# Fast hyperbolic tangent approximation in Javascript

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?

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

From here.

``````function rational_tanh(x)
{
if( x < -3 )
return -1;
else if( x > 3 )
return 1;
else
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
• 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 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 `exp`s 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);
}
``````
• The taylor expansion's accuracy is pretty bad though. 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
• 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)
}

Math.constructor.prototype.tanh=tanh;
document.write(Math.tanh(2))
``````

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...

## EDIT

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++)
f(1);
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