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2023 AMC 10B Problems/Problem 21

Revision as of 14:42, 15 November 2023 by Technodoggo (talk | contribs)

Solution

We first examine the possible arrangements for parity of number of balls in each box for $2022$ balls.

If a $0$ denotes an even number and a $1$ denotes an odd number, then the distribution of balls for $2022$ balls could be $000,011,101,$ or $110$. With the insanely overpowered magic of cheese, we assume that each case is about equally likely.

From $000$, it is not possible to get to all odd by adding one ball; we could either get $100,010,$ or $001$. For the other $3$ cases, though, if we add a ball to the exact right place, then it'll work.

For each of the working cases, we have $1$ possible slot the ball can go into (for $101$, for example, the new ball must go in the center slot to make $111$) out of the $3$ slots, so there's a $\dfrac13$ chance. We have a $\dfrac34$ chance of getting one of these working cases, so our answer is $\dfrac34\cdot\dfrac13=\boxed{\textbf{(E) }\dfrac14.}$

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