Elegant workaround for JavaScript floating point number problem

I have the following dummy test script:

function test(){
var x = 0.1 * 0.2;
document.write(x);
}
test();

This will print the result 0.020000000000000004 while it should just print 0.02 (if you use your calculator). As far as I understood this is due to errors in the floating point multiplication precision.

Does anyone have a good solution so that in such case I get the correct result 0.02? I know there are functions like toFixed or rounding would be another possibility, but I'd like is to really have the whole number printed without any cutting and rounding. Just wanted to know whether one of you has some nice, elegant solution.

Of course, otherwise I'll round to some 10 digits or so.

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Actually, the error is because there is no way to map 0.1 to a finite binary floating point number. –  Aaron Digulla Sep 22 '09 at 8:14
Most fractions can't be converted to a decimal with exact precision. A good explanation is here: docs.python.org/release/2.5.1/tut/node16.html –  Nate Zaugg Jan 10 '11 at 18:35
possible duplicate of Is JavaScript's Math broken? –  epascarello Nov 2 '11 at 3:18
@AaronDigulla: (new Number(0.1)).valueOf() is 0.1. –  Salman A Nov 17 '12 at 17:06
@SalmanA: That your JavaScript runtime hides this problem from you doesn't mean I'm wrong. –  Aaron Digulla Nov 19 '12 at 10:45

From the Floating-Point Guide:

What can I do to avoid this problem?

That depends on what kind of calculations you’re doing.

• If you really need your results to add up exactly, especially when you work with money: use a special decimal datatype.
• If you just don’t want to see all those extra decimal places: simply format your result rounded to a fixed number of decimal places when displaying it.
• If you have no decimal datatype available, an alternative is to work with integers, e.g. do money calculations entirely in cents. But this is more work and has some drawbacks.

Note that the first point only applies if you really need specific precise decimal behaviour. Most people don't need that, they're just irritated that their programs don't work correctly with numbers like 1/10 without realizing that they wouldn't even blink at the same error if it occurred with 1/3.

If the first point really applies to you, use BigDecimal for JavaScript, which is not elegant at all, but actually solves the problem rather than providing an imperfect workaround.

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+1 for "without realizing that they wouldn't even blink at the same error if it occurred with 1/3." –  phoog Dec 1 '11 at 4:51
I noticed your dead link for BigDecimal and while looking for a mirror, I found an alternative called BigNumber: jsfromhell.com/classes/bignumber –  Jackson Dec 1 '11 at 4:52
@Jackson: Thanks, I'll take a look at that. I've also fixed the link to the BigDecimal library, which can now be found on GitHub –  Michael Borgwardt Dec 1 '11 at 8:41
I'm not sure if solution 3 (work with integers) is valid, if JavaScript doesn't have an internal integer representation. AFAIK the universal number type is float at the end of the day. –  bass-t Jul 25 '12 at 11:10
@bass-t: Yes, but floats can exactly represent integers up to the length of the significand, and as per ECMA standard it's a 64bit float. So it can exactly represent integers up to 2^52 –  Michael Borgwardt Jul 25 '12 at 13:15
show 1 more comment

I like Pedro Ladaria's solution and use something similar.

function strip(number) {
return (parseFloat(number.toPrecision(12)));
}

Unlike Pedros solution this will round up 0.999...repeating and is accurate to plus/minus one on the least significant digit.

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You are looking for an sprintf implementation for JavaScript, so that you can write out floats with small errors in them (since they are stored in binary format) in a format that you expect.

Try javascript-sprintf, you would call it like this:

var yourString = sprintf("%.2f", yourNumber);

to print out your number as a float with two decimal places.

You may also use Number.toFixed() for display purposes, if you'd rather not include more files merely for floating point rounding to a given precision.

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I think this is the cleanest solution. Unless you really really need the result to be 0.02, the small error is negligible. It sounds like what's important is that your number is displayed nicely, not that you have arbitrary precision. –  Long Ouyang Aug 7 '10 at 15:50
For display this is indeed the best option, for complicated calculations, check Borgwardt's answer. –  Xeross Aug 10 '10 at 18:29
But then again this will return exactly the same string as yourNumber.toFixed(2). –  Robert Dec 21 '10 at 18:07
on a side note, w3fools.com –  detj May 5 '13 at 19:40

Are you only performing multiplication? If so then you can use to your advantage a neat secret about decimal arithmetic. That is that NumberOfDecimals(X) + NumberOfDecimals(Y) = ExpectedNumberOfDecimals That is to say that if we have 0.123 * 0.12 then we know that there will be 5 decimal places because 0.123 has 3 decimal places and 0.12 has two. Thus if JavaScript gave us a number like 0.014760000002 we can safely truncate to the 5th decimal place without fear of loosing precision.

