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Show that the following two matrices are inverses of each other.
We can now determine whether two matrices are inverses, but how would we find the inverse of a given matrix? Since we know that the product of a matrix and its inverse is the identity matrix, we can find the inverse of a matrix by setting up an equation using matrix multiplication .
Use matrix multiplication to find the inverse of the given matrix.
For this method, we multiply by a matrix containing unknown constants and set it equal to the identity.
Find the product of the two matrices on the left side of the equal sign.
Next, set up a system of equations with the entry in row 1, column 1 of the new matrix equal to the first entry of the identity, 1. Set the entry in row 2, column 1 of the new matrix equal to the corresponding entry of the identity, which is 0.
Using row operations, multiply and add as follows: Add the equations, and solve for
Back-substitute to solve for
Write another system of equations setting the entry in row 1, column 2 of the new matrix equal to the corresponding entry of the identity, 0. Set the entry in row 2, column 2 equal to the corresponding entry of the identity.
Using row operations, multiply and add as follows: Add the two equations and solve for
Once more, back-substitute and solve for
Another way to find the multiplicative inverse is by augmenting with the identity. When matrix is transformed into the augmented matrix transforms into
For example, given
augment with the identity
Perform row operations with the goal of turning into the identity.
The matrix we have found is
When we need to find the multiplicative inverse of a matrix, we can use a special formula instead of using matrix multiplication or augmenting with the identity.
If is a matrix, such as
the multiplicative inverse of is given by the formula
where If then has no inverse.
Use the formula to find the multiplicative inverse of
Using the formula, we have
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