The base of an equilateral triangle x + y = 2 = 0 and opposite vertex is (2 , - 1). Find the equations of the remaining sides .

The equation to the base of an equilateral triangle is (sqrt3+1)x+(sqrt3-1)y+2sqrt3=0 and opposite vertex is A(1,1) then the Area of the trangle is

The equation to the base of a equilateral triangle is x+y=2 and one vertex is (2,-1). The length of the side is

The equation of the base of ann equilateral triangle is 3x-4y+15=0 and one vertex is (1,2). The length of the side is

One side of an equilateral triangle is 3x+4y=7 and its vertex is (1,2). Then the length of the side of the triangle is

The equation of the base of an equilateral triangle is 12 x + 5y-65=0. If one of its verices is (2,3) then the length of the side is

Find the height of an equilateral triangle of side x + 2.

Two adjacent sides of a parallelogram are given by 4x+5y=0, 7x+2y=0 and one diagonal is 11x+7y=9 . Find the equations of the remaining sides and the other diagonal.

One vertex of an equilateral triangle is (2,3) and the equation of one side is x-y+5=0. Then the equation to other sides are