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... and how to get the exact amount of decimal places. –  line-o Feb 13 '13 at 9:57
That would be exact. –  Nate Zaugg Feb 14 '13 at 14:50

For the mathematically inclined: http://docs.oracle.com/cd/E19957-01/806-3568/ncg_goldberg.html

The recommended approach is to use correction factors (multiply by a suitable power of 10 so that the arithmetic happens between integers). For example, in the case of 0.1 * 0.2, the correction factor is 10, and you are performing the calculation:

> var x = 0.1
> var y = 0.2
> var cf = 10
> x * y
0.020000000000000004
> (x * cf) * (y * cf) / (cf * cf)
0.02

A (very quick) solution looks something like:

var _cf = (function() {
function _shift(x) {
var parts = x.toString().split('.');
return (parts.length < 2) ? 1 : Math.pow(10, parts[1].length);
}
return function() {
return Array.prototype.reduce.call(arguments, function (prev, next) { return prev === undefined || next === undefined ? undefined : Math.max(prev, _shift (next)); }, -Infinity);
};
})();

Math.a = function () {
var f = _cf.apply(null, arguments); if(f === undefined) return undefined;
function cb(x, y, i, o) { return x + f * y; }
return Array.prototype.reduce.call(arguments, cb, 0) / f;
};

Math.s = function (l,r) { var f = _cf(l,r); return (l * f - r * f) / f; };

Math.m = function () {
var f = _cf.apply(null, arguments);
function cb(x, y, i, o) { return (x*f) * (y*f) / (f * f); }
return Array.prototype.reduce.call(arguments, cb, 1);
};

Math.d = function (l,r) { var f = _cf(l,r); return (l * f) / (r * f); };

In this case:

> Math.m(0.1, 0.2)
0.02

I definitely recommend using a tested library like SinfulJS

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This function will determine the needed precision from the multiplication of two floating point numbers and return a result with the appropriate precision. Elegant though it is not.

function multFloats(a,b){
var atens = Math.pow(10,String(a).length - String(a).indexOf('.') - 1),
btens = Math.pow(10,String(b).length - String(b).indexOf('.') - 1);
var result = (a * atens) * (b * btens) / (atens * btens);
return result;
}
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The round() function at phpjs.org works nicely: http://phpjs.org/functions/round

num = .01 + .06;  // yields 0.0699999999999
rnum = round(num,12); // yields 0.07
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You just have to make up your mind on how many decimal digits you actually want - can't have the cake and eat it too :-)

Numerical errors accumulate with every further operation and if you don't cut it off early it's just going to grow. Numerical libraries which present results that look clean simply cut off the last 2 digits at every step, numerical co-processors also have a "normal" and "full" lenght for the same reason. Cuf-offs are cheap for a processor but very expensive for you in a script (multiplying and dividing and using pov(...)). Good math lib would provide floor(x,n) to do the cut-off for you.

So at the very least you should make global var/constant with pov(10,n) - meaning that you decided on the precision you need :-) Then do:

Math.floor(x*PREC_LIM)/PREC_LIM  // floor - you are cutting off, not rounding

You could also keep doing math and only cut-off at the end - assuming that you are only displaying and not doing if-s with results. If you can do that, then .toFixed(...) might be more efficient.

If you are doing if-s/comparisons and don't want to cut of then you also need a small constant, usually called eps, which is one decimal place higher than max expected error. Say that your cut-off is last two decimals - then your eps has 1 at the 3rd place from the last (3rd least significant) and you can use it to compare whether the result is within eps range of expected (0.02 -eps < 0.1*0.2 < 0.02 +eps).

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You can also add 0.5 in order to do a poor man's rounding: Math.floor(x*PREC_LIM + 0.5)/PREC_LIM –  cmroanirgo Dec 4 '12 at 4:31
Note though, that e.g. Math.floor(-2.1) is -3. So perhaps use e.g. Math[x<0?'ceil':'floor'](x*PREC_LIM)/PREC_LIM –  MikeM Jan 20 '13 at 22:57

The result you've got is correct and fairly consistent across floating point implementations in different languages, processors and operating systems - the only thing that changes is the level of the inaccuracy when the float is actually a double (or higher).

0.1 in binary floating points is like 1/3 in decimal (i.e. 0.3333333333333... forever), there's just no accurate way to handle it.

If you're dealing with floats always expect small rounding errors, so you'll also always have to round the displayed result to something sensible. In return you get very very fast and powerful arithmetic because all the computations are in the native binary of the processor.

Most of the time the solution is not to switch to fixed-point arithmetic, mainly because it's much slower and 99% of the time you just don't need the accuracy. If you're dealing with stuff that does need that level of accuracy (for instance financial transactions) Javascript probably isn't the best tool to use anyway (as you've want to enforce the fixed-point types a static language is probably better).

You're looking for the elegant solution then I'm afraid this is it: floats are quick but have small rounding errors - always round to something sensible when displaying their results.

