Chapter 6: Rotating Shapes

Understanding Rotated Coordinate Systems

Figure 6.1


An airplane and its coordinate system

Specifying Rotation Axes

Figure 6.2a


An airplane's coordinate system tilted up. Compare with Figures 6.2b and c

Figure 6.2b


An airplane's coordinate system turned to the side. Compare with Figures 6.2a and c

Figure 6.2c


An airplane's coordinate system banked on its side. Compare with Figures 6.2a and b

Specifying Rotation Angles

Figure 6.3a


The right-hand rule to determine a positive/negative rotation angle around the X axis. Compare with Figures 6.3b and c

Figure 6.3b


The right-hand rule to determine a positive/negative rotation angle around the Y axis. Compare with Figures 6.3a and c

Figure 6.3c


The right-hand rule to determine a positive/negative rotation angle around the Z axis. Compare with Figures 6.3a and b

Translating and Rotating

Specifying a Rotation Center

The Transform Node Syntax

Experimenting with Rotation

Rotating in Different Directions

Figure 6.4b


Rotating 45.0 degrees about the X axis and building a cone

Figure 6.5b


Rotating -45.0 degrees about the X axis and building a cone

Figure 6.6b


Rotating 45.0 degrees about the Y axis and building a cone

Figure 6.7b


Rotating -45.0 degrees about the Z axis and building a box

Constructing Multiple Rotated Coordinate Systems

Figure 6.8


A 3-D asterisk created with cylinders built within one vertical and two rotated coordinate systems

Nesting Rotated Coordinate Systems

Figure 6.9


A 3-D asterisk ball built with cylinders in rotated coordinate systems

Translating and Rotating Coordinate Systems

Figure 6.10


An archway with pieces of the roof built within translated, rotated coordinate systems

Rotating About a Center Point

Figure 6.11


The lower arm of a desk lamp, rotated using a center of rotation at the lower end of the arm

Figure 6.12


The first and second arms of the desk lamp, each rotated using a center of rotation at the lower end of each arm

Summary