Hi,
When using the 'eul2rotm' function in MATLAB, it returns the rotation matrix in the normal form, not the transposed form. The rotation matrix returned by 'eul2rotm' represents a rotation in 3D space and is defined as:
R = eul2rotm([phi, theta, psi])
where 'phi', 'theta', and 'psi' are the rotation angles around the X, Y, and Z axes, respectively. The resulting rotation matrix 'R' represents the rotation transformation from the original coordinate system to the rotated coordinate system.
Regarding the deformation gradient and the 'affine3d' function, it expects the deformation gradient matrix to be in the transposed form. The deformation gradient matrix represents a linear transformation that combines rotation, scaling, shearing, and translation. The 'affine3d' function expects a 4x4 transformation matrix in the form:
T = [sx shx shy 0;
shx sy shxy 0;
shx shxy sz 0;
tx ty tz 1]
In this matrix, sx, sy, and sz represent the scaling factors along the X, Y, and Z axes, respectively. 'shx', 'shy', and 'shxy' represent the shearing factors, and 'tx', 'ty', and 'tz' represent the translation values.
To use the deformation gradient with 'affine3d', you need to transpose the deformation gradient matrix before passing it to the function. The resulting matrix will have the correct form for 'affine3d' to apply the desired transformation to a volume.
In summary, 'eul2rotm' returns the rotation matrix in the normal form, while the deformation gradient matrix should be transposed before using it with 'affine3d'.
Refer to the following MathWorks documentation for more information about 'eul2rotm':
