I know that exponentiation is O(log n) or worse for most cases, but I'm getting lost trying to understand of how numbers are represented themselves. Take JavaScript, for example, because it has several native number formats:

```
100000 === 1E5 && 100000 === 0303240
>>> true
```

Internally, don't they all end up being stored and manipulated as binary values stored in memory? If so, is the machine able to store the decimal and scientific-notation representations as fast as it does the octal?

And thus, would you expect `+("1E" + n)`

to be faster than `Math.pow(10, n)`

?

Mostly this question is about how 1E(n) works, but in trying to think about the answer myself I became more curious about how the number is parsed and stored in the first place. I would appreciate any explanation you can offer.