Let circle `c_1`, be inscribed in a square with side length `1`. As shown in figure smaller circle `c_1` is inscribed in the lower right corner of the square so that `c_1` is tangent to `c_2` and the two sides of the square then the area of the `c_2` is

Let circle 'c_1' be inscribed in a square whith side lenght 1. As shown in figure smallar cicle c_2 is inscribed in the lower right corner of the square so that c_2 is tangent to 'c_1' and the two sides of the square then the area of the 'c_2' is

8. Let S, be a square of unit area. A circle C_1, is inscribed in S_1, a square S_2, is inscribed in C_1 and so on. In general, a circle C_n is inscribed in the square S_n, and then a square S_(n+1 is inscribed in the circle C_n. Let a_n denote the sum of the areas of the circle C_1,C_2,C_3,.....,C_n then lim_(n->oo) a_n must be

If a circle is inscribed in a square of side 10, so that the circle touches the four sides of the square internally then radius of the circle is

If a circle is inscribed in a square of side 10, so that the circle touches the four sides of the square internally then radius of the circle is

If a circle is inscribed in a square of side 10, so that the circle touches the four sides of the square internally then radius of the circle is

A circle is inscribed in a square. If the side of the square be 10 cm, then the diameter of the circle is

(c) 103 (d) 10 18. A circle is inscribed in an equilateral triangle with side lengths 6 unit. Another circle is drawn inside the triangle (but outside the first circle), tangent to the first circle and two of the sides of the triangle. The radius of the smaller circle is (b) 2/3 (a) 1/ root3 (c) 2 (d) 1

A circle is inscribed in an equilateral triangle of side length a. The area of any square inscribed in the circle is

What is the area of a circle inscribed in a square of side 'a' units?

(c) 103 (d) 10 18.A circle is inscribed in an equilateral triangle with side lengths 6 unit. Another circle is drawn inside the triangle (but outside the first circle),tangent to the first circle and two of the sides of the triangle.The radius of the smaller circle is (b) 2/3 (a) 1/3 (c) 2 (d) 1