I am googling the question for past hour, but there are only points to Taylor Series or some sample code that is either too slow or does not compile at all. Well, most answer I've found over Google is "Google it, it's already asked", but sadly it's not...

I am profiling my game on low-end Pentium 4 and found out that ~85% of execution time is wasted on calculating sinus, cosinus and square root (from standard C++ library in Visual Studio), and this seems to be heavily CPU dependent (on my I7 the same functions got only 5% of execution time, and the game is waaaaaaaaaay faster). I cannot optimize this three functions out, nor calculate both sine and cosine in one pass (there interdependent), but I don't need too accurate results for my simulation, so I can live with faster approximation.

So, the question: What are the fastest way to calculate sine, cosine and square root for float in C++?

EDIT Lookup table are more painful as resulting Cache Miss is way more costly on modern CPU than Taylor Series. The CPUs are just so fast these days, and cache is not.

I made a mistake, I though that I need to calculate several factorials for Taylor Series, and I see now they can be implemented as constants.

So the updated question: is there any speedy optimization for square root as well?


I am using square root to calculate distance, not normalization - can't use fast inverse square root algorithm (as pointed in comment: http://en.wikipedia.org/wiki/Fast_inverse_square_root


I also cannot operate on squared distances, I need exact distance for calculations

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    For the inverse square root (which is common, since it is involved in vector normalization), there is a well known formula (en.wikipedia.org/wiki/Fast_inverse_square_root), but honestly it is a bit outdated, and probably 1.0/sqrt(x) will enable some compiler optimization. – sbabbi Sep 6 '13 at 16:26
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    have a look at this for sine and cosine: devmaster.net/forums/topic/4648-fast-and-accurate-sinecosine – user2366842 Sep 6 '13 at 16:26
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    How about dectecting the CPU and using a native instruction on a modern processor with a lookup table or other optimized code on older machines. – drescherjm Sep 6 '13 at 16:39
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    When asking this kind of question, you need to specify your conditions much more precisely. Do you have any information on the distribution of the numbers for which you'll have to compute sin/cos/sqrt (say they are all close to 0)? Do you have specific constraints on the precision (say, does sin(0) absolutely have to be 0)? etc. Any extra information gives a way to improve the solution. – Marc Glisse Sep 6 '13 at 17:51

15 Answers 15


The fastest way is to pre-compute values an use a table like in this example:

Create sine lookup table in C++

BUT if you insist upon computing at runtime you can use the Taylor series expansion of sine or cosine...

Taylor Series of sine

For more on the Taylor series... http://en.wikipedia.org/wiki/Taylor_series

One of the keys to getting this to work well is pre-computing the factorials and truncating at a sensible number of terms. The factorials grow in the denominator very quickly, so you don't need to carry more than a few terms.

Also...Don't multiply your x^n from the start each time...e.g. multiply x^3 by x another two times, then that by another two to compute the exponents.

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  • And as for square root? – PiotrK Sep 6 '13 at 16:29
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    He said at the start of his post that he doesn't like Taylor series but didn't explain why. – rliu Sep 6 '13 at 16:29
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    @roliu My mistake, I though I have to calculate Factorial several times, but I missed that I can use precomputed constant – PiotrK Sep 6 '13 at 16:31
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    There's an interesting link in the question comments that shows a method even better than the Taylor series. – Mark Ransom Sep 6 '13 at 16:41
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    This is not the best way to calculate sin/cos in terms of efficiency. There are old answers in stackoverflow that had already discussed this in great detail. Also - GSL GNU scientific library, which is the standard numerical library used everywhere, also does not use that. Knowing the best numerical procedure allows you to balance accuracy/speed more precisely. – Vivian Miranda Sep 7 '13 at 0:06

Here's the guaranteed fastest possible sine function in C++:

double FastSin(double x)
    return 0;

Oh, you wanted better accuracy than |1.0|? Well, here is a sine function that is similarly fast:

double FastSin(double x)
    return x;

This answer actually does not suck, when x is close to zero. For small x, sin(x) is approximately equal to x, because x is the first term of the Taylor expansion of sin(x).

What, still not accurate enough for you? Well read on.

Engineers in the 1970s made some fantastic discoveries in this field, but new programmers are simply unaware that these methods exist, because they're not taught as part of standard computer science curricula.

You need to start by understanding that there is no "perfect" implementation of these functions for all applications. Therefore, superficial answers to questions like "which one is fastest" are guaranteed to be wrong.

Most people who ask this question don't understand the importance of the tradeoffs between performance and accuracy. In particular, you are going to have to make some choices regarding the accuracy of the calculations before you do anything else. How much error can you tolerate in the result? 10^-4? 10^-16?

Unless you can quantify the error in any method, don't use it. See all those random answers below mine, that post a bunch of random uncommented source code, without clearly documenting the algorithm used and its exact maximum error across the input range? "The error is approximately sort of mumble mumble I would guess." That's strictly bush league. If you don't know how to calculate the PRECISE maximum error, to FULL precision, in your approximation function, across the ENTIRE range of the inputs... then you don't know how to write an approximation function!

