Question

Does the sequence defined by `a_1=2`, `a_(n+1)=72/(1+a_n)` converge? What does it converge to?

Answer 1

See below.

Explanation:

If the sequence converges then

`a_(n+1)= a_oo = 72/(1+a_n)=72/(1+a_oo)`

or

`a_oo = 72/(1+a_oo)` and solving for `a_oo` we get at

`a_oo = {-9,8}`

Now analyzing the behavior of the transformation

`f(x)=72/(1+x)` we have

`f'(x) = -72/(1+x)^2` and

`abs(f'(8)) = 8/9 < 1 rArr 8` is a stable sequence limit point
`abs(f'(-9)) = 9/8 > 1 rArr -9` is an unstable sequence limit point.