miraculousmadison
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Graph the solution to the inequality n – 4 ≥ 4. A number line beginning at 5 with tick marks every one unit up to 10. There is a closed circle at 8 and dark shading from that circle to the left that continues past 5. A number line beginning at 5 with tick marks every one unit up to 10. There is a closed circle at 8 and dark shading from that circle to the right that continues past 10. A number line beginning at negative 3 with tick marks every one unit up to 2. There is a closed circle at 0 and dark shading from that circle to the left that continues past negative 3. A number line beginning at negative 3 with tick marks every one unit up to 2. There is a closed circle at 0 and dark shading from that circle to the right that continues past 2.

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misspetty3

Step-by-step explanation:

o graph the solution to the inequality n - 4 ≥ 4, we need to represent the numbers that satisfy this inequality on a number line.

1. Begin the number line at 5 and mark tick marks every one unit up to 10.

2. Place a closed circle at 8, indicating that 8 is included in the solution set.

3. Shade to the left of the closed circle, extending the shading past 5. This indicates that all numbers less than 8, including 8 itself, satisfy the inequality.

The graph should show a closed circle at 8 and dark shading to the left that continues past 5.

This representation visually demonstrates that any number greater than or equal to 8 is a solution to the inequality n - 4 ≥ 4.

So, in summary, the solution to the inequality n - 4 ≥ 4 is all numbers greater than or equal to 8.

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