If x is 2.3, then math.floor(x) returns 2.0, the largest integer smaller than or equal to x (as a float.)

How would I get i the largest integer strictly smaller than x (as a integer)?

The best I came up with is:

i = int(math.ceil(x)-1)

Is there a better way?

Note, that if x is 2.0 then math.floor(x) returns 2.0 but I need the largest integer smaller than 2.0, which is 1.

  • 1
    What do you mean by "the largest integer smaller or greater than x"? – komaromy Jan 3 '15 at 19:24
  • @komaromy: OP probably means "smaller or equal". – Kevin Jan 3 '15 at 19:24
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    @MartijnPieters: No, it behaves differently if x is integral. – Kevin Jan 3 '15 at 19:25
  • 2
    If the input value is negative, what do you want? For -1.2, you want -2; for -2.0, you want -3.0? – Jonathan Leffler Jan 3 '15 at 19:32
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    I think your original choice of int(math.ceil(x) - 1) is the right one – Jivan Jan 3 '15 at 19:35

math.ceil(x)-1 is correct and here is the proof.

if x is in Z (the set of integers), then math.ceil(x) = x. Therefore math.ceil(x)-1=x-1, the largest integer smaller than x.

Else we have x in R \ Z and math.ceil(x) is the smallest integer y such that xy. But then y-1 is an integer smaller than the smallest integer such that xy, therefore x > y-1 and by construction y-1 is the largest such integer smaller than x.

It's simple enough that I wouldn't bother with those if-else. But to avoid computation errors with floats I would do the -1 outside the int conversion.

  • Marked this as the best answer, although Kevin suggested it first. This discussion was very interesting. – pheon Jan 4 '15 at 18:58
  • The conversion to int is only required for floats greater in magnitude than 2.0**53. As an example where it is required, try 9007199254740996.0 – Simon Byrne Jan 5 '15 at 14:52

The following C code works in a certain sense---it gives you the next most negative integer that's representable as a floating-point number:

double flooor(double x) {
  return floor(nextafter(x, -1.0/0.0));

The following Python code is a direct transliteration, but it relies on NumPy:

def flooor(x):
  return math.floor(numpy.nextafter(x, -numpy.inf))

The nextafter function moves from its first argument one double closer to its second argument. It has a special case; if z < 0 and you ask for nextafter(0.0, z), it will return the smallest negative subnormal number.

From your specification, it is unclear what should be done with positive infinity and the most negative finite number. This code sends positive infinity to the most positive finite number, negative infinity to itself, and the most negative finite number to negative infinity.

Martijn Pieters gave the incantation int(math.ceil(x)) - 1 in his answer, since deleted. This correctly finds the largest int less than the float x. This rounds x up, converts it to integer, and subtracts 1, giving the largest Python int that is numerically less than x.

  • Who is asking for C code? provide similar python code.. – aerokite Jan 3 '15 at 21:58
  • @AerofoilKite: Done. But I'd note that it's not hard to call C code from python. – tmyklebu Jan 3 '15 at 22:22
  • can you explain why my answers are wrong? For my knowledge – aerokite Jan 3 '15 at 22:25
  • @AerofoilKite: Useful test cases: 1.7976931348623157e+308, 1.7976931348623155e+308, 1267650600228229401496703205376.0, and their negatives. – tmyklebu Jan 3 '15 at 22:36
  • Tnx for your sharing – aerokite Jan 3 '15 at 22:41

What about:

i = int(math.floor(x) - 1)
  • 1
    Doesn't work. Subtracting 1 is a no-op for sufficiently big floating-point numbers. – tmyklebu Jan 3 '15 at 22:35
  • Even after floor? I tried the cases you provided and it seems to work. – eternauta Jan 3 '15 at 22:49
  • If x = 1267650600228229401496703205376.0, you get i = 1267650600228229401496703205376. – tmyklebu Jan 3 '15 at 22:52
  • x = 1267650600228229401496703205376.0, i = int(math.floor(x) - 1), i, 1267650600228229401496703205375 – eternauta Jan 3 '15 at 22:55
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    Yes, it works in 3.4 but not in 2.7. If you know any documentation about this let me know, i'm new with python as you can see. – eternauta Jan 3 '15 at 23:30

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