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

The straight lines x+y=0, 3x+y=4 and x+3y=4 form a triangle which is

Show that straight lines (A^2-3B^2)x^2+8A Bx y+(B^2-3A^2)y^2=0 form with the line A x+B y+C=0 an equilateral triangle of area (C^2)/(sqrt(3)(A^2+B^2) .

Show that the four points of intersection of the lines : (2x-y + 1) (x-2y+3) = 0 , with the axes lie on a circle and find its centre.

The equation of the sides of a triangle are x+2y+1=0, 2x+y+2=0 and px+qy+1=0 and area of triangle is Delta .

Area of the triangle formed by the lines y=2x, y=3x and y=5 is equal to (in square units) :

Show that the lines 2x + 3y - 8 = 0 , x - 5y + 9 = 0 and 3x + 4y - 11 = 0 are concurrent.

Show that the straight lines : x-y-1=0, 4x + 3y = 25 and 2x-3y + 1 = 0 are concurrent.

Area of the triangle formed by the lines y^2-9xy+18x^2=0 and y=9 is

Show that the area of the triangle formed by the tangent and the normal at the point (a,a) on the curve y^2 (2a-x)=x^3 and the line x=2a is (5a^2)/4 sq. units.

Adjacent sides of the rectangle are 2x^(2) + 10 xy + 3y ^(2) and x ^(2) - 2 xy + 1, find its area.