Worksheet: Finding the Inverse of 3 x 3 Matrix

In this worksheet, we will practice how to find the inverse matrix for a given three-by-three matrix.

Q1:

By considering the value of the determinant, determine whether the matrix has an inverse. If so, find the inverse by considering the matrix of cofactors.

AIt has an inverse, .
BIt has an inverse, .
CIt has an inverse, .
DIt has an inverse, .
EIt has no inverse.

Q2:

Find the inverse of the following matrix.

Q3:

Determine whether the matrix has an inverse by finding whether the determinant is nonzero. If the determinant is nonzero, find the inverse using the inverse formula involving the cofactor matrix.

AIt has an inverse, which is .
BIt has an inverse, which is .
CIt has an inverse, which is .
DIt has an inverse, which is .
E The matrix has no inverse.

Q4:

Find, if it exists, the inverse of the matrix

Q5:

Use technology to find the inverse of the following matrix.

Q6:

Use technology to find the inverse of the following matrix.

Q7:

Use technology to find the inverse of the following matrix.

Q8:

Using the elementary row operation, find for the given matrix if possible.

A
B
C
D
E The matrix has no inverse.

Q9:

Using the Cayley-Hamilton theorem, find for the given matrix if possible.

A
B
C
D
EThe matrix has no inverse.

Q10:

Using elementary row operations, find for the given matrix if possible.

A
B
C
D The matrix has no inverse.
E