`P_(1) : x + 3y - z = 0 and P_(2) : y + 2z = 0` are two intersecting planes `P_(3)` is a plane passing through the point (2,1,-1) and through the line of intersection of `P_(1) and P_(2)`

Distance of `P_(3)` from origin is _______ units.

P_(1) : x + 3y - z = 0 and P_(2) : y + 2z = 0 are two intersecting planes P_(3) is a plane passing through the point (2,1,-1) and through the line of intersection of P_(1) and P_(2) __________ is a point on P_(3) .

P_(1) : x + 3y - z = 0 and P_(2) , y + 2z = 0 are two intersecting planes P_(3) is a plane passing through the point (2,1,-1) and through the line of intersection of P_(1) and P_(2) Equation of P_(3) is

P_(1) : x + 3y - z = 0 and P_(2) : y + 2z = 0 are two intersecting planes P_(3) is a plane passing through the point (2,1,-1) and through the line of intersection of P_(1) and P_(2) The angle between P_(1) and P_(2) is ________.

P_(1) : x + 3y - z = 0 and P_(2) , y + 2z = 0 are two intersecting planes P_(3) is a plane passing through the point (2,1,-1) and through the line of intersection of P_(1) and P_(2) Equation of plane parallel of P_(3) and passing through (1,2,3) is __________ .

Distance of a point P(-2,1,2) from the line of intersection of x+3y-2z+1=0 and x-2y+z=0 is

Let P_(1) : 2x + y + z + 1 = 0 P_(2) : 2x - y + z + 3 = 0 and P_(3) : 2x + 3y + z + 5 = 0 be three planes, then the distance of the line of intersection of planes P_(1) = 0 and P_(2) = 0 from the plane P_(3) = 0 is

Let P_1:2x+y-z=3 and P_2: x+2y+z=2 be two planes. Then, which of the following statement(s) is (are) TRUE? The line of intersection of P_1 and P_2 has direction ratios 1, 2, -1 (b) The line (3x-4)/9=(1-3y)/9=z/3 is perpendicular to the line of intersection of P_1 and P_2 (c) The acute angle between P_1 and P_2 is 60o (d) If P_3 is the plane passing through the point (4, 2, -2) and perpendicular to the line of intersection of P_1 and P_2 , then the distance of the point (2, 1, 1) from the plane P_3 is 2/(sqrt(3))

Let P_(1):x-2y+3z=5 and P_(2):2x-3y+z+4=0 be two planes. The equation of the plane perpendicular to the line of intersection to the line of intersection of P_(1)=0 and P_(2)= and passing through (1,1,1) is

Let a plane p passes through the point (3,7,-7) and contain the line , (x-2)/-3=(y-3)/2=(z+2)/1 , or distance of the plane p from the origin is d then d^2 is