Two particles each of mass m are moving in horizontal circle with same angular speed. If both string are of same length then the ratio of tension in string `(T_(1))/(T_(2))` is

A particle is attached by means of two equal strings to two points A and B in the same vertical line and describes a horizontal circle with a uniform angular speed. If the angular speed of the particle is 2sqrt(2g//h) with AB=h, show that the ratio of the tensions of the strings is 5:3

A uniform rod of mass m and length L is suspended with two massless strings as shown in figure. If the rod is at rest in a horizontal position the ratio of tension in the two strings T_(1)//T_(2) is

A uniform rod of mass m and length L is suspended with two massless strings as shown in the figure. If the rod is at rest in a horizontal position the ratio of tension in the two strings T_1/T_2 is:

A uniform rod of mass m and length L is suspended with two massless strings as shown in the figure. If the rod is at rest in a horizontal position the ratio of tension in the two strings T_1/T_2 is:

A stone is tied to one end of a string and rotated in horizontal circle with a uniform angular velocity. The tension in the string is T, if the length of the string is halved and its angular velocity is doubled , the tension in the string will be

A boy revolves two balls each of mass 100 gm and tied with strings of 1 metre length each in horizontal circle as shown in figure. If the speed of outermost ball is 6 m/s , then tension in string-1 is-

A stone is tied to one end of a steing and rotated in horizontal circle with a uniform angular velocity. The tension in the string is T, if the lrngth of the string is halved and its angular velocity is doubled , the tension in the string will be

Two particles of masses m_1 and m_2 are connected to a string and the system is rotated in a horizontal plane with 'P' as center. The ratio of tension in the two parts of string is

A simple pendulum of length L and mass M is oscillating about a vertical line with angular amplitude theta . If for an angular displacement phi (phi>theta) the tension in the string is T_1 and for angular amplitude theta the tension is T_2 , then