Category:Examples of Floor Function
Jump to navigation
Jump to search
This category contains examples of Floor Function/Definition 1.
The floor function of $x$ is defined as the supremum of the set of integers no greater than $x$:
- $\floor x := \sup \set {m \in \Z: m \le x}$
where $\le$ is the usual ordering on the real numbers.
Pages in category "Examples of Floor Function"
The following 15 pages are in this category, out of 15 total.
F
- Floor Function/Examples
- Floor Function/Examples/Floor of -1.1
- Floor Function/Examples/Floor of 0.99999
- Floor Function/Examples/Floor of 1.1
- Floor Function/Examples/Floor of 14
- Floor Function/Examples/Floor of 3
- Floor Function/Examples/Floor of 4.35
- Floor Function/Examples/Floor of 5 over 2
- Floor Function/Examples/Floor of Binary Logarithm of 35
- Floor Function/Examples/Floor of Minus 5 over 2
- Floor Function/Examples/Floor of Minus One Half
- Floor Function/Examples/Floor of One Half
- Floor Function/Examples/Floor of Root 10
- Floor Function/Examples/Floor of Root 2
- Floor Function/Examples/Floor of Root 5