Three successive terms of a G.P. will form the sides of a triangle if the common ratio r satisfies the inequality

Prove that the three successive terms of a GP will form the sides of a triangle if the common ratio satisfies the inequality 1/2(sqrt5-1)lttlt1/2(sqrt5+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) .

If three successive terms of as G.P. with commonratio rgt1 form the sides of a triangle and [r] denotes the integral part of x the [r]+[-r]= (A) 0 (B) 1 (C) -1 (D) none of these

If three successive terms of as G.P. with commonratio rgt1 form the sides of a triangle and [r] denotes the integral part of x the [r]+[-r]= (A) 0 (B) 1 (C) -1 (D) none of these

If three successive terms of as G.P. with commonratio rgt1 form the sides of a triangle and [r] denotes the integral part of x the [r]+[-r]= (A) 0 (B) 1 (C) -1 (D) none of these

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

Write the G.P. If the first term a=3, and the common ratio r= 2.

If the sides of a triangle are in G.P., and its largest angle is twice the smallest, then the common ratio r satisfies the inequality

If the sides of a triangle are in GP and its largest angle is twice tha smallset then the common ratio r satisfies the inequality

If the sides of a triangle are in GP and its largest angle is twice tha smallset then the common ratio r satisfies the inequality