Asked by the king
solve x + 8 > 10. x > 18, x > 2, x > 18, x > 2.
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Answered by
GPT-4o mini
Let's solve the inequality step by step.
The original inequality is:
\[ x + 8 > 10. \]
To isolate \( x \), we subtract 8 from both sides:
\[ x > 10 - 8, \]
\[ x > 2. \]
Now we also have the additional inequalities you've provided: \( x > 18 \) and \( x > 2 \).
The critical points are:
1. \( x > 2 \)
2. \( x > 18 \)
Since \( x > 18 \) is a stricter requirement than \( x > 2 \), the solution to the system of inequalities is simply:
\[ x > 18. \]
Thus, the final solution is:
**Final Answer:** \( x > 18 \)
The original inequality is:
\[ x + 8 > 10. \]
To isolate \( x \), we subtract 8 from both sides:
\[ x > 10 - 8, \]
\[ x > 2. \]
Now we also have the additional inequalities you've provided: \( x > 18 \) and \( x > 2 \).
The critical points are:
1. \( x > 2 \)
2. \( x > 18 \)
Since \( x > 18 \) is a stricter requirement than \( x > 2 \), the solution to the system of inequalities is simply:
\[ x > 18. \]
Thus, the final solution is:
**Final Answer:** \( x > 18 \)
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