Home
Class 11
PHYSICS
A small ball of mass 'm' is connected by...

A small ball of mass `'m'` is connected by an intextensible mass less string of length `('l' = 10m)` with an another ball of mass `M = 4m`. They are released with zero tension in the string from a height `h(h = 5m)` as shown. Find the time when the string becomes taut for the first time after the mass `'M'` collides with the ground is _____`S`. (Take all collisions to be elastic) `(g = 10 m//s^(2))`

Promotional Banner

Similar Questions

Explore conceptually related problems

A small ball of mass m is connected by an inextensible massless string of length with an another ball of mass M = 4m . They are released with zero tension in the string from a height h as shown in the figure. Find the time when the string becomes taut for the first time after the mass M collides with the ground. Take all collisions to be elastic.

A small ball of mass m is connected by an inextensible massless string of length with an another ball of mass M = 4m . They are released with zero tension in the string from a height h as shown in the figure. Find the time when the string becomes taut for the first time after the mass M collides with the ground. Take all collisions to be elastic.

The block of mass m is at rest. Find the tension in the string A .

The block of mass m is at rest. Find the tension in the string A .

Two blocks of masses m and M are connected by an inextensible light string . When a constant horizontal force acts on the block of mass M. The tension in the string is

Two blocks of masses m and M are connected by an inextensible light string . When a constant horizontal force acts on the block of mass M. The tension in the string is

A ball A of mass m attached to a string of length L is released when the string is horizontal. It strikes another ball B of mass 2 m suspended to another string of length L at rest as shown. Find the maximum angle made by the string if the collision is completely inelastic.

A body of mass M is hanging by an inextensible string of mass m. If the free end of the string accelerates up with constant acceleration a. find the variation of tension in the string a function of the distance measured from the mass M (bottom of the string).

A body of mass M is hanging by an inextensible string of mass m. If the free end of the string accelerates up with constant acceleration a. find the variation of tension in the string a fuction of the distance measured from the mass M (bottom of the string).

A particle of mass 2m is connected by an inextensible string of length 1.2 m to a ring of mass m which is free to slide on a horizontal smooth rod. Initially the ring and the particle are at the same level with the string taut. Both are then released simultaneously. The distance in meter moved by the ring when the string becomes veritcal is :-