Equality as Negation
Posted: Thu Feb 03, 2022 12:39 am
A positive value has as its opposite a negative value.
Outside standard logic, a "+P" means a "positive P" thus P exists; a "-P" means a "negative P" thus P does not exist.
Taking the symbols of "+" and "-" out of the equation due to language differences, a positive P is equivalent to the negation of a negative P. Negative P contains P as the negation of negative P (which is P). P contains negative P as the negation of P. Value is derived from negation thus P and Negative P equate as one contains the other.
1. P results from the negation of negative of P.
2. Negative P results from the negation of P.
3. P results in -P through its negation; Negative P results in P through its negation.
4. Both P and Negative P result in each other through negation; they switch positions when both are nullified. Because they can switch positions, through negation alone, they equate through but not without this negation. Negation allows two seemingly opposites to equate
Outside standard logic, a "+P" means a "positive P" thus P exists; a "-P" means a "negative P" thus P does not exist.
Taking the symbols of "+" and "-" out of the equation due to language differences, a positive P is equivalent to the negation of a negative P. Negative P contains P as the negation of negative P (which is P). P contains negative P as the negation of P. Value is derived from negation thus P and Negative P equate as one contains the other.
1. P results from the negation of negative of P.
2. Negative P results from the negation of P.
3. P results in -P through its negation; Negative P results in P through its negation.
4. Both P and Negative P result in each other through negation; they switch positions when both are nullified. Because they can switch positions, through negation alone, they equate through but not without this negation. Negation allows two seemingly opposites to equate