Let the cosine of angle between the vectors p and q be `lamda` such that `2p+q=hati+hatj and p+2q=hati-hatj`, then `lamda` is equal to

What is the angle between two vectors vec P =2hati +3hatj +hatk and vec Q =-3hati +6hatk .

The angle between the vectors vec(P)=3hati+hatj+2hatkandvecQ=hati-2hatj+3hatk is

If the position vectors of P and Q are (hati+3hatj-7hatk) and (5hati-2hatj+4hatk) , then |PQ| is

If the position vectors of P and Q are (hati+3hatj-7hatk) and (5hati-2hatj+4hatk) , then |PQ| is

If the position vectors of P and Q are (hati+3hatj-7hatk) and (5hati-2hatj+4hatk) , then |PQ| is

If the position vectors of P and Q are (hati+3hatj-7hatk) and (5hati-2hatj+4hatk) , then |PQ| is

If the position vectors of P and Q are (hati+3hatj-7hatk) and (5hati-2hatj+4hatk) , then |PQ| is

The vectors lamda hati + hatj + 2 hatk, hati + lamda hatj - hatk and 2 hati - hatj + lamda hatk are coplanar if :

Let P,Q,R and S be the points on the plane with position vectors - 2 hati - hatj, 4 hati , 3 hati + 3 hatj and - 3 hati + 2 hatj respectively. The quadrilateral PQRS must be a: