The distance of the point of intersection of the line `(x-2)/3= (y+1)/4= (z-2)/12`
and the plane `x-y+z=5` from the point `(-1,-5,-10)` is

Find the angle between the line (x-2)/3=(y+1)/-1=(z-3)/-2 and the plane 3 x+4 y+z+5=0

Find the distance of the point (- 2,3) from the line x - y = 5.

The point of intersection of the straight line (x-2)/(2) = (y-1)/(-3) = (z+2)/(1) with the plane x+3y - z + 1=0 is a) (3,-1,1) b) (-5,1,-1) c) (2,0,3) d) (4,-2,-1)

The angle between the line (x-3)/2=(y-1)/1=(z+4)/(-2) and the plane, x+y+z+5=0 is :

Find the distance of the point (-1,1) from the line 12(x + 6) = 5 (y - 2)

(a)Distance of the point (x,y,z) from the XY plane is

The point at which the line (x-2)/(1)=(y-4)/(-5)=(z+3)/(4) intersects the xy-plane is

The equation of the plane passing through the intersection of the planes x+2y-z = 3 and x + y - 3z = 5 and passing through the point (1,-1,0) is