The bisectors of the angles between the lines `(ax+by)^2=c(bx-ay)^2,c gt0` are respectively parallel and perpendicular to the line

The lines y = mx bisects the angle between the lines ax^(2) +2hxy +by^(2) = 0 if

The angle between the lines ay^2-(1+lambda^2))xy-ax^2=0 is same as the angle between the line:

Find the equation of the bisectors of the angle between the lines represented by 3x^2-5xy+y^2=0

If the coordinate axes are the bisectors of the angles between the pair of lines ax^(2)+2hxy+by^(2)=0 , then

Prove that the bisectors of the between the lines ax^2+acxy+cy^2=0 and (3+1/c)x^2+xy+(3+1/a)y^2=0 are always the same .

The tangent of angle between the lines whose intercepts on the axes are a, -b and b, -a , respectively, is

P_1, P_2 are points on either of the two lines y- sqrt(3) |x| =2 at a distance of 5 units from their point of intersection. Find the coordinates of the foot of perpendiculars drawn from P_1, P_2 on the bisector of the angle between the given lines. Thinking Process : Here, equation y- sqrt(3) |x| =2 represents two different lines for x gt 0 and x lt 0 and they are bisector of Y -axis. P_1 and P_2 are points at a distance 5 unit from point of intersection. The y coordinate of the foot of perpendicular on Y-axis is 2+5 cos ( 30^(@) ) .

Find the equation of the tangent line to the curve y = x^(2) – 2x +7 which is (a) parallel to the line 2x – y + 9 = 0 (b) perpendicular to the line 5y – 15x = 13.

The two lines x=ay+b, z=cy+d and x=a'y+b', z=c'y+d' are perpendicular to each other, if

if one of the lines given by the equation ax^2+2hxy+by^2=0 coincides with one of the lines given by a'x^2+2h'xy+b'y^2=0 and the other lines representted by them be perpendicular , then . (ha'b')/(b'-a')=(h'ab)/(b-a)=1/2sqrt(-a a' b b')