If `vecP*vecQ=0`, then angle between `vecP and vecQ` is `0^@`.

If vecP.vecQ=PQ then angle between vecP and vecQ is

If vectors vecP, vecQ and vecR have magnitudes 5, 12 and 13 units and vecP + vecQ = vecR , the angle between vecQ and vecR is :

If vecA.vecB=vec0 and vecAxxvecC=vec0 , then the angle between vecB and vecC is

Given that P=Q=R . if vecP+vecQ=vecR then the angle between vecP & vecR is theta_(1) and vecP+vecQ+vecR=0 then the angle between vecP & vecR is theta_(2) . What is the relation between theta_(1) and theta_(2) .

If veca+vecb+vecc=vec0, |veca| = 3, |vecb| = 5, |vecc| = 7 , then angle between veca and vecb is

Given that P=Q=R . If vec(P)+vec(Q)=vec(R) then the angle between vec(P) and vec(R) is theta_(1) . If vec(P)+vec(Q)+vec(R)=vec(0) then the angle between vec(P) and vec(R) is theta_(2) . The relation between theta_(1) and theta_(2) is :-

If vecA xx vecB= vec0 and vecB xx vecC=vec0 , then the angle between vecA and vecC may be :

If vecA+ vecB = vecC and A+B+C=0 , then the angle between vecA and vecB is :

If vec(P).vec(Q) = 0 , then what is the angle between vec(P) and vec(Q) ?

The resultant of vecP and vecQ is perpendicular to vecR . What is the angle between vecP and vecQ