The equation of line `l_(1)` is `y=2x+3`, and the equation of line `l_(2)` is y=2x-5.

The equation of line l_(1) is y=(5)/(2)x-4 , and the equation of line l_(2) is y=-(2)/(5)x+9 .

Given equation of line L_1 is y = 4 Find the equation of L_2 .

Given equation of line L_(1) is y = 4. (iii) Find the equation of L_(2) .

In the given figure, Given equation of line L_(1) is y = 4. Write the slope of line L_(2)" if "L_(2) is the bisector of angle O.

Given equation of line L_(1) is y = 4 and line L2 is the bisector of angle O. Write the coordinates of point P.

Given equation of line L_1 is y = 4 Write the slope of line L_1 if L_2 is the bisector of angle O.

The combined equation of the lines L_(1) and L_(2) is 2x^(2)+6xy+y^(2)=0 and that lines L_(3) and L_(4) is 4x^(2)+18xy+y^(2)=0 . If the angle between L_(1) and L_(4) be alpha , then the angle between L_(2) and L_(3) will be

The Cartesian equation of a line is (x+3)/2=(y-5)/4=(z+6)/2 . Find the vector equation for the line.

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

The Cartesian equation of a line is (x-3)/2=(y+1)/(-2)=(z-3)/5 . Find the vector equation of the line.