Category:Definitions/Continuous Real Functions
Jump to navigation
Jump to search
This category contains definitions related to Continuous Real Functions.
Related results can be found in Category:Continuous Real Functions.
The concept of continuity makes precise the intuitive notion that a function has no "jumps" or "holes" at a given point.
Loosely speaking, a real function $f$ is continuous at a point $p$ if and only if the graph of $f$ does not have a "break" at $p$.
Subcategories
This category has the following 3 subcategories, out of 3 total.
Pages in category "Definitions/Continuous Real Functions"
The following 38 pages are in this category, out of 38 total.
C
- Definition:Class of Continuous Real Functions
- Definition:Continuous Extension/Real Function
- Definition:Continuous on Interval
- Definition:Continuous Real Function
- Definition:Continuous Real Function at Point
- Definition:Continuous Real Function at Point/Also defined as
- Definition:Continuous Real Function at Point/Also presented as
- Definition:Continuous Real Function at Point/Definition 1
- Definition:Continuous Real Function at Point/Definition 2
- Definition:Continuous Real Function on Closed Interval
- Definition:Continuous Real Function on Half Open Interval
- Definition:Continuous Real Function on Interval
- Definition:Continuous Real Function on Open Interval
- Definition:Continuous Real Function on Subset
- Definition:Continuous Real Function/Class
- Definition:Continuous Real Function/Closed Interval
- Definition:Continuous Real Function/Everywhere
- Definition:Continuous Real Function/Half Open Interval
- Definition:Continuous Real Function/Informal Definition
- Definition:Continuous Real Function/Interval
- Definition:Continuous Real Function/Left-Continuous
- Definition:Continuous Real Function/One Side
- Definition:Continuous Real Function/Open Interval
- Definition:Continuous Real Function/Point
- Definition:Continuous Real Function/Right-Continuous
- Definition:Continuous Real Function/Subset