If you add 1/3 3 times, you would expect a number close to 1, but I
get exactly 1.0.

Actually a normal person uncontaminated by programming experience would expect n * 1 / n to equal 1, but we're not normal here.

I can't reproduce your problem exactly, I get

```
groovy:000> def foo(n) {
groovy:001> sum = 0.0
groovy:002> for (int i = 0; i < n; i++) {
groovy:003> sum += 1.0 / n
groovy:004> }
groovy:005> sum
groovy:006> }
===> true
groovy:000> foo(3)
===> 0.9999999999
```

There may be 2 issues here, at least you will want to be aware of them.

One is that doubles are not exact, they cannot represent some values exactly, and you just have to expect stuff to be off by a little bit. Your goal isn't 100% accuracy, it's to keep the error within acceptable bounds. (Peter Lawrey has an interesting article on doubles that you might want to check out.) If that's not ok for you, you'll want to avoid doubles. For a lot of uses BigDecimal is good enough. If you want a library where the division problems in your question give accurate answers you might check out the answers to this question.

The other issue is that System.out.println doesn't tell you the exact value of a double, it fudges a bit. If you add a line like:

```
System.out.println(new java.math.BigDecimal(sum));
```

then you will get an accurate view of what the double contains.