Six customers enter a three-floor restaurant. Each customer decides on which floor to have dinner. Assume that the decisions of different customers are independent, and that for each customer, each floor is equally likely. Find the probability that exactly one customer dines on the first floor.
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The probability would be 6 × 1 /3 × (2/3) ^ 5
Explanation:
- Probability is the term which is defined as the number of ways in order to achieve the success. It is the aggregate number of the possible results or outcomes.
- So, in this situation, 6 customers want to enter the 3 floor restaurant. Then the probability would be:
= Number of customers × 1/ Number of floors × (2 / 3) ^5
= 6 × 1/ 3 × (2/3) ^5
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