Proved by: Not Applicable
References: Set Theory Vocabulary
Justifications: Not Applicable
Specializations: Not Applicable
Generalizations: Not Applicable
Negation
- The opposite of [For all
is true]
is [There existsfor which is not true].
Above,stands for “property.” Symbollically, the sentence is written
The opposite ofis .
Another standard notation foris , where the bar | means “such that.” - The opposite of [There exists
for which P(x) is true]
is [For allis not true].
Symbolically the same sentence is written
The opposite ofis .
Remark. A mathematical statement is true if and only if its opposite is true.
Another way to say this is that the opposite of a statement being true implies the statement to be true.
Example: The statement “All eleven-legged alligators are orange with blue spots” is true, since if it were false, then there would exist an eleven-legged alligator that is not orange with blue spots.
The statement “All eleven-legged alligators are black with white stripes” is equally true.