Question
Solve the inequality \( c-32 \geq 0 \), and write the solution in interval notation.
Ask by Kelly Howell. in the United States
Feb 27,2025
Upstudy AI Solution
Tutor-Verified Answer
Answer
The solution is \( c \geq 32 \), which in interval notation is [32, ∞).
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Beyond the Answer
To solve the inequality \( c - 32 \geq 0 \), we can start by isolating \( c \). Adding \( 32 \) to both sides gives: \[ c \geq 32 \] This means that the values of \( c \) must be greater than or equal to \( 32 \). In interval notation, we express this solution as: \[ [32, \infty) \] So the final answer is \( c \in [32, \infty) \).