No one uses the Taylor series alone to approximate transcendentals in software. Except for certain highly specific cases, Taylor series generally approach the target slowly across common input ranges.

The algorithms that your grandparents used to calculate transcendentals efficiently, are collectively referred to as CORDIC and were simple enough to be implemented in hardware. Here is a well documented CORDIC implementation in C. CORDIC implementations, usually, require a very small lookup table, but most implementations don't even require that a hardware multiplier be available. Most CORDIC implementations let you trade off performance for accuracy, including the one I linked.

There's been a lot of incremental improvements to the original CORDIC algorithms over the years. For example, last year some researchers in Japan published an article on an improved CORDIC with better rotation angles, which reduces the operations required.

If you have hardware multipliers sitting around (and you almost certainly do), or if you can't afford a lookup table like CORDIC requires, you can always use a Chebyshev polynomial to do the same thing. Chebyshev polynomials require multiplies, but this is rarely a problem on modern hardware. We like Chebyshev polynomials because they have highly predictable maximum errors for a given approximation. The maximum of the last term in a Chebyshev polynomial, across your input range, bounds the error in the result. And this error gets smaller as the number of terms gets larger. Here's one example of a Chebyshev polynomial giving a sine approximation across a huge range, ignoring the natural symmetry of the sine function and just solving the approximation problem by throwing more coefficients at it. And here's an example of estimating a sine function to within 5 ULPs. Don't know what an ULP is? You should.

We also like Chebyshev polynomials because the error in the approximation is equally distributed across the range of outputs. If you're writing audio plugins or doing digital signal processing, Chebyshev polynomials give you a cheap and predictable dithering effect "for free."

If you want to find your own Chebyshev polynomial coefficients across a specific range, many math libraries call the process of finding those coefficients "Chebyshev fit" or something like that.

Square roots, then as now, are usually calculated with some variant of the Newton-Raphson algorithm, usually with a fixed number of iterations. Usually, when someone cranks out an "amazing new" algorithm for doing square roots, it's merely Newton-Raphson in disguise.

Newton-Raphson, CORDIC, and Chebyshev polynomials let you trade off speed for accuracy, so the answer can be just as imprecise as you want.

Lastly, when you've finished all your fancy benchmarking and micro-optimization, make sure that your "fast" version is actually faster than the library version. Here is a typical library implementation of fsin() bounded on the domain from -pi/4 to pi/4. And it just ain't that damned slow.

One last caution to you: you're almost certainly using IEEE-754 math to perform your estimations, and anytime you're performing IEEE-754 math with a bunch of multiplies, then some obscure engineering decisions made decades ago will come back to haunt you, in the form of roundoff errors. And those errors start small, but they get bigger, and Bigger, and BIGGER! At some point in your life, please read "What every computer scientist should know about floating point numbers" and have the appropriate amount of fear. Keep in mind that if you start writing your own transcendental functions, you'll need to benchmark and measure the ACTUAL error due to floating-point roundoff, not just the maximum theoretical error. This is not a theoretical concern; "fast math" compilation settings have bit me in the butt, on more than one project.

tl:dr; go google "sine approximation" or "cosine approximation" or "square root approximation" or "approximation theory."

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    For float/double, most platforms have efficient hardware sqrt. On x86, hardware sqrt is faster than anything you could cook up yourself, except using the hardware fast approximate reciprocal sqrt instruction. I guess without a hardware FPU, or if it has very slow sqrt but fast multiply, NR could be a win. – Peter Cordes May 18 '17 at 21:00
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    The x86 hardware itself is doing a Newton-Raphson iterative approximation. – johnwbyrd Jun 30 '17 at 2:41
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    It doesn't matter how the hardware is wired up; all that matters is how fast it is relative to an FP multiply (or fused multiply-add). The sqrt instruction is a black box that spits out correctly-rounded sqrt results extremely fast (e.g. on Skylake with 12 cycle latency, one per 3 cycle throughput). You can't beat that with a Newton-Raphson iteration starting with rsqrtps (approximate reciprocal sqrt). Using just rsqrtps (giving 12-bit precision) is faster, or if you need the sqrt instead of the reciprocal, x * approx_rsqrt(x) is somewhat faster than sqrt(x). – Peter Cordes Jun 30 '17 at 2:51
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    Unless you bottleneck on uop throughput rather than sqrt latency, in which case using plain sqrtps is faster even than rsqrtps + fmaddps, because it sqrtps decodes to a single uop (the table-lookup + Newton-Raphson happens inside the divider unit, not driven by microcode which would compete with other instructions for execution resources). – Peter Cordes Jun 30 '17 at 2:55
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    If you declare FastSine as constexpr, it will be even faster. – davidhigh Feb 6 '19 at 12:41

First, the Taylor series is NOT the best/fastest way to implement sine/cos. It is also not the way professional libraries implement these trigonometric functions, and knowing the best numerical implementation allows you to tweak the accuracy to get speed more efficiently. In addition, this problem has already been extensively discussed in StackOverflow. Here is just one example.

