A block whose mass is 2 kg is fastened on a spring whose spring constant is 100 `Nm^(-1)` . It is pulled to a distance of 0.1 m from over a frictionless surface and is released at t=0. Calculate the kinetic eneryg of the block when it is 0.05 m away from its mean position.

A block whose mass is 2kg is fastened to a spring. The spring has a spring constant of 100 Nm^(-1) . The block is pulled to a distance x=10 cm from its equilibrium position at x=0 on a frictionless surface from rest at t=0. Calculate the kinetic, potential and total energies of the block when it is 5 cm away from the mean position.

A block whose mass is 1kg is fastened to a spring. The spring has a spring constant of 50 Nm^(-1) . The block is pulled to a distance x=10 cm from its equilibrium position at x=0 on a frictionless surface from rest at t=0. Calculate the kinetic, potential and total energies of the block when it is 5 cm away from the mean position.

A block whose mass is 1kg is fastened to a spring. The spring has a spring constant of 50 Nm^(-1) . The block is pulled to a distance x=10 cm from its equilibrium position at x=0 on a frictionless surface from rest at t=0. Calculate the kinetic, potential and total energies of the block when it is 7.07 cm away from the mean position.

A block whose mass is 1 kg is fastened to a spring.The spring has a spring constant 50Nm^(-1) . The block is pulled to a distance x=10cm from its equilibrium position at x=0 on a frictionless surface at t=0 . Calculate the kinetic, potential and total energies of the block when it is 5cm away from the mean position.

A block whose mass is 1 kg is fastened to a spring. The spring has a spring constant of 50 N m^(-1) . The block is pulled to a distance x = 10 cm from its equilibrium position at x = 0 on a frictionless surface from rest at t = 0. Calculate the kinetic, potential and total energies of the block when it is 5 cm away from the mean position.