In Exercises 43–44, (a) Write each linear system as a matrix equation in the form AX = B (b) Solve the system using the inverse that is given for the coefficient matrix.

A linear system can be expressed in matrix form as AX = B, where A is the coefficient matrix containing the coefficients of the variables, X is the column matrix of the variables, and B is the column matrix of constants. This representation simplifies the process of solving systems of equations, allowing for the use of matrix operations.

The inverse of a matrix A, denoted as A⁻¹, is a matrix that, when multiplied by A, yields the identity matrix. For a system of equations represented as AX = B, if A is invertible, the solution can be found using X = A⁻¹B. This method is efficient for solving linear systems when the inverse is readily available.

Solving a linear system involves finding the values of the variables that satisfy all equations simultaneously. Techniques include substitution, elimination, and using matrix methods such as finding the inverse. Understanding these methods is crucial for effectively solving systems represented in matrix form.