The vectors from origin to the points A and B are `vec(a)=2hat(i)-3hat(j)+2hat(k)` and `vec(b)=2hat(i)+3hat(j)+hat(k)` respectively then the area of triangle OAB is

The vector from origion to the point A and B are vec(A)=3hat(i)-6hat(j)+2hat(k) and vec(B)=2hat(i)+hat(j)-2hat(k) ,respectively. Find the area of the triangle OAB.

The vectors from origin to the points A and B are vec(a)=3hat(i)-6hat(j)+2hat(k) and vec(b)= 2hat(i) +hat(j)-2hat(k) respectively. Find the area of : (i) the triangle OAB (ii) the parallelogram formed by vec(OA) and vec(OB) as adjacent sides.

The vectors from origin to the points A and B are vec(a)=3hat(i)-6hat(j)+2hat(k) and vec(b)= 2hat(i) +hat(j)-2hat(k) respectively. Find the area of : (i) the triangle OAB (ii) the parallelogram formed by (OA) and (OB) as adjacent sides.

Vector vec(A)=hat(i)+hat(j)-2hat(k) and vec(B)=3hat(i)+3hat(j)-6hat(k) are :

If vec(A)=2hat(i)+hat(j)+hat(k) and vec(B)=hat(i)+hat(j)+hat(k) are two vectors, then the unit vector is

Find |vec(a)xx vec(b)| , if vec(a)=2hat(i)+hat(j)+3hat(k) and vec(b)=3hat(i)+5hat(j)-2hat(k) .

If vec(a)=3hat(i)-2hat(j)+hat(k), vec(b)=2hat(i)-4 hat(j)-3 hat(k) , find |vec(a)-2 vec(b)| .

Find the scalar and vector products of two vectors vec(a)=(2hat(i)-3hat(j)+4hat(k)) and vec(b)(hat(i)-2hat(j)+3hat(k)) .

If vec(a)=2hat(i)-hat(j)+2hat(k) and vec(b)=6hat(i)+2hat(j)+3hat(k) , find a unit vector parallel to vec(a)+vec(b) .

If vec(a)=4hat(i)+hat(j)-hat(k) , vec(b)=3hat(i)-2hat(j)+2hat(k) , then the value of |vec(a)-vec(b)-vec(c)| is :-