A line L passeds through the points `(1,1) and (2,0)` and another line L' passes through `((1)/(2), 0)` and perpendicular to L. Then the area of the triangle formed by the lines L, L' and Y-axis is

The area of triangle formed by the lines l_1 and l_2 and the x-axis is:

A line L passes through the points (1, 1) and (0, 2) and another line M which is perpendicular to L passes through the point (0,-12).The area of the triangle formed by these lines with y-axis is- (A) 25/8 (B) 25/16 (C) 25/4 (D) 25/32

In the xy plane,the line L_(1) passes through the point (1,1) and the line L_(2) passes through the point (-1,1). If the difference of the slopes of the lines is 2. Then the locus of the point of intersection of the lines L_(1) and L_(2) is

L_(1) is a line passing through the point A(n,n+1) having slope, n, L_(2) is a line passing through the point B(-n, n^(2)) and is perpendicular to L_(1) , If L_(1) and L_(2) intersect on y-axis, then n is equal to ________ (n gt 0)

A straight line L is perpendicular to the line 5x-y=1. The area of the triangle formed by line L, and the coordinate axes is 5. Find the equation of line L.

Lying in the plane x+y+z=6 is a line L passing through (1, 2, 3) and perpendicular to the line of intersection of planes x+y+z=6 and 2x-y+z=4 , then the equation of L is

The line l_(1) passing through the point (1,1) and the l_(2), passes through the point (-1,1) If the difference of the slope of lines is 2. Find the locus of the point of intersection of the l_(1) and l_(2)