9873
EXPLORE
LATEST
ABOUT
AUTHORING AREA
PARTICIPATE
Your browser does not support JavaScript or it may be disabled!
Composition of Functions
Construct
by starting at a point on the
axis and moving vertically to the graph of
. Move horizontally to the graph of
to relocate
to an
value. Next evaluate
there by moving vertically to the graph of
. Finally move horizontally to the point
.
Contributed by:
Bruce Atwood
SNAPSHOTS
RELATED LINKS
Composition
(
Wolfram
MathWorld
)
PERMANENT CITATION
"
Composition of Functions
" from
the Wolfram Demonstrations Project
http://demonstrations.wolfram.com/CompositionOfFunctions/
Contributed by:
Bruce Atwood
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
Integrals of Nested Elementary Functions
Michael Trott
Instantaneous Rate of Change: Exploring More Functions
Wolfgang Narrath and Reinhard Simonovits
Marden's Theorem
Bruce Torrence
Lucas-Gauss Theorem
Bruce Torrence
Discrete Function Composition
Gerry Bilodeau
Inverse Composition Rule
Ed Pegg Jr
Composition and Transformations
Michael Rogers
The Effects of Some Simple Compositions on the Graph of a Function
Marc Brodie (Wheeling Jesuit University)
Rational Functions of Small Degree
Donald Krug
Function Transformations
Eric Schulz
Related Topics
Algebra
Calculus
High School Mathematics
High School Precalculus
Browse all topics
Related Curriculum Standards
US Common Core State Standards, Mathematics
HSF-BF.A.1
HSF-IF.C.7
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+