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 triangle is

The equation to the base of an equilateral triangle is (sqrt(3)+1)x+(sqrt(3)-1)y+2sqrt(3)=0 and opposite vertex is A(1,1) then the Area of the triangle is

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 area of an equilateral triangle with side 2 sqrt3 cm is :

The equation of an altitude of an equilateral triangle is sqrt3x + y = 2sqrt3 and one of its vertices is (3,sqrt3) then the possible number of triangles is a. 1 b. 2 c. 3 4. 4

The equation of an altitude of an equilateral triangle is sqrt3x + y = 2sqrt3 and one of its vertices is (3,sqrt3) then the possible number of triangles is

The equation of an altitude of an equilateral triangle is sqrt3x + y = 2sqrt3 and one of its vertices is (3,sqrt3) then the possible number of triangles is

The equation of an altitude of an equilateral triangle is sqrt3x + y = 2sqrt3 and one of its vertices is (3,sqrt3) then the possible number of triangles is

The equation of the base of an equilateral triangle is x+y-2=0 and the opposite vertex has coordinates (2, -1). Find the area of the triangle.

The equation of the base of an equilateral triangle is x+y-2=0 and the opposite vertex his coordinates (2,-1). Find the area of he triangle.

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