2. Question 2. Two events are independent if: a) They have no outcomes in common. b) The occurrence of one does not affect the occurrence of the other. c) They both have the same probability of occurring. d) They can never occur at the same time.

To determine which statement correctly defines independent events, let's analyze each option: a) **They have no outcomes in common.** This statement describes mutually exclusive events, not independent events. Independent events can have outcomes in common. b) **The occurrence of one does not affect the occurrence of the other.** This is the correct definition of independent events. If two events are independent, knowing that one event occurred does not change the probability of the other event occurring. c) **They both have the same probability of occurring.** This statement is not true for independent events. Independent events can have different probabilities. d) **They can never occur at the same time.** This statement also describes mutually exclusive events. Independent events can occur simultaneously. Based on this analysis, the correct answer is: **b) The occurrence of one does not affect the occurrence of the other.**