10753
EXPLORE
LATEST
ABOUT
AUTHORING AREA
PARTICIPATE
Your browser does not support JavaScript or it may be disabled!
q-Pascal Triangle
The
-binomial coefficients
are integers for integers
and
. They satisfy the two recurrence equations:
,
.
Contributed by:
Oleksandr Pavlyk
SNAPSHOTS
RELATED LINKS
q-Binomial Coefficient
(
Wolfram
MathWorld
)
Pascal's Triangle
(
Wolfram
MathWorld
)
PERMANENT CITATION
"
q-Pascal Triangle
" from
the Wolfram Demonstrations Project
http://demonstrations.wolfram.com/QPascalTriangle/
Contributed by:
Oleksandr Pavlyk
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
Digits of Hyperfactorial and Barnes G
Oleksandr Pavlyk
q-Trigonometric Functions
Oleksandr Pavlyk
q-Cosine and q-Sine Functions over the Extended Complex q-Plane
Michael Trott
PowerMod Is Eventually Periodic
Oleksandr Pavlyk
Periodicity of Euler Numbers in Modular Arithmetic
Oleksandr Pavlyk
Wilson's Theorem in Disguise
Oleksandr Pavlyk and Brett Champion
A Continuous Analog of the 1D Thue-Morse Sequence
Oleg Kravchenko
Number Theory Tables
Ed Pegg Jr
Discrete Number Theory Plots
Ed Pegg Jr
Resizable Number Theory Tables
Ed Pegg Jr
Related Topics
Combinatorics
Sequences
Special Functions
Version 7 Features
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+