Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

8.10 THE INVERSE OF A MATRIX


Find the inverse of the matrix

A=




243


1 − 2 − 2


−33 2



.


We first determine|A|:


|A|=2[−2(2)−(−2)3] + 4[(−2)(−3)−(1)(2)] + 3[(1)(3)−(−2)(−3)]
=11. (8.58)

This is non-zero and so an inverse matrix canbe constructed. To do this we need the
matrix of the cofactors,C, and henceCT. We find


C=




24 − 3


113 − 18


− 27 − 8



 and CT=



21 − 2


4137


− 3 − 18 − 8



,


and hence


A−^1 =


CT


|A|


=


1


11




21 − 2


4137


− 3 − 18 − 8



. (8.59)


For a 2×2 matrix, the inverse has a particularly simple form. If the matrix is

A=

(
A 11 A 12
A 21 A 22

)

then its determinant|A|is given by|A|=A 11 A 22 −A 12 A 21 ,andthematrixof


cofactors is


C=

(
A 22 −A 21
−A 12 A 11

)
.

Thus the inverse ofAis given by


A−^1 =

CT
|A|

=

1
A 11 A 22 −A 12 A 21

(
A 22 −A 12
−A 21 A 11

)

. (8.60)


It can be seen that the transposed matrix of cofactors for a 2×2matrixisthe


same as the matrix formed by swapping the elements on the leading diagonal


(A 11 andA 22 ) and changing the signs of the other two elements (A 12 andA 21 ).


This is completely general for a 2×2 matrix and is easy to remember.


The following are some further useful properties related to the inverse matrix
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