A weight `w` is supported by two strings anclined at `60^(@)` and `30^(@)` to the verticle. The tentions in the strings are `T_(1)` and `T_(2)` as shown. If these tentions in the are to be determined in terms of `W` using a tringle of force, which of these trianles should you draw? (block is in equilibrium)

A weight W is supported by two strings inclined at 60^(@) and 30^(@) to the vertical. The tensions in the strings are T_(1) and T_(2) as shown. If these tensions in the strings are to be determined in terms of W using a triangle of force, which of these triangles should you draw? (block is in equilibrium)

A block of weight W is supported by three strings as shown in figure. Which of the following relations is true for tension in the string ? (Here, T_(1), T_(2) and T_(3) are the tension in the strings A,B and C respectively)

A block of weight W is supported by three strings as shown in figure. Which of the following relations is true for tension in the string ? (Here, T_(1), T_(2) and T_(3) are the tension in the strings A,B and C respectively)

A block of mass 10 kg is suspended with two strings as shown in the fig. Find the tensions T_(1) and T_(2) in the two string.

In the figure the masses of the blocks A and B are same and each equal to m. The tensions in the strings OA and AB are T_(2) and T_(1) respectively. The system is in equilibrium with a constant horizontal force mg on B. The tension T_(1) is :-

A non-uniform rod AB of weight w is supported horizontally in a vertical plane by two light strings PA and QB as shown in the figure.G is the centre of gravity of the rod. If PA and QB make angles 30^(@) and 60^(@) respectively with the vertical, the ratio ("AG")/("GB") is

ltbrltgt A string of mass m (can be non uniform as well) is suspended through two points which are not in same horizontal level. Tension in the string at the end points are T_(1) and T_(2) and at the lowest point is T_(3) . Mass of string in terms of T_(1),T_(2) and T_(3) can be represented a (uniform gravity 'g' exists downwards)

ltbrltgt A string of mass m (can be non uniform as well) is suspended through two points which are not in same horizontal level. Tension in the string at the end points are T_(1) and T_(2) and at the lowest point is T_(3) . Mass of string in terms of T_(1),T_(2) and T_(3) can be represented a (uniform gravity 'g' exists downwards)