Prove that if xp satisfies Axp, =b, then every solution to
Chapter 9, Problem 15E(choose chapter or problem)
Prove that if \(\mathbf{x}_{p}\) satisfies \(\mathbf{A} \mathbf{x}_{p}=\mathbf{b}\), then every solution to the nonhomogeneous system Ax = b is of the form \(\mathbf{x}=\mathbf{x}_{p}+\mathbf{x}_{h}\), where \(\mathbf{x}_{h}\) is a solution to the corresponding homogeneous system Ax = 0.
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