I am currently trying to prove the following relationship $1 + r \leq \left(1 +\frac{r}{m}\right)^m\quad \text{for any }m \geq 1.$
Would you be so kind and provide some hints/solutions to the above?
I am currently trying to prove the following relationship $1 + r \leq \left(1 +\frac{r}{m}\right)^m\quad \text{for any }m \geq 1.$
Would you be so kind and provide some hints/solutions to the above?
You'll probably want to assume at least $r \ge -m$, otherwise it can be false (e.g. try $m=3$ and r < -9).
Let $f(r) = (1+r/m)^m - (1+r)$ for -m \le r < \infty. Then $f(0) = f'(0) = 0$, while $f''(r) = \frac{m-1}{m} (1+r/m)^{m-2} \ge 0$, so $f(r)$ is convex on this interval. Therefore $f(r) \ge 0$ there.
This is not a very nice solution, but for $m$ not an integer:
It is easy to see that $\frac{\log(1+x)}{x}$ times a constant is a decreasing function (simply because $(\log(1+x)≤ x)$ and x grows faster). Hence for $x=\frac{r}{m}$ the function $ m*\log(1+r/m) $ is increasing for increasing $m≥1$. But therefore so is the function $(1+\frac{r}{m})^m$.
If you do not know $\left(a+b\right)^n=\sum_{i=0}^n\binom{n}{i}a^ib^{n-i}$, prove it by induction using $\binom{n}{k}=\binom{n-1}{k}+\binom{n-1}{k-1}$.
Note that $\binom{m}{0}=1$, $\binom{m}{1}=m$ for every $m$, and use it to prove the inequality.