Two vectors `vecA` and `vecB` lie in a plane, another vector `vecC` lies outside this plane, then the resultant of these three vectors i.e. `vecA+vecB+vecC`

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

If non-zero vectors veca and vecb are equally inclined to coplanar vector vecc , then vecc can be

Two vectors vecA" and "vecB have equal magnitudes. If magnitude of vecA+vecB is equal to n times the magnitude of vecA-vecB , then the angle between vecA" and "vecB is :-

A vector vecA points vertically upward and vecB points towards north. The vector produce vecAxxvecB is

The magnitude of the vector product of two vectors vecA and vecB may not be:

The resultant of the vectors A and B is perpendicular to the vector A and its magnitude is equal to half the magnitude of vector B. The angle between vecA" and "vecB is :-

The angle between the vectors vecA and vecB is theta. The value of vecA(vecAxx vec B) is -

Three vectors vecA,vecB and vecC are such that vecA=vecB+vecC and their magnitudes are in ratio 5:4:3 respectively. Find angle between vector vecA and vecC

If vector (veca+ 2vecb) is perpendicular to vector (5veca-4vecb) , then find the angle between veca and vecb .