The representation of a complex number as a point in the complex plane is known as an Argand diagram.
Eric W. Weisstein
THINGS TO TRY
Specify a complex number in terms of its modulus
by moving the sliders. The coordinates of the point
is the real part and
is the imaginary part) are shown.
the Wolfram Demonstrations Project
Eric W. Weisstein
Embed Interactive Demonstration
More details »
Download Demonstration as CDF »
Download Author Code »
More by Author
Powers of Complex Roots
Rotating by Powers of i
Powers of Complex Numbers
The Roots of Unity in the Complex Plane
Ed Pegg Jr
Roots of Complex Numbers
The Riemann Sphere as a Stereographic Projection
High School Algebra II and Trigonometry
High School Mathematics
High School Precalculus
Browse all topics
Related Curriculum Standards
US Common Core State Standards, Mathematics
The #1 tool for creating Demonstrations
and anything technical.
Explore anything with the first
computational knowledge engine.
The web's most extensive
Course Assistant Apps »
An app for every course—
right in the palm of your hand.
Wolfram Blog »
Read our views on math,
science, and technology.
Computable Document Format »
The format that makes Demonstrations
(and any information) easy to share and
STEM Initiative »
Programs & resources for
educators, schools & students.
Join the initiative for modernizing
Step-by-step Solutions »
Walk through homework problems one step at a time, with hints to help along the way.
Wolfram Problem Generator »
Unlimited random practice problems and answers with built-in Step-by-step solutions. Practice online or make a printable study sheet.
Wolfram Language »
Knowledge-based programming for everyone.
Note: Your message & contact information may be shared with the author of any specific Demonstration for which you give feedback.
© 2016 Wolfram Demonstrations Project & Contributors |
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