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Matrices and Matrix Operations
with
TI-Nspire™ CAS
Forest W. Arnold
June 2020
A
Typeset in LT X.
E
Copyright © 2020 Forest W. Arnold
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Trademarks
TI-Nspire is a registered trademark of Texas Instruments, Inc.
Attribution
MostoftheexamplesinthisarticlearefromAFirstCourseinLinearAlgebraanOpen
Text by Lyrix Learning, base textbook version 2017 - revision A, by K. Kuttler.
The text is licensed under the Creative Commons License (CC BY) and is available
for download at the link
https://lyryx.com/first-course-linear-algebra/.
1 Introduction
Thearticle Systems of Equations with TI-Nspire™ CAS: Matrices and Gaussian Elim-
ination described how to represent and solve systems of linear equations with matrices
and elementary row operations. By defining arithmetic and algebraic operations with
matrices, applications of matrices can be expanded to include more than simply solving
linear systems.
Thisarticle describes and demonstrates how to use TI-Nspire’s builtin matrix functions
to
• add and subtract matrices,
• multiply matrices by scalars,
• multiply matrices,
• transpose matrices,
• find matrix inverses, and
• use matrix equations.
TheTI-Nspire examples in this article require the CAS version of TI-Nspire.
2 Matrices and Vectors
In TI-Nspire CAS, a matrix is a rectangular array of expressions (usually numbers)
with m rows and n columns. The dimension (size) of a matrix is denoted as m×n.
Whenstating the dimension of a matrix, m, the number of rows is always stated first.
Anexampleofa3×4matrixis
a a a a
11 12 13 14
a a a a (1)
21 22 23 24
a a a a
31 32 33 34
Avector is either a matrix with one row and multiple columns (a row vector) or a
matrix with multiple rows and a single column (a column vector). An example of a
rowvector is
rv1 rv2 rv3 rv4 (2)
and an example of a column vector is
cv1
cv2 (3)
cv3
1
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