In this project, we introduce Python code for solving Quaternionic Quadratic Equations(QQE). Liping Huang and Wasin So [2] derive explicit formulas for computing the roots of quaternionic quadratic equations. We study and motivated by their mathematical work and able to give convenient Python code to get solutions for any QQE. In section one, we give a brief introduction about quaternions, its history, algebra, and geometry[4]. Later we explain Huang and Wasin [2] work of how to derive an explicit formula for solving QQE and include the Python code to solve any QQE of the form $x^2+bx+c=0$ where $a,b\in\mathbb{H}$ in general. All necessary details about how to install and code using Python can be found from Python official website [5] and a...
AbstractThe celebrated Four Squares Theorem of Lagrange states that every positive integer is the su...
Solving a quadratic equation P (x) = ax2 + bx+ c = 0 with real coefficients is known to middle scho...
Quaternions are a number system that has become increasingly useful for representing the rotations o...
AbstractIn this paper, we derive explicit formulas for computing the roots of a quaternionic quadrat...
This article explores the numerical mathematics and visualization capabilities of Mathematica in the...
This paper describes new issues of the Mathematica standard package Quaternions for implementing Ham...
In this paper we revisit the ring of (left) one-sided quaternionic polynomials with special focus on...
This article discusses a recently developed Mathematica tool -QPolynomial- a collection of functions...
This package creates a quaternion type in python, and further enables numpy to create and manipulate...
We revisit the quaternion Newton method for computing roots of a class of quaternion valued function...
AbstractThe purpose of this paper is to show how the problem of finding roots (or zeros) of the moni...
AbstractA method is developed to compute the zeros of a quaternion polynomial with all terms of the ...
After more than hundred years of arguments in favour and against quaternions, of exciting odysseys w...
William Rowan Hamilton invented the quaternions in 1843, in his effort to construct hypercomplex num...
International audienceQuaternions form a set of four global but not unique parameters, which canrepr...
AbstractThe celebrated Four Squares Theorem of Lagrange states that every positive integer is the su...
Solving a quadratic equation P (x) = ax2 + bx+ c = 0 with real coefficients is known to middle scho...
Quaternions are a number system that has become increasingly useful for representing the rotations o...
AbstractIn this paper, we derive explicit formulas for computing the roots of a quaternionic quadrat...
This article explores the numerical mathematics and visualization capabilities of Mathematica in the...
This paper describes new issues of the Mathematica standard package Quaternions for implementing Ham...
In this paper we revisit the ring of (left) one-sided quaternionic polynomials with special focus on...
This article discusses a recently developed Mathematica tool -QPolynomial- a collection of functions...
This package creates a quaternion type in python, and further enables numpy to create and manipulate...
We revisit the quaternion Newton method for computing roots of a class of quaternion valued function...
AbstractThe purpose of this paper is to show how the problem of finding roots (or zeros) of the moni...
AbstractA method is developed to compute the zeros of a quaternion polynomial with all terms of the ...
After more than hundred years of arguments in favour and against quaternions, of exciting odysseys w...
William Rowan Hamilton invented the quaternions in 1843, in his effort to construct hypercomplex num...
International audienceQuaternions form a set of four global but not unique parameters, which canrepr...
AbstractThe celebrated Four Squares Theorem of Lagrange states that every positive integer is the su...
Solving a quadratic equation P (x) = ax2 + bx+ c = 0 with real coefficients is known to middle scho...
Quaternions are a number system that has become increasingly useful for representing the rotations o...