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2024 AMC 10B Problems/Problem 17

Revision as of 00:15, 14 November 2024 by Lprado (talk | contribs)

Solution 1

We perform casework based on how many people tie. Let's say we're dealing with the following people: $A,B,C,D,E$.

$5$ people tied: All $5$ people tied for $1$st place, so only $1$ way.

$4$ people tied: $A,B,C,D$ all tied, and $E$ either got $1$st or last. ${5}\choose{1}$ ways to choose who isn't involved in the tie and $2$ ways to choose if that person gets first or last, so $10$ ways.

$3$ people tied: We have $ABC, D, E$. There are $3! = 6$ ways to determine the ranking of the $3$ groups. There are $5\choose2$ ways to determine the two people not involved in the tie. So $6 \cdot 10 = 60$ ways.

$2$ people tied: We have $AB, C, D, E$. There are $4! = 24$ ways to determine the ranking of the $4$ groups. There are $5\choose{3}$ ways to determine the three people not involved in the tie. So $24 \cdot 10 = 240$ ways.

It's impossible to have "1 person tie", so that case has $0$ ways.

Finally, there are no ties. We just arrange the $5$ people, so $5! = 120$ ways.

The answer is $1+10+60+240+0+120 = \boxed{431}$.

~lprado

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