Category:Definitions/Ordering on Natural Numbers
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This category contains definitions related to Ordering on Natural Numbers.
Related results can be found in Category:Ordering on Natural Numbers.
Let $\N$ denote the natural numbers.
The ordering on $\N$ is the relation $\le$ everyone is familiar with.
For example, we use it when we say:
- James has $6$ apples, which is more than Mary, who has $4$.
which can be symbolised as:
- $6 \ge 4$
Pages in category "Definitions/Ordering on Natural Numbers"
The following 13 pages are in this category, out of 13 total.
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- Definition:Ordering on 1-Based Natural Numbers
- Definition:Ordering on Minimally Inductive Set
- Definition:Ordering on Natural Numbers
- Definition:Ordering on Natural Numbers in Real Numbers
- Definition:Ordering on Natural Numbers/1-Based
- Definition:Ordering on Natural Numbers/Minimally Inductive Set
- Definition:Ordering on Natural Numbers/Naturally Ordered Semigroup
- Definition:Ordering on Natural Numbers/Peano Structure
- Definition:Ordering on Natural Numbers/Restriction of Real Numbers
- Definition:Ordering on Natural Numbers/Von Neumann Construction
- Definition:Ordering on Naturally Ordered Semigroup
- Definition:Ordering on Peano Structure
- Definition:Ordering on Von Neumann Construction of Natural Numbers