[" The bisector of two lines "L_(1)" and "L_(2)" are given by "3x^(2)-8xy-3y^(2)+10x+20y-25=0" .If the line "L" ,passes "],[" through origin,find the equation of line "L_(2)" ."]

The bisector of two lines L and L are given by 3x^(2)-8xy-3y^(2)+10x+20y-25=0. If the line L_(1) passes through origin,find the equation of line L_(2).

The bisector of two lines L and L are given by 3x^2 - 8xy - 3y^2 + 10x + 20y - 25 = 0 . If the line L_1 passes through origin, find the equation of line L_2 .

The equations of bisectors of two lines L_(1)&L_(2) are 2x-16y-5=0 and 64x+8y+35=0. lf the line L_(1) passes through (-11,4), the equation of acute angle bisector of L_(1)o*L_(2) is:

The equations of bisectors of two lines L_1 & L_2 are 2x-16y-5=0 and 64x+ 8y+35=0 . lf the line L_1 passes through (-11, 4) , the equation of acute angle bisector of L_1 & L_2 is:

The equations of bisectors of two lines L_1 & L_2 are 2x-16y-5=0 and 64x+ 8y+35=0 . lf the line L_1 passes through (-11, 4) , the equation of acute angle bisector of L_1 & L_2 is:

The equations of bisectors of two lines L_1 & L_2 are 2x-16y-5=0 and 64x+ 8y+35=0 . lf the line L_1 passes through (-11, 4) , the equation of acute angle bisector of L_1 & L_2 is:

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

If the lines L_(1) and L_(2) are tangents to 4x^(2)-4x-24y+49=0 and are normals for x^(2)-y^(2)=72, then find the slopes of L_(1) and L_(2).