Asked by dee

To fill in the missing values in the table based on the information provided, we can determine the blocks traveled per minute.

- In 5 minutes, Jose travels 8 blocks, so his speed is \( \frac{8 \text{ blocks}}{5 \text{ minutes}} = 1.6 \text{ blocks per minute}\).

- In 10 minutes, he travels 16 blocks, which also confirms the speed: \( \frac{16 \text{ blocks}}{10 \text{ minutes}} = 1.6 \text{ blocks per minute}\).

Now, let's fill in the missing values in the table.

### Given:
1. **When mins (x) = 5**:
- Blocks (y) = 8

2. **When mins (x) = 10**:
- Blocks (y) = 16

### To find:
1. **When mins (x) = 2.5**:
- Using the blocks per minute:
\[
y = 1.6 \times 2.5 = 4 \text{ blocks}
\]

2. **When mins (x) = 25**:
- Again using the same rate:
\[
y = 1.6 \times 25 = 40 \text{ blocks}
\]

### Completed table:
- Minutes (x):
- 2.5 → Blocks (y) = 4
- 5 → Blocks (y) = 8
- 10 → Blocks (y) = 16
- 25 → Blocks (y) = 40

So, the completed table would look like:

| Minutes (x) | Blocks (y) |
|-------------|------------|
| 2.5 | 4 |
| 5 | 8 |
| 10 | 16 |
| 25 | 40 |