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Rouché–capelli theorem

Written by the Fiveable Content Team • Last updated August 2025

study guides for Linear Algebra and Differential Equations

Definition

The Rouché–Capelli theorem provides a criterion for determining the consistency of a system of linear equations and characterizes the solution set. Specifically, it states that a system of linear equations is consistent if and only if the rank of the coefficient matrix is equal to the rank of the augmented matrix. This theorem connects the concepts of linear dependence, independence, and the role of ranks in solving linear systems.

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5 Must Know Facts For Your Next Test

The Rouché–Capelli theorem applies to both homogeneous and non-homogeneous systems of linear equations.
If the ranks are equal and less than the number of variables, there are infinitely many solutions.
If the ranks are equal and equal to the number of variables, there is exactly one solution.
If the ranks are different, the system is inconsistent and has no solutions.
The theorem can be used in conjunction with Gaussian elimination to analyze and solve systems of linear equations.

Review Questions

How does the Rouché–Capelli theorem help determine whether a system of linear equations has solutions?
- The Rouché–Capelli theorem helps determine if a system has solutions by comparing the ranks of the coefficient matrix and the augmented matrix. If these ranks are equal, the system is consistent, meaning it has at least one solution. If they are not equal, it indicates that the system is inconsistent and has no solutions. This understanding is crucial for analyzing systems during solving processes.
What implications does the Rouché–Capelli theorem have for finding multiple solutions in a linear system?
- According to the Rouché–Capelli theorem, if a linear system's ranks are equal but less than the number of variables, this suggests that there are infinitely many solutions. This occurs because there are free variables that can take on multiple values, leading to various combinations that satisfy all equations in the system. Therefore, recognizing this condition allows for determining not just if solutions exist but also their nature.
Evaluate how you would apply the Rouché–Capelli theorem alongside Gaussian elimination in practice.
- To apply the Rouché–Capelli theorem alongside Gaussian elimination, you first convert your system of equations into an augmented matrix. You would then use Gaussian elimination to bring this matrix to row echelon form or reduced row echelon form. Afterward, you would check the ranks of both the coefficient matrix and augmented matrix. If they match as described by the theorem, you can deduce whether solutions exist and how many solutions can be expected based on their rank relative to the number of variables.