Two forces whose magnitudes are in the ratio `3:5` give a resultant of 28N. If the angle of their inclination is `60^@`, find the magnitude of each force.

Two forces, each of magnitude F have a resultant of the same magnitude F. The angle between the two forces is

Two forces, each of magnitude F have a resultant of the same magnitude F. The angle between the two forces is

Two forces of magnitudes P and Q are inclined at an angle (theta) . The magnitude of their resultant is 3Q. When the inclination is changed to (180^(@)-theta) , the magnitude of the resultant force becomes Q. Find the ratio of the forces.

When two vectors of magnitudes P and Q are inclined at an angle theta , the magnitudes of their resultant is 2P. When the inclination is changed to 180^(@)-theta , the magnitudes of the resultant is halved. Find the ratio of P and Q .

Two forces are such that the sum of their magnitudes is 18 N, the resultant is sqrt(228) when they are at 120^(@) . Then the magnitude of the forces are

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

Two equal forces are acting at a point with an angle 60^(@) between them. If the resultant force is equal to 4sqrt(3)N , the magnitude of each force is

Two forces of magnitude 3N and 4N respectively are acting on a body. Calculate the resultant force if the angle between them is 0^(@)

Find the magnitude of the resultant of shown forces :-

Two equal forces are acting at a point with an angle of 60^(@) between them. If the resultant force is equal to 40sqrt(3)N , The magnitude of each force is :-