as all know `decimal fractions`

(like 0.1) , when stored as `floating point`

(like double or float) will be internally represented in "binary format" (IEEE 754). And some decimal fractions can not directly be represented in binary format.

What I have not understood, is the precision of this "conversion":

1.) A Floating point itself can have a precision (that is the "significant")?

2.) But also the conversion from decimal fraction to binary fraction has a precision loss?

**Question:**

What is the worst case precision loss (for "all" possible decimal fractions) when converting from decimal fractions to floating point fractions?

(The reason I want to know this is, when comparing decimal fractions with binary/floating point fractions I need to take the precision into account...to determine if both figures are identical. And I want this precision to be as tight/precise as possible `(decimal fraction == binary fraction +/- precision)`

**Example (only hypothetical)**

```
0,1 dec => 0,10000001212121212121212 (binary fraction double) => precision loss 0,00000001212121212121212
0,3 dec => 0,300000282828282 (binary fraction double) => precision loss 0,000000282828282
```

somesituations to find the largest percentage difference situation. – Delan Azabani Aug 24 '11 at 2:13