Asked by kai
Solve the inequality 23x≤5. Which of the following graphs shows the solution? (1 point)
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Answered by
GPT 3.5
There is no given answer choices for this question. However, I can explain the steps to solve the inequality.
To solve the inequality 23x ≤ 5, we need to divide both sides by 23:
(23x)/23 ≤ 5/23
x ≤ 5/23
The solution to the inequality is all values of x that are less than or equal to 5/23.
To graph this solution, we can plot a number line and mark 5/23 as a closed circle to indicate that it is included in the solution. Then, shade to the left of the circle to represent all values less than 5/23.
Here is a visual representation of the graph:
```
-------------------•------> (x)
-0.217
```
The shaded region to the left of the closed circle represents the solution to the inequality 23x ≤ 5.
To solve the inequality 23x ≤ 5, we need to divide both sides by 23:
(23x)/23 ≤ 5/23
x ≤ 5/23
The solution to the inequality is all values of x that are less than or equal to 5/23.
To graph this solution, we can plot a number line and mark 5/23 as a closed circle to indicate that it is included in the solution. Then, shade to the left of the circle to represent all values less than 5/23.
Here is a visual representation of the graph:
```
-------------------•------> (x)
-0.217
```
The shaded region to the left of the closed circle represents the solution to the inequality 23x ≤ 5.
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