Consider three planes :
`2x+py+6z=8, x+2y+qz=5 and x+y+3z=4`
Q. Three planes do not have any common point of intersection if :

Consider three planes : 2x+py+6z=8, x+2y+qz=5 and x+y+3z=4 Q. Three planes intersect at a point if :

Prove that the planes 12x-15y+16z-28=0, 6x + 6y -7z- 8= 0 and 2x + 35y-39z + 12 = 0 have a common line of intersection.

Consider three planes P_1 : x-y + z = 1 , P_2 : x + y-z=-1 and P_3 : x-3y + 3z = 2 Let L_1, L_2 and L_3 be the lines of intersection of the planes P_2 and P_3 , P_3 and P_1 and P_1 and P_2 respectively.Statement 1: At least two of the lines L_1, L_2 and L_3 are non-parallel . Statement 2:The three planes do not have a common point

The planes 2x + 5y + 3z = 0, x-y+4z = 2 and7y-5z + 4 = 0

The three planes 4y+6z=5,2x+3y+5z=5 and 6x+5y+9z=10 (a) meet in a point (b) have a line in common (c) form a triangular prism (d) none of these

The three planes 4y+6z=5,2x+3y+5z=5a n d6x+5y+9z=10 a. meet in a point b. have a line in common c. form a triangular prism d. none of these

Find the angle between the planes 2x - y + 3z = 6 and x + y +2z =7 .

Find the angle between the planes 2x - y + 3z = 6 and x + y +2z =7 .

Consider the system of equations {:(2x+lambday+6z=8),(x+2y+muz=5),(x+y+3z=4):} The system of equations has : Exactly one solution if :

For what values of p and q the system of equations 2x+py+6z=8, x+2y+qz=5, x+y+3z=4 has i no solution ii a unique solution iii in finitely many solutions.