Let `P_1` be the plane `x-2y+2z=0` and a point `A(1,2,3)` . Let there be another plane `P_2` which is parrallel to `P_1` and at unit distance from A. If `P_2` is `ax+by+cz+d=0` then +ve value of `((b-d)/(c-a))`

The equation of the planes parallel to the plane x - 2y + 2z - 3=0 which are at unit distance from the point (1, 2, 3) is ax +by+cz+d=0 . If (b-d)=K(c-a) , then the positive value of K is _______ .

Consider the plane pi_(1) : 2x - 3y + 4z + 9 = 0 and the point P(1,-2,3). Distance between pi_(1) and P is _______ units.

Let the acute angle bisector of the two planes x - 2y - 2z + 1 = 0 and 2x - 3y - 6 z+ 1= 0 be the plane P. Then which of the following points lies on P ?

Let the acute angle bisector of the two planes x - 2y - 2z + 1 = 0 and 2x - 3y - 6 + 1= 0 be the plane P. Then which of the following points lies on P ?

Let P be the image of the point (3, 1, 7) with respect to the plane x-y+z=3 . The equation of the plane passing through P and parallel to x-2y+3z=7 is

In R', consider the planes P_1, y= 0 and P_2:x + z =1. Let P_3, be a plane, different from P_1, and P_2, which passes through the intersection of P_1, and P_2. If the distance of the point (0, 1, 0) from P_3, is 1 and the distance of a point (alpha,beta,gamma) from P_3 is 2, then which of the following relation is (are) true ?

In R', consider the planes P_1, y= 0 and P_2:x + z =1. Let P_3, be a plane, different from P_1, and P_2, which passes through the intersection of P_1, and _2P If the distance of the point (0, 1, 0) from P_3, is 1 and the distance of a point (alpha,beta,gamma) from P_3 is 2, then which of the following relation is (are) true ?

Let two planes p _(1): 2x -y + z =2 and p _(2) : x + 2y - z=3 are given : equation of the plane through the intersection of p _(1) and p_(2) and the point (3,2,1) is :

If the equation of the locus of a point P such that the distance of P from the origin is twice the distance of P from A(1 2) is 3x^(2) + 3y^(2) -ax - by+c =0 then a+b+c =