Second, the big difference you see between old/new PCS is due to the fact that modern Intel architecture has explicit assembly code to calculate elementary trigonometric functions. It is quite hard to beat them on execution speed.

Finally, let's talk about the code on your old PC. Check gsl gnu scientific library (or numerical recipes) implementation, and you will see that they basically use Chebyshev Approximation Formula.

Chebyshev approximation converges faster, so you need to evaluate fewer terms. I won't write implementation details here because there are already very nice answers posted on StackOverflow. Check this one for example . Just tweak the number of terms on this series to change the balance between accuracy/speed.

For this kind of problem, if you want implementation details of some special function or numerical method, you should take a look on GSL code before any further action - GSL is THE STANDARD numerical library.

EDIT: you may improve the execution time by including aggressive floating point optimization flags in gcc/icc. This will decrease the precision, but it seems that is exactly what you want.

EDIT2: You can try to make a coarse sin grid and use gsl routine (gsl_interp_cspline_periodic for spline with periodic conditions) to spline that table (the spline will reduce the errors in comparison to a linear interpolation => you need less points on your table => less cache miss)!

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For square root, there is an approach called bit shift.

A float number defined by IEEE-754 is using some certain bit represent describe times of multiple based 2. Some bits are for represent the base value.

float squareRoot(float x)
  unsigned int i = *(unsigned int*) &x;

  // adjust bias
  i  += 127 << 23;
  // approximation of square root
  i >>= 1;

  return *(float*) &i;

That's a constant time calculating the squar root

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  • What is the purpose of taking the address of i then casting it to float* before dereferencing it again? – Nubcake Aug 20 '17 at 0:10
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    en.wikipedia.org/wiki/… – johnwbyrd Sep 29 '17 at 3:31
  • @Nubcake type punning. Knowing the ieee representation of float, this can work. – Red.Wave May 23 '18 at 17:57

Based on the idea of http://forum.devmaster.net/t/fast-and-accurate-sine-cosine/9648 and some manual rewriting to improve the performance in a micro benchmark I ended up with the following cosine implementation which is used in a HPC physics simulation that is bottlenecked by repeated cos calls on a large number space. It's accurate enough and much faster than a lookup table, most notably no division is required.

template<typename T>
inline T cos(T x) noexcept
    constexpr T tp = 1./(2.*M_PI);
    x *= tp;
    x -= T(.25) + std::floor(x + T(.25));
    x *= T(16.) * (std::abs(x) - T(.5));
    x += T(.225) * x * (std::abs(x) - T(1.));
    return x;

The Intel compiler at least is also smart enough in vectorizing this function when used in a loop.

If EXTRA_PRECISION is defined, the maximum error is about 0.00109 for the range -π to π, assuming T is double as it's usually defined in most C++ implementations. Otherwise, the maximum error is about 0.056 for the same range.

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  • theres a division in the first line – Hexo Jul 6 '16 at 19:33
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    Yes, but that is a compile-time constant division which is infinitely cheap at runtime :P – milianw Jul 7 '16 at 8:36
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    I'd like to see a benchmark against standard library cosine. stackoverflow.com/questions/824118/why-is-floor-so-slow – johnwbyrd Nov 5 '17 at 4:12
  • @johnwbyrd I don't have access to a license of the Intel compiler anymore, where the difference was the biggest. Reason being as I said that it managed to vectorize the above function and surrounding code, whereas it didn't do that as nicely for std::cos. The link to "floor is slow" also shows how -ffast-math helps alleviate the issue somewhat. ICC does this by default. – milianw Nov 6 '17 at 11:36
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    For all those other visual learners out there that wanna see how this black mathgic works: desmos.com/calculator/cbuhbme355 – Chet Jun 27 at 6:05

For x86, the hardware FP square root instructions are fast (sqrtss is sqrt Scalar Single-precision). Single precision is faster than double-precision, so definitely use float instead of double for code where you can afford to use less precision.

For 32bit code, you usually need compiler options to get it to do FP math with SSE instructions, rather than x87. (e.g. -mfpmath=sse)

To get C's sqrt() or sqrtf() functions to inline as just sqrtsd or sqrtss, you need to compile with -fno-math-errno. Having math functions set errno on NaN is generally considered a design mistake, but the standard requires it. Without that option, gcc inlines it but then does a compare+branch to see if the result was NaN, and if so calls the library function so it can set errno. If your program doesn't check errno after math functions, there is no danger in using -fno-math-errno.

