The angle between (vecA + vecB) and `(vecA xx vecB)` is given by—

The angle between vecA - vecB and vecA xx vecB is ( vecA ne vecB)

What is the angle between (vecA+vecB) and (vecAxxvecB) ?

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

Let veca = 2hati + hatj - 2hatk, and vecb = hati+ hatj if c is a vector such that veca .vecc = |vecc|, |vecc -veca| = 2sqrt2 and the angle between veca xx vecb and vecc is 30^(@) , then |(veca xx vecb)|xx vecc| is equal to

What is the angle between vector vecA and the resultant of (vecA+vecB) and (vecA-vecB) ?

Statement I: The angle between the vectors vecA=hati +hatj and vecB=hatj+hatk is (pi)/3 . Statement II: The angle between vector vecA and vecB is theta =cos ^(-1) ((vecA*vecB)/(AB)) .

If veca and vecb are unit vectors, then angle between veca and vecb for sqrt3 ​ veca − vec b to be unit vector is

If the angle between unit vectors veca and vecb is 120^(@) . Then find the value of |veca +vecb| .

If theta is the angle between the unit vectors veca and vecb , then prove that cos((theta)/2)=1/2|veca+vecb|