The joint equation of 2 sltitudes of an equailateral triangle is `x^(2)-3y^(2)-4x+6sqrt(3)y-5=0`. The third altitude has equation

The joint equation of two altitudes of an equilateral triangle is (sqrt(3)x-y+8-4sqrt(3))(-sqrt(3)x-y+12+4sqrt(3))=0 The third altitude has the equation

The joint equation of two altitudes of an equilateral triangle is (sqrt(3)x-y+8-4sqrt(3)) (-sqrt(3)x-y+12 +4sqrt(3)) = 0 The third altitude has the equation

The joint equation of two altitudes of an equilateral triangle is (sqrt(3)x-y+8-4sqrt(3)) (-sqrt(3)x-y+12 +4sqrt(3)) = 0 The third altitude has the equation

The joint equation of two altitudes of an equilateral triangle is (sqrt(3)x-y+8-4sqrt(3)) (-sqrt(3)x-y+12 +4sqrt(3)) = 0 . Find the third altitude equation.

The equation of one side of an equilateral triangle is x-y=0\ and one vertex is (2+sqrt(3),\ 5) . Prove that a second side is y+(2-sqrt(3))x=6 and find the equation of the third side.

The equation of one side of an equilateral triangle is x-y=0\ and one vertex is (2+sqrt(3),\ 5) . Prove that a second side is y+(2-sqrt(3))x=6 and find the equation of the third side.

The equation of an altitude of an equilateral triangle is sqrt(3)x+y=2sqrt(3) and one of its vertices is (3,sqrt(3)) then the possible number of triangles is

The joint equation of the line 2x+y=0 and 3x-5y=0 is