You don't need any of the "unsafe" parts of -ffast-math to get sqrt and some other functions to inline better or at all, but -ffast-math can make a big difference (e.g. allowing the compiler to auto-vectorize in cases where that changes the result, because FP math isn't associative.

e.g. with gcc6.3 compiling float foo(float a){ return sqrtf(a); }

foo:    # with -O3 -fno-math-errno.
    sqrtss  xmm0, xmm0

foo:   # with just -O3
    pxor    xmm2, xmm2   # clang just checks for NaN, instead of comparing against zero.
    sqrtss  xmm1, xmm0
    ucomiss xmm2, xmm0
    ja      .L8          # take the slow path if 0.0 > a
    movaps  xmm0, xmm1

.L8:                     # errno-setting path
    sub     rsp, 24
    movss   DWORD PTR [rsp+12], xmm1   # store the sqrtss result because the x86-64 SysV ABI has no call-preserved xmm regs.
    call    sqrtf                      # call sqrtf just to set errno
    movss   xmm1, DWORD PTR [rsp+12]
    add     rsp, 24
    movaps  xmm0, xmm1    # extra mov because gcc reloaded into the wrong register.

gcc's code for the NaN case seems way over-complicated; it doesn't even use the sqrtf return value! Anyway, this is the kind of mess you actually get without -fno-math-errno, for every sqrtf() call site in your program. Mostly it's just code-bloat, and none of the .L8 block will ever run when taking the sqrt of a number >= 0.0, but there's still several extra instructions in the fast path.

If you know that your input to sqrt is non-zero, you can use the fast but very approximate reciprocal sqrt instruction, rsqrtps (or rsqrtss for the scalar version). One Newton-Raphson iteration brings it up to nearly the same precision as the hardware single-precision sqrt instruction, but not quite.

sqrt(x) = x * 1/sqrt(x), for x!=0, so you can calculate a sqrt with rsqrt and a multiply. These are both fast, even on P4 (was that still relevant in 2013)?

On P4, it may be worth using rsqrt + Newton iteration to replace a single sqrt, even if you don't need to divide anything by it.

See also an answer I wrote recently about handling zeroes when calculating sqrt(x) as x*rsqrt(x), with a Newton Iteration. I included some discussion of rounding error if you want to convert the FP value to an integer, and links to other relevant questions.


  • sqrtss: 23c latency, not pipelined
  • sqrtsd: 38c latency, not pipelined
  • fsqrt (x87): 43c latency, not pipelined
  • rsqrtss / mulss: 4c + 6c latency. Possibly one per 3c throughput, since they apparently don't need the same execution unit (mmx vs. fp).

  • SIMD packed versions are somewhat slower


  • sqrtss/sqrtps: 12c latency, one per 3c throughput
  • sqrtsd/sqrtpd: 15-16c latency, one per 4-6c throughput
  • fsqrt (x87): 14-21cc latency, one per 4-7c throughput
  • rsqrtss / mulss: 4c + 4c latency. One per 1c throughput.
  • SIMD 128b vector versions are the same speed. 256b vector versions are a bit higher latency, almost half throughput. The rsqrtss version has full performance for 256b vectors.

With a Newton Iteration, the rsqrt version is not much if at all faster.

Numbers from Agner Fog's experimental testing. See his microarch guides to understand what makes code run fast or slow. Also see links at the tag wiki.

IDK how best to calculate sin/cos. I've read that the hardware fsin / fcos (and the only slightly slower fsincos that does both at once) are not the fastest way, but IDK what is.

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QT has fast implementations of sine (qFastSin) and cosine (qFastCos) that uses look up table with interpolation. I'm using it in my code and they are faster than std:sin/cos and precise enough for what I need (error ~= 0.01% I would guess):


#define QT_SINE_TABLE_SIZE 256

inline qreal qFastSin(qreal x)
   int si = int(x * (0.5 * QT_SINE_TABLE_SIZE / M_PI)); // Would be more accurate with qRound, but slower.
   qreal d = x - si * (2.0 * M_PI / QT_SINE_TABLE_SIZE);
   int ci = si + QT_SINE_TABLE_SIZE / 4;
   si &= QT_SINE_TABLE_SIZE - 1;
   ci &= QT_SINE_TABLE_SIZE - 1;
   return qt_sine_table[si] + (qt_sine_table[ci] - 0.5 * qt_sine_table[si] * d) * d;

inline qreal qFastCos(qreal x)
   int ci = int(x * (0.5 * QT_SINE_TABLE_SIZE / M_PI)); // Would be more accurate with qRound, but slower.
   qreal d = x - ci * (2.0 * M_PI / QT_SINE_TABLE_SIZE);
   int si = ci + QT_SINE_TABLE_SIZE / 4;
   si &= QT_SINE_TABLE_SIZE - 1;
   ci &= QT_SINE_TABLE_SIZE - 1;
   return qt_sine_table[si] - (qt_sine_table[ci] + 0.5 * qt_sine_table[si] * d) * d;

The LUT and license can be found here: https://code.woboq.org/qt5/qtbase/src/corelib/kernel/qmath.cpp.html#qt_sine_table

These pair of functions take radian inputs. The LUT covers the entire 2π input range. The function interpolates between values using the difference d, using the cosine (with a similar interpolation using sine again) as the derivative.

