How to solve this question??

Is the answer C??

The **centroid** is located **2/3** of the distance from the vertex along the segment that connects the vertex to the midpoint of the opposite side.

Since, 6 is the height of the triangle the centroid will be 4 from the top.

And it is a fact that when an equilateral triangle is inscribed in a circle, the centroid of the triangle and center of the circle coincide.

Therefore, the radius is 4 and the area is 16pi

1 Like

yeahh

Thanks @devagyas900

1 Like