Question
To solve the inequality, first solve for the value of j that makes the associated equation true. That will give you the boundary point for the inequality. Solve on paper or show your work below. Then, enter your answer on Zearn.
j + 7 ≥ -8
j+7
=
−8
j
=
Enter
j + 7 ≥ -8
j+7
=
−8
j
=
Enter
Answers
GPT-4o mini
To solve the inequality \( j + 7 \geq -8 \), first, we need to solve for \( j \) by isolating it on one side of the inequality.
1. Start with the inequality:
\[
j + 7 \geq -8
\]
2. Next, subtract 7 from both sides:
\[
j + 7 - 7 \geq -8 - 7
\]
\[
j \geq -15
\]
Therefore, the boundary point for the inequality is \( j = -15 \).
Now, the final answer is:
\[
j \geq -15
\]
For the answer in terms of entering it into Zearn:
- Enter: \( -15 \)
1. Start with the inequality:
\[
j + 7 \geq -8
\]
2. Next, subtract 7 from both sides:
\[
j + 7 - 7 \geq -8 - 7
\]
\[
j \geq -15
\]
Therefore, the boundary point for the inequality is \( j = -15 \).
Now, the final answer is:
\[
j \geq -15
\]
For the answer in terms of entering it into Zearn:
- Enter: \( -15 \)