2022 AMC 10B Problem 13

Below is the professionally curated solution for Problem 13 of the 2022 AMC 10B, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2022 AMC 10B solutions, or check the answer key.

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Concepts:primesum and difference of cubesdigits

Difficulty rating: 1140

13.

The positive difference between a pair of primes is equal to 2,2, and the positive difference between the cubes of the two primes is 31106.31106. What is the sum of the digits of the least prime that is greater than those two primes?

 8 \ 8

 10 \ 10

 11 \ 11

 13 \ 13

 16 \ 16

Solution:

Since the primes are 22 away from each other, we can make them equal to m1,m+1,m-1,m+1, where mm is their average.

Then, (m+1)3(m1)3=31106,(m+1)^3-(m-1)^3 = 31106 , making m3+3m2+3m+1m^3+3m^2+3m+1(m33m2+3m1)-(m^3-3m^2+3m-1) =6m2+2=31106.= 6m^2+2 = 31106.

Therefore, m2=5184,m^2= 5184, so m=72.m=72.

The primes are therefore 71,73.71,73. The least prime greater than both of those is 79,79, and its digit sum is 16.16.

Thus, the answer is E .

Problem 13 in Other Years