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 :

Let the equtios of two planes be P_1:2x-y+z=2 and P_2: x+2y-z=3 the equation o fthe plane through the intersection of P_1 nd P_2 and the point (3,2,1) is (A) x-3y+2z+1=0 (B) 3x-y+2z-9=0 (C) 4x-3y+2z-8=0 (D) 2x-3y+z-1=0

Consider the lines L_(1): (x-1)/(2)=(y)/(-1)= (z+3)/(1) , L_(2): (x-4)/(1)= (y+3)/(1)= (z+3)/(2) and the planes P_(1)= 7x+y+2z=3, P_(2): 3x+5y-6z=4 . Let ax+by+cz=d be the equation of the plane passing through the point of intersection of lines L_(1) and L_(2) , and perpendicular to planes P_(1) and P_(2) . Match Column I with Column II.

Consider the lines L_(1):(x-1)/(2)=(y)/(-1)=(z+3)/(1),L_(2):(x-4)/(1)=(y+3)/(1)=(z+3)/(2) and the planes P_(1):7x+y+2z=3," "P_(2):3x+5y-6z=4. Let ax+by+cz=d the equation of the plane passing through the point of intersection of lines L_(1) and L_(2) and perpendicualr to planes P_(1) and P_(2) . Match List I with List II and select the correct answer using the code given below the lists.

Let P_(1):x +y+2z-4=0 and P_(2): 2x-y+3z+5=0 be the planes. Let A(1, 3, 4) and B(3, 2, 7) be two points in space. The equation of a third plane P_(3) through the line of intersection of P_(1) and P_(2) and parallel to AB is

Let P_(1):x+y+2z=3 and P_(2):x-2y+z4 be two planes. Let A(2, 4 5) and B(4, 3, 8) be two points in space. The equation of plane P_(3) through the line of intersection of P_(1) and P_(2) such that the length of the projection upon it of the line segment AB is the least, is

Let the equations of two planes be P_1: 2x-y+z=2 and P_2: x+2y-z=3 Equation of the plane which passes through the point (-1,3,2) and is perpendicular to each of the plane P_1 and P_2 is (A) x-3y-5z+20=0 (B) x+3y+5z-18=0 (C) x-3y-5z=0 (D) x+3y-5z=0

In R^(3) , 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(s) is/are true?