Find the angle between two vectors `vecaandvecb` with magnitudes `sqrt(3)and2`, respectively having `veca*vecb=sqrt(6)`.

Find the angle between two vectors vecaandvecb with magnitudes 1 and 2 respectively and when veca*vecb=1 .

Find the angle between two vectors vec(a) and vec(b) with magnitudes 1 and 2 respectively and when vec(a).vec(b)=1 .

The angle between vectors (vecA xx vecB) and (vecB xx vecA) is :

Find the angle of vector veca=6hati+2hatj-3hatk with x -axis.

Show that the area of the triangle contained between the vectors veca and vecb is one half of the magnitude of vecaxxvecb .

Find the magnitude of two vectors vecaandvecb , having the same magnitude and such that the angle between them is 60^(@) and their scalar product is (1)/(2) .

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

Theree coplanar vectors vecA,vecB and vecC have magnitudes 4.3 and 2 respectively. If the angle between any two vectors is 120^(@) then which of the following vector may be equal to (3vecA)/(4)+(vecB)/(3)+(vecC)/(2)

vecA, vecB" and "vecC are three orthogonal vectors with magnitudes 3, 4 and 12 respectively. The value of |vecA-vecB+vecC| will be :-