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

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

Consider the equation of a pair of straight lines as x^2-3xy+lambday^2+3x-5y+2=0 The point of intersection of line is (alpha, beta) , then the value of alpha^2+beta^2 is

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

Find the angle between the lines whose joint equation is 2x^2-3xy+y^2=0

The angle between the pair of straight lines y^2sin^2 theta-xy sin ^2 theta +x^2(cos ^2theta -1) =0 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.

If the equation of the pair of straight lines passing through the point (1,1) , one making an angle theta with the positive direction of the x-axis and the other making the same angle with the positive direction of the y-axis, is x^2-(a+2)x y+y^2+a(x+y-1)=0,a!=2, then the value of sin2theta is (a) a-2 (b) a+2 (c) 2/(a+2) (d) 2/a

Find the angle between the lines repersented by the equation x^2-2pxy+y^2=0

If the pair of straight lines x^(2)-2pxy-y^(2)=0and x^(2)-2qxy-y^(2)=0 are such that each pair bisects the angle between the other pair , then prove that pq=-1 .

Two of the straight lines given by 3x^3 +3x^2y-3xy^2+dy^3=0 are at right angles , if d equal to