12,000+
Interactive Demonstrations Powered by Notebook Technology »
TOPICS
LATEST
ABOUT
AUTHORING AREA
PARTICIPATE
Your browser does not support JavaScript or it may be disabled!
Algebraic Identities with Powers of Two or Four for Thirteen Variable Sets
Let
,
,
be three arbitrary complex numbers.
Set
,
,
,
,
,
,
,
,
,
,
,
,
and
,
,
,
,
,
,
,
,
,
,
,
,
.
Then for
,
.
In this Demonstration,
and
are integers.
For example,
Contributed by:
Minh Trinh Xuan
THINGS TO TRY
Slider Zoom
Gamepad Controls
Automatic Animation
SNAPSHOTS
RELATED LINKS
A Five-Power Diophantine Equation
(
Wolfram Demonstrations Project
)
abc Conjecture
(
Wolfram Demonstrations Project
)
Coincidences in Powers of Integers
(
Wolfram Demonstrations Project
)
Diophantine Equation
(
Wolfram
MathWorld
)
Seven Points with Integral Distances
(
Wolfram Demonstrations Project
)
PERMANENT CITATION
Minh Trinh Xuan
"
Algebraic Identities with Powers of Two or Four for Thirteen Variable Sets
"
http://demonstrations.wolfram.com/AlgebraicIdentitiesWithPowersOfTwoOrFourForThirteenVariableS/
Wolfram Demonstrations Project
Published: June 9, 2022
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
A Four-Power Algebraic Identity
Minh Trinh Xuan
A Two-Power Algebraic Identity
Minh Trinh Xuan
A Four-Term Algebraic Identity for Powers 1, 2, 3 and 5
Minh Trinh Xuan
Algebraic Identity with Squares and Seventh Powers
Minh Trinh Xuan
Algebraic Identity with Five Fourth Powers
Minh Trinh Xuan
Algebraic Identity with Six Fourth Powers
Minh Trinh Xuan
Algebraic Identity with Twelve Variables
Minh Trinh Xuan
A Five-Power Algebraic Identity
Minh Trinh Xuan
A Six-Variable Algebraic Identity with Squares and Cubes
Minh Trinh Xuan
Algebraic Identity for Powers 1, 2, 4 and 6
Minh Trinh Xuan
Related Topics
Polynomials
Browse all topics