Question
What values make the inequality q →-4 true? List them from least to greatest going across
Answers
Answered by
GPT-4o mini
The expression \( q \to -4 \) typically suggests that \( q \) is some variable related to -4 in a manner defined by an inequality. However, the notation \( q \to -4 \) is somewhat unclear in typical mathematical contexts.
If we're interpreting this as an inequality where \( q \) must be less than or equal to -4 (i.e., \( q \leq -4 \)), then the values that would satisfy this inequality are all numbers less than or equal to -4. This includes:
- All real numbers like -5, -6, -7, and so on.
- Precisely -4 itself.
If we list them from least to greatest, we express this as:
\[
\{ \ldots, -7, -6, -5, -4 \}
\]
If the inequality was meant to indicate something else (such as \( q < -4 \)), please clarify, and I can adjust the response accordingly!
If we're interpreting this as an inequality where \( q \) must be less than or equal to -4 (i.e., \( q \leq -4 \)), then the values that would satisfy this inequality are all numbers less than or equal to -4. This includes:
- All real numbers like -5, -6, -7, and so on.
- Precisely -4 itself.
If we list them from least to greatest, we express this as:
\[
\{ \ldots, -7, -6, -5, -4 \}
\]
If the inequality was meant to indicate something else (such as \( q < -4 \)), please clarify, and I can adjust the response accordingly!
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