Programming languages differ in the names they use for inverse trig functions, and in some cases differ in their return values for the same inputs.

Choice of range

If sin(θ) = x, then θ is the inverse sine of x, right? Maybe. Depends on how you define the inverse sine. If -1 ≤ x ≤ 1, then there are infinitely many θ’s whose sine is x. So you have to make a choice.

The conventional choice is for inverse sine to return a value of θ in the closed interval

[-π/2, π/2].

Inverse tangent uses the same choice. However, the end points aren’t possible outputs, so inverse tangent typically returns a value in the open interval

(-π/2, π/2).

For inverse cosine, the usual choice is to return values in the closed interval

[0, π].

Naming conventions

Aside from how to define inverse trig functions, there’s the matter of what to call them. The inverse of tangent, for example, can be written tan^-1, arctan, or atan. You might even see arctg or atn or some other variation.

Most programming languages I’m aware of use atan etc. Python uses atan, but SciPy uses arctan. Mathematica uses ArcTan.

Software implementations typically follow the conventions above, and will return the same value for the same inputs, as long as inputs and outputs are real numbers.

Arctangent with two arguments

Many programming languages have a function atan2 that takes two arguments, y and x, and returns an angle whose tangent is y/x. Note that the y argument to atan2 comes first: top-down order, numerator then denominator, not alphabetical order.

However, unlike the one-argument atan function, the return value may not be in the interval (-π/2, π/2). Instead, atan2 returns an angle in the same quadrant as x and y. For example,

    atan2(-1, 1)

returns -π/4; because the point (1, -1) is in the 4th quadrant, it returns an angle in the 4th quadrant. But

    atan2(1, -1)

returns 3π/4. Here the point (-1, 1) and the angle 3π/4 are in the 2nd quadrant.

In Common Lisp, there’s no function named atan2; you just call atan with two arguments. Mathematica is similar: you call ArcTan with two arguments. However, Mathematica uses the opposite convention and takes x as its first argument and y as its second.

Complex values

Some software libraries support complex numbers and some do not. And among those that do support complex numbers, the return values may differ. This is because, as above, you have choices to make when extending these functions to complex inputs and outputs.

For example, in Python,

    math.asin(2)

returns a domain error and

    scipy.arcsin(2)

returns 1.5707964 + 1.3169578i.

In Common Lisp,

    (asin 2)

returns 1.5707964 – 1.3169578i. Both SciPy and Common Lisp return complex numbers whose sine equals 2, but they follow different conventions for what number to chose. That is, both

    scipy.sin(1.5707964 - 1.3169578j)
    scipy.sin(1.5707964 + 1.3169578j)

in Python and

    (sin #C(1.5707964 -1.3169578))
    (sin #C(1.5707964 +1.3169578))

in Common Lisp both return 2, aside from rounding error.

In C99, the function casin (complex arc sine) from <complex.h>

    double complex z = casin(2);

returns 1.5707964 + 1.3169578i. The Mathematica call

    ArcSin[2.]

returns 1.5707964 – 1.3169578i.

Branch cuts

The Common Lisp standardization committee did a very careful job of defining math functions for complex arguments. I’ve written before about this here. You don’t need to know anything about Lisp to read that post.

The committee ultimately decided to first rigorously define the two-argument arctangent function and bootstrap everything else from there. The post above explains how.

Other programming language have made different choices and so may produce different values, as demonstrated above. I mention the Common Lisp convention because they did a great job of considering every detail, such as how to handle +0 and -0 in IEEE floating point.

Suppose you want to compute the natural logarithms of every floating point number, correctly truncated to a floating point result. Here by floating point number we mean an IEEE standard 64-bit float, what C calls a double. Which logarithm is hardest to compute?

We’ll get to the hardest logarithm shortly, but we’ll first start with a warm up problem. Suppose you needed to compute the first digit of a number z. You know that z equals 2 + ε where ε is either 10^-100 or -10^-100. If ε is positive, you should return 2. If ε is negative, you should return 1. You know z to very high precision a priori, but to return the first digit correctly, you need to compute z to 100 decimal places.

In this post we’re truncating floating point numbers, i.e. rounding down, but similar considerations apply when rounding to nearest. For example, if you wanted to compute 0.5 + ε rounded to the nearest integer.

In general, it may not be possible to know how accurately you need to compute a value in order to round it correctly. William Kahan called this the table maker’s dilemma.

