The maximum value of magnitude of `(vecA-vecB)` is

Two vectors vec A and vecB have equal magnitudes.If magnitude of (vecA+vecB) is equal to n times of the magnitude of (vecA-vecB) then the angle between vecA and vecB is :-

If hata, hatb are unit vectors and vec c is such that vec c=veca xx vec c +vecb , then the maximum value of [veca vecb vec c] is :

if veca=hati+hatj+2hatk, vecb=hati+2hatj+2hatk and |vecc|=1 Such that [veca xx vecb vecb xx vecc vecc xx veca] has maximum value, then the value of |(veca xx vecb) xx vecc|^(2) is (a) 0 (b) 1 (c) 4/3 (d) none of these

The resultant of two vectors vecA and vecB is perpendicular to the vector vecA and its magnitude is equal to half of the magnitude of the vector vecB . Find out the angles between vecA and vecB . .

If vecA=2hati+4hatj and vecB=6hati+8hatj and A and B are the magnitudes of vecA and vecB , then find the value of A and B

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

Resultant of two vectors vecA and vecB is of magnitude P, If vecB is reversed, then resultant is of magnitude Q. What is the value of P^(2) + Q^(2) ?

Resultant of two vectors vecA and vecB is of magnitude P, If vecB is reversed, then resultant is of magnitude Q. What is the value of P^(2) + Q^(2) ?

Given that veca and vecb are two non zero vectors, then the value of (veca + vecb) xx (veca-vecb) is,

veca, vecb and vecc are unit vecrtors such that |veca + vecb+ 3vecc|=4 Angle between veca and vecb is theta_(1) , between vecb and vecc is theta_(2) and between veca and vecb varies [pi//6, 2pi//3] . Then the maximum value of cos theta_(1)+3cos theta_(2) is