2020 AMC 10B Problem 15

Below is the professionally curated solution for Problem 15 of the 2020 AMC 10B, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2020 AMC 10B solutions, or check the answer key.

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Concepts:pattern recognitionprocess simulationleast common multiple

Difficulty rating: 1660

15.

Steve wrote the digits 1,1, 2,2, 3,3, 4,4, and 55 in order repeatedly from left to right, forming a list of 10,00010,000 digits, beginning 123451234512123451234512\ldots

He then erased every third digit from his list (that is, the 33rd, 66th, 99th, \ldots digits from the left), then erased every fourth digit from the resulting list (that is, the 44th, 88th, 1212th, \ldots digits from the left in what remained), and then erased every fifth digit from what remained at that point.

What is the sum of the three digits that were then in the positions 2019,2020,2021?2019, 2020, 2021?

77

99

1010

1111

1212

Solution:

Start with the repeating block 1234512345. Deleting every third digit repeats over lcm(3,5)=15\operatorname{lcm}(3,5)=15 original positions: 1234512345123451245235134,123451234512345\longrightarrow 1245235134, so the new period has length 1010.

Deleting every fourth digit from this period repeats over lcm(4,10)=20\operatorname{lcm}(4,10)=20 positions: 12452351341245235134124235341452513,12452351341245235134\longrightarrow 124235341452513, so the new period has length 1515.

Deleting every fifth digit from this period gives 124235341452513124253415251,124235341452513\longrightarrow 124253415251, which has period 1212. Since 20193(mod12)2019\equiv 3\pmod{12}, the digits in positions 2019,2020,20212019,2020,2021 are the 3rd, 4th, and 5th digits of this period: 4,2,54,2,5. Their sum is 1111.

Thus, the correct answer is D .

Problem 15 in Other Years