How to round to integer (naturally) in C++? [duplicate]

Please i need help in rounding integers naturally in C++ as follows:

example 1: Rounding(1.6) = 2 ( as in ceil(1.6) )
example 2: Rounding(1.4) = 1 ( as in floor(1.4) )
example 3: Rounding(1.501) = 2 ( as in ceil(1.501) )
and so on.

Where `int Rounding(float)` is a function that return an integer and takes a float number. I know the functions ceil and floor from the library.

I assume that a mathematical equation is needed to construct such a function. I am looking for the most efficient way.

Any suggestions are highly appreciated,

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marked as duplicate by Roddy, Andre, Roman C, Nicholas Wilson, Ananda MahtoApr 15 '13 at 9:20

``````int round(float x)
{
return static_cast<int>(floor(x + 0.5f));
}
``````

Note that the usual floating-point caveats apply.

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Will that really compile without a cast? –  Blindy Apr 29 '11 at 16:04
@Blindy: Yes.... –  Nawaz Apr 29 '11 at 16:05
@Blindy: Yes, but I'll put one in anyway, to satisfy any compiler warnings. –  Oli Charlesworth Apr 29 '11 at 16:06

The typical way to do it is:

``````floor(x+0.5)
``````

The following version rounds half-integers (1.5, 2.5 etc) symmetrically away from 0:

``````x>=0 ? floor(x+0.5) : ceil(x-0.5)
``````
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+1 for remembering negative numbers. –  Mark B Apr 29 '11 at 16:03
-1: It will work for negative values. You're thinking of `trunc` (if such a thing existed). So your code won't work... –  Oli Charlesworth Apr 29 '11 at 16:04
Ah, I see you've changed it to do `ceil` for negative values. However, this leads to inconsistent behaviour for half-integers. So the -1 remains, given that `floor(x+0.5f)` is simpler, and consistent... –  Oli Charlesworth Apr 29 '11 at 16:13
Does it? It looks to me as if it consistently rounds away from 0 on half integers, thus being symmetrical as expected. –  Blindy Apr 29 '11 at 16:17
Yes, I suppose it is consistent (actually, it's not what I would expect, but I'm not everybody!). The OP hasn't specified what type of half-int rounding he wants, so I can't complain. So if you remove the "this will not work for negative values" statement, then your answer will be correct, and I'll remove the -1. –  Oli Charlesworth Apr 29 '11 at 16:20