Given `vecC= vecAxxvecB `and `vecD = vecBxxvecA` What is the angle between `vecC ` and `vecD ` ?

Given vecC = vecA xx vecB and vecD = vecB xx vecA . What is the angle between vecC and vecD ?

If vecC=vecAxxvecB , then vecC is

If veca, vecb,vecc are unit vectors such that veca.vecb = 0= veca.vecc and the angle between vecb and vecc is pi//3 then the value of |vecaxxvecb -veca xx vecc| is

The angle between (vecAxxvecB) and (vecBxxvecA) is (in radian)

Vectors vecC and vecD have magnitudes of 3 units and 4 units, respectively. What is the angle between the directions of vecC and vecD if vecC.vecD equals (a) zero, (b) 12 units , and (c ) -12 units ?

Vectors vecC and vecD have magnitudes of 3 units and 4 units, respectively. What is the angle between the directions of vecC and vecD if vecC.vecD equals (a) zero, (b) 12 units , and (c ) -12 units ?

Let veca=2hati+hatj-2hatk and vecb=hati+hatj . If vecc is a vector such that veca.vec=|vecc|,|vecc-veca|=2sqrt(2) and the angle between vecaxxvecb and vecc is 30^(@) , then |(vecaxxvecb)xxvecc|= .

Unit vectors veca, vecb, vecc are coplanar. A unit vector vecd is perpendicular to them.If (vecaxxvecb)xx(veccxxvecd)=1/6hati-1/3hatj+1/3hatjk and the angle between veca and vecb is 30^(@) , then vecc is/are

Let the vectors veca, vecb,vecc and vecd be such that (vecaxxvecb)xx(veccxxvecd)=vec0 . Let P_1 and P_2 be planes determined by pairs of vectors veca,vecb and vecc,vecd respectively. Then the angle between P_1 and P_2 is (A) 0 (B) pi/4 (C) pi/3 (D) pi/2