Consider a plane `x+y-z=1` and the point `A(1, 2, -3)` A line L has the equation `x=1+3r, y=2-r, z=3+4r`
Q. Equation of the plane containing the line L and the point A has the equation

Find the equation of the plane through the point (1,4,-2) and parallel to the plane -2x+y-3z=7 .

Consider the lines x=y=z and line 2x+y+z-1=0=3x+y+2z-2 , then

Let the line L having equation (x-1)/(2)=(y-3)/(5)=(z-1)/(3) intersects the plane P, having equation x-y+z=5 at the point A. Statement-I Equation of the line L' thorugh the point A, lying in the plane P and having minimum inclination with line L is 8x+y-7z-4=0=x-y+z-5 Statement-II Line L' must be projection of the line L in the plane P.

The equation of plane containing the line x/2 = y/3 = z/4 and perpendicular the plane which is containing the lines x/3 = y/4 = z/2 and x/4 = y/2 = z/3 is.....

Two line whose are (x-3)/(2)=(y-2)/(3)=(z-1)/(lambda) and (x-2)/(3)=(y-3)/(2)=(z-2)/(3) lie in the same plane, then, Q. Angle between the plane containing both the lines and the plane 4x+y+2z=0 is equal to

Find the equation of the image of the plane x-2y+2z-3=0 in plane x+y+z-1=0.

The length of projection of the line segmet joining the points (1, 0, -1) and (-1, 2, 2) on the plane x+3y-5z=6 is equal to

Consider the line L_(1) : (x-1)/(2)=(y)/(-1)=(z+3)/(1), L_(2) : (x-4)/(1)=(y+3)/(1)=(z+3)/(2) and the plans 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 perpendicular to plane P_(1) and P_(2) .then find a,b,c&d

The equation of the plane through the intersection of the planes x+y+z=1 and 2x+3y-z+4 = 0 and parallel to x-axis is

Find the point of intersection of the line (x-1)/(2)=(2-y)/(3)=(z+3)/(4) and the plane 2x + 4y - z = 1. Also find the angle between them.