Let `vecC=vecA+vecB`

Assertion : The direction of a zero (null) vector is indeteminate. Reason : We can have vecAxx vecB = vecA *vecB with vecA ne vec0 and vecB ne vec0 .

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

If |vecAxxvecB|=vecA*vecB , then angle between vecA and vecB" is "theta = …...

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

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=vecC and A^(2)+B^(2)=C^(2) . Which of the following statements, is correct:-

Two vectors veca and vecb add to give a resultant vecc=veca+vecb . In which of these cases angle between veca and vecb is maximum: (a,b,c represent the magnitudes of respective vectors )

If vectors vecA and vecB are such that |vecA+vecB|= |vecA|= |vecB| then |vecA-vecB| may be equated to

If vectors vecA and vecB are such that |vecA+vecB|= |vecA|= |vecB| then |vecA-vecB| may be equated to

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