Area of the largest triangle that can be inscribed in a semi-circle of radius r units is

Two circles, C1 and C2, with respective radii of 13 cm and 17 cm and their centres 20 cm apart, intersect each other at two points P and Q. Find the area (in sq.cm) of the biggest triangle that can be drawn in the region where the two circles overlap, such that two of the vertices of the triangle are P and Q.

If a, b, c are the sides of a right triangle where c is the hypotenuse,prove that the radius r of the circle which touches the sides of the triangle is given by2a b cr + −

A semicircle of radius 3 units is drawn on one edge of a right-angled triangle, and a semicircle of radius 4 units is drawn on another edge. The semicircles intersect on the hypotenuse of the triangle, as shown.What is the shaded area, in square units?

An equilateral triangle and a circle M are inscribed in a circle K, as shown in the figure below.What is the ratio of the area of K to the area of M?Reminder: The area of a circle with radius r is proportional to r2.a. 4:1b. 8:1c. 10:1d. 12:1e. 14:1f. 16:1g. 20:1Question subject is Geometry.Your answer was: 16:1You answered this question correctly! (+5 points)23.38% of students answered this question correctly.

A regular 12-sided polygon is inscribed in a circle of a radius r cm. Find the area (in sq.cm) of the region between the circle and the polygon.