# Rotate 3D shape around its centeroid/axis

I have a 3D shape defined in STL file and I'd like to rotate it around its axis/center using Yaw, Pitch and Roll. However, I've already implemented a solution and it doesn't work as expected as it rotates the 3D shape around the origin axis instead. Here's what I've done so far (written in PHP):

``````function rotate(\$vertices, \$roll = 0, \$pitch = 0, \$yaw = 0)
{
if(!empty(\$vertices))
{
\$cosa = cos(\$yaw);
\$sina = sin(\$yaw);

\$cosb = cos(\$pitch);
\$sinb = sin(\$pitch);

\$cosc = cos(\$roll);
\$sinc = sin(\$roll);

\$Axx = \$cosa * \$cosb;
\$Axy = \$cosa * \$sinb * \$sinc - \$sina * \$cosc;
\$Axz = \$cosa * \$sinb * \$cosc + \$sina * \$sinc;

\$Ayx = \$sina * \$cosb;
\$Ayy = \$sina * \$sinb * \$sinc + \$cosa * \$cosc;
\$Ayz = \$sina * \$sinb * \$cosc - \$cosa * \$sinc;

\$Azx = -\$sinb;
\$Azy = \$cosb * \$sinc;
\$Azz = \$cosb * \$cosc;

//loop through all triangles
foreach(\$vertices as \$i => \$vertex)
{
\$px = \$vertex->x;
\$py = \$vertex->y;
\$pz = \$vertex->z;

\$points =
[
'x' => (\$Axx * \$px + \$Axy * \$py + \$Axz * \$pz),
'y' => (\$Ayx * \$px + \$Ayy * \$py + \$Ayz * \$pz),
'z' => (\$Azx * \$px + \$Azy * \$py + \$Azz * \$pz)
];

//update the vertex
\$vertices[\$i]->setVertex(\$vi, \$points);
}
}

return \$vertices;
}
``````

Please let me know if I'm missing something. any help would be appreciated.

• The code above rotates about the origin. If your centre of rotation (say, `\$c`), isn't the origin, you can move the object before rotating: `\$px = \$vertex->x - \$c->x` and so on. After rotating, move it back: `'x' => (\$Axx * \$px + \$Axy * \$py + \$Axz * \$pz) + \$c->x`, ... Dec 9, 2019 at 7:34
• @MOehm - so in other words the rotation must be executed on the origin? and there's no other way to do that? Dec 9, 2019 at 7:41
• What's wrong with that? You can, of course, create a 4×4 transformation matrix that describes both rotation and transformation, but it's essentially the same under the hood. Dec 9, 2019 at 7:51
• @MOehm - nothing is wrong with it. I was just wondering. but that works too. Thanks for your help. please add that comment as an answer so I can accept it. Dec 9, 2019 at 7:57
• @MOehm There's a small issue, so when I add the rotation for example for yaw = 1, is that in degrees or radians? because it applies a big rotating of the object Dec 9, 2019 at 8:01

The code above rotates about the origin. If your centre of rotation (say, \$c), isn't the origin, you can move the object before rotating:

``````\$px = \$vertex->x - \$c->x;
\$py = \$vertex->y - \$c->y;
\$pz = \$vertex->z - \$c->z;
``````

After rotating, move the point back to the centre of rotation:

``````\$points =
[
'x' => (\$Axx * \$px + \$Axy * \$py + \$Axz * \$pz) + \$c->x,
'y' => (\$Ayx * \$px + \$Ayy * \$py + \$Ayz * \$pz) + \$c->y,
'z' => (\$Azx * \$px + \$Azy * \$py + \$Azz * \$pz) + \$c->z
];
``````
• perfect! thanks for your help. I just converted the radians to degrees and now it's rotating perfectly. Dec 9, 2019 at 8:15