IC Python API:Transformation Key

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Revision as of 18:58, 22 April 2019 by Chuck (RL) (Talk | contribs) (Animating the Box)

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Main article: RL Python Samples.

This article focuses on animating a prop by keying its transformation. This is an alternative to the usual method of animating objects by setting data on transformational components like below:

data_block = prop.GetControl("Transform").GetDataBlock()
data_block.SetData("Position/PositionX", RLPy.RTime(0), RLPy.RVariant(100))
data_block.SetData("Position/PositionY", RLPy.RTime(0), RLPy.RVariant(0))
data_block.SetData("Position/PositionZ", RLPy.RTime(0), RLPy.RVariant(50))

Necessary Modules

Besides the RLPy standard module, we'll need two system based modules to load a prop from a directory with the likes of os and winreg

import RLPy
import os
import winreg

os

The os module provides a portable way of using operating system dependent functionality.

winreg

winreg offers functions that exposes the Windows registry API to Python.

Loading a Test Prop

Let's start by loading in a box object for the purpose of animation.

# Get the iClone 7 default template path
registry = winreg.ConnectRegistry(None, winreg.HKEY_LOCAL_MACHINE)
rawKey = winreg.OpenKey(registry, r"SOFTWARE\Reallusion\iClone\7.0")
ic_template_path = os.path.abspath(
    winreg.QueryValueEx(rawKey, "Template Data")[0])

# Load Box_001.iProp
RLPy.RFileIO.LoadFile(
    ic_template_path + "//iClone Template//Props//3D Blocks//Box_001.iProp")

This gives us the following result:

IClone API Transform Key 01.png

Creating a Transformation Matrix

Next, we'll need to create a transform object and fill it with scale, rotation, and translation information. The transform object is simply a 3x3 matrix where each transformational component occupies a row.

# Create a quaternion from euler angles
m3 = RLPy.RMatrix3().FromEulerAngle(RLPy.EEulerOrder_XYZ, 0,
                                    45 * RLPy.RMath.CONST_DEG_TO_RAD, 0)[0]
q_rotation = RLPy.RQuaternion().FromRotationMatrix(m3)

# Create a transform matrix
xform = RLPy.RTransform(
    RLPy.RVector3(0.25, 0.25, 0.25),    # Scale
    q_rotation,                         # Rotation
    RLPy.RVector3(100, 0, 100)          # Translation
)

Notice that the second row of the transform matrix is occupied with a quaternion rotation. In order to input euler values, which is easier to understand by the layman, we must convert it to a rotational 3x3 matrix and convert that to a quaternion rotation.

Animating the Box