- #1
mnb96
- 715
- 5
Hello,
according to my book of 'Geometric Algebra' the operation of Left-Contraction for Blades has a distributive property in respect to addition. However the authors do not prove it, nor they give the smallest hint on how to derive it.
The property says that:
[tex](\textbf{A+B})|\textbf{C}=\textbf{A}|\textbf{C}+\textbf{B}|\textbf{C}[/tex]
where the symbol | denotes Left-Contraction.
Does anyone have a clue on how to prove that identity?
according to my book of 'Geometric Algebra' the operation of Left-Contraction for Blades has a distributive property in respect to addition. However the authors do not prove it, nor they give the smallest hint on how to derive it.
The property says that:
[tex](\textbf{A+B})|\textbf{C}=\textbf{A}|\textbf{C}+\textbf{B}|\textbf{C}[/tex]
where the symbol | denotes Left-Contraction.
Does anyone have a clue on how to prove that identity?