1. The problem involves understanding frequency (f) and relative frequency (fr) in two tables: one for clubs and one for games. 2. Frequency (f) is the count of occurrences, and relative frequency (fr) is the fraction or decimal representing the proportion of that category relative to the total. 3. For the clubs table, frequencies are: Teatro = 8, Baile = 5, Lectura = 4, Pintura = 3. Total frequency is $8 + 5 + 4 + 3 = 20$. 4. The relative frequency for Baile is given as $\frac{5}{20} = \frac{25}{100} = 0.25$, confirming the total frequency is 20. 5. For the games table, frequencies are: Ludo = 9, Ajedrez = 2, Damas = unknown, Cartas = 6, with total frequency 25. 6. The relative frequency for Ludo is $\frac{9}{25} = \frac{36}{100} = 0.36$, confirming total frequency is 25. 7. To find the missing frequency for Damas, sum known frequencies: $9 + 2 + 6 = 17$. Since total is 25, $\text{Damas} = 25 - 17 = 8$. 8. Relative frequency for Damas is $\frac{8}{25} = 0.32$. 9. The time labels M, Md, T, N represent morning, noon, afternoon, and night respectively, but no calculation is requested for these. Final answers: - Total frequency clubs = 20 - Total frequency games = 25 - Missing frequency Damas = 8 - Relative frequency Damas = 0.32