Two athletes in an 800 metre race take 104 seconds and 108 seconds respectively to complete the race. Assuming each athlete is running at a constant speed, calculate the distance between them when the faster athlete is at the finishing line.

To determine the distance between the two athletes when the faster athlete finishes the 800-meter race, we first need to calculate their respective speeds.

For the faster athlete:
- Distance: \( 800 \) meters
- Time: \( 104 \) seconds
- Speed: \(\frac{800 \text{ meters}}{104 \text{ seconds}} = \frac{200}{26} \approx 7.692 \text{ meters/second} \)

For the slower athlete:
- Distance: \( 800 \) meters
- Time: \( 108 \) seconds
- Speed: \(\frac{800 \text{ meters}}{108 \text{ seconds}} \approx 7.407 \text{ meters/second} \)

Now, we need to find out how far the slower athlete has run when the faster athlete finishes the race.

Time taken by the faster athlete to finish the race: \( 104 \) seconds.

Using the slower athlete's speed, we find the distance covered by the slower athlete in \( 104 \) seconds:
\[ \text{Distance} = \text{Speed} \times \text{Time} \]
\[ \text{Distance} = 7.407 \times 104 \approx 770.33 \text{ meters} \]

Therefore, the distance between the two athletes when the faster athlete finishes the race is:
\[ 800 \text{ meters} - 770.33 \text{ meters} \approx 29.67 \text{ meters} \]

So, the distance between them is approximately \(29.67\) meters.