Question

To find the time and distance when Ella catches up with Ann, we need to determine where the two lines representing their distances cross.

1. **Ann's Distance Equation:**
- \( y = 4x \)
- This represents Ann's distance in miles after \( x \) hours, with a speed of 4 mph.

2. **Ella's Distance Equation:**
- \( y = 6x - 12 \)
- This represents Ella's distance in miles after \( x \) hours, starting 2 hours later than Ann, with a speed of 6 mph.

To find the point where Ella catches up with Ann, we set their equations equal to each other:

\[
4x = 6x - 12
\]

Now, solving for \( x \):

\[
4x - 6x = -12 \\
-2x = -12 \\
x = 6
\]

Now, we substitute \( x = 6 \) back into either equation to find the corresponding \( y \):

Using Ann's equation:
\[
y = 4(6) = 24
\]

So, at \( x = 6 \) hours, both Ann and Ella will have covered a distance of \( 24 \) miles.

Now let's look at which lines on the graph can be used to find this point:
- Ella starts 2 hours later than Ann, so she catches up at \( x = 6 \) hours.
- The corresponding distance when both have gone the same distance is \( y = 24 \) miles.

Next, let’s evaluate the lines provided based on given intersection points.

- **Line 1** intersects with Line 2 at (2, 8), with Line 3 at (4, 12), and with Line 4 at (6, 16).
- **Line 2** intersects with Line 1 at (2, 8), with Line 3 at (6, 24), and with Line 4 at (8, 32).
- **Line 3** intersects with Line 1 at (4, 12), with Line 2 at (6, 24), but does not intersect Line 4.
- **Line 4** intersects with Line 1 at (6, 16) and with Line 2 at (8, 32).

The correct lines to identify when Ella catches up with Ann are:

**Line 2 (0, 0) and Line 3 (2, 0)**:
- Line 2 intersects Line 3 at (6, 24).

Thus, the lines that will help you find when Ella catches up with Ann are **Line 2 and Line 3**, where the intersection occurs at the point (6, 24).