10680
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
Find the Coefficients of a Partial Fraction Decomposition
Izidor Hafner
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+