Four forces of magnitude P, 2P, 3P and 4P act along the four sides of a square ABCD in cyclic order. Use the vector method to find the magnitude of resultant force.

Three forces of magnitudes 2N, 3N and 6N act at corners of a cube along three sides as shown in figure. Find the resultant of these forces in N.

Four forces are acting on a body as shown in figure. The magnitude of resultant of the forces is

In a cyclic process shown on the P -V diargam the magnitude of the work done is :

Two horizontal forces of magnitudes of 10N and P N act on a particle. The force of magnitude 10N acts due west and the force of magnitude P N acts on a bearing of 30^(@) east of north as shown in (figure) The resultant of these two force acts due north. Find the magnitude of the resultant.

The greatest & the least magnitude of the resultant of two forces of constant magnitudes are P & Q respectively. If the forces act at an angle 2 alpha , then prove that the magnitude of their resultant is given by sqrt(P^(2) cos^(2) alpha+Q^(2) sin^(2) alpha) .

Two forces each of magnitude 2N, act at an angle of 60^(@) . The magnitude of the resultant force

In the cyclic process shown on V-P diagram, the magnitude of the work done is

Two perpendicular forces of magnitudes 10 N and 5 N act at a point. Find their resultant.

Two forces of magnitudes 3N and 4 N act together on an object making an angle 60^(@) with each other. Find the resultant force acting on the object.

In the cyclic process shown in the V-P diagram the magnitude of the work is done is