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    I remember that Stephen Landrum implemented this technique at 3DO around 1993. – johnwbyrd Apr 1 at 4:55
  • Good luck figuring out the implicit error by the way. – johnwbyrd Apr 16 at 23:23
  • @johnwbyrd Someone posted the worst case error here: stackoverflow.com/a/7725752 – Adriel Jr May 11 at 16:55
  • That estimate does not take into account floating point rounding effects. – johnwbyrd Jun 15 at 22:08

Sharing my code, it's a 6th degree polynomial, nothing special but rearranged to avoid pows. On Core i7 this is 2.3 times slower than standard implementation, although a bit faster for [0..2*PI] range. For an old processor this could be an alternative to standard sin/cos.

    On [-1000..+1000] range with 0.001 step average error is: +/- 0.000011, max error: +/- 0.000060
    On [-100..+100] range with 0.001 step average error is:   +/- 0.000009, max error: +/- 0.000034
    On [-10..+10] range with 0.001 step average error is:     +/- 0.000009, max error: +/- 0.000030
    Error distribution ensures there's no discontinuity.

const double PI          = 3.141592653589793;
const double HALF_PI     = 1.570796326794897;
const double DOUBLE_PI   = 6.283185307179586;
const double SIN_CURVE_A = 0.0415896;
const double SIN_CURVE_B = 0.00129810625032;

double cos1(double x) {
    if (x < 0) {
        int q = -x / DOUBLE_PI;
        q += 1;
        double y = q * DOUBLE_PI;
        x = -(x - y);
    if (x >= DOUBLE_PI) {
        int q = x / DOUBLE_PI;
        double y = q * DOUBLE_PI;
        x = x - y;
    int s = 1;
    if (x >= PI) {
        s = -1;
        x -= PI;
    if (x > HALF_PI) {
        x = PI - x;
        s = -s;
    double z = x * x;
    double r = z * (z * (SIN_CURVE_A - SIN_CURVE_B * z) - 0.5) + 1.0;
    if (r > 1.0) r = r - 2.0;
    if (s > 0) return r;
    else return -r;

double sin1(double x) {
    return cos1(x - HALF_PI);
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I use the following CORDIC code to compute trigonometric functions in quadruple precision. The constant N determines the number of bits of precision required (for example N=26 will give single precision accuracy). Depending on desired accuracy, the precomputed storage can be small and will fit in the cache. It only requires addition and multiplication operations and is also very easy to vectorize.

The algorithm pre-computes sin and cos values for 0.5^i, i=1,...,N. Then, we can combine these precomputed values, to compute sin and cos for any angle up to a resolution of 0.5^N

template <class QuadReal_t>
QuadReal_t sin(const QuadReal_t a){
  const int N=128;
  static std::vector<QuadReal_t> theta;
  static std::vector<QuadReal_t> sinval;
  static std::vector<QuadReal_t> cosval;
    #pragma omp critical (QUAD_SIN)

      QuadReal_t t=1.0;
      for(int i=0;i<N;i++){

      for(int i=N-2;i>=0;i--){

  QuadReal_t t=(a<0.0?-a:a);
  QuadReal_t sval=0.0;
  QuadReal_t cval=1.0;
  for(int i=0;i<N;i++){
      QuadReal_t sval_=sval*cosval[i]+cval*sinval[i];
      QuadReal_t cval_=cval*cosval[i]-sval*sinval[i];
  return (a<0.0?-sval:sval);
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This is a sinus implementation that should be quite fast, it works like this:

it has an arithemtical implementation of square rooting complex numbers

from analitical math with complex numbers you know that the angle is halfed when a complex number is square rooted

You can take a complex number whose angle you already know (e.g. i, has angle 90 degrees or PI / 2 radians)

Than by square rooting it you can get complex numbers of form cos (90 / 2^n) + i sin (90 / 2^n)

from analitical math with complex numbers you know that when two numbers multiply their angles add up

you can show the number k (one you get as an argument in sin or cos) as sum of angles 90 / 2^n and then get the resulting values by multiplying those complex numbers you precomputed

result will be in form cos k + i sin k

#define PI 3.14159265
#define complex pair <float, float>

/* this is square root function, uses binary search and halves mantisa */

float sqrt(float a) {

    float b = a;

    int *x = (int*) (&b); // here I get integer pointer to float b which allows me to directly change bits from float reperesentation

    int c = ((*x >> 23) & 255) - 127; // here I get mantisa, that is exponent of 2 (floats are like scientific notation 1.111010101... * 2^n)

    if(c < 0) c = -((-c) >> 1); // ---
                                //   |--> This is for halfing the mantisa
    else c >>= 1;               // ---

    *x &= ~(255 << 23); // here space reserved for mantisa is filled with 0s

    *x |= (c + 127) << 23; // here new mantisa is put in place

    for(int i = 0; i < 5; i++) b = (b + a / b) / 2; // here normal square root approximation runs 5 times (I assume even 2 or 3 would be enough)

    return b;

