Answer:
To find all the points that are on the graph of the equation 4y - 6x = 12, we can solve the equation for y:
```
y = (3x + 3) / 2
```
This equation gives us the slope and y-intercept of the line. The slope is 3/2 and the y-intercept is 3. We can use this information to plot the line on a graph.
Once we have plotted the line, we can see that all of the following points are on the graph:
* (-4, -3)
* (-1, 1.5)
* (0, 3)
We can check this by substituting the x-value of each point into the equation and solving for y. For example, if we substitute -4 for x in the equation, we get:
```
y = (3)(-4) + 3 / 2 = -12 + 3 / 2 = -9 / 2 = -4.5
```
This is the y-coordinate of the point (-4, -3), so we know that this point is on the graph.
We can do the same thing for the other two points, and we will find that they are also on the graph. Therefore, the only points that are on the graph of the equation 4y - 6x = 12 are **(-4, -3), (-1, 1.5), and (0, 3)**.
Explanation:
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