I have a 4x4 matrix (row-major) class and a quaternion class and I'm attempting to provide conversion methods that convert between the two representations for rotations.

This is my conversion function for converting from a quaternion to a matrix, where _2 is System.Math.Pow:

```
/// <summary>
/// Converts the quaternion to it's matrix representation.
/// </summary>
/// <returns>A matrix representing the quaternion.</returns>
public Matrix ToMatrix()
{
return new Matrix(new double[,] {
{
_2(W) + _2(X) - _2(Y) - _2(Z),
(2 * X * Y) - (2 * W * Z),
(2 * X * Z) + (2 * W * Y),
0
},
{
(2 * X * Y) + (2 * W * Z),
_2(W) - _2(X) + _2(Y) - _2(Z),
(2 * Y * Z) + (2 * W * X),
0
},
{
(2 * X * Z) - (2 * W * Y),
(2 * Y * Z) - (2 * W * X),
_2(W) - _2(X) - _2(Y) + _2(Z),
0
},
{
0,
0,
0,
1
}
});
}
```

These are my two conversion functions for converting from a matrix to a quaternion. Note that they both don't work when considering X rotation.

```
/// <summary>
/// Converts the matrix to a quaternion assuming the matrix purely
/// represents rotation (any translation or scaling information will
/// result in an invalid quaternion).
/// </summary>
/// <returns>A quaternion representing the rotation.</returns>
public Quaternion ToQuaternion()
{
/* http://www.euclideanspace.com/maths/geometry/rotations/conversions/matrixToQuaternion/index.htm
*/
double tr = this.m_Data[0, 0] + this.m_Data[1, 1] + this.m_Data[2, 2];
if (tr > 0)
{
double s = _N2(tr + 1) * 2;
return new Quaternion(
(this.m_Data[2, 1] - this.m_Data[1, 2]) / s,
(this.m_Data[0, 2] - this.m_Data[2, 0]) / s,
(this.m_Data[1, 0] - this.m_Data[0, 1]) / s,
0.25 * s
);
}
else if ((this.m_Data[0, 0] > this.m_Data[1, 1]) && (this.m_Data[0, 0] > this.m_Data[2, 2]))
{
double s = _N2(1 + this.m_Data[0, 0] - this.m_Data[1, 1] - this.m_Data[2, 2]) * 2;
return new Quaternion(
0.25 * s,
(this.m_Data[0, 1] + this.m_Data[1, 0]) / s,
(this.m_Data[0, 2] + this.m_Data[2, 0]) / s,
(this.m_Data[2, 1] - this.m_Data[1, 2]) / s
);
}
else if (this.m_Data[1, 1] > this.m_Data[2, 2])
{
double s = _N2(1 + this.m_Data[1, 1] - this.m_Data[0, 0] - this.m_Data[2, 2]) * 2;
return new Quaternion(
(this.m_Data[0, 1] + this.m_Data[1, 0]) / s,
0.25 * s,
(this.m_Data[1, 2] + this.m_Data[2, 1]) / s,
(this.m_Data[0, 2] - this.m_Data[2, 0]) / s
);
}
else
{
double s = _N2(1 + this.m_Data[2, 2] - this.m_Data[0, 0] - this.m_Data[1, 1]) * 2;
return new Quaternion(
(this.m_Data[0, 2] + this.m_Data[2, 0]) / s,
(this.m_Data[1, 2] + this.m_Data[2, 1]) / s,
0.25 * s,
(this.m_Data[1, 0] - this.m_Data[0, 1]) / s
);
}
}
/// <summary>
/// This is a simpler form than above, but doesn't work for all values. It exhibits the
/// *same results* as ToQuaternion for X rotation however (i.e. both are invalid).
/// </summary>
public Quaternion ToQuaternionAlt()
{
double w = System.Math.Sqrt(1 + this.m_Data[0, 0] + this.m_Data[1, 1] + this.m_Data[2, 2]) / 2;
return new Quaternion(
(this.m_Data[2, 1] - this.m_Data[1, 2]) / (4 * w),
(this.m_Data[0, 2] - this.m_Data[2, 0]) / (4 * w),
(this.m_Data[1, 0] - this.m_Data[0, 1]) / (4 * w),
w
);
}
```

**Now my test suite has a simple test like so:**

```
[TestMethod]
public void TestMatrixXA()
{
Matrix m = Matrix.CreateRotationX(45 / (180 / System.Math.PI));
Assert.AreEqual<Matrix>(m, m.ToQuaternion().ToMatrix(), "Quaternion conversion was not completed successfully.");
}
```

This is the result I get from the test suite:

```
Expected:
{ 1, 0, 0, 0 }
{ 0, 0.707106781186548, -0.707106781186547, 0 }
{ 0, 0.707106781186547, 0.707106781186548, 0 }
{ 0, 0, 0, 1 }
Actual:
{ 1, 0, 0, 0 }
{ 0, 0.707106781186547, 0.707106781186547, 0 }
{ 0, -0.707106781186547, 0.707106781186547, 0 }
{ 0, 0, 0, 1 }
```

You will note that the two values in the matrix are inverted. I've tested it and upon each conversion back and forth (so .ToQuaternion().ToMatrix()) these fields are inverted. i.e. If I do the quaternion / matrix conversion twice I get the correct matrix.

Since the difference between the correct value and the result is so simple, I'm assuming it's something simple like a negative sign being in the wrong place, but as I'm not an expert at matrix and quaternion math, I'm having trouble finding where the problem is.

*Does anyone know what's wrong with the math?*