/* this is a square root for complex numbers (I derived it in paper), you'll need it later */

complex croot(complex x) {

    float c = x.first, d = x.second;

    return make_pair(sqrt((c + sqrt(c * c + d * d)) / 2), sqrt((-c + sqrt(c * c + d * d)) / 2) * (d < 0 ? -1 : 1));

/* this is for multiplying complex numbers, you'll also need it later */

complex mul(complex x, complex y) {

    float a = x.first, b = x.second, c = y.first, d = y.second;

    return make_pair(a * c - b * d, a * d + b * c);

/* this function calculates both sinus and cosinus */

complex roots[24];

float angles[24];

void init() {

    complex c = make_pair(-1, 0); // first number is going to be -1

    float alpha = PI; // angle of -1 is PI

    for(int i = 0; i < 24; i++) {

        roots[i] = c; // save current c

        angles[i] = alpha; // save current angle

        c = croot(c); // root c

        alpha *= 0.5; // halve alpha

complex cosin(float k) {

    complex r = make_pair(1, 0); // at start 1

    for(int i = 0; i < 24; i++) {

        if(k >= angles[i]) { // if current k is bigger than angle of c

            k -= angles[i]; // reduce k by that number

            r = mul(r, roots[i]); // multiply the result by c

    return r; // here you'll have a complex number equal to cos k + i sin k.

float sin(float k) {

    return cosin(k).second;

float cos(float k) {

    return cosin(k).first;

Now if you still find it slow you can reduce number of iterations in function cosin (note that the precision will be reduced)

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  • johnwbyrd hahah good point, I'll change that EDIT: Although in my code PI doesn't doesn't bare much weight, the only reason it's there is cause it's usual for trig functions to use radians as input – Fran x1024 Apr 16 at 23:43

This is an implementation of Taylor Series method previously given in akellehe's answer.

unsigned int Math::SIN_LOOP = 15;
unsigned int Math::COS_LOOP = 15;

// sin(x) = x - x^3/3! + x^5/5! - x^7/7! + ...
template <class T>
T Math::sin(T x)
    T Sum       = 0;
    T Power     = x;
    T Sign      = 1;
    const T x2  = x * x;
    T Fact      = 1.0;
    for (unsigned int i=1; i<SIN_LOOP; i+=2)
        Sum     += Sign * Power / Fact;
        Power   *= x2;
        Fact    *= (i + 1) * (i + 2);
        Sign    *= -1.0;
    return Sum;

// cos(x) = 1 - x^2/2! + x^4/4! - x^6/6! + ...
template <class T>
T Math::cos(T x)
    T Sum       = x;
    T Power     = x;
    T Sign      = 1.0;
    const T x2  = x * x;
    T Fact      = 1.0;
    for (unsigned int i=3; i<COS_LOOP; i+=2)
        Power   *= x2;
        Fact    *= i * (i - 1);
        Sign    *= -1.0;
        Sum     += Sign * Power / Fact;
    return Sum;
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So let me rephrase that, this idea comes from approximating the cosine & sine functions on an interval [-pi/4,+pi/4] with a bounded error using the Remez algorithm. Then using the range reduced float remainder and a LUT for the outputs cos & sine of the integer quotient, the approximation can be moved to any angular argument.

Its just unique and I thought it could be expanded on to make a more efficient algorithm in terms of a bounded error.

void sincos_fast(float x, float *pS, float *pC){
    float cosOff4LUT[] = { 0x1.000000p+00,  0x1.6A09E6p-01,  0x0.000000p+00, -0x1.6A09E6p-01, -0x1.000000p+00, -0x1.6A09E6p-01,  0x0.000000p+00,  0x1.6A09E6p-01 };

    int     m, ms, mc;
    float   xI, xR, xR2;
    float   c, s, cy, sy;

    // Cody & Waite's range reduction Algorithm, [-pi/4, pi/4]
    xI  = floorf(x * 0x1.45F306p+00 + 0.5);              // This is 4/pi.
    xR  = (x - xI * 0x1.920000p-01) - xI*0x1.FB5444p-13; // This is pi/4 in two parts per C&W.
    m   = (int) xI;
    xR2 = xR*xR;

    // Find cosine & sine index for angle offsets indices
    mc = (  m  ) & 0x7;     // two's complement permits upper modulus for negative numbers =P
    ms = (m + 6) & 0x7;     // phase correction for sine.

