Jim rented the lawnmower from 9:00 a.m. until 5:30 p.m. To find the total duration of the rental, we can calculate the difference between these times. From 9:00 a.m. to 5:00 p.m., there are 8 hours. We then need to add the additional 30 minutes from 5:00 p.m. until 5:30 p.m. We convert 30 minutes to 0.5 hours (30 minutes / 60 minutes), so the total duration is 8.5 hours.

Now that we found the duration in hours, we can calculate the hourly rental fee. To do this, we'll divide the total cost Jim paid, $53.04, by the total duration in hours, 8.5. So, the hourly rental fee is: \(\frac{53.04}{8.5}= \frac{5304}{850}\)

For this step, we need to simplify the fraction \(\frac{5304}{850}\) without using a calculator. Let's divide both numerator and denominator by their greatest common divisor. The greatest common divisor of 5304 and 850 is 2, so we divide both numbers by 2. \(\frac{5304}{850} = \frac{5304 \div 2}{850 \div 2} = \frac{2652}{425}\) Now compare this simplified fraction with the given options: (A) \(5.58 = \frac{558}{100}\) (B) \(6.24 = \frac{624}{100}\) (C) \(6.63 = \frac{663}{100}\) (D) \(7.07 = \frac{707}{100}\) Notice that (C) \(\frac{663}{100}\) is close to our simplified fraction \(\frac{2652}{425}\). As we cannot use a calculator, we can safely approximate that the hourly rental fee was (C) \( \$6.63\).