Solve the compound inequality . Write the solution in interval notation. The solution is ____.
Answer & Analysis
Analysis
Question Analysis
This question evaluates the student's ability to solve a compound inequality with "and" and express the solution in interval notation.
Key Concept Explanation
Compound inequalities with "and" are solved by finding the intersection of the solutions of each individual inequality.
Step-by-step Solution
1. Solve the first inequality: . Subtract 5 from both sides: . Divide by 2: .
2. Solve the second inequality:
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