Number of equilateral triangle with `y=sqrt3(x-1)+2;y=-sqrt3 x` as two of its sides is

Number of equilateral triangle with y=sqrt3(x-1)+2;y=- sqrt3x as two of its sides 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 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 a. 1 b. 2 c. 3 4. 4

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 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 triangle (s) is

The equation of an altitude of an equilateral triangle is sqrt3x+y=2sqrt3 and one of its vertices is (3,sqrt3) then Which of the following can be the possible orthocentre of the triangle

The equation of an altitude of an equilateral triangle is sqrt3x+y=2sqrt3 and one of its vertices is (3,sqrt3) then Which of the following can not be the vertex of the triangle