If in triangles ABC and EDF, `(AB)/(DE)=(BC)/(FD)` then they will be similar, when

If in a triangle ABC, (bc)/(2 cos A) = b^(2) + c^(2) - 2bc cos A then prove that the triangle must be isosceless

In an acute angle triangle ABC, AD, BE and CF are the altitudes, then (EF)/a+(FD)/b+(DE)/c is equal to -

In Delta ABC, DE ||BC and (AD)/(DB) = (3)/(5) . AC = 5.6 Find AE.

In the figure , DE || BC and (AD)/(DB) = 3/5 , calculate the value of (i) ("area of " Delta ADE)/("area of " Delta ABC) (ii) ("area of trapezium BCED")/("area of " Delta ABC)

In Delta ABC , right angle is at B,AB = 5cm and angle ACB =30^(@) Determine the lengths of the sides BC and AC.

In triangle ABC, if a = 2 and bc = 9, then prove that R = 9//2Delta

In triangle, ABC the points D,E,F are the midpoints of the sides , BC CA, and AB respectively. Using vector method, show that the area of Delta DEF is equal to (1)/(4) ("area of" Delta ABC) .

Let G be the centroid of triangle ABC and the circumcircle of triangle AGC touches the side AB at A If AC = 1, then the length of the median of triangle ABC through the vertex A is equal to

From a point O inside a triangle ABC, perpendiculars OD, OE and OF are drawn to the sides BC, CA and AB, respectively. Prove that the perpendiculars from A, B and C to the sides EF, FD and DE are concurrent