5 Must Know Facts For Your Next Test

1. Compound inequalities can be expressed in two forms: conjunctions (using 'and') and disjunctions (using 'or').
2. When solving a compound inequality that uses 'and', the solution is the intersection of the individual solutions, while with 'or', it's the union.
3. To graph compound inequalities, individual inequalities are plotted on the same number line, showing where their solutions overlap or combine.
4. When manipulating compound inequalities, it is crucial to remember that multiplying or dividing by a negative number reverses the inequality signs.
5. Real-world applications of compound inequalities often involve constraints, such as determining acceptable ranges for measurements, prices, or other quantities.

Review Questions

• How do you solve a compound inequality that uses 'and', and what does this imply about the solution set?
  • To solve a compound inequality with 'and', you solve each individual inequality separately and then find the intersection of their solution sets. This means you are looking for values that satisfy both inequalities at the same time. The resulting solution set is where both conditions overlap, which is often represented on a number line as a shaded region between two points.
• In what situations would you use a compound inequality that employs 'or', and how does this affect the interpretation of the solution?
  • A compound inequality using 'or' is useful when you want to include values that satisfy at least one of the inequalities rather than both. This means that the solution encompasses all values from either inequality, creating a broader range. When graphing, the solution will show all areas covered by either inequality, indicating that any value within those regions is acceptable.
• Evaluate the significance of compound inequalities in real-world applications and how they contribute to problem-solving.
  • Compound inequalities play an essential role in real-world problem-solving by allowing for the representation of multiple conditions that must be met simultaneously. For example, they can be used in budgeting to determine acceptable spending ranges under different constraints or in engineering to ensure dimensions fall within safety limits. By utilizing compound inequalities, individuals can make informed decisions based on a comprehensive understanding of their options and limitations, leading to more effective outcomes.

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