The empirical probability of the next person entering the store favoring something other than rock, country, or classical music is 24/60.
Explanation:
a) To determine the empirical probability that the next person entering the store favors rock music, we need to divide the number of people who chose rock by the total number of people surveyed.
From the given information, we know that 16 people chose rock out of the 60 people surveyed.
So, the empirical probability of the next person entering the store favoring rock music is 16/60.
b) To determine the empirical probability that the next person entering the store favors country music, we need to divide the number of people who chose country by the total number of people surveyed.
From the given information, we know that 18 people chose country out of the 60 people surveyed.
So, the empirical probability of the next person entering the store favoring country music is 18/60.
c) To determine the empirical probability that the next person entering the store favors something other than rock, country, or classical music, we need to subtract the number of people who chose rock, country, or classical from the total number of people surveyed and then divide it by the total number of people surveyed.
From the given information, we know that 24 people chose something other than rock, country, or classical out of the 60 people surveyed.
So, the empirical probability of the next person entering the store favoring something other than rock, country, or classical music is 24/60.
It's important to note that these probabilities are based on the sample of 60 people surveyed and may not accurately represent the preferences of all people entering the store.
(Try using ai answer. This is what it gave me. I dint think of any of this.)