MathDB

1985 MMPC

Part of Michigan Mathematics Prize Competition

Subcontests

(1)
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1985 MMPC , Part 2 = Michigan Mathematics Prize Competition

p1. Sometimes one finds in an old park a tetrahedral pile of cannon balls, that is, a pile each layer of which is a tightly packed triangular layer of balls. A. How many cannon balls are in a tetrahedral pile of cannon balls of NN layers? B. How high is a tetrahedral pile of cannon balls of NN layers? (Assume each cannon ball is a sphere of radius RR.)
p2. A prime is an integer greater than 11 whose only positive integer divisors are itself and 11. A. Find a triple of primes (p,q,r)(p, q, r) such that p=q+2p = q + 2 and q=r+2q = r + 2 . B. Prove that there is only one triple (p,q,r)(p, q, r) of primes such that p=q+2p = q + 2 and q=r+2q = r + 2 .
p3. The function gg is defined recursively on the positive integers by g(1)=1g(1) =1, and for n>1n>1 , g(n)=1+g(ng(n1))g(n)= 1+g(n-g(n-1)) . A. Find g(1)g(1) , g(2)g(2) , g(3)g(3) and g(4)g(4) . B. Describe the pattern formed by the entire sequence g(1),g(2),g(3),...g(1) , g(2 ), g(3), ... C. Prove your answer to Part B.
p4. Let xx , yy and zz be real numbers such that x+y+z=1x + y + z = 1 and xyz=3xyz = 3 . A. Prove that none of xx , yy , nor zz can equal 11. B. Determine all values of xx that can occur in a simultaneous solution to these two equations (where x,y,zx , y , z are real numbers).
p5. A round robin tournament was played among thirteen teams. Each team played every other team exactly once. At the conclusion of the tournament, it happened that each team had won six games and lost six games. A. How many games were played in this tournament? B. Define a circular triangle in a round robin tournament to be a set of three different teams in which none of the three teams beat both of the other two teams. How many circular triangles are there in this tournament? C. Prove your answer to Part B.
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