In an equilateral triangle prove that the centroid and the centre of the circumcircle (circumcentre) coincide.

In an equilateral triangle,prove that the centroid and centre of the circum-circle (circum centre) coincide.TO PROVE: The centroid and circum centre are coincident. CONSTRUCTION: Draw medians AD,BE and CF.

In an equilateral triangle, prove that the centroid and centre of the circum-circle (circum centre) coincide) Given : An equilateral triangle A B C in which D , E a n d F are the mid-points of sides B C , C A a n d A B respectively. To Prove: The centroid and circum centre are coincident. Construction : Draw medians A D , B E a n d C F

From the figure,ABC is an equilateral triangle of side 14cm. M is the center of the circumcircle.Find the area of shaded resin.

In an equilateral triangle ABC, G is the centroid. Each side of the triangle is 6 cm. The length of AG is

The controid of an equilateral triangles is (0,0) and the length of the altitude is 6. The equation of the circumcircle of the triangle is

The height of an equilateral triangle is 4sqrt(3) cm . The ratio of the area of its circumcircle to that of its in-circle is