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• Mason–Stothers_theorem abstract "The Mason–Stothers theorem, or simply Mason's theorem, is a mathematical theorem about polynomials, analogous to the abc conjecture for integers. It is named after W. Wilson Stothers, who published it in 1981, and R. C. Mason, who rediscovered it shortly thereafter.The theorem states:Let a(t), b(t), and c(t) be relatively prime polynomials such that a + b = c, with coefficients that are either real numbers or complex numbers. Then where rad(f) is the polynomial of minimum degree that has the same roots as f, so deg(rad(f)) gives the number of distinct roots of f.↑ ↑ ↑".
• Mason–Stothers_theorem wikiPageID "30962576".
• Mason–Stothers_theorem wikiPageRevisionID "602132229".
• Mason–Stothers_theorem title "Mason's Theorem".
• Mason–Stothers_theorem urlname "MasonsTheorem".
• Mason–Stothers_theorem subject Category:Polynomials.
• Mason–Stothers_theorem subject Category:Theorems_in_algebra.
• Mason–Stothers_theorem comment "The Mason–Stothers theorem, or simply Mason's theorem, is a mathematical theorem about polynomials, analogous to the abc conjecture for integers. It is named after W. Wilson Stothers, who published it in 1981, and R. C. Mason, who rediscovered it shortly thereafter.The theorem states:Let a(t), b(t), and c(t) be relatively prime polynomials such that a + b = c, with coefficients that are either real numbers or complex numbers.".
• Mason–Stothers_theorem label "Mason–Stothers theorem".
• Mason–Stothers_theorem label "メーソン・ストーサーズの定理".
• Mason–Stothers_theorem sameAs Mason%E2%80%93Stothers_theorem.
• Mason–Stothers_theorem sameAs メーソン・ストーサーズの定理.
• Mason–Stothers_theorem sameAs Q6783821.
• Mason–Stothers_theorem sameAs Q6783821.
• Mason–Stothers_theorem wasDerivedFrom Mason–Stothers_theorem?oldid=602132229.