Question

To find the slope of the line passing through the points described by \(3y\) and \(-1x\), we'll first interpret this correctly. It seems you're looking for the slope of a line given by these components.

1. **Identify the points:** Assuming \(3y\) implies a point where \(y = 3\) and \(-1x\) implies a point where \(x = -1\). The coordinates of this point would be \((-1, 3)\).

2. **Find the slope:** The slope of a line passing through a single point cannot be determined from just one point. However, if you want to compare it to the lines given in the equations, we can look at their slopes.

The equations given are:
1. \(y = -1x + 2\) → Slope = -1
2. \(y = 3x + 4\) → Slope = 3
3. \(y = 4x + 3\) → Slope = 4
4. \(y = -4x + 3\) → Slope = -4

Now, let's summarize:
- The slope of the line through the point \((-1, 3)\) relative to the given equations will depend on additional points or would need another point to find comparison slopes.

### Additional Information & Summary

If you simply want to relate it:
- The slope of the segment through a single point is not defined without another point.
- The provided equations have distinct slopes, which can be graphed to see their angles.

If you meant for me to calculate the slope between two defined points, or if you're looking for something else with these equations and point (e.g. intersection), please clarify!