If we start at level 0, and require 2*level xp to get from `level-1`

to `level`

(ie: 2 xp gets you to level 1, 2+4 total gets you to level 2, 2+4+6 total for level 3, etc), then we have an arithmetic sequence, and the sum is equal to `(level/2) * (2 + (2*level))`

Simplifying further:

```
$total_xp_required = $level * (1 + $level);
```

Now, if we use the quadratic formula to solve `level^2 + level + -xp = 0`

for `level`

, we get `level = (-1 ± sqrt(1 - 4*(-xp))) / 2`

.

The positive root will always be the one we want, so of the +/-, we only care about the +. Also, non-integer levels don't make sense, so turn it into an int. The only catch is, floats are kinda flaky -- numbers could come up to like 1.99999999998 or something rather than 2.0. We can add a tiny fudge factor to the number before truncating it.

```
$level = int((sqrt(1 + ($xp*4)) - 1) / 2 + .000000005);
```

Now, if you want to double the xp required each time, it gets even easier. Say level 1 requires 2 xp, level 2 takes 4, level 3 takes 8, etc. Then your total xp required for a given level is `2 ^ level`

.

Powers of 2 being a special case in binary, 2^x can be represented by `1 << x`

.

```
$total_xp_required = 1 << $level;
```

And to calculate the level, there are a number of tricks. Mathematically, the level is the log_{2} of the score.

```
$level = intval(log($xp) / log(2) + .000000005);
```

Or stringwise, we can just count the number of digits in the number's base-2 representation. No fudge factor needed here, since floats never come into the picture.

```
$level = strlen(sprintf("%b", $xp)) - 1;
```

Either way, at this point, since we can calculate level from xp and vice versa, you don't really need to store the level at all -- just calculate it when you need it.