I would like to extend the answer provided by @Jason S. Using a domain subdivision method similar to that described by @Jason S and using Maclaurin series approximations, an average (2-3)X speedup over the tan(), sin(), cos(), atan(), asin(), and acos() functions built into the gcc compiler with -O3 optimization was achieved. The best Maclaurin series approximating functions described below achieved double precision accuracy.

For the tan(), sin(), and cos() functions, and for simplicity, an overlapping 0 to 2pi+pi/80 domain was divided into 81 equal intervals with "anchor points" at pi/80, 3pi/80, ..., 161pi/80. Then tan(), sin(), and cos() of these 81 anchor points were evaluated and stored. With the help of trig identities, a single Maclaurin series function was developed for each trig function. Any angle between Â±infinity may be submitted to the trig approximating functions because the functions first translate the input angle to the 0 to 2pi domain. This translation overhead is included in the approximation overhead.

Similar methods were developed for the atan(), asin(), and acos() functions, where an overlapping -1.0 to 1.1 domain was divided into 21 equal intervals with anchor points at -19/20, -17/20, ..., 19/20, 21/20. Then only atan() of these 21 anchor points was stored. Again, with the help of inverse trig identities, a single Maclaurin series function was developed for the atan() function. Results of the atan() function were then used to approximate asin() and acos().

Since all inverse trig approximating functions are based on the atan() approximating function, any double-precision argument input value is allowed. However the argument input to the asin() and acos() approximating functions is truncated to the Â±1 domain because any value outside it is meaningless.

To test the approximating functions, a billion random function evaluations were forced to be evaluated (that is, the -O3 optimizing compiler was not allowed to bypass evaluating something because some computed result would not be used.) To remove the bias of evaluating a billion random numbers and processing the results, the cost of a run without evaluating any trig or inverse trig function was performed first. This bias was then subtracted off each test to obtain a more representative approximation of actual function evaluation time.

Table 2. Time spent in seconds executing the indicated function or functions one billion times. The estimates are obtained by subtracting the time cost of evaluating one billion random numbers shown in the first row of Table 1 from the remaining rows in Table 1.

Time spent in tan(): 18.0515 18.2545

Time spent in TAN3(): 5.93853 6.02349

Time spent in TAN4(): 6.72216 6.99134

Time spent in sin() and cos(): 19.4052 19.4311

Time spent in SINCOS3(): 7.85564 7.92844

Time spent in SINCOS4(): 9.36672 9.57946

Time spent in atan(): 15.7160 15.6599

Time spent in ATAN1(): 6.47800 6.55230

Time spent in ATAN2(): 7.26730 7.24885

Time spent in ATAN3(): 8.15299 8.21284

Time spent in asin() and acos(): 36.8833 36.9496

Time spent in ASINCOS1(): 10.1655 9.78479

Time spent in ASINCOS2(): 10.6236 10.6000

Time spent in ASINCOS3(): 12.8430 12.0707

(In the interest of saving space, Table 1 is not shown.) Table 2 shows the results of two separate runs of a billion evaluations of each approximating function. The first column is the first run and the second column is the second run. The numbers '1', '2', '3' or '4' in the function names indicate the number of terms used in the Maclaurin series function to evaluate the particular trig or inverse trig approximation. SINCOS#() means that both sin and cos were evaluated at the same time. Likewise, ASINCOS#() means both asin and acos were evaluated at the same time. There is little extra overhead in evaluating both quantities at the same time.

The results show that increasing the number of terms slightly increases execution time as would be expected. Even the smallest number of terms gave around 12-14 digit accuracy everywhere except for the tan() approximation near where its value approaches Â±infinity. One would expect even the tan() function to have problems there.

Similar results were obtained on a high-end MacBook Pro laptop in Unix and on a high-end desktop computer in Linux.