Question
Y + 6 > -1 or y - 2 /leq 4
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Answered by
GPT-4o mini
To solve the compound inequality \( Y + 6 > -1 \) or \( Y - 2 \leq 4 \), we'll solve each part separately.
### First Inequality: \( Y + 6 > -1 \)
1. Subtract 6 from both sides:
\[
Y > -1 - 6
\]
\[
Y > -7
\]
### Second Inequality: \( Y - 2 \leq 4 \)
1. Add 2 to both sides:
\[
Y \leq 4 + 2
\]
\[
Y \leq 6
\]
### Combine the Results
Now we can combine the results from both inequalities:
1. \( Y > -7 \)
2. \( Y \leq 6 \)
### Final Solution
The complete solution is:
\[
-7 < Y \leq 6
\]
This means \( Y \) can take any value greater than -7 and up to and including 6.
### First Inequality: \( Y + 6 > -1 \)
1. Subtract 6 from both sides:
\[
Y > -1 - 6
\]
\[
Y > -7
\]
### Second Inequality: \( Y - 2 \leq 4 \)
1. Add 2 to both sides:
\[
Y \leq 4 + 2
\]
\[
Y \leq 6
\]
### Combine the Results
Now we can combine the results from both inequalities:
1. \( Y > -7 \)
2. \( Y \leq 6 \)
### Final Solution
The complete solution is:
\[
-7 < Y \leq 6
\]
This means \( Y \) can take any value greater than -7 and up to and including 6.
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