Problem of the Month
- Everyone is welcome to participate, but only undergraduate OU students are eligible for the prizes.
- At the end of the academic year, a prize will be awarded to the undergraduate OU students with the most correct solutions.
- A complete solution to the problem must include a proof.
- Solutions to the Problem of the Month can be submitted in the Math Department's office (PHSC 423), or via email to nickmbmiller [at] ou [dot] edu
- Make sure that your submission includes your name and OU email.
- The deadline for submission is the last day of the month.
- The problem of the month during the summer months of May, June, July, and August will not be graded and are just for fun.
Winners of the academic year 2022/23 are Matthew Hudson and Jacob Norris.
April 2024
Products of polynomials
Suppose that f(x), g(x) are two monic polynomials with non-negative real coefficients and suppose that the product f(x)g(x)=xn+an-1xn-1+...+a0 has the property that that each coefficient, ai, is either 0 or 1. Does it follow that f and g have the same property?