In `Delta ABC`, right angled at A, `cos^(-1)((R )/(r_(2)+r_(3)))` is

In any triangle, the minimum value of r^(3) /(r_(1) r_(2) r_(3)) is equal to

In any triangle ABC, find the least value of (r_(1) r_(2)r_(3))/(r^3)

In DeltaABC, the value of ((r_1+r_2)(r_2+r_3)(r_3+r_1))/(R(s)^(2) is

In Delta ABC, /_A is a right angle and AO is perpendicular to BC. Prove that AO^(2) = BO.CO .

If in a triangle (r)/(r_(1)) = (r_(2))/(r_(3)) , then

In DeltaABC, R, r, r_(1), r_(2), r_(3) denote the circumradius, inradius, the exradii opposite to the vertices A,B, C respectively. Given that r_(1) :r_(2): r_(3) = 1: 2 : 3 The sides of the triangle are in the ratio

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

In a right angle triangle ABC, right angle is at B ,If tan A=sqrt(3) , then find the value of (i) sin A cos C+ cos A sin C " "(ii) cos A cos C -sin A sin C

In a Delta ABC , tan A and tanB are the roots of pq(x^(2)+1) =r^(2)x . Then DeltaABC is

In triangle ABC, if r_(1) = 2r_(2) = 3r_(3) , then b : c is equal to