I have not found any clear benchmark about this subject so I made one. I will post it here in case anybody is looking for this like me.

I have one question though. Isn't SSE supposed to be 4 times faster than four fpu RSQRT in a loop? It is faster but a merely 1.5 times. Is moving to SSE registers having this much impact because I do not do a lot of calculations, but only rsqrt? Or is it because SSE rsqrt is much more precise, how do I find how many iterations sse rsqrt does? The two results:

```
4 align16 float[4] RSQRT: 87011us 2236.07 - 2236.07 - 2236.07 - 2236.07
4 SSE align16 float[4] RSQRT: 60008us 2236.07 - 2236.07 - 2236.07 - 2236.07
```

**Edit**

Compiled using MSVC 11 `/GS- /Gy /fp:fast /arch:SSE2 /Ox /Oy- /GL /Oi`

on AMD Athlon II X2 270

The test code:

```
#include <iostream>
#include <chrono>
#include <th/thutility.h>
int main(void)
{
float i;
//long i;
float res;
__declspec(align(16)) float var[4] = {0};
auto t1 = std::chrono::high_resolution_clock::now();
for(i = 0; i < 5000000; i+=1)
res = sqrt(i);
auto t2 = std::chrono::high_resolution_clock::now();
std::cout << "1 float SQRT: " << std::chrono::duration_cast<std::chrono::microseconds>(t2-t1).count() << "us " << res << std::endl;
t1 = std::chrono::high_resolution_clock::now();
for(i = 0; i < 5000000; i+=1)
{
thutility::math::rsqrt(i, res);
res *= i;
}
t2 = std::chrono::high_resolution_clock::now();
std::cout << "1 float RSQRT: " << std::chrono::duration_cast<std::chrono::microseconds>(t2-t1).count() << "us " << res << std::endl;
t1 = std::chrono::high_resolution_clock::now();
for(i = 0; i < 5000000; i+=1)
{
thutility::math::rsqrt(i, var[0]);
var[0] *= i;
}
t2 = std::chrono::high_resolution_clock::now();
std::cout << "1 align16 float[4] RSQRT: " << std::chrono::duration_cast<std::chrono::microseconds>(t2-t1).count() << "us " << var[0] << std::endl;
t1 = std::chrono::high_resolution_clock::now();
for(i = 0; i < 5000000; i+=1)
{
thutility::math::rsqrt(i, var[0]);
var[0] *= i;
thutility::math::rsqrt(i, var[1]);
var[1] *= i + 1;
thutility::math::rsqrt(i, var[2]);
var[2] *= i + 2;
}
t2 = std::chrono::high_resolution_clock::now();
std::cout << "3 align16 float[4] RSQRT: "
<< std::chrono::duration_cast<std::chrono::microseconds>(t2-t1).count() << "us "
<< var[0] << " - " << var[1] << " - " << var[2] << std::endl;
t1 = std::chrono::high_resolution_clock::now();
for(i = 0; i < 5000000; i+=1)
{
thutility::math::rsqrt(i, var[0]);
var[0] *= i;
thutility::math::rsqrt(i, var[1]);
var[1] *= i + 1;
thutility::math::rsqrt(i, var[2]);
var[2] *= i + 2;
thutility::math::rsqrt(i, var[3]);
var[3] *= i + 3;
}
t2 = std::chrono::high_resolution_clock::now();
std::cout << "4 align16 float[4] RSQRT: "
<< std::chrono::duration_cast<std::chrono::microseconds>(t2-t1).count() << "us "
<< var[0] << " - " << var[1] << " - " << var[2] << " - " << var[3] << std::endl;
t1 = std::chrono::high_resolution_clock::now();
for(i = 0; i < 5000000; i+=1)
{
var[0] = i;
__m128& cache = reinterpret_cast<__m128&>(var);
__m128 mmsqrt = _mm_rsqrt_ss(cache);
cache = _mm_mul_ss(cache, mmsqrt);
}
t2 = std::chrono::high_resolution_clock::now();
std::cout << "1 SSE align16 float[4] RSQRT: " << std::chrono::duration_cast<std::chrono::microseconds>(t2-t1).count()
<< "us " << var[0] << std::endl;
t1 = std::chrono::high_resolution_clock::now();
for(i = 0; i < 5000000; i+=1)
{
var[0] = i;
var[1] = i + 1;
var[2] = i + 2;
var[3] = i + 3;
__m128& cache = reinterpret_cast<__m128&>(var);
__m128 mmsqrt = _mm_rsqrt_ps(cache);
cache = _mm_mul_ps(cache, mmsqrt);
}
t2 = std::chrono::high_resolution_clock::now();
std::cout << "4 SSE align16 float[4] RSQRT: "
<< std::chrono::duration_cast<std::chrono::microseconds>(t2-t1).count() << "us " << var[0] << " - "
<< var[1] << " - " << var[2] << " - " << var[3] << std::endl;
system("PAUSE");
}
```

Results using **float** type:

```
1 float SQRT: 24996us 2236.07
1 float RSQRT: 28003us 2236.07
1 align16 float[4] RSQRT: 32004us 2236.07
3 align16 float[4] RSQRT: 51013us 2236.07 - 2236.07 - 5e+006
4 align16 float[4] RSQRT: 87011us 2236.07 - 2236.07 - 2236.07 - 2236.07
1 SSE align16 float[4] RSQRT: 46999us 2236.07
4 SSE align16 float[4] RSQRT: 60008us 2236.07 - 2236.07 - 2236.07 - 2236.07
```

**My conclusion is not it is not worth bothering with SSE2 unless we make calculations on no less than 4 variables. (Maybe this applies to only rsqrt here but it is an expensive calculation (it also includes multiple multiplications) so it probably applies to other calculations too)**

**Also sqrt(x) is faster than x*rsqrt(x) with two iterations, and x*rsqrt(x) with one iteration is too inaccurate for distance calculation.**

**So the statements that I have seen on some boards that x*rsqrt(x) is faster than sqrt(x) is wrong. So it is not logical and does not worth the precision loss to use rsqrt instead of sqrt unless you directly need 1/x^(1/2).**

Tried with no SSE2 flag (in case it applied SSE on normal rsqrt loop, it gave same results).

My RSQRT is a modified (same) version of quake rsqrt.

```
namespace thutility
{
namespace math
{
void rsqrt(const float& number, float& res)
{
const float threehalfs = 1.5F;
const float x2 = number * 0.5F;
res = number;
uint32_t& i = *reinterpret_cast<uint32_t *>(&res); // evil floating point bit level hacking
i = 0x5f3759df - ( i >> 1 ); // what the fuck?
res = res * ( threehalfs - ( x2 * res * res ) ); // 1st iteration
res = res * ( threehalfs - ( x2 * res * res ) ); // 2nd iteration, this can be removed
}
}
}
```

`_mm_rsqrt_ss`

instead of`_mm_rsqrt_ps`

). Am I missing something? – jalf Mar 2 '13 at 14:51minimalsample, one which only generates the benchmarks that actually matter, with as little additional code as possible. :) – jalf Mar 2 '13 at 14:52