The equation(s) of the bisectors(s) of that angles between the lines `x+2y-11=0,3x-6y-5=0` which contains the point (1,-3) is

The equation of the bisector of that angle between the lines x+2y-11=0,3x-6y-5=0 which contains the point (1,-3) is (3x=19 (b) 3y=73x=19 and 3y=7 (d) None of these

The equation of the bisector of the angle between the lines x+2y-2=0,3x-6y-11=0 which contains the point (1,-3) is

The equation of the bisector of that angle between the lines x + y = 3 and 2x - y = 2 which contains the point (1,1) is

The equations of the bisector of the agle between the line 2x + y - 6 =0 and 2x - 4y + 7=0 which contains the point (1,2) is .

The equation of the bisector of the obtuse angle between the lines x-y+2=0 , 7x+y+1=0 is

The equation of the bisector of the obtuse angle between the lines x-2y+4=0 and 4x-3y+2=0 is

The angle between the lines 3x-y+5=0,x+3y-2=0 is

Consider the bisector (L=0) of the angle between the lines x+2y-11 = 0 and 3x – 6y-5= 0 (the region) which contains the point A(1, -3) . Let P(a,1) and Q(b,2) be two points lying on this line (L=0) . Then