- #1
brian44
- 23
- 0
I've tried and searched for a long time, and I haven't been able to prove or find a proof that the following sequence converges (without using another definition of the exponential function):
\forall x \in \mathbb{R}. Prove that:
\lim_{n \rightarrow \infty} (1+ x/n)^n exists.
I can prove that it is monotonic and using binomial theorem I can show that it is bounded for x=1. However if I try to use the same approach for general x, I get the power series for e^x and can only say it is bounded if I can prove the power series converges, which I don't know how to do. But even if I did is there any way to prove this limit exists without proving the power series converges (the other definition of e^x)?
Another related question I can't figure out is, how can I prove that
\lim_{n \rightarrow \infty} (1+ x/n + o(x/n))^n = \lim_{n \rightarrow \infty}(1 + x/n)^n
where o(x/n) is any function that goes to 0 more quickly as (x/n) \rightarrow 0 than (x/n)?
\forall x \in \mathbb{R}. Prove that:
\lim_{n \rightarrow \infty} (1+ x/n)^n exists.
I can prove that it is monotonic and using binomial theorem I can show that it is bounded for x=1. However if I try to use the same approach for general x, I get the power series for e^x and can only say it is bounded if I can prove the power series converges, which I don't know how to do. But even if I did is there any way to prove this limit exists without proving the power series converges (the other definition of e^x)?
Another related question I can't figure out is, how can I prove that
\lim_{n \rightarrow \infty} (1+ x/n + o(x/n))^n = \lim_{n \rightarrow \infty}(1 + x/n)^n
where o(x/n) is any function that goes to 0 more quickly as (x/n) \rightarrow 0 than (x/n)?
