The sides of a triangle ABC are as shown in the given figure. Let D be any internal point of this triangle and let e,f and g denote the distance between the point D and the sides of the triangle. The sum `(5e +12f +13g)` is equal to

A point P is an arbitrary interior point of an equilateral triangle of side 4. If x, y, z are the distances of 'P' from sides of the triangle then the value of (x+y+z)^(2) is equal to -

Three vectors vecP,vecQ " and " vecR are shown in the figure. Let S be any point on the vector vecR . The distance between the points P and S is b|vecR| . The general relation among vectors vecP,vecQ " and " vecS is:

Let P be an interior point of a triangle ABC , Let Q and R be the reflections of P in AB and AC , respectively if Q .A , R are collinear then angle A equals -

The line segment joining the mid-points of any two sides of a triangle in parallel to the third side and equal to half of it.

The area of an equilateral triangle ABC is 17320.5 cm^(2) . With each vertex of the triangle as centre, a circle is drawn with radius to half the length of the side of the triangle (see the given figure). Find the area of the shaded region. (Use pi = 3.14 and sqrt(3) = 1.73205 )

D is a point on side BC of triangle ABC such that AD = AC (see the given figure). Show that AB gt AD.

let ABC be a right angled triangle at C. If the inscribed circle touches the side AB at D and (AD) (BD)=11, then find the area of triangle ABC. .

The two shorter sides of right angles triangle are 5 cm and 12 cm. Let theta denote the angle opposite to the 5 cm side. Find sintheta, costheta and tantheta .

If D, E and F be the middle points of the sides BC,CA and AB of the DeltaABC , then AD+BE+CF is

Sides of triangles are given below, Determine which of them are right triangles. In case of a right triangle, write the length of its hypotenuse : 13 cm, 12 cm, 5 cm