If the vectors `vec(AB) = 3 hati + 4 hatk and A vecC = 5 hati - 2 hatj + 4 hatk` are the side of the triangle ABC, then the length of the median through A is :

The vectro vec(AB)= 3 hatj + 4 hatk and vec(AC) = 5 hati - 2 hatj + 4 hatk are the sides of a triangle ABC. The length of the medium through A is :

If hati+ hatj - hatk and 2hati - 3 hatj + hatk are adjacent sides of a parallelogram , then the lengths of its diagonals are

The vectors 2 hati - ahtj + hatk, hati -3 hatj - 5 hatj and sqrt3 hati - 4 hatj - 4 hatk are the sides of a triange, which is :

The two vectors hati+hatj+hatk and hati+3hatj+5hatk represent the two slides vec(AB) and vec(AC) respectively of a DeltaABC . The length of the median through A is

The projection of vector hati - 2 hatj + hatk on the vector 4 hati - 4 hatj + 7 hatk is :

Find the unit vector vecA=-3hati+4hatj+5hatk