If P is a point on the altitude AD of the `Delta ABC` such that `angle CBP=B/3,` then AP is equal to

If the sides of a Delta ABC are in AP and a is the smallest sie, then cos A equals

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

ABC is an isosceles triangle with AB = AC. Draw AP bot BC to show that angle B = angle C

A,B and C are the points respectively the complex numbers z_(1),z_(2) and z_(3) respectivley, on the complex plane and the circumcentre of /_\ABC lies at the origin. If the altitude of the triangle through the vertex. A meets the circumcircle again at P, prove that P represents the complex number (-(z_(2)z_(3))/(z_(1))) .

Find the coordinates of the point P on AD such that AP : PD = 2 : 1.

In the given figure, altitudes AD and CE of DeltaABC intersect each other at the point P. Show that : DeltaPDC ~ DeltaBEC

In the given figure, altitudes AD and CE of DeltaABC intersect each other at the point P. Show that : DeltaAEP ~ DeltaCDP

In the given figure, altitudes AD and CE of DeltaABC intersect each other at the point P. Show that : DeltaABD ~ DeltaCBE

In the given figure, altitudes AD and CE of DeltaABC intersect each other at the point P. Show that : DeltaAEP ~ DeltaADB

AD, BE and CF are altitudes of triangle ABC. If AD = BE = CF, prove that triangle ABC is an equilateral triangle.