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var times = function (a, b) {
return Math.round((a * b) * 100)/100;
};

---or---

var fpFix = function (n) {
return Math.round(n * 100)/100;
};

fpFix(0.1*0.2); // -> 0.02

---also---

var fpArithmetic = function (op, x, y) {
var n = {
'*': x * y,
'-': x - y,
'+': x + y,
'/': x / y
}[op];

return Math.round(n * 100)/100;
};

--- as in ---

fpArithmetic('*', 0.1, 0.2);
// 0.02

fpArithmetic('+', 0.1, 0.2);
// 0.3

fpArithmetic('-', 0.1, 0.2);
// -0.1

fpArithmetic('/', 0.2, 0.1);
// 2
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I think that would give the same problem as a result. You return a floating point so a big chance the return value will also be "incorrect". –  Gertjan Aug 9 '10 at 12:10

Have a look at Fixed-point arithmetic. It will probably solve your problem, if the range of numbers you want to operate on is small (eg, currency). I would round it off to a few decimal values, which is the simplest solution.

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Do you know maybe know any fixed-point libs for JavaScript? –  Juri Sep 22 '09 at 7:47
The problem is not floating point vs. fixed point, the problem is binary vs. decimal. –  Michael Borgwardt Aug 9 '10 at 12:33

not elegant but does the job (removes trailing zeros)

var num = 0.1*0.2;
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toFixed doesn't always work: stackoverflow.com/questions/661562/… –  Sam Hasler Oct 25 '10 at 10:22

Try my chiliadic arithmetic library, which you can see here. If you want a later version, I can get you one.

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You can't represent most decimal fractions exactly with binary floating point types (which is what ECMAScript uses to represent floating point values). So there isn't an elegant solution unless you use arbitrary precision arithmetic types or a decimal based floating point type. For example, the Calculator app that ships with Windows now uses arbitrary precision arithmetic to solve this problem.

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You are right, the reason for that is limited precision of floating point numbers. Store your rational numbers as a division of two integer numbers and in most situations you'll be able to store numbers without any precision loss. When it comes to printing, you may want to display the result as fraction. With representation I proposed, it becomes trivial.

Of course that won't help much with irrational numbers. But you may want to optimize your computations in the way they will cause the least problem (e.g. detecting situations like sqrt(3)^2).

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You are right, the reason for that is limited precision of floating point numbers<pedant> actually, the OP put it down to imprecise floating point operations, which is wrong </pedant> –  detly Aug 10 '10 at 7:40

To avoid this you should work with integer values instead of floating points. So when you want to have 2 positions precision work with the values * 100, for 3 positions use 1000. When displaying you use a formatter to put in the separator.

Many systems omit working with decimals this way. That is the reason why many systems work with cents (as integer) instead of dollars/euro's (as floating point).

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You could use a regex to check if the number ends with a long string of 0s followed by a small remainder:

// using max number of 0s = 8, maximum remainder = 4 digits
x = 0.1048000000000051
parseFloat(x.toString().replace(/(\.[\d]+[1-9])0{8,}[1-9]{0,4}/, '\$1'), 10)
// = 0.1048
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To multiply a * b, where a = 5 and b = 0.0001:

1. Shift decimal point of a right until number becomes int: 0.0001 -> 1
2. Shift decimal point of b right by the same number of places: 5 -> 50000
3. Multiply: 1 * 50000
4. Shift decimal point of result left by same number of places: 0.0005

function multiply (a, b) {
// get number of decimal places to shift
exp = b.toString().length - 2;

function makeInt (num) {
return num * Math.pow(10, exp);
}

function makeFloat(num) {
return num / Math.pow(100, exp);
}

return makeFloat(makeInt(a) * makeInt(b));
}

multiply (5, 0.0001);

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This works for me:

function round_up( value, precision ) {
var pow = Math.pow ( 10, precision );
return ( Math.ceil ( pow * value ) + Math.ceil ( pow * value - Math.ceil ( pow * value ) ) ) / pow;
}

round_up(341.536, 2); // 341.54
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Use

var x = 0.1*0.2;
x =Math.round(x*Math.pow(10,2))/Math.pow(10,2);
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Hmm...but note, this always rounds to 2 decimals. That would of course be an option, but what about the calculation 0.55*0.55 (since I don't know the exact numbers in advance. That would give 0.3 instead of 0.3025. Of course I could then use Math.round(x*Math.pow(10,4))/Math.pow(10,4);. Rounding is always an option, but I just wanted to know whether there is some better solution –  Juri Sep 22 '09 at 8:38

I have a workaround here. Just multiplying with 10E^x doesn't work with 1.1 for example.

function sum(a,b){
var tabA = (a + "").split(".");
var tabB = (b + "").split(".");
decA = tabA.length>1?tabA[1].length:0;
decB = tabB.length>1?tabB[1].length:0;
a = (tabA[0]+tabA[1])*1.0;
b = (tabB[0]+tabB[1])*1.0;
var diff = decA-decB;
if(diff >0){
//a has more decimals than b
b=b*Math.pow(10,diff);
return (a+b)/Math.pow(10,decA);
}else if (diff<0){
//a has more decimals than b
a=a*Math.pow(10,-diff);
return (a+b)/Math.pow(10,decB);
}else{
return (a+b)/Math.pow(10,decA);
}
}

scary but working :)

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