# What does 'depending on rounding' exactly mean?

About `random.uniform`, docstring says:

Get a random number in the range [a, b) or [a, b] depending on rounding.

But I do not know what does 'depending on rounding' exactly mean.

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Well underneath `random.uniform` in the docs it says `The end-point value b may or may not be included in the range depending on floating-point rounding in the equation a + (b-a) * random().` –  Jon Clements Nov 3 '12 at 21:09

Return a random floating point number `N` such that `a <= N <= b` for `a <= b` and `b <= N <= a` for `b < a`.

The end-point value `b` may or may not be included in the range depending on floating-point rounding in the equation `a + (b-a) * random()`.

Floating point arithmetic on computers is limited in precision and rounding errors caused by this imprecision may lead to `b` not being included in the full range of values used for the random value that `uniform()` returns.

`random.random()` returns a value between 0.0 (inclusive) and 1.0 (exclusive). There are values for `a` and `b` where a floating point calculation of the sum `a + (b-a) * (1.0 - epsilon/2)` does not equal `b`, but will be a minute amount lower than `b`, while for other combinations the sum does equal to `b`. `epsilon` is the minimum precision of a floating point number on your platform (see `sys.float_info`), and `1.0 - epsilon/2` the maximum value `random.random()` can return.

If you are interested in the details of why floating point arithmetic on computers is imprecise, I can recommend the following two articles:

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Example: `random.uniform(0, 5e-324)` includes the upper bound. –  DSM Nov 3 '12 at 21:20
@SvenMarnach: ah, missed the `)`, read it as `]`. So the maximum value is `1.0 - epsilon` then? –  Martijn Pieters Nov 3 '12 at 21:24
@MartijnPieters: The maximum value depends on the random generator. It's usually not `1.0 - epsilon` with `epsilon` being the "epsilon" of the floating-point representation, but rather with an epsilon depending on how many bits the random number generator delivers. This used to 48 bits some time ago, and the mantissa of double-precision numbers has 52 bits, so there's a factor of 16. I'm investigating if this is still true. –  Sven Marnach Nov 3 '12 at 21:29
@SvenMarnach: right, so not `1.0 - epsilon` exactly, but something close to that that depends on the resolution of the random number algorithm (Wichman-Hill, see the source). –  Martijn Pieters Nov 3 '12 at 21:31
@MartijnPieters: Oh, that's a very different algorithm than the one I had in mind. Yes, of course it depends on this algorithm, and I can't tell what the maximum value is at first glance. :) –  Sven Marnach Nov 3 '12 at 21:34

`rounding` is: if i round 3.45 upwards, i will get 4. but if i round it downwards, i will get 3. so in this case, the values of ranges coming from [ or ] will change depending on round

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why is downvote? –  doniyor Nov 4 '12 at 11:59