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

Two particles of masses m and M(Mgtm) are connected by a cord that passes over a massless, frictionless pulley. The tension T in the string and the acceleration a of the particles is

two masses 2m and m are attached to the the ends of a string while passing over a smooth Pulley of mass m and radius R . The ratio of tensions in both the strings 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

Two particles of mass m and 2m are connected by a string of length L and placed at rest over a smooth horizontal surface. The particles are then given velocities as indicated in the figure shown. The tension developed in the string will be

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:

Two men of masses m and m//2 starts climbing up on two masseless strings fixed at the ceiling with acceleration g and g//2 respectively. The ratio of tensions in the two strings will be :

A particle of mass m_(1) is fastened to one end of a string and one of m_(2) to the middle point, the other end of the string being fastened to a fixed point on a smooth horizontal table The particles are then projected, so that the two portions of the string are always in the same straight line and describes horizontal circles find the ratio of tensions in the two parts of the string

Two particle of masses 10 kg and 35 kg are connected with four strings at points B and D as shown in fig. Determine the tension in various segments of the string.

Two masses m and M are attched with strings as shwon . If the system is in equilibrium then , tan theta

A particle of mass m is tied to a string of length L and whirled into a horizontal plan. If tension in the string is T then the speed of the particle will be :