Let `veca, vecb` and `vecc` be three vectors having magnitudes 1,1 and 2 resectively. If `vecaxx(vecaxxvecc)+vecb=vec0` then the acute angel between `veca` and `vecc` is

Let veca, vecb and vecc be three having magnitude 1,1 and 2 respectively such that vecaxx(vecaxxvecc)+vecb=vec0 , then the acute angle between veca and vecc is

If veca, vecb, vecc be three vectors of magnitude sqrt(3),1,2 such that vecaxx(vecaxxvecc)+3vecb=vec0 if theta angle between veca and vecc then cos^(2)theta is equal to

Let veca, vecb and vecc be the three vectors having magnitudes, 1,5 and 3, respectively, such that the angle between veca and vecb "is" theta and veca xx (veca xxvecb)=vecc . Then tan theta is equal to

If vecA xx vecB= vec0 and vecB xx vecC=vec0 , then the angle between vecA and vecC may be :

If veca, vecb, vecc are mutually perpendicular vectors having magnitude 1,2,3 respectively, then [vec(a)+vecb+vecc, vecb-veca, vecc] =

If |vecc|=2 , |veca|=|vecb|=1 and vecaxx(vecaxxvecc)+vecb=vec0 then the acute angle between veca and vecc is (A) pi/6 (B) pi/4 (C) pi/3 (D) (2pi)/3

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

Three vectors veca,vecb , vecc with magnitude sqrt2,1,2 respectively follows the relation veca=vecbxx(vecbxxvecc) the acute angle between the vectors vecb and vecc is theta . then find the value of 1+tantheta is

veca and vecb are two vectors such that |veca|=1 ,|vecb|=4 and veca. Vecb =2 . If vecc = (2vecaxx vecb) - 3vecb then find angle between vecb 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: