2025 AMC 8 Problem 21
Below is the video solution and professionally curated solution for Problem 21 of the 2025 AMC 8, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2025 AMC 8 solutions, or check the answer key.
All of the real AMC 8, AMC 10, AMC 12, and AIME problems in our complete solution collection are used with official legal permission of the Mathematical Association of America (MAA).
Difficulty rating: 1840
21.
The Konigsberg School has assigned grades through to pods through one grade per pod. Some of the pods are connected by walkways, as shown in the figure below. The school noticed that each pair of connected pods has been assigned grades differing by or more grade levels. (For example, grades and will not be in pods directly connected by a walkway.) What is the sum of the grade levels assigned to pods and
Video solution:
Click to load, then click again to play
Written solution:
Pods and are all pairwise connected. Four numbers from through that are all at least apart must be . Thus and get the even grades .
Pod is connected to and . If , then and would have to be and , leaving and as and . But then , which is connected to and , cannot be either remaining even grade without being only away from one of them. So cannot be .
If , then and must be and . If , then cannot be or , so . Also, cannot be , since then again cannot be or . Therefore and , giving .
The case is symmetric, giving and . The same sum is .
Thus, A is the correct answer.
Problem 21 in Other Years
1985 AMC 8 · 1986 AMC 8 · 1987 AMC 8 · 1988 AMC 8 · 1989 AMC 8 · 1990 AMC 8 · 1991 AMC 8 · 1992 AMC 8 · 1993 AMC 8 · 1994 AMC 8 · 1995 AMC 8 · 1996 AMC 8 · 1997 AMC 8 · 1998 AMC 8 · 1999 AMC 8 · 2000 AMC 8 · 2001 AMC 8 · 2002 AMC 8 · 2003 AMC 8 · 2004 AMC 8 · 2005 AMC 8 · 2006 AMC 8 · 2007 AMC 8 · 2008 AMC 8 · 2009 AMC 8 · 2010 AMC 8 · 2011 AMC 8 · 2012 AMC 8 · 2013 AMC 8 · 2014 AMC 8 · 2015 AMC 8 · 2016 AMC 8 · 2017 AMC 8 · 2018 AMC 8 · 2019 AMC 8 · 2020 AMC 8 · 2022 AMC 8 · 2023 AMC 8 · 2024 AMC 8 · 2026 AMC 8