Duplicate Question
The question on this page has been marked as a duplicate question.
Original Question
Solve the inequality and graph the solution. v+1 3 ≥ – 1 Plot the endpoints. Select an endpoint to change it from closed to ope...Asked by evergreen
Solve the inequality and graph the solution.
5s>10
Plot the endpoints. Select an endpoint to change it from closed to open. Select the middle of the segment, ray, or line to delete it.
5s>10
Plot the endpoints. Select an endpoint to change it from closed to open. Select the middle of the segment, ray, or line to delete it.
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To solve the inequality \(5s > 10\), we can start by isolating \(s\).
1. Divide both sides of the inequality by 5:
\[
s > \frac{10}{5}
\]
\[
s > 2
\]
This tells us that \(s\) can take any value greater than 2.
### Graphing the Solution:
1. **Identify the endpoint**: The endpoint is at \(s = 2\).
2. **Change the endpoint from closed to open**: Since this is a "greater than" inequality, we will use an open circle at \(s = 2\) to indicate that 2 itself is not included in the solution.
3. **Delete the middle of the segment**: The solution is represented on the graph as a ray extending to the right from \(s = 2\).
### Final Representation:
- Open circle at \(s = 2\) (indicating \(2\) is **not** included).
- A solid ray extending to the right (indicating all values greater than \(2\) are included).
Here’s how it looks mathematically and visually:
- Number line representation:
- Open circle at \(2\)
- Ray starting from the point \(2\) and extending to the right towards positive infinity.
Therefore, the solution is \(s > 2\), and its graphical representation is shown as described above.
1. Divide both sides of the inequality by 5:
\[
s > \frac{10}{5}
\]
\[
s > 2
\]
This tells us that \(s\) can take any value greater than 2.
### Graphing the Solution:
1. **Identify the endpoint**: The endpoint is at \(s = 2\).
2. **Change the endpoint from closed to open**: Since this is a "greater than" inequality, we will use an open circle at \(s = 2\) to indicate that 2 itself is not included in the solution.
3. **Delete the middle of the segment**: The solution is represented on the graph as a ray extending to the right from \(s = 2\).
### Final Representation:
- Open circle at \(s = 2\) (indicating \(2\) is **not** included).
- A solid ray extending to the right (indicating all values greater than \(2\) are included).
Here’s how it looks mathematically and visually:
- Number line representation:
- Open circle at \(2\)
- Ray starting from the point \(2\) and extending to the right towards positive infinity.
Therefore, the solution is \(s > 2\), and its graphical representation is shown as described above.
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.