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Imaginary number
How to Show That Various Numbers Either Can Or Cannot Be Constructed Using Only a Straightedge and Compass
Operations with Complex Numbers Adding & Subtracting: Combine Like Terms (풂 + 풃풊) + (풄 + 풅풊) = (풂 + 풄) + (풃 + 풅)풊 Examples: 1
Theory of Trigintaduonion Emanation and Origins of Α and Π
Truly Hypercomplex Numbers
Chapter I, the Real and Complex Number Systems
Doing Physics with Quaternions
50 Mathematical Ideas You Really Need to Know
Complex Numbers -.: Mathematical Sciences : UTEP
Quaternions by Wasinee Siewrichol
A Brief History of Mathematics for Dynamic Systems
Structurally Hyperbolic Algebras Dual to the Cayley-Dickson and Clifford
Abstract Algebra Lecture Notes
Algebra and Geometry of Hamilton's Quaternions
Quaternions: a History of Complex Noncommutative Rotation Groups in Theoretical Physics
In Praise of Quaternions
Beyond Complex: an Inspection of Quaternions
The Complex Number System
Imaginary Numbers Practice Worksheet
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CS420-2016S-08 Orientation & Quaternions
2.7 Imaginary and Complex Numbers
Comptex Numbers
The Origins of Complex Geometry in the 19Th Century ∗
The Plane of Complex Numbers
Logic, Diophantine Geometry, and Transcendence Theory
Octonionic Formulation of the Fully Symmetric Maxwell's Equations in 3+ 1 Dimensions
“Congeneric Surd Equations” to “Segre's Bicomplex Numbers”
12 Complex Numbers and Functions Fall 2003
Imaginary Number Bases
A New Derivation of Biquaternion Schrödinger
The 22 Letters of Reality: Chiral Bisedenion Properties for Maximal Information Propagation
Geometric Constructions in Relation with Algebraic and Transcendental Numbers
Arxiv:1606.03315V1 [Math.HO] 10 Jun 2016 Imaginary and Complex Numbers Arose in Looking for ‘Impossible’ Solutions to Polynomial Equations Such As X2 + 1 = 0
Complex Numbers the Need for Imaginary and Complex Numbers Arises When finding the Two Roots of a Quadratic Equation
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Pi – Not Just an Ordinary Number
Elementary Functions Complex Numbers Motivation for the Complex