# rotate3d shorthand

How to combine `rotateX(50deg) rotateY(20deg) rotateZ(15deg)` in shorthand `rotate3d()`?

`rotateX(50deg)` is equivalent to `rotate3d(1, 0, 0, 50deg)`

`rotateY(20deg)` is equivalent to `rotate3d(0, 1, 0, 20deg)`

`rotateZ(15deg)` is equivalent to `rotate3d(0, 0, 1, 15deg)`

So...

`rotateX(50deg) rotateY(20deg) rotateZ(15deg)`

is equivalent to

`rotate3d(1, 0, 0, 50deg) rotate3d(0, 1, 0, 20deg) rotate3d(0, 0, 1, 15deg)`

For a generic `rotate3d(x, y, z, α)`, you have the matrix

where

You now get the matrices for each of the 3 `rotate3d` transforms and you multiply them. And the resulting matrix is the matrix corresponding to the resulting single `rotate3d`. Not sure how to easy it is to extract the values for `rotate3d` out of it, but it's sure easy to extract those for a single `matrix3d`.

In the first case (`rotateX(50deg)` or `rotate3d(1, 0, 0, 50deg)`), you have:

`x = 1`, `y = 0`, `z = 0`, `α = 50deg`

So the first row of the matrix in this case is `1 0 0 0`.

The second one is `0 cos(50deg) -sin(50deg) 0`.

The third one `0 sin(50deg) cos(50deg) 0`.

And the fourth one is obviously `0 0 0 1`.

In the second case, you have `x = 0`, `y = 1`, `z = 0`, `α = 20deg`.

First row: `cos(20deg) 0 sin(20deg) 0`.

Second row: `0 1 0 0`.

Third row: `-sin(20) 0 cos(20deg) 0`.

Fourth: `0 0 0 1`

In the third case, you have `x = 0`, `y = 0`, `z = 1`, `α = 15deg`.

First row: `cos(15deg) -sin(15deg) 0 0`.

Second row `sin(15deg) cos(15deg) 0 0`.

And the third and the fourth row are `0 0 1 0` and `0 0 0 1` respectively.

Note: you may have noticed that the signs of the sin values for the rotateY transform are different than for the other two transforms. It's not a computation mistake. The reason for this is that, for the screen, you have the y-axis pointing down, not up.

So these are the three `4x4` matrices that you need to multiply in order to get the `4x4` matrix for the resulting single `rotate3d` transform. As I've said, I'm not sure how easy it can be to get the 4 values out, but the 16 elements in the 4x4 matrix are exactly the 16 parameters of the `matrix3d` equivalent of the chained transform.

EDIT:

Actually, it turns out it's pretty easy... You compute the trace (sum of diagonal elements) of the matrix for the `rotate3d` matrix.

`4 - 2*2*(1 - cos(α))/2 = 4 - 2*(1 - cos(α)) = 2 + 2*cos(α)`

You then compute the trace for the product of the three `4x4` matrices, you equate the result with `2 + 2*cos(α)` you extract `α`. Then you compute `x`, `y`, `z`.

In this particular case, if I computed correctly, the trace of the matrix resulting from the product of the three `4x4` matrices is going to be:

``````T =
cos(20deg)*cos(15deg) +
cos(50deg)*cos(15deg) - sin(50deg)*sin(20deg)*cos(15deg) +
cos(50deg)*cos(20deg) +
1
``````

So `cos(α) = (T - 2)/2 = T/2 - 1`, which means that `α = acos(T/2 - 1)`.

• Epic answer is epic. Upvoted. – Hugo Giraudel Mar 4 '13 at 19:09
• yeah I don't even know how to fact check that. I was totally going to until I saw the sin. cause it opened up my mind. when i saw the sin. shoutout ace of base – Andrew Luhring Aug 21 '13 at 4:11
• @AndrewLuhring Amazing. – aendrew Nov 21 '13 at 16:32
• looks like the best answer ever given on stackoverflow !!!!!! – Ali Jan 29 '14 at 18:13
• Note that the rotate matrix is applicable only if the `[x,y,z]` vector is normalized, that is, only if vector length `Math.sqrt(x*x + y*y + z*z)` is one. If it is not normalized, it can easily be converted into a normalized one, by diving each `x`, `y` and `z` by their length. – Jose Rui Santos Feb 2 '14 at 15:41

Syntax:

``````rotate3d(x, y, z, a)
``````

Values:

• `x` Is a `<number>` describing the x-coordinate of the vector denoting the axis of rotation.
• `y` Is a `<number>` describing the y-coordinate of the vector denoting the axis of rotation.
• `z` Is a `<number>` describing the z-coordinate of the vector denoting the axis of rotation.
• `a` Is an `<angle>` representing the angle of the rotation. A positive angle denotes a clockwise rotation, a negative angle a counter-clockwise one.

