2x2 Matrices, Determinants and Inverses

2x2 Matrices, Determinants and Inverses
Evaluating Determinants of 2x2 Matrices Using Inverse Matrices to Solve Equations

Evaluating Determinants of 2x2 Matrices
When you multiply two matrices together, in the order AB or BA, and the result is the identity matrix, then matrices A and B are inverses. Identity matrix for multiplication

You only have to prove ONE of these. To show two matrices are inverses… AB = I OR BA = I AA-1 = I OR A-1A = I Inverse of A Inverse of A

Example 1: Show that B is the multiplicative inverse of A.

Example 1: Show that B is the multiplicative inverse of A. AB = I. Therefore, B is the inverse of A and A is the inverse of B.

Example 1: Show that B is the multiplicative inverse of A. AB = I. Therefore, B is the inverse of A and A is the inverse of B. Check by multiplying BA…answer should be the same

Example 2: Show that the matrices are multiplicative inverses.

Example 2: Show that the matrices are multiplicative inverses. BA = I. Therefore, B is the inverse of A and A is the inverse of B.

The determinant is used to tell us if an inverse exists. If det ≠ 0, an inverse exists. If det = 0, no inverse exists. A Matrix with a determinant of zero is called a SINGULAR matrix

To calculate a determinant…

To calculate a determinant… Multiply along the diagonal

To calculate a determinant… Take the product of the leading diagonal, and subtract the product of the non-leading diagonal Equation to find the determinant

Example 1: Evaluate the determinant.

Example 1: Evaluate the determinant. det = -23 Therefore, there is an inverse.

Example 2: Evaluate the determinant.

Example 2: Evaluate the determinant. det = 0 Therefore, there is no inverse.

How do you know if a matrix has an inverse AND what that inverse is? Given , the inverse of A is given by: Equation to find an inverse matrix This is called the adjoint matrix. It is formed by interchanging elements in the leading diagonal and negating elements in the non-leading diagonal

Example 1: Determine whether the matrix has an inverse. If an inverse exists, find it.

Example 1: Determine whether the matrix has an inverse. If an inverse exists, find it. Step 1: Find det M

Example 1: Determine whether the matrix has an inverse. If an inverse exists, find it. Step 1: Find det M det M = -2, the inverse of M exists.

Example 1: Determine whether the matrix has an inverse. If an inverse exists, find it. Step 2: Find the adjoint matrix. i.e

Example 1: Determine whether the matrix has an inverse. If an inverse exists, find it. Step 2: Find the adjoint matrix. i.e Change signs

Example 1: Determine whether the matrix has an inverse. If an inverse exists, find it. Step 2: Find the adjoint matrix. i.e Change signs Adjoint of M

Example 1: Determine whether the matrix has an inverse. If an inverse exists, find it. Step 2: Find the adjoint matrix. i.e Change positions Adjoint of M

Example 1: Determine whether the matrix has an inverse. If an inverse exists, find it. Step 3: Use the equation to find the inverse.

Example 2: Determine whether the matrix has an inverse. If an inverse exists, find it.

Solving a matrix equation. AX = B Use X = A B

2x2 Matrices, Determinants and Inverses

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2x2 Matrices, Determinants and Inverses

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