Difference between revisions of "Meta-Rule/Composition"
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=Symmetries as a collection of possibilities= | |||
According to [[Mathemaniac]], symmetries can be thought of as mathematical operands that gets to be manipulated through some operations that preserves the properties of being symmetrical. These four most general properties are: | |||
# Closure: Symmetrical operations on symmetries always create symmetries | |||
# Associativity: Symmetries composition with symmetries are symmetries Associative | |||
# Identity: Doing nothing is a symmetrical operation | |||
# Inverse Exists: Symmetrical operations can be undone, and returns to the original symmetry. |
Revision as of 10:20, 27 July 2021
Symmetries as a collection of possibilities
According to Mathemaniac, symmetries can be thought of as mathematical operands that gets to be manipulated through some operations that preserves the properties of being symmetrical. These four most general properties are:
- Closure: Symmetrical operations on symmetries always create symmetries
- Associativity: Symmetries composition with symmetries are symmetries Associative
- Identity: Doing nothing is a symmetrical operation
- Inverse Exists: Symmetrical operations can be undone, and returns to the original symmetry.