I'm currently working on a VR app based on three.js
The problem I need to solve is that the equirectangular images, that are loaded into the panoramic viewer often have yaw/pitch/roll - which has a huge impact on the rest of the application.
Now I want the user to correct the rotation in an easy, interactive manner (setting yaw/pitch/roll manually as input values drives one mad) and I came up with the following solution:
The idea is to prompt the user to select three points: Two on the floor and one on the ceiling (a point that is above of one of the points on the floor). In the background I get the intersections with the panoramic sphere and calculate yaw/pitch/roll.
Now I got so far to get the intersections (vectors) of the mouse-pano-sphere interaction. However I just don't get the rest working. Tried it with three's lookAt() on the user-selected vectors and to modify the rotatePlane() method of https://codepen.io/maurizzzio/pen/GjAPYj to fit my use case:
rotatePlane() {
const vec1 = new Vector3().copy(this.floorPointMain.position).normalize();
const vec2 = new Vector3().copy(this.floorPointOne.position).normalize();
const vec3 = new Vector3().copy(this.ceilingPoint.position).normalize();
const xy = new THREE.Vector3().subVectors(vec2, vec1);
const xz = new THREE.Vector3().subVectors(vec3, vec1);
const normal = new THREE.Vector3().crossVectors(xy, xz).normalize();
const Z = new THREE.Vector3(0, 0, 1);
const axis = new THREE.Vector3().crossVectors(Z, normal).normalize();
const angle = Math.acos(Z.dot(normal));
const q = new THREE.Quaternion().setFromAxisAngle(axis, angle);
this.orientationGrid.rotation.setFromQuaternion(q);
this.floorPointOne.rotation.setFromQuaternion(q);
this.floorPointMain.rotation.setFromQuaternion(q);
this.ceilingPoint.rotation.setFromQuaternion(q);
const distanceToPlane = vec1.dot(normal);
}
see my current result of above:
However it just won't work and after two days of searching the web and trying a lot, I'm starting to get mad and be very desperate for help.
Please help - with three.js formulas or abstraction help - because I'm not even sure anymore if the very basic idea of solving the rotation problem is right...
Thanks a lot!