In a right - angled isosceles triangle , the ratio of the circumradius and inradius is

In a right angles triangle, prove that r+2R=s.

If the points A(-2, k), B(3,-4) and C(7,10) are the vertices of a right angled isosceles triangle right angled at A, find the value of k and the area of Delta ABC .

In a right angled triangle, the length of the hypotenuse is 15 cm and one of the sides forming right angle is 9 cm. Then, the semiperimeter of the triangle is …………..cm.

If an angle and a side of a right angle triangle is known , then rest of the sides and angles can be found as follows In DeltaABC (figure ), if angleB=90^(@),angleC=theta and BC=x , then AB=x tan theta and AC=x sec theta . Now, consider in isosceles triangle PQR (Figure 2), Where PQ=PR and 20N=sqrt(3) On the basis of the above information answer the question The angle of triangle PQR are

If an angle and a side of a right angle triangle is known , then rest of the sides and angles can be found as follows In DeltaABC (figure ), if angleB=90^(@),angleC=theta and BC=x , then AB=x tan theta and AC=x sec theta . Now, consider in isosceles triangle PQR (Figure 2), Where PQ=PR and 20N=sqrt(3) On the basis of the above information answer the question Length of the side QR is

In a right angle triangle, the sum of hypotenuous and one side is given, Prove that when the angle between them is (pi)/(3) , the area of the triangle is maximum.

Equilateral triangles are drawn on the three sides of a right angled triangle. Show that the area of the triangle on the hypotenuse is equal to the sum of the areas of triangles on the other two sides.

Using vector method prove that in a right angled teriangle, the midpoint of the hypotenuse is equidistance from the vertices of the triangle.

In the given figue vertices of DeltaABC lie on y=f(x)=ax^(2)+bx+c . The DeltaAB is right angled isosceles triangle whose hypotenuse AC=4sqrt(2) units. y=f(x) is given by