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Algebraically Identifying an Inconsistent System of Linear Equations
When solving a system of linear equations using algebraic techniques, the system can be definitively identified as an inconsistent system if the computation completely eliminates all variables and results in a mathematically false statement, such as . Because no variables remain to be evaluated and the resulting numerical statement is impossible, there are no real values that can satisfy all equations in the system simultaneously. Consequently, it is proven that the system has absolutely no solution.
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Ch.4 Systems of Linear Equations - Intermediate Algebra @ OpenStax
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Algebraically Identifying an Inconsistent System of Linear Equations