![]() Note: We should always remember that if the given two events are mutually exclusive events then \, where the two events do not occur at the same time and only one event can occur. In this case, even if Max Verstappen only has a probability of 0.35 of winning, because it’s the highest probability of winning in that race, the function correctly maps him as the winner. Here we are given that the probability of horse A winning a race is \[\dfrac \\ I sort the probabilities from highest to lowest and map the driver with the highest probability as the winner of the race. We can then find whether they are mutually exclusive and substitute the given probabilities in the formula and we can find the answer. ![]() As such, a race with 1/1 odds would signify that for every failure, there would be one success, giving you a 50 probability. Students will need a pair of dice and can complete this work as individuals. We can first write the formula of the probability of either winning. Probability: Fractional odds can easily be translated to probability percentages. These slides show a full and detailed walkthrough of the Probability Race Game. ![]() ![]() Hint: In this problem, we have to find the probability of either two horses winning the race where we are given the probabilities of each horse winning. ![]()
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