The expected probability of each outcome is 1/6 or approximately 16.67%.
To find the largest discrepancy between the experimental and expected probability, we need to calculate the difference for each outcome:
Outcome 2: | 10/60 - 1/6 | = | 10/60 - 0.1667 | ≈ 0.1667
Outcome 4: | 9/60 - 1/6 | = | 9/60 - 0.1667 | ≈ 0.1667
Outcome 6: | 6/60 - 1/6 | = | 6/60 - 0.1667 | = 0
Outcome 8: | 15/60 - 1/6 | = | 15/60 - 0.1667 | = 0
Outcome 10: | 13/60 - 1/6 | = | 13/60 - 0.1667 | ≈ 0.1667
Outcome 12: | 8/60 - 1/6 | = | 8/60 - 0.1667 | ≈ 0.1667
The largest discrepancy is approximately 0.17 or 17% to the nearest whole number.