# Make a set of 3D points rotate around a point

What is the formula for calculating the position of 3D point after it has been rotated around another 3D point a certain radians/degrees? I am using Java / LWLJGL.

Could someone just fill in the blanks in the following?
```public Vector3f rotate(Vector3f origin, Vector3f rotation) { Vector3f ret = new Vector3f(); ret.x = __________; ret.y = __________; ret.z = __________; }```

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Rotation in 3D requires two angles and is not commutative. Before we answer, can you confirm that you have both of the paramters avaiable? –  hexafraction Jun 27 '13 at 17:50
@hexafraction - Well, I was going to have 3 rotation parameters - the x, y, and z rotations (and the point to rotate around) –  functorial Jun 30 '13 at 1:23
There's no such thing as x, y, and z rotations. There are only two angles involved, just like in two dimensions only one angle is involved. To informally prove this, take a point in 2D and try to rotate it in two different independent ways. –  hexafraction Jun 30 '13 at 1:24
@hexafraction what about pitch, yaw, and roll? –  functorial Jun 30 '13 at 1:36
That can't be done with a point. A point has no internal orientation. –  hexafraction Jun 30 '13 at 1:37

## 1 Answer

Consider your fixed point has coordinates (a,b,c) and moving object (x1,y1,z1) at time `t1` and at (x2,y2,z2) at time `t2`.

option 1 you can consider projection on `x-y`plane and projection on `y-z` plane and calculate angle in that 2D space.

option 2 you can consider two vectors. say vector `A` and `B`

``````A=(x1-a)i+(y1-b)j+(z1-c)k
B=(x2-a)i+(y2-b)j+(z2-c)k
``````

Now use dot product of `A` and `B`

`````` A . B = |A||B|cos(angle)
``````
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I am confused now. What are t1, t2, A, and B? Can't you just write a method like:`public Vector3f rotate(Vector3f origin, Vector3f rotation){ float x=... float y=... float z=... }` –  functorial Jun 30 '13 at 1:26
@user2529202 Rotation is only two angles. The mathematics in this post is sound, now you can construct a method that uses the mathematics here. –  hexafraction Jun 30 '13 at 1:38
@user2529202 you no need to worry about t1 and t2. I used them to explain. you only want to know three points(fixed point and two location of rotating point). you can find A and B from those. I suggest you to learn about vectors.refer this mathsisfun.com/algebra/vectors.html. if there any thing unclear, leave a comment here. –  Ruchira Gayan Ranaweera Jun 30 '13 at 4:24