I'm doing some digital signal processing calculations in javascript, and I found that calculating the hyperbolic tangent (tanh) is a bit too expensive. This is how I currently approximate tanh:

function tanh (arg) {
    // sinh(number)/cosh(number)
    return (Math.exp(arg) - Math.exp(-arg)) / (Math.exp(arg) + Math.exp(-arg));

Anyone knows a faster way to calculate it?

  • 2
    you need to specify two key pieces of information (a) what's the domain of your input argument, (b) what accuracy you need.
    – Jason S
    May 25, 2011 at 15:42
  • 2
    Now ES6 provides this natively. Nov 8, 2015 at 7:49

8 Answers 8


From here.

function rational_tanh(x)
    if( x < -3 )
        return -1;
    else if( x > 3 )
        return 1;
        return x * ( 27 + x * x ) / ( 27 + 9 * x * x );

This is a rational function to approximate a tanh-like soft clipper. It is based on the pade-approximation of the tanh function with tweaked coefficients.

The function is in the range x=-3..3 and outputs the range y=-1..1. Beyond this range the output must be clamped to -1..1.

The first to derivatives of the function vanish at -3 and 3, so the transition to the hard clipped region is C2-continuous.

The Padé approximation is magnitudes better than the Taylor expansion. The clamping may also be an issue (depending on your range).

  • Great! What if I have an arbitrary range? Simply scaling the coefficents would be right? (eg: range [-1,1] -> return x * ( 9 + x * x ) / ( 9 + 3 * x * x )) May 24, 2011 at 23:47
  • 1
    I don't think so. From what I understand, 3 was chosen because the first two derivatives vanish at -3 and 3 (remember that we're only using the first 3 elements from the approximation). I don't think scaling the coefficients will give the desired result. May 24, 2011 at 23:54
  • @janesconference, I just graphed it to double-check and yeah, you don't want to do that :) May 25, 2011 at 0:03
  • @janesconference for outer range coefs use taylor
    – Adrian
    Jan 5, 2012 at 5:28
  • Plotted (without clips at 3) fooplot.com/… Jul 10, 2014 at 16:54

You could do this and cut your performance time in half:

function tanh(arg) {
    var pos = Math.exp(arg);
    var neg = Math.exp(-arg);
    return (pos - neg) / (pos + neg);
  • in ff4, the test was 41% slower for your solution :( May 24, 2011 at 23:52
  • @janesconference: Whoa! I see that too in ff4 - I saw the performance boost using Chrome. May 25, 2011 at 1:23

Not sure of how big the performance increase will be, but

(exp(x) - exp(-x))/(exp(x) + exp(-x)) = (exp(2x) - 1)/(exp(2x) + 1)

You'll cut the number of exps in half.


For an accurate answer using fewer Math.exp()s, you can use the relationship between tanh and the logistic function. Tanh(x) is exactly 2 * logistic(2 * x) - 1, and expanding out the logistic function, you get:

  function one_exp_tanh(x){
      return 2.0 / (1.0 + exp(-2.0 * x)) - 1.0;

I don't know whether that is faster in javascript though.


ES6 provides this method and many other trig functions natively:

  • Math.sinh – hyperbolic sine of a number
  • Math.cosh – hyperbolic cosine of a number
  • Math.tanh – hyperbolic tangent of a number
  • Math.asinh – hyperbolic arc-sine of a number
  • Math.acosh – hyperbolic arc-cosine of a number
  • Math.atanh – hyperbolic arc-tangent of a number
  • Math.hypot – square root of the sum of squares

most probably it would be faster than most of JS alternatives.


You could always cut the formula off at a certain number level of accuracy.

function tanh (x) {
    return arg - (x * x * x / 3) + (2 * x * x * x * x * x / 15);
  • 3
    The taylor expansion's accuracy is pretty bad though.
    – dee-see
    May 24, 2011 at 23:36
  • Agreed. It's a ton faster, but it really does depend. May 24, 2011 at 23:38
  • arg is x, I suppose? This is very useful. Could you point me to a general rule to cut the formula to an arbitrary level of accuracy? May 24, 2011 at 23:38
  • 1
    Yes, sorry. x is arg. The general Taylor expansion is wolframalpha.com/input/?i=tanh. May 24, 2011 at 23:39

this is my answer to this problem

function tanh(x){
     var e = Math.exp(2*x)
     return (e-1)/(e+1)


Calling that function on chrome takes less than three times of what it takes to call an empty function f(){} so I think that you are not going to gain much with any rewriting.

The problem is the function overhead, not the formula. May be inlining it could save something more interesting...


To make the test what I did was just opening a console in Chrome (ctrl-shift-C) and created a timing function with

timeit = function(f) {
     var start=(new Date).getTime();
     for (var i=0; i<100000; i++)
     return (new Date).getTime() - start;

and then tested it with function(){} and with your function.

It turns out however that this kind of test is very unreliable. I even got absurd results with timeit(f1) reporting 200 and timeit(f2) reporting 120 (quite a difference) but f1 and f2 were indeed two variables linked to the same function object. Also there was a difference between timeit(f) and timeit(function(x){ return Math.cos(x); }) even when f was exactly that function.

May be there is an explanation because of how V8 and the javascript console interact but I don't know what it is.

Also with FF4 this approach gives very unreliable results...

  • I'm gonna try that. By the way, how did you profile that? (I'm on ff4 and I do the profiling with firebug) May 24, 2011 at 23:49

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