In vector diagram shown in figure where `(vecR)` is the resultant of vectors `(vecA)` and `(vecB)`. If `R=(B)/sqrt(2)`, the value of angle `theta` is :

In vector diagram shown in figure where (vecR) is the resultant of vectors (vecA) and (vecB) . If R= (B)/(sqrt2) , then value of angle theta is :

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

Find the resultant of the three vector OvecA,OvecB and OvecC of magnitude r as shown in figure.

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

The ratio of maximum and minimum magnitude of the resultant of two vectors vecA and vecB is 3:2. The relation between A and B is

The angle between the unit vectors bar(a) and bar(b) is theta . If bar(a)-sqrt(2)bar(b) is a unit vector then theta = …………

Keeping one vector constant, if direction of other to be added in the first vector is changed continuously, tip of the resultant vector describes a circles, In the following figure vector vec(a) is kept constant. When vector vec(b) addede to vec(a) changes its direction, the tip of the resultant vector vec(r)=vec(a)+vec(b) describes circles of radius b with its centre at the tip of vector vec(a) . Maximum angle between vector vec(a) and the resultant vec(r)=vec(a)+vec(b) is

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

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

If theta is the angle between any two vectors vecaandvecb , then |veca*vecb|=|vecaxxvecb| when theta is equal to