Site Navigation
Categories:
Calculus
Continuous mappings

Summary Of: Continuous function

A continuous function with a continuous... is given by the common statement that a continuous function is a function whose graph can be drawn without lifting the chalk from the blackboard... the notion of a continuous function as one whose graph you can draw without taking your pencil off the paper is... cannot be extended to a continuous function whose domain is... continuous function is the function... A continuous function on a closed interval has a maximum... A continuous function on a closed interval has a maximum... A continuous function on a closed interval has a maximum... is similar to the definition above for a continuous function but modified as follows...

Encyclodia Page On: Continuous function

These Are Links To Other Documents
calculus | Fundamental theorem | Limits of functions | Vector calculus | Matrix calculus | Mean value theorem | Differentiation | Product rule | Quotient rule | Chain rule | Change of variables | Implicit differentiation | Taylor's theorem | Related rates | List of differentiation identities | Integration | Lists of integrals | Improper integrals | parts | disks | cylindrical
shells | substitution | trigonometric substitution | partial fractions | changing order | mathematics | function | inverse function | topology | more advanced article | real numbers | metric spaces | order theory | domain theory | Scott continuity | height | classical physics | real numbers | domain | interval | graph | Cartesian plane | curve | point | domain | limit | limit point | vacuously true | domain | subset | Hölder continuity | real numbers | Cauchy | neighborhood | Heine | sequence | axiom of choice | Wacław Sierpiński | weaker | continuity (topology) | polynomial functions | real numbers | rational functions | exponential functions | logarithms | square root | trigonometric functions | absolute value | sign function | Thomae's function | composition | differentiable | absolute value | A continuous function on a closed interval has a maximum (green here) and a minimum (blue), and assumes all values between them. | | intermediate value theorem | existence theorem | completeness | closed interval | m | sign | zero | extreme value theorem | | | metric space | sequences | limits | Cauchy sequence | Gδ set | Continuous function (topology) | topological space | if and only if | open set | neighborhood | Continuity of a function at a point | metric space | neighbourhood system | open balls | Hausdorff | order theory | posets | Scott continuity | complete lattice | sup | relation | characteristic function | Semicontinuity | Piecewise | Classification of discontinuities | Uniform continuity | Absolute continuity | Equicontinuity | Lipschitz continuity | Symmetrically continuous function | Scott continuity | Normal function | Bounded linear operator | Continuous functor | Continuous stochastic process | University of Tennessee | 2001 | Categories | Calculus | Continuous mappings |
This article is licensed under the GNU Free Documentation License. It uses material from the Wikipedia article "Continuous function".