`vecA.vecB=|vecAxxvecB|`, then the angle between A and B is

If vecA*vecB=|vecAxxvecB| then the angle between vecA and vecB is

Statement I: If two vectors veca and vecb are such that |veca+vecb|=|veca-vecb| , then the angle between veca and vecb is 90^@ . Statement II: veca+vecb=vecb+veca .

If veca and vecb are two vectors, such that veca.vecbgt0 and |veca.vecb|=|vecaxxvecb| then the angle between the vectors veca and vecb is

veca and vecb are two vectors such that |veca+vecb|= |veca-vecb| then angle between veca and vecb is

vecA,vecB and vecC are unit vectors, vecA*vecB=vecA*vecC=0 , and the angle between vecB and vecC is 30^@ . Prove that, vecA=pm2(vecBxxvecC) .

(vecAxxvecB)= sqrt3 vecA*vecB then find the angle between vecA and vecB .

The vectors vecA and vecB are such that |vecA+vecB|=|vecA-vecB| . The angle between two vectors will be

If |vecaxxvecb|=veca*vecb , then what is the angle between veca and vecb ?