Question
For Problems 7-10, indicate whethe solution of the inequality \( 33 x+55 \) 7. \( x=-2 \)
Ask by Salazar Gough. in the United States
Jan 28,2025
Upstudy AI Solution
Tutor-Verified Answer
Answer
Cannot determine if \( x = -2 \) is a solution because the inequality is incomplete.
Solution
It looks like the inequality you've provided is incomplete. To accurately determine whether \( x = -2 \) is a solution for Problem 7, I need the full inequality expression. Typically, an inequality will include a comparison operator such as \( < \), \( \leq \), \( > \), or \( \geq \).
**For example:**
- If the inequality is \( 33x + 55 < 0 \), we can check if \( x = -2 \) satisfies it.
- If the inequality is \( 33x + 55 > 100 \), the approach would be different.
**Please provide the complete inequality for Problem 7**, and I'll be happy to help you determine whether \( x = -2 \) is a valid solution.
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Simplify this solution Mind Expander
To determine whether \( x = -2 \) is a solution to the inequality \( 33x + 55 \), we need to first rewrite it as an inequality. Let's consider \( 33x + 55 > 0 \) or \( 33x + 55 < 0 \). When plugging in \( x = -2 \): \[ 33(-2) + 55 = -66 + 55 = -11 \] If the inequality were \( 33x + 55 < 0 \), then \( x = -2 \) would indeed be a solution since \(-11 < 0\). However, if the inequality were \( 33x + 55 > 0 \), \( x = -2 \) would not be a solution, as \(-11\) is not greater than 0. Thus, the answer depends on the original inequality given. To summarize, you need to clarify whether you're testing for greater than or less than to find the correct solution status for \( x = -2\)!
