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 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 /_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

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, R (b + c) = a sqrt(bc) , where R is the circumradius of the triangle. Then the triangle is

In triangle ABC, a=5, b=4, c=3. G is the centroid of trianggle. If R_(1) be the circumradius of triangle GAB then the value of (a)/(65) R_(1)^(2) must be

Let the centroid of an equilateral triangle ABC be at the origin. Let one of the sides of equilateral triangle be along the straight line x+y=3. If R and r be the radius of circumcircle and incircle respectively of triangleABC , then (R+r) is equal to :

Let A(0,-1,1),B(0,0,1),C(1,0,1) are the vertices of a Delta ABC. If R and r denotes the circumradius and inradius of Delta ABC, then (r)/(R) has value equal to