Prove that the line `lx+my+n=0` and the pair of lines `(lx+my)^2-3(mx-ly)^2=0` form an equilateral triangle and its area is `(n^2)/(sqrt(3)(l^2+m^2))`

Show that the lines (x+2a)^2-3y^2=0,x=a form an equilateral triangle.

Show that the lines form an equilateral triangle and find its area (x+2a)^(2)-3y^(2)=0,x-a=0

Show that the lines form an equilateral triangle and find its area x^(2)-4xy+y^(2)=0, x+y-3=0

The area of the equilaterial triangle formed by the pair of lines (ax+by)^(2)-3(bx-ay)^(2)=0 and the line ax+by+c=0 is (c^(2))/(sqrt(3)(a^(2)+b^(2))) sq. units.

Show that the straight lines represented by 3x^2+48xy+23y^2=0,3x-2y+13=0 form an equilateral triangle of area (13)/(sqrt(3)) sq. units

If the pair of lines ax^(2)+2hxy+by^(2)=0 (h^(2) gt ab) orms an equilateral triangle with the line lr + my + n = 0 then (a+3b)(3a+b)=

The area of the triangle formed by pair of line (ax+by)^2-3(bx-ay)^2=0 " and the line " ax+by+c=0 is

Show that following lines forms an equilateral triangle and find its area x^(2)-4xy^(2)=0, x+y-3=0