The resultant R of vector P andQ is perpendicular to P and R=P both , then angle betwwen `|P|and|Q| `is

The resultant vec(P) and vec(Q) is perpendicular to vec(P) . What is the angle between vec(P) and vec(Q) ?

If P+Q=R and |P|=|Q|= sqrt(3) and |R| ==3 , then the angle between P and Q is

Two vectors vec(P) " and "vec(Q) are added, the magnitude of resultant is 15 units. If vec(Q) is reversed and added to vec(P) resultant has a magnitude sqrt(113) units. The resultant of vec(P) and a vector perpendicular vec(P) and equal in magnitude to vec(Q) has a magnitude

The resultant of two vectors vec(P) and vec(Q) is vec(R) . If vec(Q) is doubled then the new resultant vector is perpendicular to vec(P) . Then magnitude of vec(R) is :-

Given that P 12, Q = 5 and R = 13 also P+Q=R, then the angle between P and Q will be

Three forces P, Q and R are acting on a particel in the plane, the angle between P and Q and that between Q and R are 150^(@) and 120^(@) respectively. Then for equilibrium, forces P, Q and R are in the ratio

Three forces P, Q and R are acting on a particel in the plane, the angle between P and Q and that between Q and R are 150^(@) and 120^(@) respectively. Then for equilibrium, forces P, Q and R are in the ratio

If vector P, Q and R have magnitude 5,12,and 13 units and vec(P)+vec(Q)=vec(R ) , the angle between Q and R is

The resultant vector of vec(P) and vec(Q) is vec(R ) . On reversing the direction of vec(Q) the resultant vector becomes vec(S) . Show that R^(2)+S^(2)=2(P^(2)+Q^(2))

P Q R S is a parallelogram. P X and QY are respectively, the perpendiculars from P and Q to S R and R S produced. Prove that P X=Q Ydot