A be the area of a right `triangle` and b be one of the sides containing the right angle, then the length of altitude on the hypotenus

If A be the area of a right triangle and b one of the sides containing the right angle,prove that the length of the altitude on the hypotenuse is (2AB)/(sqrt(b^(4)+4A^(2)))

If A be the area of a right triangle and b one of the sides containing the right angle, prove that the length of the altitude on the hypotenuse is (2A B)/(sqrt(b^4+4A^2))

If A be the area of a right Deltaand b be one of the sides containing the right angle, prove that the length of the altitude on the hypotenuse is (2Ab)/(sqrt(b^(4)+4A^(2)) .

The area of a right angled triangle is 24 cm and one of the sides containing the right angle is 6 cm. The altitude on the hypotenuse is

The area of a right-angled triangle is 20 sq.cm and one of the sides containing the right angle is 4cm. The altitude on the hypotenuse is (41)/(sqrt(34))cm(b)sqrt((41)/(40))cm(c)(29)/(sqrt(20))cm(d)(20)/(sqrt(29))cm

The revolution of a right triangle about one of the sides containing the right angle generates solid called:

The perimeter of a right angled triangle is 60 cm. The ratio of the sides containing the right angle 5:2:3 What is the length of the hypotenuse

The area of a triangle,whose base and the corresponding altitude are 15cm and 7cm, is equal to area of a right triangle whose one of the sides containing the right angle is 10.5cm. Find the other side of this triangle.