position so that the spring remains unstretched. The spring constant is 200 Nm^(-1) . The mass M is then released and begins to undergo small oscillations. The amplitude of oscillation is

A block of mass m is attached to three springs A,B and C having force constants k, k and 2k respectively as shown in figure. If the block is slightly oushed against spring C . If the angular frequency of oscillations is sqrt((Nk)/(m)) , then find N . The system is placed on horizontal smooth surface.

On a smooth inclined plane, a body of mass M is attached between two springs. The other ends of the springs are fixed to firm supports. If each spring has force constant K , the period of oscillation of the body (assuming the springs as massless) is

On a smooth inclined plane a body of mass M is attached between two springs. The other ends of the springs are fixed to firm supports. If each spring has a force constant k, the period of oscilation of the body is (assuming the spring as massless)

A block of mass m is attached to one end of a mass less spring of spring constant k. the other end of spring is fixed to a wall the block can move on a horizontal rough surface. The coefficient of friction between the block and the surface is mu then the compession of the spring for which maximum extension of the spring becomes half of maximum compression is .