# Checking that float modulo int is finite ordinal

In a for-loop, I'm integrating with respect to time with constant, fractional time step, `dt.` I only want to save the simulation results for integral (finite ordinal) time points. My solution is as follows,

``````dt = 0.1
steps = 100

for step in range(steps):
if (step*dt) % 1 == 0.0:
print step
``````

I've never really trusted modular arithmetic on floats. Is there a better way to check if a float is integral or am I simply being paranoid?

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## 2 Answers

This is dangerous, in any programming language. In your example, `0.1` cannot be represented exactly by in floating-point, so that test will never pass (well I suppose it may do after 2^24 iterations or so). In many cases, the step size may not have an exact representation in floating-point, so that the accumulated rounding error causes the test to erroneously trigger/not trigger. In other cases, as the accumulated value gets larger, eventually it will begin to lose precision due to the increasing exponent (in your example, assuming Python uses single-precision by default, you'll get an erroneous trigger after 20971529 iterations).

Try to find a way to avoid performing equality tests on floating-point values (checking for integral values is one such test). So in your case, just test on `step % 10`.

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Is 2^24 just pulled out of nowhere, or does it have any meaning? –  Dhaivat Pandya Jun 1 '11 at 17:51
Doing any operation on a IEEE floating point is bound to give you errors, even if it is step%10. –  Dhaivat Pandya Jun 1 '11 at 17:52
@Dhaivat: A single-precision float has 23 mantissa bits (+1 implied), so after approximately that number of iterations, the OP's `step*dt` will have no fractional component (assuming Python uses single-precision by default). As you may have guessed, I don't know Python at all; will `step` be an integer type or a floating-point type here? –  Oli Charlesworth Jun 1 '11 at 17:54
@Dhaivat: Even if `step` is floating-point, so long as `steps` is less than 2^24, this should work fine. –  Oli Charlesworth Jun 1 '11 at 17:55
"0.1 cannot be represented exactly [] in floating-point" is true, but "so that test will never pass" doesn't follow. Try it and see. –  DSM Jun 1 '11 at 18:02
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I don't trust floats either, you can use the Decimal type or, you can use types. I like types better.

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