Points (0,0) ,`(3,sqrt(3))` and (x,y) from an equilateral triangle , then what is (x,y) ?

Prove that the points (0, 0), (3, (pi)/(2)) and (3, (pi)/(6)) are the vertices of an equilateral triangle.

The points (3,2),(-3,2),(0, h) are the vertices of an equilateral triangle. If h le 0 then the value of h is

If the pair of lines given by a x^(2)+2 h x y+b y^(2)=0 (h^(2)>a b) forms an equilateral triangle with A x+B y+C=0 then (a+3 b)(3 a+b)=

Show that the following points form an equilateral triangle A(a, 0), B(-a, 0), C(0, a sqrt(3))

One vertex of the equilateral triangle with centroid at the origin and one side as x+y-2=0 is :

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

A st. line through the point (2, 2) intersects the lines sqrt(3)x+y=0 and sqrt(3)x-y=0 at the points A and B. The equation to the line AB so that the triangle OAB is equilateral is :

If |(2a,x_(1),y_(1)),(2b,x_(2),y_(2)),(2c,x_(3),y_(3))| = (abc)/2 != 0 , then the area of the triangle whose vertices are ((x_(1))/a,(y_(1))/a),((x_(2))/b,(y_(2))/b)and ((x_(3))/c,(y_(3))/c)

The three lines represented by y^(3)-4x^(2)y=0 form a triangle which is

Let (x,y) be any point on the parabla y^(2)=4x let P be the point that divides the line segment from (0,0) to (x,y) in the ratio 1:3 then the locus of p is