Let F(x,y) and G(x,y) be relatively prime homogeneous polynomials of degree at least one having integer coefficients. Prove that there exists a number c depending only on the degrees and the maximum of the absolute values of the coefficients of F and G such that F(x,y)=G(x,y) for any integers x and y that are relatively prime and satisfy max{∣x∣,∣y∣}>c. [K. Gyory] Miklos Schweitzercollege contestsnumber theoryrelatively primealgebrapolynomialabsolute value