11246
EXPLORE
LATEST
ABOUT
AUTHORING AREA
PARTICIPATE
Your browser does not support JavaScript or it may be disabled!
Intermediate Value Theorem
If
is continuous on a closed interval
, and
is any number in the closed interval between
and
, then there is at least one number
in
such that
.
Contributed by:
Izidor Hafner
THINGS TO TRY
Gamepad Controls
SNAPSHOTS
RELATED LINKS
Intermediate Value Theorem
(
Wolfram
MathWorld
)
Bolzano's Theorem
(
Wolfram Demonstrations Project
)
PERMANENT CITATION
"
Intermediate Value Theorem
" from
the Wolfram Demonstrations Project
http://demonstrations.wolfram.com/IntermediateValueTheorem/
Contributed by:
Izidor Hafner
Share:
Embed Interactive Demonstration
New!
Just copy and paste this snippet of JavaScript code into your website or blog to put the live Demonstration on your site.
More details »
Download Demonstration as CDF »
Download Author Code »
(preview »)
Files require
Wolfram
CDF Player
or
Mathematica
.
Related Demonstrations
More by Author
Cauchy Mean-Value Theorem
Soledad Mª Sáez Martínez and Félix Martínez de la Rosa
Two Integral Mean Value Theorems
Soledad María Sáez Martínez and Félix Martínez de la Rosa
Two Integral Mean Value Theorems of Flett Type
Soledad María Sáez Martínez and Félix Martínez de la Rosa
Marden's Theorem
Bruce Torrence
Squeeze Theorem
Bruce Atwood (Beloit College)
Bolzano's Theorem
Julio Cesar de la Yncera
Lucas-Gauss Theorem
Bruce Torrence
Fermat's Theorem on Stationary Points
Julio Cesar de la Yncera
Mapping a Convergent Sequence by a Continuous Function
Izidor Hafner
A Convergent Sequence Satisfies the Cauchy Criterion
Izidor Hafner
Related Topics
Analysis
Calculus
High School Calculus and Analytic Geometry
High School Mathematics
Browse all topics
Note: To run this Demonstration you need Mathematica 7+ or the free Mathematica Player 7EX
Download or upgrade to
Mathematica Player 7EX
I already have
Mathematica Player
or
Mathematica 7+