2021 AMC 10B Fall Problem 19

Below is the professionally curated solution for Problem 19 of the 2021 AMC 10B Fall, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2021 AMC 10B Fall solutions, or check the answer key.

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Concepts:digitsexponentbounding to limit cases

Difficulty rating: 1990

19.

Let NN be the positive integer 7777777,7777\ldots777, a 313313-digit number where each digit is a 7.7. Let f(r)f(r) be the leading digit of the rr{ }th root of N.N. What isf(2)+f(3)+f(4)f(2) + f(3) + f(4) +f(5)+f(6)?+ f(5)+ f(6)?

8 8

9 9

11 11

22 22

29 29

Solution:

The number NN satisfies 710312<N<810312.7\cdot10^{312}\lt N\lt 8\cdot10^{312}. Multiplying or dividing by a power of 1010 only shifts the decimal point, so we only need the leading factor left after taking out the largest convenient power of 1010.

For r=2r=2, N\sqrt N has leading factor between 7\sqrt7 and 8\sqrt8, so f(2)=2f(2)=2.

For r=3r=3, the leading factor is between 73\sqrt[3]{7} and 83\sqrt[3]{8}, so f(3)=1f(3)=1. For r=4r=4, the leading factor is between 74\sqrt[4]{7} and 84\sqrt[4]{8}, so f(4)=1f(4)=1.

For r=5r=5, since 312=562+2312=5\cdot62+2, the leading factor is between 7005\sqrt[5]{700} and 8005\sqrt[5]{800}. Since 35<700<800<453^5\lt700\lt800\lt4^5, f(5)=3f(5)=3.

For r=6r=6, the leading factor is between 76\sqrt[6]{7} and 86\sqrt[6]{8}, so f(6)=1f(6)=1. The sum is 2+1+1+3+1=82+1+1+3+1=8.

Thus, the answer is A .

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