Like in :

``````.will-distort{
transform:rotate3d(10, 10, 10, 45deg);
}
``````

Fiddled here

Caniuse it here

• Answered like a sir. +1 – Michael Mar 4 '13 at 18:07
• Maybe I'm thick, but I think he's asking for an algorithm to go from the chained transform to a single `rotate3d`, not for the definition of `rotate3d`. – Ana Mar 4 '13 at 18:33
• I think he wants to know how to combine rotateX(50deg) rotateY(20deg) rotateZ(15deg) in shorthand rotate3d() in CSS – Milche Patern Mar 5 '13 at 13:03

Depends on what you are trying to do, this 'hack' could help you. Let's say you are doing animation, and you want add transformation after transformation and so on, and you don't want the CSS to look like it's doing 100's of transformations:

This works in chrome: 1. Apply whatever transform you want to an element. 2. Next time you want to add a transform, add it to the computed transform: "window.getComputedStyle(element).transform" - but make sure to put the new transform to the left. 3. Now your transform would look like "rotateZ(30deg) matrix3d(......). 4. Next time you want to add another transform, repeat the process - Chrome always reduces the transforms to matrix3d notation.

TL;DR- apply whatever transforms you want, and then get the computed matrix3d transformation.

This trick also lets you quickly (that is, without doing any math by yourself) make a functionality that rotates an object with respect to your reference frame in any direction. See the sample below:

EDIT: I have added xyz translations as well. Using this, it would be very easy to place objects in specific 3d locations with specific orientations in mind. Or...imagine a cube that bounces and changes it's spin axis with each bounce depending on how it lands!

``````	var boxContainer = document.querySelector('.translator'),
cube = document.getElementById('cube'),
optionsContainer = document.getElementById('options');
var dims = ['x', 'y', 'z'];
var currentTransform;
var currentTranslate;
var init = function () {
optionsContainer.querySelector('.xRotation input')
if (currentTransform != 'none') {
var newTransform = 'rotateX(' + (360 - event.target.value) + 'deg) ' + currentTransform;
} else {
var newTransform = 'rotateX(' + (360 - event.target.value) + 'deg)';
}
cube.style.transform = newTransform;
}, false);

optionsContainer.querySelector('.yRotation input')
if (currentTransform != 'none') {
var newTransform = 'rotateY(' + (360 - event.target.value) + 'deg) ' + currentTransform;
} else {
var newTransform = 'rotateY(' + (360 - event.target.value) + 'deg)';
}
cube.style.transform = newTransform;
}, false);

optionsContainer.querySelector('.zRotation input')

if (currentTransform != 'none') {
var newTransform = 'rotateZ(' + (360 - event.target.value) + 'deg) ' + currentTransform;
} else {
var newTransform = 'rotateZ(' + (360 - event.target.value) + 'deg)';
}
cube.style.transform = newTransform;
}, false);

optionsContainer.querySelector('.xTranslation input')

if (currentTranslate != 'none') {
var newTransform = 'translateX(' + (100 - event.target.value) + 'px) ' + currentTranslate;
} else {
var newTransform = 'translateX(' + (100 - event.target.value) + 'px)';
}
boxContainer.style.transform = newTransform;
}, false);

optionsContainer.querySelector('.yTranslation input')

if (currentTranslate != 'none') {
var newTransform = 'translateY(' + (100 - event.target.value) + 'px) ' + currentTranslate;
} else {
var newTransform = 'translateY(' + (100 - event.target.value) + 'px)';
}
boxContainer.style.transform = newTransform;
}, false);
optionsContainer.querySelector('.zTranslation input')

if (currentTranslate != 'none') {
var newTransform = 'translateZ(' + (500 - event.target.value) + 'px) ' + currentTranslate;
} else {
var newTransform = 'translateZ(' + (500 - event.target.value) + 'px)';
}
boxContainer.style.transform = newTransform;
}, false);

reset();

};

function reset() {
currentTransform = window.getComputedStyle(cube).transform;
currentTranslate = window.getComputedStyle(boxContainer).transform;
optionsContainer.querySelector('.xRotation input').value = 360;
optionsContainer.querySelector('.yRotation input').value = 360;
optionsContainer.querySelector('.zRotation input').value = 360;
optionsContainer.querySelector('.xTranslation input').value = 100;
optionsContainer.querySelector('.yTranslation input').value = 100;
optionsContainer.querySelector('.zTranslation input').value = 500;

}

