Let the angle between two nonzero vector `vecA and vecB` is `120^@` and its resultant be `vecC`.

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

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

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

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

The values of x for which the angle between the vectors veca =xhati - 3hatj-hatk and vecb = 2x hati + x hatj -hatk is acute, and the angle, between the vector vecb and the axis of ordinates is obtuse, are

Find the resultant of the following two vector vecA and vecB . vec(A):40 units due east and , vec(B):25 units 37^(@) north of west

Assertion: The angle between the two vectors (hati+hatj) and (hatj+hatk) is (pi)/(3) radian. Reason: Angle between two vectors vecA and vecB is given by theta=cos^(-1)((vecA.vecB)/(AB))

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

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)

If vecA=2hati-2hatj-hatk and vecB=hati+hatj , then : (a) Find angle between vecA and vecB . (b) Find the projection of resultant vector of vecA and vecB on x-axis. (c) Find a vector which is, if added to vecA , gives a unit vector along y-axis.