Worst case for logarithm

Lefèvre and Muller [1] found that the floating point number whose logarithm is hardest to compute is

x = 1.0110001010101000100001100001001101100010100110110110 × 2⁶⁷⁸

where the fractional part is written in binary. The log of x, again written in binary, is

111010110.0100011110011110101110100111110010010111000100000000000000000000000000000000000000000000000000000000000000000111 …

The first 53 significant bits, all the bits a floating point number can represent [2], are followed by 65 zeros. We have to compute the log with a precision of more than 118 bits in order to know whether the last bit of the fraction part of the float representation should be a 0 or a 1. Usually you don’t need nearly that much precision, but this is the worst case.

Mathematica code

Here is Mathematica code to verify the result above. I don’t know how to give Mathematica floating point numbers in binary, but I know how to give it integers, so I’ll multiply the fraction part by 2⁵² and take 52 from the exponent.

n = FromDigits[
  "10110001010101000100001100001001101100010100110110110", 2]
x = n  2^(678 - 52)
BaseForm[N[Log[x], 40], 2]

This computes the log of x to 40 significant decimal figures, between 132 and 133 bits, and gives the result above.

Related posts

A few days ago I wrote about another example by Jean-Michel Muller: A floating point oddity.

William Kahan also came up recently in my post on summing an array of floating point numbers.

***

[1] Vincent Lefèvre, Jean-Michel Muller. Worst Cases for Correct Rounding of the Elementary Functions in Double Precision. November 2000. Research Report 2000-35. Available here.

[2] There are 52 bits in the the faction of an IEEE double. The first bit of a fraction is 1, unless a number is subnormal, so the first bit is left implicit, squeezing out one extra bit of precision. That is, storing 52 bits gives us 53 bits of precision.

Adding up an array of numbers is simple: just loop over the array, adding each element to an accumulator.

Usually that’s good enough, but sometimes you need more precision, either because your application need a high-precision answer, or because your problem is poorly conditioned and you need a moderate-precision answer [1].

There are many algorithms for summing an array, which may be surprising if you haven’t thought about this before. This post will look at Kahan’s algorithm, one of the first non-obvious algorithms for summing a list of floating point numbers.

We will sum a list of numbers a couple ways using C’s float type, a 32-bit integer. Some might object that this is artificial. Does anyone use floats any more? Didn’t moving from float to double get rid of all our precision problems? No and no.

In fact, the use of 32-bit float types is on the rise. Moving data in an out of memory is now the bottleneck, not arithmetic operations per se, and float lets you pack more data into a giving volume of memory. Not only that, there is growing interest in floating point types even smaller than 32-bit floats. See the following posts for examples:

• 8-bit floating point
• 16-bit floating point
• Posit numbers

And while sometimes you need less precision than 32 bits, sometimes you need more precision than 64 bits. See, for example, this post.

Now for some code. Here is the obvious way to sum an array in C:

    float naive(float x[], int N) {
        float s = 0.0;
        for (int i = 0; i < N; i++) {
            s += x[i];
        }
        return s;
    }

Kahan’s algorithm is not much more complicated, but it looks a little mysterious and provides more accuracy.

    float kahan(float x[], int N) {
        float s = x[0];
        float c = 0.0;
        for (int i = 1; i < N; i++) {
            float y = x[i] - c;
            float t = s + y;
            c = (t - s) - y;
            s = t;
        }
        return s;
    }

Now to compare the accuracy of these two methods, we’ll use a third method that uses a 64-bit accumulator. We will assume its value is accurate to at least 32 bits and use it as our exact result.

    double dsum(float x[], int N) {
        double s = 0.0;
        for (int i = 0; i < N; i++) {
            s += x[i];
        }
        return s;
    }

For our test problem, we’ll use the reciprocals of the first 100,000 positive integers rounded to 32 bits as our input. This problem was taken from [2].

    #include <stdio.h&gt:
    int main() {
        int N = 100000;
        float x[N];
        for (int i = 1; i <= N; i++)
            x[i-1] = 1.0/i;
  
        printf("%.15g\n", naive(x, N));
        printf("%.15g\n", kahan(x, N));  
        printf("%.15g\n", dsum(x, N));
    }

This produces the following output.

    12.0908508300781
    12.0901460647583
    12.0901461953972

The naive method is correct to 6 significant figures while Kahan’s method is correct to 9 significant figures. The error in the former is 5394 times larger. In this example, Kahan’s method is as accurate as possible using 32-bit numbers.

