Consider three vectors `p=i+j+k, q=2i+4j-k and r=i+j+3k`. If p, q and r denotes the position vector of three non-collinear points, then the equation of the plane containing these points is

Find the position vector of the mid point of the vector joining the points P(2,3,4) and Q(4,1,-2).

Equations of the line which passe through the point with position vector (2, 1, 0) and perpendicular to the plane containing the vectors i+j and j+k is

A line L_1 passing through a point with position vector p=i+2h+3k and parallel a=i+2j+3k , Another line L_2 passing through a point with direction vector to b=3i+j+2k . Q. The minimum distance of origin from the plane passing through the point with position vector p and perpendicular to the line L_2 , is

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

One plane is parallel to the vectors hat i + hat j + hat k and 2 hat i Other plane is parallel to the vectros hat i + hat j and hat i - hat k . The angle between the line of intersection of both the planes and the vector 2 hat i - hat j is ................

OABC is a tetrahedron. The position vectors of A, B and C are i, i+j and j+k , respectively. O is origin. The height of the tetrahedron (taking ABC as base) is

Consider two points P and Q with position vectors vec(OP)=3veca-2vecb and vec(OQ)=veca+vecb . Find the position vector of a point R which divides the line joining P and Q in the ratio 2:1 , (i) intermally , and (ii) externally.

Consider two points P and Q with position vectors vec(OP)=3hata-2vec(b) and vec(OQ)=vec(a)+vec(b) . Find the position vector of a point R which divides the line joining P and Q in the ratio 2 : 1, (i) internally, and (ii) externally.

Consider two points P and Q with position vectors 2vec(a)+vec(b) and vec(a)-3vec(b) respectively. Find the position vector of a point R which divide the line segment joining P and Q in the ratio. 1 : 2 externally. Prove that P is a midpoint of line segment RQ.