MyWikiBiz, Author Your Legacy — Thursday December 26, 2024
Jump to navigationJump to search
Appendices
Logical Translation Rule 1
\(\text{Logical Translation Rule 1}\!\)
|
|
|
|
\(\text{If}\!\)
|
\(s ~\text{is a sentence about things in the universe}~ X\)
|
|
\(\text{and}\!\)
|
\(p ~\text{is a proposition} ~:~ X \to \underline\mathbb{B}\)
|
|
\(\text{such that:}\!\)
|
|
|
\(\text{L1a.}\!\)
|
\(\downharpoonleft s \downharpoonright ~=~ p\)
|
|
\(\text{then}\!\)
|
\(\text{the following equations hold:}\!\)
|
|
|
\(\text{L1b}_{00}.\!\)
|
\(\downharpoonleft \operatorname{false} \downharpoonright\)
|
\(=\!\)
|
\((~)\)
|
\(=\!\)
|
\(\underline{0} ~:~ X \to \underline\mathbb{B}\)
|
|
\(\text{L1b}_{01}.\!\)
|
\(\downharpoonleft \operatorname{not}~ s \downharpoonright\)
|
\(=\!\)
|
\((\downharpoonleft s \downharpoonright)\)
|
\(=\!\)
|
\((p) ~:~ X \to \underline\mathbb{B}\)
|
|
\(\text{L1b}_{10}.\!\)
|
\(\downharpoonleft s \downharpoonright\)
|
\(=\!\)
|
\(\downharpoonleft s \downharpoonright\)
|
\(=\!\)
|
\(p ~:~ X \to \underline\mathbb{B}\)
|
|
\(\text{L1b}_{11}.\!\)
|
\(\downharpoonleft \operatorname{true} \downharpoonright\)
|
\(=\!\)
|
\(((~))\)
|
\(=\!\)
|
\(\underline{1} ~:~ X \to \underline\mathbb{B}\)
|
|
Geometric Translation Rule 1
\(\text{Geometric Translation Rule 1}\!\)
|
|
|
|
\(\text{If}\!\)
|
\(Q \subseteq X\)
|
|
\(\text{and}\!\)
|
\(p ~:~ X \to \underline\mathbb{B}\)
|
|
\(\text{such that:}\!\)
|
|
|
\(\text{G1a.}\!\)
|
\(\upharpoonleft Q \upharpoonright ~=~ p\)
|
|
\(\text{then}\!\)
|
\(\text{the following equations hold:}\!\)
|
|
|
\(\text{G1b}_{00}.\!\)
|
\(\upharpoonleft \varnothing \upharpoonright\)
|
\(=\!\)
|
\((~)\)
|
\(=\!\)
|
\(\underline{0} ~:~ X \to \underline\mathbb{B}\)
|
|
\(\text{G1b}_{01}.\!\)
|
\(\upharpoonleft {}^{_\sim} Q \upharpoonright\)
|
\(=\!\)
|
\((\upharpoonleft Q \upharpoonright)\)
|
\(=\!\)
|
\((p) ~:~ X \to \underline\mathbb{B}\)
|
|
\(\text{G1b}_{10}.\!\)
|
\(\upharpoonleft Q \upharpoonright\)
|
\(=\!\)
|
\(\upharpoonleft Q \upharpoonright\)
|
\(=\!\)
|
\(p ~:~ X \to \underline\mathbb{B}\)
|
|
\(\text{G1b}_{11}.\!\)
|
\(\upharpoonleft X \upharpoonright\)
|
\(=\!\)
|
\(((~))\)
|
\(=\!\)
|
\(\underline{1} ~:~ X \to \underline\mathbb{B}\)
|
|
Logical Translation Rule 2
\(\text{Logical Translation Rule 2}\!\)
|
|
|
|
\(\text{If}\!\)
|
\(s, t ~\text{are sentences about things in the universe}~ X\)
|
|
\(\text{and}\!\)
|
\(p, q ~\text{are propositions} ~:~ X \to \underline\mathbb{B}\)
|
|
\(\text{such that:}\!\)
|
|
|
\(\text{L2a.}\!\)
|
\(\downharpoonleft s \downharpoonright ~=~ p \quad \operatorname{and} \quad \downharpoonleft t \downharpoonright ~=~ q\)
|
|
\(\text{then}\!\)
|
\(\text{the following equations hold:}\!\)
|
|
|
\(\text{L2b}_{0}.\!\)
|
\(\downharpoonleft \operatorname{false} \downharpoonright\)
|
\(=\!\)
|
\((~)\)
|
\(=\!\)
|
\((~)\)
|
|
\(\text{L2b}_{1}.\!\)
|
\(\downharpoonleft \operatorname{neither}~ s ~\operatorname{nor}~ t \downharpoonright\)
|
\(=\!\)
|
