Asked by T-Swizzle

To adjust the linear equation \( y = -x - 3 \) so that the bottom part of the line is closer to -5, we can manipulate the y-intercept or alter the slope in a way that maintains the line's general behavior while shifting its position.

### Original Equation:
The line \( y = -x - 3 \) intersects the y-axis at \( (0, -3) \) and has a slope of -1.

### Desired Adjustment:
If you want the bottom part of the line to be closer to -5, you will need to adjust the vertical position of the line.

One way to achieve this is to lower the y-values at certain x-values. For example, you could adjust the y-intercept to something like -4 or lower, which would shift the entire line down.

### New Equation:
Let's modify the equation to \( y = -x - 4 \).

### Analysis of New Equation:
1. **Intersection at Y-axis**: This line intersects the y-axis at \( (0, -4) \).
2. **X-intercept**: Setting \( y = 0 \):
\[
0 = -x - 4 \Rightarrow x = -4
\]
So the x-intercept is \( (-4, 0) \).
3. **Behavior**: The slope remains -1, so the line will still be decreasing at the same rate.

This adjustment brings the lower part of the line closer to -5 on the y-axis without changing its overall slope.

### Conclusion:
The adjusted equation you can use is:
\[
y = -x - 4
\]
This line should have the lower part closer to -5 while keeping the top part close to its original position. You can refine this adjustment further if a specific distance or alignment is desired.

Apologies for the misunderstanding! If you want to keep the top part of the line exactly the same, between -5 and 0, and only adjust the bottom part closer to -5, you need to change the slope or y-intercept carefully.

### Existing Equation:
The original equation is:
\[
y = -x - 3
\]

### Desired Changes:
To achieve this, let’s keep the part between -5 and 0 intact and modify the lower portion specifically. This means we want to increase the steepness of the line without changing where it crosses the y-axis at y = -3.

### Adjusted Slope:
One way to shift the bottom part of the line closer to -5 while keeping the top segment intact is to adjust the line to a steeper slope. Let's try a line with a steeper slope, making it steeper than -1.

### New Adjusted Equation:
If we keep the y-intercept the same but increase the slope, we can try:
\[
y = -2x - 3
\]
This line has a slope of -2, which means it will drop faster.

### Analysis of the New Equation:
1. **Y-intercept**: The line still crosses the y-axis at \( (0, -3) \), meaning the top part will stay consistent.
2. **X-intercept**: Setting \( y = 0 \):
\[
0 = -2x - 3 \Rightarrow 2x = -3 \Rightarrow x = -\frac{3}{2} \text{ or } (-1.5, 0)
\]
3. **Behavior**: The slope of -2 means that as \( x \) increases, \( y \) decreases more quickly, pulling the bottom part closer to -5.

### Conclusion:
The adjusted line \( y = -2x - 3 \) retains the behavior you want between -5 and 0 but makes the bottom part of the line closer to -5.

If this is still not what you want or if you have a specific alteration needed, please let me know!