If the position vectors of the point A and B are `3hat(i)+hat(j)+2hat(k) and hat(i)-2hat(j)-4hat(k)` respectively. Then the equation of the plane through B and perpendicular to AB is

If the position vector of the vertices of a triangle are hat(i)-hat(j)+2hat(k), 2hat(i)+hat(j)+hat(k) & 3hat(i)-hat(j)+2hat(k) , then find the area of the triangle.

The position vectors of the points A and B are respectively hat i - hat j + 3 hat k and 3 hat i + 3 hat j + 3 hat k . The equation of the plane bar r. (5 hat i + 2 hat j - 7 hat k ) + 9 =0 Then points A and B.

Find the equaiton of the sphere described on the joint of points A and B having position vectors 2hat(i)+6hat(j)-7hat(k) and -2hat(i)+4hat(j)-3hat(k) , respectively, as the diameter. Find the centre and the radius of the sphere.

A vector equally inclined to the vectors hat(i)-hat(j)+hat(k) and hat(i)+hat(j)-hat(k) then the plane containing them is

Find a unit vector perpendicular to both the vectors (2hat(i)+3hat(j)+hat(k)) and (hat(i)-hat(j)-2hat(k)) .

A line passes through the point with position vector 2hat(i)-3hat(j)+4hat(k) and is in the diretion of 3hat(i)+4hat(j)-5hat(k) . Find the equation of the line is vector and cartesian forms.

Find the angle between vec(P) = - 2hat(i) +3 hat(j) +hat(k) and vec(Q) = hat(i) +2hat(j) - 4hat(k)

Forces acting on a particle have magnitude of 14N, 7N and 7N act in the direction of vectors 6hat(i)+2hat(j)+3hat(k),3hat(i)-2hat(j) +6hat(k),2hat(i)-3hat(j)-6hat(k) respectively. The forces remain constant while the particle is displaced from point A: (2,-1,-3) to B: (5,-1,1). Find the work done. The coordinates are specified in meters.

The co-ordinate of the point P on the line r=(hat(i)+hat(j)+hat(k))+lambda(-hat(I)+hat(j)-hat(k)) which is nearest to the origin is

Find the unit vector perpendicular the plane rcdot(2hat(i)+hat(j)+2hat(k))=5 .