You can think of integer division in ruby implemented like this --

given `a`

and `b`

, ruby finds integer solutions to `q b + m = a`

such that

`m`

is the same sign as `b`

- the value of
`m`

is made as small (close to zero) as possible.

These two rules give you unique solutions for `q`

(`a / b`

) and `m`

(`a % b`

).

in your first case, `a`

is 14200 and `b`

is 3600. The unique solutions of `q b + m = a`

that follow those rules is `q = 3`

and `m = 1600`

-- try it.

```
> 3 * 3600 + 1600
# => 12400
```

Is this the only solution? What about `q = 4`

? then

```
4 * 3600 + m = 12400
m = -2000
```

nope ... not only is `m`

now bigger than before, but it's even the wrong sign (remember the first rule?)

What about `q = 2`

?

```
2 * 3600 + m = 12400
m = 5200
```

nope ... our first solution for `m`

was smaller. Therefore the only values of `q`

and `m`

possible are 3 and 1600.

Now let's try your second case -- `a`

is `-12400`

and `b`

is `3600`

again. The unique solution is `q = -4`

and `b = 2000`

.

Let's check.

```
> -4 * 3600 + 2000
# => -12400
```

it works!

let's quickly check other values of `q`

-- let's try -3, the "obvious" answer if we compare to the first example:

```
-3 * 3600 + m = -12400
m = -1600
```

okay...well, `m`

here is "smaller" than before...so it fits Rule #2. But rule #1 says that `m`

has to be the same sign as `b`

...so we won't accept negative values of `m`

.

Therefore the only unique solutions are `q = -4`

and `m = 2000`

.

The other two divisions then in your question should be clear from here.

In order to get the results you seem to expect, you should use `-3600`

instead of `3600`

for your hour dividend.