In triangle ABC, medians AD and CE are drawn `AD = 5, angle DAC = pi//8, and angle ACE = pi//4`, then the area of the triangle ABC is equal to

In a triangle ABC, medians AD and CE are drawn. If AD=5, angle DAC=pi/8 and angle ACE=pi/4 then the area of the triangle ABC is equal to (5a)/b, then a+b is equal to

In triangle ABC medians AD and CE are drawn, if AD=5, angleDAC= pi/8 and angleACE=pi/4 , then the area of triangle ABC is equal to a. 25/8 b. 25/3 c. 25/18 d. 10/3

In a triangle ABC, medians AD and BE are deawn. IF AD= 4, angle D AB=(pi)/(6) and angle ABE=(pi)/(3), then the area of the trianlge ABC is-

In a triangle ABC with altitude AD, angleBAC=45^(@), DB=3 and CD=2 . The area of the triangle ABC is :

ABC is a triangle whose medians AD and BE are perpendicular to each other. If AD=p and BE = q then area of triangleABC is

Triangle ABC is inscribed in a circle, such that AC is a diameter of the circle and angle BAC is 45^@ . If the area of triangle ABC is 72 square units, how larger is the area of the circle than the area of triangle ABC ?

If median AD of a triangle ABC makes angle (pi)/(6) with side BC, then the valur of (cot B-cot C)^(2) is equal to

In triangle ABC, AD = DB = DC (see figure). If angle DCB is 60^@ and angle ACD is 20^@ , what is the value of x?

In triangle ABC, AD is perpendicular to side BC and AD^2 = BD xx DC . Show that angle BAC = 90^@ .

In triangle ABC, angle B is right angled, AC=2 and A(2,2), B(1,3) then the length of the median AD is