for given `x < 10^15`

, quickly and accurately determine the maximum integer `p`

such that `2^p <= x`

Here are some things I've tried:

First I tried this but it's not accurate for large numbers:

```
>>> from math import log
>>> x = 2**3
>>> x
8
>>> p = int(log(x, 2))
>>> 2**p == x
True
>>> x = 2**50
>>> p = int(log(x, 2))
>>> 2**p == x #not accurate for large numbers?
False
```

I could try something like:

```
p = 1
i = 1
while True:
if i * 2 > n:
break
i *= 2
p += 1
not_p = n - p
```

Which would take up to 50 operations if p was 50

I could pre-compute all the powers of 2 up until 2^50, and use binary search to find p. This would take around log(50) operations but seems a bit excessive and ugly?

I found this thread for C based solutions: Compute fast log base 2 ceiling

However It seems a bit ugly and I wasn't exactly sure how to convert it to python.

`x`

always an integer? – DSM Oct 28 '12 at 2:44floorinstead of ceiling? Because p is the max integer such that`2^p <= x`

then`p == floor(log(x,2))`

. – Bob Stein Apr 1 '15 at 16:14