You could just divide your number by your base float, round it up to the nearest int, and re-multiply.

psuedo code

```
def round_to_float(base_float,to_round)
return ceiling(to_round / base_float) * base_float
end
```

example with `3`

:

```
ceiling(3.0 / 2.6) * 2.6
ceiling(1.15) * 2.6
2 * 2.6
5.2
```

For multiple checking, you could use `fmod($to_round,$base_float) == 0`

, but there will inevitably be floating point inaccuracies and it's not a reliable way to test floats.

To be certain, you should pick a small enough `epsilon`

(on the order of machine precision on your computer), and make sure your quotient `to_round/base_float`

is within `epsilon`

of its `floor`

.

putting it all together

```
def round_to_float(base_float,to_round)
quotient = to_round / base_float
if (absolute_value(quotient - floor(quotient)) < epsilon)
return false
else
return ceiling(quotient) * base_float
end
end
```

where epsilon is a really small number. In theory it should be your machine precision ... usually something like 10^-9. In practice 10^-4 should be sufficient in most use cases.