# The Float Precision Problem

**You have two problems here, but both come from the same root**

You can't compare floats precisely. You can't subtract or divide them precisely. You can't count **anything** for them precisely. Any operation with them could (and almost always does) bring some error into the result. Even `a=0.2f`

is not a precise operation. The deeper reasons of that are very well explained by the authors of the other answers here. _{(My thanks and votes to them for that.)}

Here comes your first and more simple error. You should never, *never*, **never**, *never*, **NEVER** use on them == or its equivalent in any language.

Instead of `a==b`

, use `Abs(a-b)<HighestPossibleError`

instead.

**But this is not the sole problem in your task.**

`Abs(1/y-x)<HighestPossibleError`

won't work, either. At least, it won't work often enough. Why?

Let's take pair x=1000 and y=0.001. Let's take the "starting" relative error of y for 10^{-6}.

_{(Relative error = error/value).}

Relative errors of values are adding to at multiplication and division.

1/y is about 1000. Its relative error is the same 10^{-6}. ("1" hasn't errors)

That makes absolute error =1000*10^{-6}=0.001. When you subtract x later, that error will be all that remains. (Absolute errors are adding to at adding and subtracting, and the error of x is negligibly small.) Surely, you are not counting on so large errors, HighestPossibleError would be surely set lower and your program would throw off a good pair of x,y

So, the next two rule for float operations: try not to divide greater valuer by lesser one and God save you from subtracting the close values after that.

**There are two simple ways to escape this problem.**

By founding what of x,y has the greater abs value and divide 1 by the greater one and only later to subtract the lesser one.

If you want to compare `1/y against x`

, while you are working yet with letters, not values, *and your operations make no errors*, multiply the both sides of comparison by y
and you have `1 against x*y`

. _{(Usually you should check signs in that operation, but here we use abs values, so, it is clean.)} The result comparison has no division at all.

In a shorter way:

```
1/y V x <=> y*(1/y) V x*y <=> 1 V x*y
```

We already know that such comparison as `1 against x*y`

should be done so:

```
const float HighestPossibleError=1e-10;
if(Abs(x*y-1.0)<HighestPossibleError){...
```

That is all.

P.S. If you really need it *all* on one line, use:

```
if(Abs(x*y-1.0)<1e-10){...
```

But it is bad style. I wouldn't advise it.

P.P.S. In your second example the compiler optimizes the code so, that it sets z to 5 before running any code. So, checking 5 against 5 works even for floats.

`((x*y) == 1)`

doesn't work either? – Vyktor Feb 3 '12 at 23:29