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Original Question
Solve the inequality and graph the solution. 20>5c Plot the endpoints. Select an endpoint to change it from closed to open. Sel...Asked by evergreen
Solve the inequality and graph the solution.
–
2<c+2
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.
–
2<c+2
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 \( -2 < c + 2 \), we will first isolate \( c \).
1. Subtract 2 from both sides:
\[
-2 - 2 < c
\]
\[
-4 < c
\]
This can also be written as:
\[
c > -4
\]
Now we can denote the solution set:
- The solution includes all values of \( c \) that are greater than -4.
### Graphing the Solution
1. **Endpoint:** The endpoint is at \( -4 \).
2. **Type of Endpoint:** Since the inequality is strictly greater than \( -4 \) (not inclusive), we will represent -4 as an open dot (not included).
3. **Direction of the Ray:** Since \( c \) can take on any value greater than -4, we draw an arrow to the right (indicating all values greater than -4).
### Final Graph Representation
- Open circle (or dot) at \( -4 \) to indicate it is not included.
- Arrow extending to the right from \( -4 \).
So, in summary, the graph would look like:
```
<---( -4 )-------------------->
```
This indicates that all values greater than \( -4 \) are included in the solution set.
1. Subtract 2 from both sides:
\[
-2 - 2 < c
\]
\[
-4 < c
\]
This can also be written as:
\[
c > -4
\]
Now we can denote the solution set:
- The solution includes all values of \( c \) that are greater than -4.
### Graphing the Solution
1. **Endpoint:** The endpoint is at \( -4 \).
2. **Type of Endpoint:** Since the inequality is strictly greater than \( -4 \) (not inclusive), we will represent -4 as an open dot (not included).
3. **Direction of the Ray:** Since \( c \) can take on any value greater than -4, we draw an arrow to the right (indicating all values greater than -4).
### Final Graph Representation
- Open circle (or dot) at \( -4 \) to indicate it is not included.
- Arrow extending to the right from \( -4 \).
So, in summary, the graph would look like:
```
<---( -4 )-------------------->
```
This indicates that all values greater than \( -4 \) are included in the solution set.
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