``````.translator
{
height: 200px;
position: absolute;
width: 200px;
transform-style: preserve-3d;
}
.threeSpace
{
height: 200px;
moz-perspective: 1200px;
o-perspective: 1200px;
perspective: 200px;
position: absolute;
transform-origin: 50px 50px 100px;
webkit-perspective: 1200px;
width: 100px;
perspective-origin: 100px 25px;
transform-style: preserve-3d;
}
#pointer{
position:relative;
height:2px;
width:2px;
top:25px;
left:100px;
background:blue;
z-index:9999;

}

#cube
{
height: 100%;
moz-transform-origin: 90px 110px 0px;
moz-transform-style: preserve-3d;
o-transform-origin: 90px 110px 0px;
o-transform-style: preserve-3d;
position: absolute;
transform-origin: 90px 110px 0px;
transform-style: preserve-3d;
webkit-transform-origin: 90px 110px 0px;
webkit-transform-style: preserve-3d;
width: 100%;
}
#cube .midPoint{
position:absolute;
top:48px;
left:48px;
height:1px;
width:1px;
background:green;
}

#cube figure
{
border: 2px solid black;
color: white;
display: block;
font-size: 60px;
font-weight: bold;
height: 96px;
line-height: 96px;
position: absolute;
text-align: center;
width: 96px;
/* transform-style: preserve-3d; */
}
#cube .front
{
background: hsl(0, 100%, 50%);
}

#cube .back
{
background: hsl(60, 100%, 50%);
}
#cube .right
{
background: hsl(120, 100%, 50%);
}
#cube .left
{
background: hsl(180, 100%, 50%);
}
#cube .top
{
background: hsl(240, 100%, 50%);
}
#cube .bottom
{
background: hsl(300, 100%, 50%);
}
#cube .front
{
moz-transform: translateZ(50px);
o-transform: translateZ(50px);
transform: translateZ(50px);
webkit-transform: translateZ(50px);
}

#cube .back
{
moz-transform: rotateX(-180deg) translateZ(50px);
o-transform: rotateX(-180deg) translateZ(50px);
transform: rotateX(-180deg) translateZ(50px);
webkit-transform: rotateX(-180deg) translateZ(50px);
}
#cube .right
{
moz-transform: rotateY(90deg) translateZ(50px);
o-transform: rotateY(90deg) translateZ(50px);
transform: rotateY(90deg) translateZ(50px);
webkit-transform: rotateY(90deg) translateZ(50px);
}
#cube .left
{
moz-transform: rotateY(-90deg) translateZ(50px);
o-transform: rotateY(-90deg) translateZ(50px);
transform: rotateY(-90deg) translateZ(50px);
webkit-transform: rotateY(-90deg) translateZ(50px);
}
#cube .top
{
moz-transform: rotateX(90deg) translateZ(50px);
o-transform: rotateX(90deg) translateZ(50px);
transform: rotateX(90deg) translateZ(50px);
webkit-transform: rotateX(90deg) translateZ(50px);
}
#cube .bottom
{
moz-transform: rotateX(-90deg) translateZ(50px);
o-transform: rotateX(-90deg) translateZ(50px);
transform: rotateX(-90deg) translateZ(50px);
webkit-transform: rotateX(-90deg) translateZ(50px);
}
#options{
position:absolute;
width:80%;
top:40%;

}
#options input
{
width: 60%;
}``````
``````<body>

<div class="threeSpace">
<div id="pointer"></div>
<div class="translator">
<div id="cube">
<figure class="front"><div class='midPoint'></div></figure>
<figure class="back"></figure>
<figure class="right"></figure>
<figure class="left"></figure>
<figure class="top"></figure>
<figure class="bottom"></figure>
</div>
</div>
</div>
<section id="options">
<p class="xRotation">
<label>xRotation</label>
<input type="range" min="0" max="720" value="360" data-units="deg" />
</p>
<p class="yRotation">
<label>yRotation</label>
<input type="range" min="0" max="720" value="360" data-units="deg" />
</p>
<p class="zRotation">
<label>zRotation</label>
<input type="range" min="0" max="720" value="360" data-units="deg" />
</p>
<p class="xTranslation">
<label>xTranslation</label>
<input type="range" min="0" max="200" value="100" data-units="deg" />
</p>
<p class="yTranslation">
<label>yTranslation</label>
<input type="range" min="0" max="200" value="100" data-units="deg" />
</p>
<p class="zTranslation">
<label>zTranslation</label>
<input type="range" min="0" max="1000" value="500" data-units="deg" />
</p>
</section>
</body>``````

• This is one of the most useful posts ever, thnak you – damiano celent Jul 24 '16 at 20:14

The exact value is `rotate3d(133,32,58,58deg)`

See the fiddle (For chrome and Safari, using -webkit-transform)

• How exactly do you compute it? – Ana Mar 4 '13 at 18:18
• @Ana I don't, that's why your answer is 10x better :) – Bigood Feb 24 '15 at 16:28