A particle oFIGURE mass m is FIGUREixed to one and oFIGURE a light spring having FIGUREorce constant k and unstretched length l. The other end is FIGUREixed. The system is given an angular speed `omega` about the FIGUREixed end oFIGURE the spring such that it rotates in a circle in the gravity FIGUREree space. Then the strength in the spring is:

A particles of mass m is fixed to one end of a light spring of force constant k and unstreatched length l. the system is rotated about the other end of the spring with an angular velocity omega in gravity free space. The increase in length of the spring is

A particle of mass m is fixed to one end of a massless spring of spring constant k and natural length l_(0) . The system is rotated about the other end of the spring with an angular velocity omega ub gravity-free space. The final length of spring is

A particle of mass m is fixed to one end of a light rigid rod of length l and rotated in a vertical ciorcular path about its other end. The minimum speed of the particle at its highest point must be

"A mass is attached to one end of a spring and by holding the other end in hand, the spring is whirled in a horizontal circle" What happens to the length of the spring ?

A ball of mass m is attached to the lower end of a light vertical spring of force constant K . The upper end of the spring is fixed. The ball is released from rest with the spring at its normal ( unstretched ) length, and comed to rest again after descending through a distance x .

Two particles of mass m each are attached to a light rod of length d, one at its centre and the other at a free end, The rod is fixed at the other end and is rotated in a plane at an angular speed omega . Calculate the angular momentum of the particle at the end with respect to the particle at the centre

One end of a light spring of spring constant k is fixed to a wall and the other end is tied to a block placed on a smooth horizontal surface. In a displacement, the work by the spring is 1/2kx^2 . The possible cases are

One end of a light spring of spring constant k is fixed to a wall and the other end is tied to a block placed on a smooth horizontal surface. In a displacment, the work done by the spring is +(1/2)kx^(2) . The possible cases are.

One end of a light spring of spring constant k is fixed to a wall and the other end is tied to a block placed on a smooth horizontal surface. In a displacement, the work done by the spring is +(1/2)kx^(2) . The possible cases are.

A small block of mass m is fixed at upper end of a massive vertical spring of spring constant k=(2mg)/(L) and natural length 10L The lower end of spring is free and is at a height L from fixed horizontal floor as shown. The spring is initially unstressed and the spring block system is released from rest in the shown position. Q. At the instant the speed of block is maximum the magitude of force exeted by the spring on the block is