To determine the order of the distances run by Joseph, Colby, and Susie, we first need to calculate the distance Joseph ran. Joseph ran \(\sqrt{125}\) miles, which can be calculated as follows:
\[ \sqrt{125} = \sqrt{25 \times 5} = 5\sqrt{5} \approx 5 \times 2.236 \approx 11.18 \text{ miles} \]
Now, we have the distances:
- Joseph: approximately 11.18 miles
- Colby: 13 miles
- Susie: The distance Susie ran is not specified, but if we assume she ran the distance from the library to her house is not greater than the other two distances, we cannot determine her exact distance without additional information.
However, assuming Susie ran the shortest possible distance (as we have no specific value for her distance), she would likely run less than or equal to 11.18 miles.
Thus, we can make a reasonable assumption:
- If Susie's distance is less than Joseph's (which is \(11.18\) miles), the order would be:
- Susie, Joseph, Colby
- However, if Susie's distance was equal to or more than 11.18 miles she would come after Joseph.
Since we have no specific distance for Susie, and assuming she lives relatively close to the library, the best assumption is:
The order with the assumption that Susie ran a distance that makes her less than Joseph would be:
- Susie, Joseph, Colby
However, if you can provide the distance Susie ran, we could adjust accordingly. Based on the provided options and without exact details, the most reasonable choice, if Susie's distance is reasonably short compared to Joseph’s and Colby’s, is:
Susie, Joseph, Colby.