A motorcyclist (as a particle) is undergoing vertical circles inside a sphere of death. The speed of the motorcycle varies between` 6 ms^-1`and`10 ms^-1` Calculate diameter of the sphere of death . How much minimum value are possible for these two speed?

A motor cyclist (as a particle ) is undergoing vertical circles inside a sphere of death . The speed of the motorcycle varies between 6m/s and 10 m/s. Calculate diameter of the sphere of death. How much minimum values are possible for these two speeds ?

If the speed of light is 3.0 xx10^8 ms^-1 , calculate the distance covered by light to 2.00 ns.

During a stunt a cyclist ( considered to be a particle is undertaking horizontal circles inside a cylindrical well of radius 6.05m. If the necessary friction coefficient is 0.5, how much minimum speed should the stunt artist maintain? Mass of the artist is 50kg. If she / he increases the speed by 20% how much will the force of friction be? (Use g = 10ms^2)

During a stunt, a cyclist (considered to be a particle) is undertaking horizontal circles inside a cylindrical well of radius 6.05 m. If the necessary friction coefficient is 0.5, how much minimum speed should the stunt artist maintain ? Mass of artist is 50 kg . If she/ he increses the speed by 20%, how much will the force of friction be ?

A block of weight 10 N is fastened to one end of a wire of cross sectional area 3 mm^2 and is rotated in a vertical circle of radius 20 cmk. The speed of the block at the bottom of the circle is 2ms^-1 . Find the elongation of the wire when the block is at the bottom of the circle. Young modulus of the material of the wire =2xx10^11Nm^-2 .

A particle is moving in a vertical circle with constant speed. The tansions in the string when passing through two positions at angles 30^@ and 60^@ from vertical (lowest position) are T_1 and T_2 respectively. Then

A bucket full of water is tied at the end of rope of length 1.6 m. It is rotated in vertical circle with constant speed around the other end. What should be the minimum speed of bucket so that water does not spill out at the highest position of the circle ?