5 Must Know Facts For Your Next Test

1. In the context of solving linear equations, a linear equation has infinite solutions when the coefficients of the variables are equal to zero, making the equation an identity.
2. When solving applications with systems of equations, a system of linear equations has infinite solutions if the equations are dependent, meaning one equation can be expressed as a multiple of another equation.
3. In the case of graphing systems of linear inequalities, parallel lines result in a system of linear inequalities with infinite solutions, as the lines never intersect.
4. Infinite solutions indicate that there are an unlimited number of values for the variables that satisfy the equation or system of equations.
5. The presence of infinite solutions often suggests that the problem is either underdetermined or that the equations are not linearly independent.

Review Questions

• Explain how the concept of infinite solutions applies when solving a linear equation using a general strategy.
  • When solving a linear equation using a general strategy, the equation will have infinite solutions if the coefficients of the variables are equal to zero. In this case, the equation becomes an identity, meaning it is true for any value of the variable. This results in an unlimited number of solutions that satisfy the equation.
• Describe the role of infinite solutions in the context of solving applications with systems of equations.
  • In the context of solving applications with systems of equations, a system will have infinite solutions if the equations are dependent, meaning one equation can be expressed as a multiple of another equation. This indicates that the system is underdetermined, and there are an unlimited number of variable values that satisfy the system. Recognizing infinite solutions in this context can help identify the nature of the problem and guide the solution process.
• Analyze how the concept of infinite solutions relates to the graphing of systems of linear inequalities.
  • When graphing systems of linear inequalities, parallel lines result in a system with infinite solutions. This is because parallel lines never intersect, meaning there are an unlimited number of points that satisfy both inequalities. Understanding the connection between parallel lines and infinite solutions can help students interpret the graphical representation of a system of linear inequalities and determine the nature of the solution set.

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