Let `veca,vecb` and `vecc` be non-zero vectors such that no two are collinear and
`(vecaxxvecb)xxvecc=1/3|vecb||vecc|veca`
If `theta` is the acute angle between the vectors `vecb` and `vecc` then `sin theta` equals

Let veca, vecb and vecc be non-zero vectors such that no two are collinear and (vecaxxvecb)xxvecc=1/3 |vecb||vecc|veca if theta is the acute angle between vectors vecb and vecc then find value of sin theta .

Let veca,vecb and vecc be the non zero vectors such that (vecaxxvecb)xxvecc=1/3 |vecb||vecc|veca. if theta is the acute angle between the vectors vecb and veca then theta equals (A) 1/3 (B) sqrt(2)/3 (C) 2/3 (D) 2sqrt(2)/3

If veca, vecb, vecc are three non-zero vectors such that veca + vecb + vecc=0 and m = veca.vecb + vecb.vecc + vecc.veca , then:

Let veca,vecb,vecc be three non-zero vectors such that [vecavecbvecc]=|veca||vecb||vecc| then

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:

For non-zero vectors veca, vecb and vecc , |(veca xx vecb) .vecc = |veca||vecb||vecc| holds if and only if

Let veca,vecb, and vecc be three non zero vector such that no two of these are collinear. If the vector veca+2vecb is collinear with vecc and vecb+3vecc is colinear with veca (lamda being some non zero scalar) then veca\+2vecb+6vecc equals (A) lamdaveca (B) lamdavecb (C) lamdavecc (D) 0

Let veca, vecb and vecc are three non - collinear vectors in a plane such that |veca|=2, |vecb|=5 and |vecc|=sqrt(29) . If the angle between veca and vecc is theta_(1) and the angle between vecb and vecc is theta_(1) the angle between vecb and vecc is theta_(2) , where theta_(1), theta_(2) in [(pi)/(2),pi] , then the value of theta_(1)+theta_(2) is equal to

If veca, vecb, vecc are vectors such that |vecb|=|vecc| then {(veca+vecb)xx(veca+vecc)}xx(vecbxxvecc).(vecb+vecc)=