    // Find cosine & sine
    cy = cosOff4LUT[mc];     // Load angle offset neighborhood cosine value 
    sy = cosOff4LUT[ms];     // Load angle offset neighborhood sine value 

    c = 0xf.ff79fp-4 + xR2 * (-0x7.e58e9p-4);               // TOL = 1.2786e-4
    // c = 0xf.ffffdp-4 + xR2 * (-0x7.ffebep-4 + xR2 * 0xa.956a9p-8);  // TOL = 1.7882e-7

    s = xR * (0xf.ffbf7p-4 + xR2 * (-0x2.a41d0cp-4));   // TOL = 4.835251e-6
    // s = xR * (0xf.fffffp-4 + xR2 * (-0x2.aaa65cp-4 + xR2 * 0x2.1ea25p-8));  // TOL = 1.1841e-8

    *pC = c*cy - s*sy;      
    *pS = c*sy + s*cy;

float sqrt_fast(float x){
    union {float f; int i; } X, Y;
    float ScOff;
    uint8_t e;

    X.f = x;
    e = (X.i >> 23);           // f.SFPbits.e;

    if(x <= 0) return(0.0f);

    ScOff = ((e & 1) != 0) ? 1.0f : 0x1.6a09e6p0;  // NOTE: If exp=EVEN, b/c (exp-127) a (EVEN - ODD) := ODD; but a (ODD - ODD) := EVEN!!

    e = ((e + 127) >> 1);                            // NOTE: If exp=ODD,  b/c (exp-127) then flr((exp-127)/2)
    X.i = (X.i & ((1uL << 23) - 1)) | (0x7F << 23);  // Mask mantissa, force exponent to zero.
    Y.i = (((uint32_t) e) << 23);

    // Error grows with square root of the exponent. Unfortunately no work around like inverse square root... :(
    // Y.f *= ScOff * (0x9.5f61ap-4 + X.f*(0x6.a09e68p-4));        // Error = +-1.78e-2 * 2^(flr(log2(x)/2))
    // Y.f *= ScOff * (0x7.2181d8p-4 + X.f*(0xa.05406p-4 + X.f*(-0x1.23a14cp-4)));      // Error = +-7.64e-5 * 2^(flr(log2(x)/2))
    // Y.f *= ScOff * (0x5.f10e7p-4 + X.f*(0xc.8f2p-4 +X.f*(-0x2.e41a4cp-4 + X.f*(0x6.441e6p-8))));     // Error =  8.21e-5 * 2^(flr(log2(x)/2))
    // Y.f *= ScOff * (0x5.32eb88p-4 + X.f*(0xe.abbf5p-4 + X.f*(-0x5.18ee2p-4 + X.f*(0x1.655efp-4 + X.f*(-0x2.b11518p-8)))));   // Error = +-9.92e-6 * 2^(flr(log2(x)/2))
    // Y.f *= ScOff * (0x4.adde5p-4 + X.f*(0x1.08448cp0 + X.f*(-0x7.ae1248p-4 + X.f*(0x3.2cf7a8p-4 + X.f*(-0xc.5c1e2p-8 + X.f*(0x1.4b6dp-8))))));   // Error = +-1.38e-6 * 2^(flr(log2(x)/2))
    // Y.f *= ScOff * (0x4.4a17fp-4 + X.f*(0x1.22d44p0 + X.f*(-0xa.972e8p-4 + X.f*(0x5.dd53fp-4 + X.f*(-0x2.273c08p-4 + X.f*(0x7.466cb8p-8 + X.f*(-0xa.ac00ep-12)))))));    // Error = +-2.9e-7 * 2^(flr(log2(x)/2))
    Y.f *= ScOff * (0x3.fbb3e8p-4 + X.f*(0x1.3b2a3cp0 + X.f*(-0xd.cbb39p-4 + X.f*(0x9.9444ep-4 + X.f*(-0x4.b5ea38p-4 + X.f*(0x1.802f9ep-4 + X.f*(-0x4.6f0adp-8 + X.f*(0x5.c24a28p-12 ))))))));   // Error = +-2.7e-6 * 2^(flr(log2(x)/2))


The longer expressions are longer, slower, but more precise. Polynomials are written per Horner's rule.

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  • 1
    This does not explain how you computed the constants (what is the algorithm used), there is an error on x2 that should read xR2, and it's computed error is much much larger than the other answers. Also, I've benchmarked it and it twice slower than milianw answers. The comments doesn't make any sense (the last commented line stated that the error is lower than the uncommented code, why?) – xryl669 Feb 6 '19 at 18:28

An approximation for the sine function that preserves the derivatives at multiples of 90 degrees is given by this formula. The derivation is similar to Bhaskara I's sine approximation formula, but the constraints are to set the values and derivatives at 0, 90, and 180 degrees to that of the sine function. You can use this if you need the function to be smooth everywhere.

#define PI 3.141592653589793

double fast_sin(double x) {
    x /= 2 * PI;
    x -= (int) x;

    if (x <= 0.5) {
        double t = 2 * x * (2 * x - 1);
        return (PI * t) / ((PI - 4) * t - 1);
    else {
        double t = 2 * (1 - x) * (1 - 2 * x);
        return -(PI * t) / ((PI - 4) * t - 1);

double fast_cos(double x) {
    return fast_sin(x + 0.5 * PI);

As for its speed, it at least outperforms the std::sin() function by an average of 0.3 microseconds per call. And the maximum absolute error is 0.0051.

