The discussion clarifies the application of the Fundamental Counting Principle (FCP) in determining the possible scores at the end of the second period of a hockey game, where the final score is 5-2. The analysis reveals that the first team can score between 0 to 5 goals, resulting in 6 possible outcomes, while the second team can score between 0 to 2 goals, yielding 3 possible outcomes. By multiplying these possibilities (6 x 3), the total number of different scores at the end of the second period is established as 18. This definitive calculation demonstrates the effective use of FCP in sports score analysis.
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The FCP states that if you have all possible outcomes in a sample space can be found by multiplying the number of ways each event can occur. So, in your problem, you have 6 (outcomes 0,1,2,3,4,5) for one team's score, and 3 (outcomes 0,1,2) for the others. Multiply each possiblility by each other, and WHALAH.ms.confused said: