2014 AMC 10A Problem 24

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Concepts:arithmetic sequencesummationtriangular number

Difficulty rating: 1790

24.

A sequence of natural numbers is constructed by listing the first 4,4, then skipping one, listing the next 5,5, skipping 2,2, listing 6,6, skipping 3,3, and on the nnth iteration, listing n+3n+3 and skipping n.n. The sequence begins 1,2,3,4,6,7,8,9,10,13.1,2,3,4,6,7,8,9,10,13. What is the 500,000500,000th number in the sequence?

996, ⁣506996,\!506

996, ⁣507996,\!507

996, ⁣508996,\!508

996, ⁣509996,\!509

996, ⁣510996,\!510

Solution:

After nn full iterations, the number of listed terms is 4+5++(n+3)=n(n+7)24+5+\cdots+(n+3)=\frac{n(n+7)}2.

We need the largest nn with n(n+7)2<500000\frac{n(n+7)}2<500000. Since 9961003=998988996\cdot1003=998988, after 996996 iterations there are 499494499494 listed numbers.

The first number listed in iteration 997997 is one more than the total of all listed and skipped numbers so far, namely 9962+4996+1=996001996^2+4\cdot996+1=996001.

The 500000500000th listed number is the 500000499494=506500000-499494=506th number of this next block, so it is 996001+505=996506996001+505=996506.

Thus, A is the correct answer.

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