ABC is a right angled triangle in which `angle A = 90^(@)` and AB = AC. Find `angle` B and `angle` C.

A(1,7), B(2,4) and C(k,5) are the vertices of a right triangle . Find k (1) if angle A = 90^(@) (2) if angle B = 90^(@) and (3) if angle C = 90^(@)

In the adjacent figure, ABC is a triangle in which angleB = 50^(@) and angleC = 70^(@) . Sides AB and AC are produced. If ‘z’ is the measure of the angle between the bisectors of the exterior angles so formed, then find 'z'.

In a right angle triangle ABC with right angle at B , in which a= 24 units , b = 25 units and angle BAC =theta , then find sin A tan A ( A lt 90 ^(@))

In the given figure, ABC is a right triangle, right angled at A. AB = 3 cm and AC = 4 cm. Semicircles are drawn on AB, AC and BC as diameters. Find the area of the shaded region.

ABC is an isosceles triangle right angled at C. Prove that AB^(2) = 2AC^(2) .

In a right angle triangle ABC, right angle is at C, BC+CA = 23 cm and BC-CA = 7cm ,then find sin A tan B

Let ABC be a right triangle in which AB = 6 cm, BC = 8 cm and angle B = 90^(@)( . BD is the perpendicular from B on AC. The circle through B,C,D is drawn. Construct the tangents from A to this circle.

In the given figure ABCD is a cyclic quadrilateral in which AC and BD are its diagonals. If angle DBC = 55 ^(@) and angle BAC = 45 ^(@), find angle BCD.

ABC is an isosceles triangle, right angled at C. Prove that AB^(2)= 2AC^(2) .

In the given figure ABC is a right triangle and right angled at B such that /_BCA = 2/_BAC. Show that hypotenuse AC = 2BC.