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Just use the FPU with inline x86 for Wintel apps. The direct CPU sqrt function is reportedly still beating any other algorithms in speed. My custom x86 Math library code is for standard MSVC++ 2005 and forward. You need separate float/double versions if you want more precision which I covered. Sometimes the compiler's "__inline" strategy goes bad, so to be safe, you can remove it. With experience, you can switch to macros to totally avoid a function call each time.

extern __inline float  __fastcall fs_sin(float x);
extern __inline double __fastcall fs_Sin(double x);
extern __inline float  __fastcall fs_cos(float x);
extern __inline double __fastcall fs_Cos(double x);
extern __inline float  __fastcall fs_atan(float x);
extern __inline double __fastcall fs_Atan(double x);
extern __inline float  __fastcall fs_sqrt(float x);
extern __inline double __fastcall fs_Sqrt(double x);
extern __inline float  __fastcall fs_log(float x);
extern __inline double __fastcall fs_Log(double x);

extern __inline float __fastcall fs_sqrt(float x) { __asm {
FLD x  ;// Load/Push input value

extern __inline double __fastcall fs_Sqrt(double x) { __asm {
FLD x  ;// Load/Push input value

extern __inline float __fastcall fs_sin(float x) { __asm {
FLD x  ;// Load/Push input value

extern __inline double __fastcall fs_Sin(double x) { __asm {
FLD x  ;// Load/Push input value

extern __inline float __fastcall fs_cos(float x) { __asm {
FLD x  ;// Load/Push input value

extern __inline double __fastcall fs_Cos(double x) { __asm {
FLD x  ;// Load/Push input value

extern __inline float __fastcall fs_tan(float x) { __asm {
FLD x  ;// Load/Push input value

extern __inline double __fastcall fs_Tan(double x) { __asm {
FLD x  ;// Load/Push input value

extern __inline float __fastcall fs_log(float x) { __asm {
FSTP ST(1) ;// Pop1, Pop2 occurs on return

extern __inline double __fastcall fs_Log(double x) { __asm {
FSTP ST(1) ;// Pop1, Pop2 occurs on return
| |
  • 1
    this is far slower than SSE. x87 has pretty much deprecated and you should use SSE anyway. In fact if you want to calculate sin/cos/sqrt for a lot of values then the SSE functions in Intel library can do that for multiple values at once and is significantly faster than any of the above x87 instructions – phuclv Oct 15 '19 at 2:39
  • 1
    since the question doesn't need much precision, an approximate square root using rsqrt(x) * x is even faster. See also Peter Cordes' answer above – phuclv Oct 15 '19 at 2:48

Over 100000000 test, milianw answer is 2 time slower than std::cos implementation. However, you can manage to run it faster by doing the following steps:

->use float

->don't use floor but static_cast

->don't use abs but ternary conditional

->use #define constant for division

->use macro to avoid function call

// 1 / (2 * PI)
#define FPII 0.159154943091895
//PI / 2
#define PI2 1.570796326794896619

#define _cos(x)         x *= FPII;\
                        x -= .25f + static_cast<int>(x + .25f) - 1;\
                        x *= 16.f * ((x >= 0 ? x : -x) - .5f);
#define _sin(x)         x -= PI2; _cos(x);

Over 100000000 call to std::cos and _cos(x), std::cos run on ~14s vs ~3s for _cos(x) (a little bit more for _sin(x))

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  • all of your comments make me wonder whether you actually compiled with compiler optimizations enabled. Most notably, this function should get inlined, thus using a macro or not should not make any difference whatsoever. – milianw Nov 6 '17 at 11:40
  • "Calling an inline function may or may not generate a function call, which typically incurs a very small amount of overhead. The exact situations under which an inline function actually gets inlined vary depending on the compiler; most make a good-faith effort to inline small functions (at least when optimization is enabled), but there is no requirement that they do so (C99, §6.7.4):" (stackoverflow.com/questions/5226803/…) – Hugo Zevetel Nov 13 '17 at 10:53
  • Right, it's compiler dependent, so what compiler do you use? Look at the assembly, it's not calling any function on clang or gcc: godbolt.org/g/UjAKBh I'd go as far as claiming that you can report a bug to your compiler if it's not inlining this function. Similar the compiler should do the constant devision for you, no need to obfuscate the code with a define with the constant... – milianw Nov 14 '17 at 11:18
  • Code was compiled with visual studio 2015. I made the test 1.5 years ago, and I can't remember if it was with optimization enabled or not (I agree I should have written this when answering). However, all the conditions I enumerated was kept because they lower the execution time. In more, it seems to me that disabled optimization is a more restrictive condition than enabled optimization, so it means the previous code is working in more case (if optimization was disabled). – Hugo Zevetel Nov 16 '17 at 8:46
  • Concerning microsoft behavior with inline function, miscrosoft says: "the compiler does not inline a function if its address is taken or if it is too large to inline." (msdn.microsoft.com/en-us/library/cx3b23a3.aspx) that is really not clear. We can also have a look to the key word __forceinline – Hugo Zevetel Nov 16 '17 at 9:11

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