\((\downharpoonleft s \downharpoonright)(\downharpoonleft t \downharpoonright)\)
|
\(=\!\)
|
\((p)(q)\!\)
|
|
\(\text{L2b}_{2}.\!\)
|
\(\downharpoonleft \operatorname{not}~ s ~\operatorname{but}~ t \downharpoonright\)
|
\(=\!\)
|
\((\downharpoonleft s \downharpoonright) \downharpoonleft t \downharpoonright\)
|
\(=\!\)
|
\((p) q\!\)
|
|
\(\text{L2b}_{3}.\!\)
|
\(\downharpoonleft \operatorname{not}~ s \downharpoonright\)
|
\(=\!\)
|
\((\downharpoonleft s \downharpoonright)\)
|
\(=\!\)
|
\((p)\!\)
|
|
\(\text{L2b}_{4}.\!\)
|
\(\downharpoonleft s ~\operatorname{and~not}~ t \downharpoonright\)
|
\(=\!\)
|
\(\downharpoonleft s \downharpoonright (\downharpoonleft t \downharpoonright)\)
|
\(=\!\)
|
\(p (q)\!\)
|
|
\(\text{L2b}_{5}.\!\)
|
\(\downharpoonleft \operatorname{not}~ t \downharpoonright\)
|
\(=\!\)
|
\((\downharpoonleft t \downharpoonright)\)
|
\(=\!\)
|
\((q)\!\)
|
|
\(\text{L2b}_{6}.\!\)
|
\(\downharpoonleft s ~\operatorname{or}~ t, ~\operatorname{not~both} \downharpoonright\)
|
\(=\!\)
|
\((\downharpoonleft s \downharpoonright ~,~ \downharpoonleft t \downharpoonright)\)
|
\(=\!\)
|
\((p, q)\!\)
|
|
\(\text{L2b}_{7}.\!\)
|
\(\downharpoonleft \operatorname{not~both}~ s ~\operatorname{and}~ t \downharpoonright\)
|
\(=\!\)
|
\((\downharpoonleft s \downharpoonright ~ \downharpoonleft t \downharpoonright)\)
|
\(=\!\)
|
\((p q)\!\)
|
|
\(\text{L2b}_{8}.\!\)
|
\(\downharpoonleft s ~\operatorname{and}~ t \downharpoonright\)
|
\(=\!\)
|
\(\downharpoonleft s \downharpoonright ~ \downharpoonleft t \downharpoonright\)
|
\(=\!\)
|
\(p q\!\)
|
|
\(\text{L2b}_{9}.\!\)
|
\(\downharpoonleft s ~\operatorname{is~equivalent~to}~ t \downharpoonright\)
|
\(=\!\)
|
\(((\downharpoonleft s \downharpoonright ~,~ \downharpoonleft t \downharpoonright))\)
|
\(=\!\)
|
\(((p, q))\!\)
|
|
\(\text{L2b}_{10}.\!\)
|
\(\downharpoonleft t \downharpoonright\)
|
\(=\!\)
|
\(\downharpoonleft t \downharpoonright\)
|
\(=\!\)
|
\(q\!\)
|
|
\(\text{L2b}_{11}.\!\)
|
\(\downharpoonleft s ~\operatorname{implies}~ t \downharpoonright\)
|
\(=\!\)
|
\((\downharpoonleft s \downharpoonright (\downharpoonleft t \downharpoonright))\)
|
\(=\!\)
|
\((p (q))\!\)
|
|
\(\text{L2b}_{12}.\!\)
|
\(\downharpoonleft s \downharpoonright\)
|
\(=\!\)
|
\(\downharpoonleft s \downharpoonright\)
|
\(=\!\)
|
\(p\!\)
|
|
\(\text{L2b}_{13}.\!\)
|
\(\downharpoonleft s ~\operatorname{is~implied~by}~ t \downharpoonright\)
|
\(=\!\)
|
\(((\downharpoonleft s \downharpoonright) \downharpoonleft t \downharpoonright)\)
|
\(=\!\)
|
\(((p) q)\!\)
|
|
\(\text{L2b}_{14}.\!\)
|
\(\downharpoonleft s ~\operatorname{or}~ t \downharpoonright\)
|
\(=\!\)
|
\(((\downharpoonleft s \downharpoonright)(\downharpoonleft t \downharpoonright))\)
|
\(=\!\)
|
\(((p)(q))\!\)
|
|
\(\text{L2b}_{15}.\!\)
|
\(\downharpoonleft \operatorname{true} \downharpoonright\)
|
\(=\!\)
|
\(((~))\)
|
\(=\!\)
|
\(((~))\)
|
|
Geometric Translation Rule 2
\(\text{Geometric Translation Rule 2}\!\)
|
|
|
|
\(\text{If}\!\)
|
\(P, Q \subseteq X\)
|
|
\(\text{and}\!\)
|
\(p, q ~:~ X \to \underline\mathbb{B}\)
