The dr's of two lines are given by `a+b+c=0,2ab +2ac-bc=0`. Then the angle between the lines is

Consider the equation of a pair of straight lines as x^2-3xy+lambday^2+3x-5y+2=0 The angle between the lines is theta then the value of cos 2 theta is

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

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

If one of the lines of my^(2)+(1-m^(2))xy-mx^(2)=0 is a bisector of the angle between the lines xy=0 , then m is

Show that the equation of the pair of lines bisecting the angles between the pair of bisectors of the angles between the pair of lines a x^2+2h x y+b y^2=0 is (a-b)(x^2-y^2)+4h x y=0.

Two lines are given by (x-2y)^2 + k (x-2y) = 0 . The value of k, so that the distance between them is 3, is :

if one of the lines the pair ax^2+2hxy+by^2=0 bisects the angle between positive directions of the axes , then a, b, h, satisfy the relation

Find the condition that one of the lines given by ax^2+2hxy+by^2=0 may coincide with one of the lines given by a' x^2 +2h'xy+b'y^2=0

The direction cosines of two lines are 1, -2,-2 and 0, 2, 1. Find the direction cosines of the line which is perpendicular to both the lines,

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')