![]() ![]() ![]() Solving Cubic Equations by Common tangents You can find a version of this on the Wolfram Demonstrations Project.ĭownload this or my other algebra notebooks from Google Drive ![]() This notebook demonstrates the steps to solving a cubic equation geometrically by trisecting a particular angle. This notebook demonstrates how to multiply two polynomials step by step.ĭownload this or my other algebra notebooks from Google Drive Solving Cubic Equations by Trisections Real roots are blue, nonreal roots in green.ĭownload this or my other algebra notebooks from Google Drive Multiplying Polynomials By changing the degree and selecting “Random Polynomial”, you can see the Fundamental Theorem of Algebra (a polynomial of degree n has n roots) and the Conjugate Theorem (if p(x) is a polynomial with real coefficients and a+b i is a root, so is a-b i). ![]() This notebook has a manipulation which displays the complex roots of a polynomial graphically in the complex plane. This notebook contains two simple manipulations to illustrate the idea of the slope between two points and the slope-intercept form of a line.ĭownload this or my other algebra notebooks from Google Drive Roots of Polynomials Important Note: The links for the notebooks open a new window or tab with a Google Drive page – the current settings for our homepages won’t allow me to host mathematica notebooks locally. Mathematica Notebooks for Standard Algebra Financial Aid & Costs Toggle Toggle Close.Wolfram Language & System Documentation Center. "VertexDegree." Wolfram Language & System Documentation Center. Wolfram Research (2010), VertexDegree, Wolfram Language function, (updated 2015). Cite this as: Wolfram Research (2010), VertexDegree, Wolfram Language function, (updated 2015). ![]()
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