In triangle `ABC, A = (1,2) B = (5,5)` and angle `ACB = 90` degrees. If area of the triangle is `6.5` square units, the number of possible triangles is?

In a triangle ABC if r_(1) = 36 , r_(2) = 18 and r_(3) = 12 , then the area of the triangle , in square units, is

Let P, Q, R be the mid-points of sides AB, BC, CA respectively of a triangle ABC. If the area of the triangle ABC is 5 square units, then the area of the triangle PQR is

In a triangle ABC, two sides are a = 6, b = 3 and cos(A-B) =(4)/(5) then the area of the triangle is

In triangle A B C , if angle is 90^0 and the area of triangle is 30 sqdot units, then the minimum possible value of the hypotenuse c

In triangle ABC, if angle C is 90° and the area of triangle is 30 sq. units, then the minimum possible value of the hypotenuse c is equal to (in units)

In triangle ABC , A=90^@,B=45^@ and a=5 , then find b?

The area of the triangle whose sides are 6,5,sqrt(13) ( in square units ) is

In the given figure, in a right angle triangle ABC, AB=12cm and AC=15cm. A square is inscribed in the triangle. One of the vertices of square coincides with the vertex of triangle. What is the maximum possible area (in cm^(2) ) of the square ?

Area of the triangle ABC with vertices (1,7),(-1,2) and (3,k) is 10 square units then sum of possible values of

Triangle ABC is inscribed in a circle, such that AC is a diameter of the circle and angle BAC is 45^@ . If the area of triangle ABC is 72 square units, how larger is the area of the circle than the area of triangle ABC ?