MATHCOUNTS is a national mathematics competition and organization supported by the National Society of Professional Engineers. Beginning in 1982, it sponsors local, state, and national competitions to promote mathematics achievement at the middle school level. As a MATHCOUNTS coach at a local middle school and avid geocacher, I have set up geocache events for the kids I coach and for local middle school math camps, where kids have to solve MATHCOUNTS problems which allow them to determine the coordinates of a geocache. This cache is the 7th in a series of math geocaches dedicated to one of the kids I have coached, and part 4 of a 5-part cache series at the university. Please note the clue written on the log sheet for this cache. You will need to collect the clues from each of MC – Julia, MC – Tarl, MC – Magnolia, and MC – Stellan to find the 5th and final cache of this university series: MC – Bente.
The cache is NOT AT THE POSTED COORDINATES. The coordinates given will take you to the Oval at The University of Montana from where you will have a short walk to the cache. To find this cache, you will need to solve the following two MATHCOUNTS problems and use your answers to determine the coordinates. The answer to the 1st question is a 3-digit integer ABC and the answer to the 2nd question is a single digit D multiplied by the square root of a 3-digit integer EFG, written as D√EFG, in simplest radical form. When you solve these questions, you will plug your answers into the coordinates: N 460 51.(D+G)(C-A)(E+F), W 1130 59.(B-E)(A+G)(C-D) to determine the cache location.
MATHCOUNTS Problems:
1. How many diagonals does a 37-sided convex polygon have? Answer: ABC
2. An ant is in an enclosed rectangular prism that is 12 inches long, 10 inches wide, and 8 inches tall. The ant is currently on a side wall (10’’ by 8’’), one inch from the ceiling and one inch from the back wall (12’’ by 8’’). The ant spots a morsel of food stuck on the opposite side wall, one inch from the floor and one inch from the front wall. What is the length in inches of the shortest path the ant can take to reach the food assuming that it does not jump and can only walk across the ceiling and the walls (not the floor)? Express your answer in simplest radical form. Answer: D√EFG
The cache container is a small magnetic key holder, and contains only a log. Since this cache is hidden at the university, you will need to use extreme stealth at certain times of the day. Be patient and if possible, try to look for this cache while most students are in classes or after business hours.
The level of difficulty for this cache refers to the puzzle; the cache is not hard to find once you have the correct coordinates.
You can check your answers for this puzzle on GeoChecker.com.