If `vecA+ vecB = vecC and A+B+C=0`, then the angle between `vecA and vecB` is :

Given that veca * vecb = 0 and veca xx vecc = 0 Then the angle between vecb and vecc is

If veca +vecb +vecc =vec0, |veca| =3 , |vecb|=5 and |vecc| =7 , then the angle between veca and vecb is

Three vectors vecA , vecB , vecC are shown in the figure angle between (i) vecA and vecB (ii) vecB and vecC ,(iii) vecA and vecC

let veca, vecb and vecc be three unit vectors such that veca xx (vecb xx vecc) =sqrt(3)/2 (vecb + vecc) . If vecb is not parallel to vecc , then the angle between veca and vecb is:

If veca+vecb+vecc=vec0, |veca| = 3, |vecb| = 5, |vecc| = 7 , then angle between veca and vecb is : a. (pi)/(2) b. (pi)/(3) c. (pi)/4 d. (pi)/(6)

A magnitude of vector vecA,vecB and vecC are respectively 12, 5 and 13 units and vecA+vecB=vecC then the angle between vecA and vecB is

The magnitudes of vectors vecA,vecB and vecC are 3,4 and 5 units respectively. If vecA+vecB= vecC , the angle between vecA and vecB is

If veca,vecb,vecc are unit vectors such that veca is perpendicular to vecb and vecc and |veca+vecb+vecc|=1 then the angle between vecb and vecc is (A) pi/2 (B) pi (C) 0 (D) (2pi)/3

Let vecA, vecB and vecC be unit vectors such that vecA.vecB = vecA.vecC=0 and the angle between vecB and vecC " be" pi//3 . Then vecA = +- 2(vecB xx vecC) .

The two vectors vecA and vecB are drawn from a common point and vecC=vecA+vecB . Then, the angle between vecA and vecB is