# Difference between float and double

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I know, I've read about the difference between double precision and single precision, etc. But they should give the same results on most cases right?

I was solving a problem on a programming contest and there were calculations with floating point numbers that were not really big, so I decided to use float instead of double, and I checked it - I was getting the correct results. But when I send the solution, it said only 1 of 10 tests was correct. I checked again and again, until I found that using float is not the same using double. I put double for the calculations and double for the output, and the program gave the SAME results, but this time it passed all the 10 tests correctly.

I repeat, the output was the SAME, the results were the SAME, but putting float didn't work - only double. The values were not so big too, and the program gave the same results on the same tests both with float and double, but the online judge accepted only the double-provided solution.

Why? What is the difference?

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Can you specify the differences between the machines on which you tested and the machines on which your submitted code was tested? Maybe the answer is there. – gnobal Mar 5 '10 at 12:54
Do you know the testing input? How did you know the output was the same? By testing a definite count of cases you can't really tell anything. – Petr Peller Mar 5 '10 at 13:13
Can you give us a sample of the input/output? – Bill Mar 5 '10 at 13:16

Huge difference.

As the name implies, a `double` has 2x the precision of `float`[1]. In general a double has 15 to 16 decimal digits of precision, while `float` only has 7.

This precision loss could lead to truncation errors much easier to float up, e.g.

``````    float a = 1.f / 81;
float b = 0;
for (int i = 0; i < 729; ++ i)
b += a;
printf("%.7g\n", b);   // prints 9.000023
``````

while

``````    double a = 1.0 / 81;
double b = 0;
for (int i = 0; i < 729; ++ i)
b += a;
printf("%.15g\n", b);   // prints 8.99999999999996
``````

Also, the maximum value of float is only about `3e38`, but double is about `1.7e308`, so using `float` can hit Infinity much easier than double for something simple e.g. computing 60!.

Maybe the their test case contains these huge numbers which causes your program to fail.

Of course sometimes even `double` isn't accurate enough, hence we have `long double`[1] (the above example gives 9.000000000000000066 on Mac), but all these floating point types suffer from round-off errors, so if precision is very important (e.g. money processing) you should use `int` or a fraction class.

BTW, don't use `+=` to sum lots of floating point numbers as the errors accumulate quickly. If you're using Python, use `fsum`. Otherwise, try to implement the Kahan summation algorithm.

[1]: The C and C++ standards do not specify the representation of `float`, `double` and `long double`. It is possible that all three implemented as IEEE double-precision. Nevertheless, for most architectures (gcc, MSVC; x86, x64, ARM) `float` is indeed a IEEE single-precision floating point number (binary32), and `double` is a IEEE double-precision floating point number (binary64).

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".don't use += to sum lots of floating point numbers as the errors accumulate quickly" - maybe that's my problem. I want to know why this happens ? – VaioIsBorn Mar 5 '10 at 13:56
@Vaio: Imagine 1000 + 1.6 + 1.6 + 1.6 + 1.6 and you're limited to 4 significant figures. Using += will give the wrong value of 1008 because the 1.6's are forced to round up to 2. – KennyTM Mar 5 '10 at 14:03
Actually, double has more than 2.2x the precision: 53 bits vs. 24 bits. – bk1e Mar 6 '10 at 16:59
The usual advice for summation is to sort your floating point numbers by magnitude (smallest first) before summing. – R.. Aug 6 '10 at 9:49
Actually, as Gregory Pakosz quotes from the standard, there is no guarantee of a double having 2x or 2.2x the precision of a float. It must have 1x or greater. – Drew Dormann Jan 16 at 23:07

Here is what the standard C99 (ISO-IEC 9899 6.2.5 §10) or C++2003 (ISO-IEC 14882-2003 3.1.9 §8) standards say:

There are three floating point types: `float`, `double`, and `long double`. The type `double` provides at least as much precision as `float`, and the type `long double` provides at least as much precision as `double`. The set of values of the type `float` is a subset of the set of values of the type `double`; the set of values of the type `double` is a subset of the set of values of the type `long double`.

The value representation of floating-point types is implementation-defined.

I would suggest having a look at the excellent What Every Computer Scientist Should Know About Floating-Point Arithmetic that covers the IEEE floating-point standard in depth. You'll learn about the representation details and you'll realize there is a tradeoff between magnitude and precision. The precision of the floating point representation increases as the magnitude decreases, hence floating point numbers between -1 and 1 are those with the most precision.

