If `vecP + vecQ = vecR` and `vecP - vecQ = vecS` , then `R^(2) + S^(2)` is equal to

If vec(P) + vec(Q) = vec(R ) and vec(P) - vec(Q) = vec(S) , then R^(2) + S^(2) is equal to

Three vectors vec(P), vec(Q), vec(R) obey vec(P) + vec(Q) = vec(R) and P^(2) + Q^(2) = R^(2) the angle between vec(P) & vec(Q) is

vecP, vecQ, vecR, vecS are vector of equal magnitude. If vecP + vecQ - vecR=0 angle between vecP and vecQ is theta_(1) . If vecP + vecQ - vecS =0 angle between vecP and vecS is theta_(2) . The ratio of theta_(1) to theta_(2) is

Let vec(a)= vec(i) + vec(j), vec(b)= 2vec(j)-vec(k) . If vec(r ) xx vec(a) = vec(b) xx vec(a), vec(r ) xx vec(b) = vec(a) xx vec(b) , then (vec(r ))/(|vec(r )|) =

The resultant of two vectors vecP and vecQ is vecR . If the magnitude of vecQ is doubled, the new resultant becomes perpendicular to vecP , then the magnitude of vecR is