## A brief explanation of "normalized" floats

In scientific notation, you write any number as `x.y * 10^z`

, where `x`

is a single non-zero digit. For example `212 = 2.12 * 10^2`

. It's always possible for `x`

to be a single digit, because you can keep dividing by `10`

. Likewise, it's always possible for `x`

to be non-zero, because you can keep multiplying by `10`

**except** when trying to write the value `0`

. `0`

in scientific notation just ends up as `0.0 * 10^0`

.

More about scientific notation

Moving on to floats... Floats are basically scientific notation in binary. They are written in the form `x.y * 2^z`

. `x`

is still a single non-zero digit, but in binary that only leaves one option: `1`

! If you're implementing floating point storage in a computer, you don't want to waste a bit that is *always* `1`

, so you only store `y`

and `z`

(and +/-).

But now how do you store `0`

? It turns out that a special value of `z`

is used to mean "`x`

is actually `0`

." Then you can store `0.0`

. But you can also store `0.0010100011000 * 2^(special z)`

and all sorts of "denormal" values.

I don't understand what toxiclib's normalize function does - I was unable to find the documentation. As far as I was aware, denormal floats have no equivalent normalized representation for the same precision float (a denormal single could be represented as a normal double, but not as a normal single). Perhaps that's what the function is doing. But unless you're dealing with some really low-level stuff or high-precision, you probably don't care.

Eric Lippert has a good explanation of the anatomy of a float.

notthe same as normalizing a float. These are two rather different concepts that happen to have the same name.