Let's solve the inequality step by step:
The inequality is:
\[ 10 \geq 22 + x \]
First, we want to isolate \( x \):
- Subtract 22 from both sides:
\[ 10 - 22 \geq x \]
This simplifies to:
\[ -12 \geq x \]
or equivalently,
\[ x \leq -12 \]
Now, let's analyze the statements based on the solution \( x \leq -12 \):
-
-11 is part of the solution: False. Since -11 is greater than -12, it does not satisfy \( x \leq -12 \).
-
x ≤ −12: True. This is the main inequality we derived.
-
x is less than or equal to negative 12: True. This statement is essentially the same as the previous one.
-
x ≥ -12: False. This contradicts the solution.
-
The graph has a closed circle: True. For \( x \leq -12 \), a closed circle is used to indicate that -12 is included in the solution.
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The graph has an open circle: False. Open circles are used for inequalities that do not include the endpoint.
-
-13 is part of the solution: True. Since -13 is less than -12, it satisfies \( x \leq -12 \).
From the analysis:
- True statements:
- x ≤ −12
- x is less than or equal to negative 12
- The graph has a closed circle
- -13 is part of the solution
So, the three correct answers from the given options about the solution to the inequality are:
- x ≤ −12
- x is less than or equal to negative 12
- The graph has a closed circle
If you're restricted to selecting only three answers total, just choose any three from the true indicators above.