40th Putnam 1979


A1. Find the set of positive integers with sum 1979 and maximum possible product.
A2. R is the reals. For what real k can we find a continuous function f : R → R such that f(f(x)) = k x⁹ for all x.
A3. a_n are defined by a₁ = α, a₂ = β, a_n+2 = a_na_n+1/(2a_n - a_n+1). α, β are chosen so that a_n+1 ≠ 2a_n. For what α, β are infinitely many a_n integral?
A4. A and B are disjoint sets of n points in the plane. No three points of A ∪ B are collinear. Can we always label the points of A as A₁, A₂, ... , A_n, and the points of B as B₁, B₂, ... , B_n so that no two of the n segments A_iB_i intersect?
A5. Show that we can find two distinct real roots α, β of x³ - 10x² + 29x - 25 such that we can find infinitely many positive integers n which can be written as n = [rα] = [sβ] for some integers r, s.
A6. Given n reals α_i ∈ [0, 1] show that we can find β ∈ [0, 1] such that ∑ 1/\|β - α_i\| ≤ 8n ∑₁ⁿ 1/(2i - 1).
B1. Can we find a line normal to the curves y = cosh x and y = sinh x?
B2. Given 0 < α < β, find lim_λ→0 ( ∫₀¹ (βx + α(1 - x) )^λ dx )^1/λ.
B3. F is a finite field with n elements. n is odd. x² + bx + c is an irreducible polynomial over F. For how many elements d ∈ F is x² + bx + c + d irreducible?
B4. Find a non-trivial solution of the differential equation F(y) ≡ (3x² + x - 1)y'' - (9x² + 9x - 2)y' + (18x + 3)y = 0. The solution of F(y) = 6(6x + 1) such that f(0) = 1, and ( f(-1) - 2)( f(1) - 6) = 1 is y=f(x). Find a relation of the form ( f(-2) - a)( f(2) - b) = c.
B5. A convex set S in the plane contains (0, 0) but no other lattice points. The intersections of S with each of the four quadrants have the same area. Show that the area of S is at most 4.
B6. z_i are complex numbers. Show that \|Re[ (z₁² + z₂² + ... + z_n²)^1/2 ]\| ≤ \|Re z₁\| + \|Re z₂\| + ... + \|Re z_n\|.

To avoid possible copyright problems, I have changed the wording, but not the substance, of all the problems. The original text and official solutions were published in American Mathematical Monthly 87 (1980) 635-40. They are also available (with the solutions expanded) in: Gerald L Alexanderson et al, The William Lowell Putnam Mathematical Competition, 1965-1984. Out of print, but in some university libraries.