Category:Negation Functions
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This category contains results about Negation Functions.
Definitions specific to this category can be found in Definitions/Negation Functions.
The negation function is the function defined on the various standard number systems as follows:
Integer Negation Function
The negation function $h: \Z \to \Z$ is defined on the set of integers as:
- $\forall n \in \Z: \map h n = -n$
Rational Negation Function
The negation function $h: \Q \to \Q$ is defined on the set of rational numbers as:
- $\forall x \in \Q: \map h x = -x$
Real Negation Function
The negation function $h: \R \to \R$ is defined on the set of real numbers as:
- $\forall x \in \R: \map h x = -x$
Complex Negation Function
The negation function $h: \R \to \R$ is defined on the set of complex numbers as:
- $\forall z = x + i y \in \C: \map h z = -x - i y$
Pages in category "Negation Functions"
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