I would like to compute both the sine and co-sine of a value together (for example to create a rotation matrix). Of course I could compute them separately one after another like `a = cos(x); b = sin(x);`

, but I wonder if there is a faster way when needing both values.

**Edit:**
To summarize the answers so far:

*Vlad*said, that there is the asm command`FSINCOS`

computing both of them (in almost the same time as a call to`FSIN`

alone)Like

*Chi*noticed, this optimization is sometimes already done by the compiler (when using optimization flags).*caf*pointed out, that functions`sincos`

and`sincosf`

are probably available and can be called directly by just including`math.h`

*tanascius*approach of using a look-up table is discussed controversial. (However on my computer and in a benchmark scenario it runs 3x faster than`sincos`

with almost the same accuracy for 32-bit floating points.)*Joel Goodwin*linked to an interesting approach of an extremly fast approximation technique with quite good accuray (for me, this is even faster then the table look-up)

`sinx ~ x-x^3/6`

and`cosx~1-x^2/4`

as approximations if you care about speed more than accuracy. You can add on terms in either series as you put more weight on accuracy (en.wikipedia.org/wiki/Taylor_series scroll down to trig taylor series.) Note this is a general way to approximate any function you want that is differntiable`n`

times. So if you have some bigger function that that sine's and cosine's belong to you will get a much bigger speed up if you approximate it instead of the sin,cos's independently. – ldog Apr 23 '10 at 3:43goodapproximation only if you need values of`x`

close to some point`x_0`

, then expand your Taylor series around`x_0`

instead of 0. This will give you excellent accuracy near`x_0`

but the farther you go the worse the results. You probably thought the accuracy sucks cause as you looked at the given asnwer and tried it for values far from`0`

. That answer is with sin,cos expanded around 0. – ldog Apr 23 '10 at 16:45