A room is in shape of a cube . A heavy ball (B) is suspended at the centre of the room tied to three inextensible strings as shown. String BA is horizontal with A being the centre point of the wall. Find the ratio of tension in the string BA and BC.

A mass M is hung with a light inextensible string as shown in Find the tension in the horizontal part of the string .

A mass M is hung with a light inextensible string as shown in Find the tension in the horizontal part of the string .

A uniform rod is rested on a wall and its lower end is tied wall with the help of a horizontal string of negligble mass as shown. Length of rod is L and height of the wall is h . What will be tension in the string ?

Three charges +q, +2q and 4q are connected by strings as shown in the figure.What is ratio of tensions in the strings AB and BC

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:

Two insects each of mass m moves with accelerations a_1 = a_2 = g//2 relative to the light inextensible string as shown in the figure. The ratio of tensions in the portions AB and BC of the string is :

A particle is suspended by a light vertical inelastic string of length 1 from a fixed support. At its equilbrium position it is projected horizontally with a speed sqrt(6 g l) . Find the ratio of the tension in the string in its horizontal position to that in the string when the particle is vertically above the point of support.

A particle is suspended by a light vertical inelastic string of length 1 from a fixed support. At its equilbrium position it is projected horizontally with a speed sqrt(6 g l) . Find the ratio of the tension in the string in its horizontal position to that in the string when the particle is vertically above the point of support.