XRRigidTransform: matrix property

A Float32Array containing 16 entries which represents the 4x4 transform matrix which is described by the position and orientation properties.

All 4x4 transform matrices used in WebGL are stored in 16-element Float32Arrays. The values are stored into the array in column-major order; that is, each column is written into the array top-down before moving to the right one column and writing the next column into the array. Thus, for an array [a0, a1, a2, …, a13, a14, a15], the matrix looks like this:

$$\begin{bmatrix} a[0] & a[4] & a[8] & a[12]\ a[1] & a[5] & a[9] & a[13]\ a[2] & a[6] & a[10] & a[14]\ a[3] & a[7] & a[11] & a[15]\ \end{bmatrix}$$

On the first request, the matrix gets computed. After that, it should be cached for performance reasons.

In this section, intended for more advanced readers, we cover how the API calculates the matrix for the specified transform. It begins by allocating a new matrix and writing a 4x4 identity matrix into it:

$$\begin{bmatrix} 1 & 0 & 0 & 0\ 0 & 1 & 0 & 0\ 0 & 0 & 1 & 0\ 0 & 0 & 0 & 1 \end{bmatrix}$$

This is a transform that will not change either the orientation or position of any point, vector, or object to which it's applied.

Next, the position is placed into the right-hand column, like this, resulting in a translation matrix that will transform a coordinate system by the specified distance in each dimension, with no rotational change. Here p_x, p_y, and p_z are the values of the x, y, and z members of the DOMPointReadOnly position.

$$\begin{bmatrix} 1 & 0 & 0 & x\ 0 & 1 & 0 & y\ 0 & 0 & 1 & z\ 0 & 0 & 0 & 1 \end{bmatrix}$$

Then a rotation matrix is created by computing a column-vector rotation matrix from the unit quaternion specified by orientation:

$$\begin{bmatrix} 1 - 2(q_y^2 + q_z^2) & 2(q_xq_y - q_zq_w) & 2(q_xq_z + q_yq_w) & p_x\ 2(q_xq_y + q_zq_w) & 1 - 2(q_x^2 + q_z^2) & 2(q_yq_z - q_xq_w) & p_y\ 2(q_xq_z - q_yq_w) & 2(q_yq_z + q_xq_w) & 1 - 2(q_x^2 + q_y^2) & p_z\ 0 & 0 & 0 & 1 \end{bmatrix}$$

The final transform matrix is calculated by multiplying the translation matrix by the rotation matrix, in the order (translation * rotation). This yields the final transform matrix as returned by matrix:

$$\begin{bmatrix} 1 - 2(q_y^2 + q_z^2) & 2(q_xq_y - q_zq_w) & 2(q_xq_z + q_yq_w) & p_x\ 2(q_xq_y + q_zq_w) & 1 - 2(q_x^2 + q_z^2) & 2(q_yq_z - q_xq_w) & p_y\ 2(q_xq_z - q_yq_w) & 2(q_yq_z + q_xq_w) & 1 - 2(q_x^2 + q_y^2) & p_z\ 0 & 0 & 0 & 1 \end{bmatrix}$$

In this example, a transform is created to create a matrix which can be used as a transform during rendering of WebGL objects, in order to place objects to match a given offset and orientation. The matrix is then passed into a library function that uses WebGL to render an object matching a given name using the transform matrix specified to position and orient it.

let transform = new XRRigidTransform(
  { x: 0, y: 0.5, z: 0.5 },
  { x: 0, y: -0.5, z: -0.5, w: 1 },
);
drawGLObject("magic-lamp", transform.matrix);