Final answer:
The probability of getting more than three tails when flipping a coin three times is 0%, as it is impossible to get more than three tails in three coin flips.
Step-by-step explanation:
The student has asked about the probability of getting more than three tails when flipping a coin three times. First, it is important to recognize that when you flip a coin three times, there are a limited number of possible outcomes: 0 tails (all heads), 1 tail, 2 tails, or 3 tails. You cannot get more than three tails in only three coin tosses, as each flip yields at most one tail. Given a fair coin, where the probability of getting either heads or tails is 50%, we calculate probabilities for a sequence of events by multiplying the probabilities of each individual event.
Since it is impossible to get more than three tails when flipping a coin three times, the probability is 0% or simply 0. This result is based on the basic probability principles and assumes a fair coin, with no bias that could impact the outcome of each toss.