In a triangle ABC , let `angleC=(pi)/2`. If r is the in-radius and R is the circum-radius of the triangle , then 2 (r + R) is equal to

In triangle ABC, let angle C = pi//2 . If r is the inradius and R is circumradius of the triangle, then 2(r + R) is equal to

In a triangle ASBC, let /_C=pi/2. If r is the in radius and R is the circumrdius of the triangle then 2(r+R) is equal to (A) a+b (B) b+c (C) c+a (D) a+b+c

In triangle ABC, let /_c=(pi)/(2) .If r is the inradius and R is circumradius of the triangle, then 2(r+R) is equal to a+b(b)b+cc+a(d)a+b+c

If R be the circum radius and r the in radius of a triangle ABC, show that Rge2r

If R denotes the circum-radius of a Delta ABC , then (b^(2)-c^(2))/(2aR) is equal to

If R is the circum radius of DeltaABC , then A (DeltaABC) = . . .

If R be circum-radius of a Delta, then circum-radius of a pedal Delta is

DeltaABC is a rightangled isoceles triangle. If r is the internal radius and R is external circle radius then R/r is equal to :