The position vectors of points of intersection of three planes `rcdotn_1=q_1, rcdotn_2=q_2, rcdotn_3=q_3,` where `n_1, n_2 and n_3` are non coplanar vectors, is

The equation of the plane which passes through the line of intersection of the planes rcdotn_1=q_1, rcdotn_2=q_2 and is parallel to the line of intersection of the planes rcdotn_3=q_3, rcdotn_4=q_4 is

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

The position vectors of the points P and Q are (3,1,2) and (1,-2,-4) repectively. The equation of the plane passing through the point Q and perpendicular to bar PQ is...............

If the three planes rcdotn_1=p_1, rcdotn_2=p_2 and rcdotn_3=p_3 have a common line of intersection, then p_1(n_2timesn_3)+p_2(n_3timesn_1)+p_3(n_1timesn_2) is equal to

Statement 1: Let vec a , vec b , vec ca n d vec d be the position vectors of four points A ,B ,Ca n dD and 3 vec a-2 vec b+5 vec c-6 vec d=0. Then points A ,B ,C ,a n dD are coplanar. Statement 2: Three non-zero, linearly dependent coinitial vector ( vec P Q , vec P Ra n d vec P S) are coplanar. Then vec P Q=lambda vec P R+mu vec P S ,w h e r elambdaa n dmu are scalars.

Show that the vectors a-2b+4c,-2a+3b-6c and -b+2c are coplanar vector, where a,b,c are non-coplanar vectors.

The orthogonal projection A' of the point A with position vector (1, 2, 3) on the plane 3x-y+4z=0 is

Find the position vector of a point R which divides the line joining two points P and Q whose position vectors are (2veca+vecb)and(veca-3vecb) externally in the ratio 1:2 Also , show that P is the mid point of the line segment RQ.