Wolfram alpha is actually wrong here.

```
(1 - 0.002) ** 5
```

is exactly `0.990039920079968`

.

You can verify that by simply assessing that there are 15 digits after the `.`

, which matches `5 * 3`

, 3 being the number of digits after the `.`

in the expression `(1 - 0.002)`

. There couldn't be any digit after the 15th by definition.

## Edit

A little more digging got me something interesting:

This notation `Decimal('0.002')`

creates an actual decimal with this **exact** value. Using `Decimal(0.002)`

the decimal is made from a float rather than a string, creating an imprecision. Using this notation is the original formula :

```
(1-decimal.Decimal(0.002))**5
```

Returns `Decimal('0.99003992007996799979349352807411754897106595345737537649055432859002826694496107'`

which is indeed 80 digits long after the `.`

, but different from the wolfram alpha value.

This is probably caused by a difference of precision between python and wolfram alpha floating point representation, and is a further indication that wolfram alpha is using floats when SetPrecision is used.

**Nota**: directly asking for the result returns the correct value (see http://www.wolframalpha.com/input/?i=%281+-+0.002%29%5E5).