The sides of a triangle ABC are in GP. Ifr is the common ratio then r lies in the interval

The sides of a right angled triangle are in G.P.Find the common ratio.

Sides of triangle ABC, a, b, c are in G.P. If 'r' be the common ratio of this G.P. , then

Sides of triangle ABC, a, b, c are in G.P. If 'r' be the common ratio of this G.P. , then

Suppose the sides of a triangle form a geometric progression with common ratio r. Then r lies in the interval-

The sides of a triangle are in geometric progression with common ratio r lt 1. If the triangle is a right-angled triangle, then r is given by

The sides of a triangle are in geometric progression with common ratio rgt1 . If the triangle is a right angled triangle, then r^(2) is given by ?

If the sides of triangle ABC are in G.P with common ratio r (r<1) , show that r<1/2(sqrt5+1)

Suppose the sides of a triangle from a geometric progression with conmen ratio r. Then r lies in the interval

If the sides of triangle ABC are in G.P.with common ratio r(r<1), show that r<(1)/(2)(sqrt(5)+1)

If three successive terms of G.P from the sides of a triangle then show that common ratio ' r' satisfies the inequality 1/2 (sqrt(5)-1) lt r lt 1/2 (sqrt(5)+1) .