Note that in our example we were not exactly trying to find the Nth harmonic number, the sum of the reciprocals of the first N positive numbers. Instead, we were using these integer reciprocals rounded to 32 bits as our input. Think of them as just data. The data happened to be produced by computing reciprocals and rounding the result to 32-bit floating point accuracy.

But what if we did want to compute the 100,000th harmonic number? There are methods for computing harmonic numbers directly, as described here.

Related posts

• Anatomy of a floating point number
• Why IEEE floating point numbers have +0 and -0
• IEEE floating point exceptions in C++

[1] The condition number of a problem is basically a measure of how much floating point errors are multiplied in the process of computing a result. A well-conditioned problem has a small condition number, and a ill-conditioned problem has a large condition number. With ill-conditioned problems, you may have to use extra precision in your intermediate calculations to get a result that’s accurate to ordinary precision.

[2] Handbook of Floating-Point Arithmetic by Jen-Michel Muller et al.

Having access to arbitrary precision arithmetic does not necessarily make numerical calculation difficulties go away. You still need to know what you’re doing.

Before you extend precision, you have to know how far to extend it. If you don’t extend it enough, your answers won’t be accurate enough. If you extend it too far, you waste resources. Maybe you’re OK wasting resources, so you extend precision more than necessary. But how far is more than necessary?

As an example, consider the problem of finding values of n such that tan(n) > n discussed a couple days ago. After writing that post, someone pointed out that these values of n are one of the sequences on OEIS. One of the values on the OEIS site is

k = 1428599129020608582548671.

Let’s verify that tan(k) > k. We’ll use our old friend bc because it supports arbitrary precision. Our k is a 25-digit number, so lets tell bc we want to work with 30 decimal places to give ourselves a little room. (bc automatically gives you a little more room than you ask for, but we’ll ask for even more.)

bc doesn’t have a tangent function, but it does have s() for sine and c() for cosine, so we’ll compute tangent as sine over cosine.

    $ bc -l
    scale = 30
    k = 1428599129020608582548671
    s(k)/c(k) - k

We expect this to return a positive value, but instead it returns

-1428599362980017942210629.31…

So is OEIS wrong? Or is bc ignoring our scale value? It turns out neither is true.

You can’t directly compute the tangent of a large number. You use range reduction to reduce it to the problem of computing the tangent of a small angle where your algorithms will work. Since tangent has period π, we reduce k mod π by computing k – ⌊k/π⌋π. That is, we subtract off as many multiples of π as we can until we get a number between 0 and π. Going back to bc, we compute

    pi = 4*a(1)
    k/pi

This returns

    454737226160812402842656.500000507033221370444866152761

and so we compute the tangent of

    t = 0.500000507033221370444866152761*pi
      = 1.570797919686740002588270178941

Since t is slightly larger than π/2, the tangent will be negative. We can’t have tan(t) greater than k because tan(t) isn’t even greater than 0. So where did things break down?

The calculation of pi was accurate to 30 significant figures, and the calculation of k/pi was accurate to 30 significant figures, given our value of pi. So far has performed as promised.

The computed value of k/pi is correct to 29 significant figures, 23 before the decimal place and 6 after. So when we take the fractional part, we only have six significant figures, and that’s not enough. That’s where things go wrong. We get a value ⌊k/π⌋ that’s greater than 0.5 in the seventh decimal place while the exact value is less than 0.5 in the 25th decimal place. We needed 25 – 6 = 19 more significant figures.

This is the core difficulty with floating point calculation: subtracting nearly equal numbers loses precision. If two numbers agree to m decimal places, you can expect to lose m significant figures in the subtraction. The error in the subtraction will be small relative to the inputs, but not small relative to the result.

Notice that we computed k/pi to 29 significant figures, and given that output we computed the fractional part exactly. We accurately computed ⌊k/π⌋π, but lost precision when we computed we subtracted that value from k.

Our error in computing k – ⌊k/π⌋π was small relative to k, but not relative to the final result. Our k is on the order of 10²⁵, and the error in our subtraction is on the order of 10^-7, but the result is on the order of 1. There’s no bug in bc. It carried out every calculation to the advertised accuracy, but it didn’t have enough working precision to produce the result we needed.

Related posts

• Quadratic formula and precision
• Computing the area of a polygon
• Math library functions that seem unnecessary