- Hands-On Mathematics for Deep Learning
- Jay Dawani
- 110字
- 2024-10-30 02:24:30
Stirling's formula
For the sake of argument, let's say 
.
We know that the following is true:
However, we now claim the following:
This can be illustrated as follows:
Now, by evaluating the integral, we get the following:
We now divide both sides by 
and take the limit as n→∞. We observe that both sides tend to 1. So, we have the following:
Stirling's formula states that as n→∞, the following is true:
Furthermore, we have the following:
We will avoid looking into the proof for Sterling's formula, but if you're interested in learning more, then I highly recommend looking it up.