Two vectors `vecA` and `vecB` are such that `vecA+vecB=vecA-vecB`. Then

The vector vecA and vecB are such that |vecA+vecB|=|vecA-vecB| . The angle between vectors vecA and vecB is -

The vector vecA and vecB are such that |vecA+vecB|=|vecA-vecB| . The angle between vectors vecA and vecB is -

Two non zero vectors vecA "and" vecB are such that |vecA+vecB|=|vecA - vecB| . Find angle between vecA "and " vecB ?

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 two non-zero vectors vecA and vecB obey the relation vecA+vecB=vecA-vecB , the angle between them is (a). 120^(@) (b). 90^(@) (c). 60^(@) (d). 0^(@)

Find |veca-vecb| , if two vectors veca and vecb are such that |veca|=2,|vecb|=3 and veca.vecb=4 .

Find |veca-vecb| , if two vectors veca and vecb are such that |veca|=2,|vecb|=3 and veca*vecb=4 .

Find |veca-vecb| , if two vectors veca and vecb are such that |veca|=2,|vecb|=3 and veca.vecb=4 .

Find |veca-vecb| , if two vectors veca and vecb are such that |veca| = 2,|vecb|=3 and veca.vecb = 4 .