2001 AIME II Problem 10

Below is the professionally curated solution for Problem 10 of the 2001 AIME II, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2001 AIME II solutions, or check the answer key.

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Concepts:multiplicative ordermodular arithmeticcounting pairs

Difficulty rating: 2710

10.

How many positive integer multiples of 10011001 can be expressed in the form 10j10i,10^{j} - 10^{i}, where ii and jj are integers and 0i<j99?0 \le i \lt j \le 99?

Solution:

Factor 10j10i=10i(10ji1).10^j - 10^i = 10^i(10^{j-i} - 1). Since 1001=711131001 = 7 \cdot 11 \cdot 13 is coprime to 10i,10^i, we need 100110ji1.1001 \mid 10^{j-i} - 1. The multiplicative order of 1010 is 66 modulo 7,7, 22 modulo 11,11, and 66 modulo 13,13, so 10k1(mod1001)10^k \equiv 1 \pmod{1001} exactly when kk is a multiple of 6.6. Distinct pairs (i,j)(i, j) give distinct values, so we just count the pairs.

For ji=6dj - i = 6d with 1d16,1 \le d \le 16, the index ii can be 0,1,,996d,0, 1, \ldots, 99 - 6d, giving 1006d100 - 6d choices. The total is d=116(1006d)=94+88++4=(94+4)162=784.\sum_{d=1}^{16} (100 - 6d) = 94 + 88 + \cdots + 4 = \frac{(94 + 4) \cdot 16}{2} = 784.

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