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 we pasted the same links?! :D – N 1.1 Mar 5 '10 at 12:58 indeed, it's the obvious one that comes to mind :) – Gregory Pakosz Mar 5 '10 at 12:59 I think nvl should get the points as Gregory has more points and nvl is just starting out. – graham.reeds Mar 5 '10 at 13:02 @graham: thanks man! :) but he deserves as much as i do. :P – N 1.1 Mar 5 '10 at 13:05 @graham.reeds fair enough. Gregory may get more votes, though, because he put the title in his link, so his answer is more easily seen to be a good one. – David Gelhar Mar 5 '10 at 13:07
• A double is 64 and single precision (float) is 32 bits.
• The double has a bigger mantissa (the integer bits of the real number).
• Any inaccuracies will be smaller in the double.
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Given a quadratic equation: x2 − 4.0000000 x + 3.9999999 = 0, the exact roots to 10 significant digits are, r1 = 2.000316228 and r2 = 1.999683772.

Using `float` and `double`, we can write a test program:

``````#include <stdio.h>
#include <math.h>

void dbl_solve(double a, double b, double c)
{
double d = b*b - 4.0*a*c;
double sd = sqrt(d);
double r1 = (-b + sd) / (2.0*a);
double r2 = (-b - sd) / (2.0*a);
printf("%.5f\t%.5f\n", r1, r2);
}

void flt_solve(float a, float b, float c)
{
float d = b*b - 4.0f*a*c;
float sd = sqrtf(d);
float r1 = (-b + sd) / (2.0f*a);
float r2 = (-b - sd) / (2.0f*a);
printf("%.5f\t%.5f\n", r1, r2);
}

int main(void)
{
float fa = 1.0f;
float fb = -4.0000000f;
float fc = 3.9999999f;
double da = 1.0;
double db = -4.0000000;
double dc = 3.9999999;
flt_solve(fa, fb, fc);
dbl_solve(da, db, dc);
return 0;
}
``````

Running the program gives me:

``````2.00000 2.00000
2.00032 1.99968
``````

Note that the numbers aren't large, but still you get cancellation effects using `float`.

(In fact, the above is not the best way of solving quadratic equations using either single- or double-precision floating-point numbers, but the answer remains unchanged even if one uses a more stable method.)

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"there were calculations with floating point numbers that were not really big"

The size of the numbers is irrelevant it's the calculation that is being performed that is relevant.

In essence if you're performing a calculation and the result is an irrational number or recurring decimal then there will be rounding errors when that number is squashed into the finite size datastructure you're using. Since double is twice the size of float then the rounding error will be a lot smaller.

The online test probably specifically used numbers which would cause this kind of error and therefore tested that you'd used the appropriate type in your code.

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Floats have less precision than doubles. Although you already know, read What WE Should Know About Floating-Point Arithmetic for better understanding.

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 No, in C and C++, floats and doubles can have the exact same precision. This is implementation dependent. See for instance Gregory Pakosz's answer. – Peter Mortensen Apr 12 at 19:57 For instance, all AVR doubles are floats (four-byte). – Peter Mortensen Apr 12 at 20:22

When using floating point numbers you cannot trust that your local tests will be exactly the same as the tests that are done on the server side. The environment and the compiler are probably different on you local system and where the final tests are run. I have seen this problem many times before in some TopCoder competitions especially if you try to compare two floating point numbers.

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type float, 32 bits long, has a precision of 7 digits. While it may store values with very large or very small range (+/- 3.4 * 10^38 or * 10^-38), it has only 7 significant digits.

type double, 64 bits long, has a bigger range ( *10^+/-308) and 15 digits precision.

long double is nominally 80 bits, though a given compiler/OS pairing may store it as 12-16 bytes for alignment purposes. The long double has an exponent that just ridiculously huge, and should have 19 digits precision. M\$, in their infinite wisdom, limits long double to 8 bytes, same as plain double.

Generally speaking, just use type double when you need a floating point value/variable. Literal floating point values used in expressions will be treated as doubles by default, and most of the math functions that return floating point values return doubles. You'll save yourself many headaches and typecastings if you just use double.

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 Actually, for float it is between 7 and 8, 7.225 to be exact. – Peter Mortensen Apr 12 at 20:25

The built-in comparison operations differ as in when you compare 2 numbers with floating point, the difference in data type (i.e. float or double) may result in different outcomes.

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