Let H be the orthocentre of triangle ABC. Then angle subtended by side BC at the centre of incircle of `Delta CHB` is

If H is the orthocentre of triangle ABC, R = circumradius and P = AH + BH + CH , then

In a triangle ABC,vertex angles A,B,C and side BC are given .The area of triangle ABC is

Let O be the circumcentre and H be the orthocentre of an acute angled triangle ABC. If A gt B gt C , then show that Ar (Delta BOH) = Ar (Delta AOH) + Ar (Delta COH)

If the bisector of angle A of the triangle ABC makes an angle theta with BC , then sintheta=

In the following figure, ABC is a right angled triangle at A. Find the area of the shaded region If AB = 6 cm, BC = 10 cm and L is the center of incircle of Delta ABC

Let G be the centroid of triangle ABC and the circumcircle of triangle AGC touches the side AB at A If BC = 6, AC = 8 , then the length of side AB is equal to

If the median AD of triangle ABC makes an angle pi/4 with the side BC, then find the value of |cotB-cotC|dot

If a DeltaABC is right angled at B, then the diameter of the incircle of the triangle is

In triangle ABC, angleBAC = 90^@, AB = 6 cm and BC = 10 cm. A circle is drawn inside the triangle which touches all the sides of the triangle (i.e., an incircle of DeltaABC is drawn).Find the area of the triangle excluding the circle.

State true or false. (a) The altitude of an acute-angled triangle lies outside the triangle. (b) the orthocentre of an obtuse-angled triangle lies outside the triangle. (c) the orthocentre is the point of concurrency of three medians of a triangle. (d) The vertex containing the right angle is also the orthocentre of a right-angled triangle.