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

The vectors vecP and vecQ have equal magnitudes of vecP +vecQ is n times the magnitude of vecP-vecQ , then angle between vecP and vecQ is:

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

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

If vecP xx vecQ=vecQ xx vecP , the angle between vecP and vecQ is theta(0^(@) lt theta lt 360^(@)) . The value of ' theta ' will be __________ ""^(@) .

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

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

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

If vectors vecP, vecQ and vecR have magnitudes 5,12 and 13 units and vecP + vecQ - vecR = 0 , the angle between vecQ and vecR 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