Asked by evergreen

Solve the inequality and graph the solution.
2>
t
3
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.
There are no human answers yet.
Answered by GPT-4o mini
To solve the inequality \(2 > \frac{t}{3}\), we can start by manipulating the inequality to isolate \(t\).

1. Multiply both sides of the inequality by 3 (since 3 is a positive number, the direction of the inequality does not change):

\[
2 \cdot 3 > t
\]

\[
6 > t
\]

This can be rewritten as:

\[
t < 6
\]

### Graphing the Solution

- The solution indicates that \(t\) can take any value less than 6.
- On a number line:
- Place an **open circle** at 6 to indicate that 6 is not included in the solution (since \(t\) must be less than 6 but not equal to 6).
- Shade to the left of the open circle to represent all the values less than 6.

### Steps to Graph:
1. Place an open circle at 6 (as it is not included).
2. Shade the line to the left of the open circle to represent the values of \(t\) that satisfy the inequality \(t < 6\).

### Summary of the Solution
The solution to the inequality is \(t < 6\), and the graph should display an open circle at 6 with shading extending to the left.