He is currently professor and Provost Fellow at Concordia University. In 2012 he was honored at the annual Wolfram Technology Conference for his work on "A New Kind of Learning" with a Wolfram Innovator Award. For more than twenty years, he developed methods for the teaching of mathematics with technology. Subject Code - MATH (Mathematics) MATH 217, Multivariable and Vector Calculus MATH 220, Mathematical Proof MATH 221, Matrix Algebra MATH 223, Linear Algebra. After postdoctoral studies at Oxford University and visiting professorships at several European universities, he returned to Concordia University as a faculty member and dean of graduate studies. Exploring Linear Algebra: Labs and Projects with Mathematica is a hands-on lab manual for daily use in the classroom. in mathematics from McGill University under the supervision of Joachim Lambek.
He completed his undergraduate studies at Oxford University under the guidance of Sir Michael Dummett and received a Ph.D. Szabo is professor in the Department of Mathematics and Statistics at Concordia University in Canada. Follow along with the examples in the Wolfram Cloud and use the material to prepare for courses in data science, engineering and other fields. Linear Algebra: An Introduction using Mathematica, 1st Editionįred E. A comprehensive introduction to fundamental concepts in linear algebra, including video lessons and interactive notebooks. Linear Algebra: An Introduction using Maple, 1st Edition The Linear Algebra Survival Guide, 1st Edition Linear Algebra with Mathematica: An Introduction Using Mathematica 1st Edition by Fred Szabo (Author) 2 ratings See all formats and editions Hardcover 129.95 1 Used from 129.95 Paperback 14.20 8 Used from 14. Symbolic linear algebra - Mathematica Stack Exchange Symbolic linear algebra Asked 9 years, 3 months ago Modified 9 years, 3 months ago Viewed 2k times 9 I would like to know how I can ask Mathematica to expand (and simplify) such an expression : ( A + B) ( A + B) where, are two real numbers and A, B are vectors in R n.
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