A loop of rope is whirled at a high angular velocity`omega`, so that it becomes a taut circle of radius r.
(a) Find the tension in the rope it the linear mass density of the rope is `mu`
(b) A kink develops in the whirling rope. Under what condition does the kink remain stationary relative to an observer on the ground?

A loop of rope is whirled at a high angular velocity omega , so that it becomes a taut circle of radius R . A kink develops in the whirling rope. (a) Show that the speed of the kink in the rope is v = omegaR . (b) Under what conditions does the kink remains stationary relative to an observer on the ground?

A body of mass m is tied with rope and rotated along horizontal circle of radius r. If T is the tension in the rope and v is the velocity of body and an instant the force required for circular motion is

A taut string having tension 100 N and linear mass density 0.25 kg//m is used inside a cart to generate a wave pulse starting at the left end, as shown. What should be the velocity of the cart so that pulse remains stationary w.r.t. ground.

A taut string having tension 100 N and linear mass density 0.25 kg//m is used inside a cart to generate a wave pulse starting at the left end, as shown. What should be the velocity of the cart so that pulse remains stationary w.r.t. ground.

A circular loop of rope of length L rotates with uniform angular velocity omega about an axis through its centre on a horizontal smooth platform. Velocity of pulse (with resppect to rope ) produce due to slight radiul displacement is given by (omegaL)/(2pi) , if the motion of the pulse and rotation of the loop, both are in same direction then the velocity of the pulse w.r.t. to ground will be:

A ring of mass m and radius r is rotated in uniform magnetic field B which is perpendicular to the plane of the loop with constant angular velocity omega_(0) .Find the net ampere force on the ring and the tension developed in the ring if there is a current i in the ring.Current and rotation both are clockwise.

A string has a linear mass density mu . The ends of the string are joined to form a closed loop and is given the shape of a circular ring of radius R. this ring is now rotated about its axis with an angular velocity omega Q. The velocity of the transverse wave set up in the string, with respect to an observer at the centre of

A hoop of mass m is projected on a floor with linear velocity v_(0) and reverse spin omega_(0) . The coefficient of friction between the hoop and the ground is mu . a. Under what condition will the hoop return back? b. How far will it go? c. How long will it continue to slip when its centre of mass becomes stationary? d. What is the velocity of return?

A disc of radius R is rotating with an angular omega_(0) about a horizontal axis it is placed on a horizontal table . The coefficient of kinetic friction is mu _(k) (a) what was the velocity of its centre of mass before being brought in contact with a the table ? (B) what happens to the linear velocity of a point on its rim when placed in contact with the table ? (c ) what happes to the linear speed of the centre of mass when disc is placed in contact with the table ? (d) which force is responsible for the effects in (b) and (C ) ? (e) wht condition should be sattisfied for rolling to begin ? (f) Calculate the time taken for the rolling to begin .

A thick rope of length 2L and linear mass density 9mu is joined at B to a thin rope of length L and linear mass density 4mu . The systems horizontally stretched by the two vertical wall A and C . Assuming B to be a node, find the minimum number of loops in the thick rope.