Consider a plane `x+y-z=1` and point `A(1, 2, -3)`. A line L has the equation `x=1 + 3r, y =2 -r and z=3+4r`.
The coordinate of a point B of line L such that AB is parallel to the plane is

Consider a plane x+y-z=1 and point A(1, 2, -3) . A line L has the equation x=1 + 3r, y =2 -r and z=3+4r . the equation of plane containing line Land point A has the equation x − 3 y + 5 = 0 x + 3 y − 7 = 0 3 x − y − 1 = 0 3 x + y − 5 = 0

Find the coordinates of the point where the line through (3,-4,-5) and (2,-3,1) crosses the plane 2x+y+z=7.

Consider the planes 3x-4y+5z=10 and 2x+2y-3z=4 i.Write the equation of the plane through the line of intersection of the above planes. ii. Write the direction ratios of the line x=2y=3z iii. If the line in (ii) is parallel to the plane in (i), show that the plane is x-20y+27z=14.

Find the equation of the plane through the line of intersection of the planes x+y+z=1 and 2x+3y+4z=5 which is perpendicular to the plane x-y+z=0

The equation of the plane passing through (1,2,3) and parallel to 3x-2y+4z=5 is

A line L_(1) with direction ratios -3,2,4 passes through the point A(7,6,2) and a line L_(2) with directions ratios 2,1,3 passes through the point B(5,3,4). A line L_(3) with direction ratios 2,-2,-1 intersects L_(1) and L_(3) at C and D, resectively. The equation of the plane parallel to line L_(1) and containing line L_(2) is equal to

Equation of line passing through A(1,0,3), intersecting the line (x/2=(y-1)/3=(z-2)/1) and parallel to the plane x+y+z=2 is

The line L given by x/5 + y/b = 1 passes through the point (13,32).the line K is parallel to L and has the equation x/c+y/3=1 then the distance between L and K is

In a plane there are two families of lines y=x+r, y=-x+r , where r in {0, 1, 2, 3, 4 } . The number of squares of diagonals of length 2 formed by the lines is: