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Unique solution

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College Algebra

Definition

A unique solution refers to a single, distinct answer to a system of equations where all variables can be solved explicitly, resulting in one point of intersection in a graph. This concept is essential in understanding how various systems behave, especially when analyzing the relationships between multiple variables, whether linear or nonlinear. Identifying a unique solution ensures that the system is consistent and that there is a clear and definitive outcome for the values of the variables involved.

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5 Must Know Facts For Your Next Test

  1. In a system of three linear equations with three variables, a unique solution exists if the equations represent three planes that intersect at a single point in three-dimensional space.
  2. For nonlinear equations, a unique solution can be identified if the graphs of the equations intersect at exactly one point.
  3. Using Gaussian elimination can help determine if a system has a unique solution by transforming the system into row echelon form and checking for leading ones in each row.
  4. Cramer's Rule provides a method to find the unique solution of a system of linear equations by using determinants when the determinant of the coefficient matrix is non-zero.
  5. If a system does not have a unique solution, it may either have no solutions (inconsistent) or infinitely many solutions (dependent).

Review Questions

  • How can you determine if a system of linear equations has a unique solution?
    • To determine if a system of linear equations has a unique solution, you can analyze the coefficients of the equations. If you transform the system into row echelon form using methods like Gaussian elimination and find that there is a leading one in every row with no contradictions, it indicates a unique solution. Additionally, checking that the determinant of the coefficient matrix is non-zero further confirms this.
  • What role does Cramer's Rule play in finding unique solutions for systems of equations?
    • Cramer's Rule is an effective method for solving systems of linear equations that have a unique solution. It uses determinants to express each variable as a ratio of determinants. When the determinant of the coefficient matrix is non-zero, Cramer's Rule guarantees that there is one distinct solution for each variable, thus confirming the uniqueness of the solution.
  • Analyze how the concept of a unique solution impacts decision-making in real-world applications involving multiple variables.
    • The concept of a unique solution is crucial in real-world applications like economics, engineering, and data analysis where multiple variables interact. When modeling systems such as supply and demand or project planning, having a unique solution allows for precise predictions and decisions based on clearly defined outcomes. If multiple solutions or no solutions exist, it complicates decision-making as it introduces ambiguity or uncertainty. Therefore, ensuring systems have unique solutions helps streamline processes and enhances reliability in strategic planning.
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