|
|
\(\text{such that:}\!\)
|
|
|
\(\text{G2a.}\!\)
|
\(\upharpoonleft P \upharpoonright ~=~ p \quad \operatorname{and} \quad \upharpoonleft Q \upharpoonright ~=~ q\)
|
|
\(\text{then}\!\)
|
\(\text{the following equations hold:}\!\)
|
|
|
\(\text{G2b}_{0}.\!\)
|
\(\upharpoonleft \varnothing \upharpoonright\)
|
\(=\!\)
|
\((~)\)
|
\(=\!\)
|
\((~)\)
|
|
\(\text{G2b}_{1}.\!\)
|
\(\upharpoonleft \overline{P} ~\cap~ \overline{Q} \upharpoonright\)
|
\(=\!\)
|
\((\upharpoonleft P \upharpoonright)(\upharpoonleft Q \upharpoonright)\)
|
\(=\!\)
|
\((p)(q)\!\)
|
|
\(\text{G2b}_{2}.\!\)
|
\(\upharpoonleft \overline{P} ~\cap~ Q \upharpoonright\)
|
\(=\!\)
|
\((\upharpoonleft P \upharpoonright) \upharpoonleft Q \upharpoonright\)
|
\(=\!\)
|
\((p) q\!\)
|
|
\(\text{G2b}_{3}.\!\)
|
\(\upharpoonleft \overline{P} \upharpoonright\)
|
\(=\!\)
|
\((\upharpoonleft P \upharpoonright)\)
|
\(=\!\)
|
\((p)\!\)
|
|
\(\text{G2b}_{4}.\!\)
|
\(\upharpoonleft P ~\cap~ \overline{Q} \upharpoonright\)
|
\(=\!\)
|
\(\upharpoonleft P \upharpoonright (\upharpoonleft Q \upharpoonright)\)
|
\(=\!\)
|
\(p (q)\!\)
|
|
\(\text{G2b}_{5}.\!\)
|
\(\upharpoonleft \overline{Q} \upharpoonright\)
|
\(=\!\)
|
\((\upharpoonleft Q \upharpoonright)\)
|
\(=\!\)
|
\((q)\!\)
|
|
\(\text{G2b}_{6}.\!\)
|
\(\upharpoonleft P ~+~ Q \upharpoonright\)
|
\(=\!\)
|
\((\upharpoonleft P \upharpoonright ~,~ \upharpoonleft Q \upharpoonright)\)
|
\(=\!\)
|
\((p, q)\!\)
|
|
\(\text{G2b}_{7}.\!\)
|
\(\upharpoonleft \overline{P ~\cap~ Q} \upharpoonright\)
|
\(=\!\)
|
\((\upharpoonleft P \upharpoonright ~ \upharpoonleft Q \upharpoonright)\)
|
\(=\!\)
|
\((p q)\!\)
|
|
\(\text{G2b}_{8}.\!\)
|
\(\upharpoonleft P ~\cap~ Q \upharpoonright\)
|
\(=\!\)
|
\(\upharpoonleft P \upharpoonright ~ \upharpoonleft Q \upharpoonright\)
|
\(=\!\)
|
\(p q\!\)
|
|
\(\text{G2b}_{9}.\!\)
|
\(\upharpoonleft \overline{P ~+~ Q} \upharpoonright\)
|
\(=\!\)
|
\(((\upharpoonleft P \upharpoonright ~,~ \upharpoonleft Q \upharpoonright))\)
|
\(=\!\)
|
\(((p, q))\!\)
|
|
\(\text{G2b}_{10}.\!\)
|
\(\upharpoonleft Q \upharpoonright\)
|
\(=\!\)
|
\(\upharpoonleft Q \upharpoonright\)
|
\(=\!\)
|
\(q\!\)
|
|
\(\text{G2b}_{11}.\!\)
|
\(\upharpoonleft \overline{P ~\cap~ \overline{Q}} \upharpoonright\)
|
\(=\!\)
|
\((\upharpoonleft P \upharpoonright (\upharpoonleft Q \upharpoonright))\)
|
\(=\!\)
|
\((p (q))\!\)
|
|
\(\text{G2b}_{12}.\!\)
|
\(\upharpoonleft P \upharpoonright\)
|
\(=\!\)
|
\(\upharpoonleft P \upharpoonright\)
|
\(=\!\)
|
\(p\!\)
|
|
\(\text{G2b}_{13}.\!\)
|
\(\upharpoonleft \overline{\overline{P} ~\cap~ Q} \upharpoonright\)
|
\(=\!\)
|
\(((\upharpoonleft P \upharpoonright) \upharpoonleft Q \upharpoonright)\)
|
\(=\!\)
|
\(((p) q)\!\)
|
|
\(\text{G2b}_{14}.\!\)
|
\(\upharpoonleft P ~\cup~ Q \upharpoonright\)
|
\(=\!\)
|
\(((\upharpoonleft P \upharpoonright)(\upharpoonleft Q \upharpoonright))\)
|
\(=\!\)
|
\(((p)(q))\!\)
|
|
\(\text{G2b}_{15}.\!\)
|
\(\upharpoonleft X \upharpoonright\)
|
\(=\!\)
|
\(((~))\)
|
\(=\!\)
|
\(((~))\)
|
|