The three lines whose combined equation is y3 – 4x2y = 0 form a triangle which is
None of these
y3 – 4x2y = 0
Clearly, these are concurrent lines passing through (0, 0).
Hence, the lines given by the equation y3 – 4x2y = 0 do not form a triangle.
If one of the lines of is a bisector of angle between the lines xy = 0, then m is
If one of the lines of the pair bisects the angle between positive direction of the axes, then a, b and h satisfy the relation.
If the equation represents two lines inclined at an angle π, then λ =
If the equation represents two parallel straight lines, then
The gradient of one of the lines given by is twice that of the other, then
The equation x3 + y3 = 0 represents
One bisector of the angle between the lines given by
. The equation of the other bisector is
The equation represents two mutually perpendicular lines if
The product of the perpendiculars drawn from the point (1, 2) to be the pair of lines x2 + 4xy + y2 = 0 is
The angle between the pair of lines whose equation is