Answer to Question #155549 in Real Analysis for Gaurav Dabas

Question #155549

if a sequence ⟨Sn⟩ is defined by Sn = Sn/1-Sn-1, s>0, s1>0. then show that the sequence converges to the positive root of the equation x²+x-5=0

Expert's answer

* I think the question is wrong. The given sequence is not defined properly.

If "S_n=\\frac {S_n}{1-S_{n-1}}" , then it gives "S_{n-1}=0" , which contradict "S_1>0" .

Also here "s>0" ,which is not defined.

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