# Rounding when [int] = [float] + [int] (Obj-C, iOS?)

In this case:

``````float a = 0.99999f;
int b = 1000;
int c = a + b;
``````

In result `c = 1001`. I discovered that it happens because `b` is converted to float (specific for iOS), then `a + b` doesn't have enough precision for `1000.9999` and (why?) is rounded to higher value. If `a` is `0.999f` we get `c = 1000` - theoretically correct behavior.

So my question is why float number is rounded to higher value? Where this behavior (or convention) is described?

I tested this on iPhone Simulator, Apple LLVM 4.2 compiler.

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here i'm getting 1000. – Balu Apr 5 '13 at 11:38
am also gettin 1000 – Burhanuddin Sunelwala Apr 5 '13 at 11:38
My mistake, people. `a = 0.99999f` – brigadir Apr 5 '13 at 11:46
`int c = (int)a + b;` it gives me `1000`, even if the `a` is `0.9999999f` – holex Apr 5 '13 at 11:52
@holex - Try `(int) (a + b)`. – Hot Licks Apr 5 '13 at 11:53

In `int c = a + b`, the integer `b` is converted to a float first, then 2 floating point numbers are added, and the result is truncated to an integer.

The default floating point rounding mode is `FE_TONEAREST`, which means that the result of the addition

``````0.99999f + 1000f
``````

is the nearest number that can be represented as a float, and that is the number `1001f`. This float is then truncated to the integer `c = 1001`.

If you change the rounding mode

``````#include <fenv.h>
fesetround(FE_DOWNWARD);
``````

then the result of the addition is rounded downward (approximately `1000.99993f`) and you would get `c = 1000`.

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Close, but not quite right. The nearest value to represent the result of the float addition is something like 1001.000032 (pulling a number out of the air), so the result is rounded to that. That number is then truncated to 1001 on the float->int conversion, per standard C rules. – Hot Licks Apr 5 '13 at 14:35
@HotLicks: I don't quite understand. Why should the nearest float to 0.99999 + 1000 be 1001.000032 and not 1001 ? 1001 is representable as a float, and is nearer to 1000.99999 than 1001.000032. (I also verified this in the debugger before giving the answer.) - Perhaps I am missing something completely? – Martin R Apr 5 '13 at 14:48
Yeah, I guess you're right -- small integers are exactly representable in IEEE float. But it needs to be emphasized that the rounding that occurs is in converting a float value to the nearest IEEE representation, not rounding to integer. The rounding is, in essence, to 1001.00000, not 1001. – Hot Licks Apr 5 '13 at 16:01
@HotLicks: I see your point. That is what I meant with "the nearest number that can be represented as a float, and that is the number `1001f`". So with "float" I meant the C type `float` which is the IEEE float. I have changed the answer slightly to stress the fact that the truncation to int is a separate step. Thank you for the feedback! – Martin R Apr 5 '13 at 16:13

The reason is that when you add 1000 you get 8 total decimal digits of precision, but IEEE float is only supports 7 digits.

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But why the number is rounded? Outlying digits should be cut off (like in `float` -> `int` conversion). – brigadir Apr 5 '13 at 12:01
@brigadir - In essence, the sum is computed using a much greater precision, and may produce a result of 1000.9999932, let's say. But that cannot be represented as a 32-bit float. So the two nearest "legal" values may be 1000.9999843 and 1001.0000017. In default rounding mode, the FP unit picks the latter, since it's closer to the "real" answer. – Hot Licks Apr 5 '13 at 14:33