If ` |vecP + vecQ| = |vecP -vecQ|` the angle between ` vecP and vecQ` is

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

if vecP +vecQ = vecP -vecQ , then

If |vecP + vecQ|= | vecP| -|vecQ| , the angle between the vectors vecP and vecQ is

if |vecP + vecQ| = |vecP| + |vecQ| , the angle between the vectors 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 :

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

Consider a parallelogram constructed on the vectors vecA=5vecp+2vecq and vecB=vecp-3vecq . If |vecp|=2, |vecq|=5 , the angle between vecp and vecq is (pi)/(3) and the length of the smallest diagonal of the parallelogram is k units, then the value of k^(2) is equal to

Two vectors vecP and vecQ are having their magnitudes in the ratio sqrt(3) :1. Further । vecP+vecQ । =। vecP - vecQ। then the angle between the vectors (vecP+ vecQ) and (vecP - vecQ) is

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

Three vectors vecP, vecQ, vecR obey P^(2) + Q^(2) =R^(2) angle between vecP & vecQ . is