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• Maximal_common_divisor abstract "In abstract algebra, particularly ring theory, maximal common divisors are an abstraction of the number theory concept of greatest common divisor (GCD). This definition is slightly more general than GCDs, and may exist in rings in which GCDs do not. Halter-Koch (1998) provides the following definition.d ∈ H is a maximal common divisor of a subset, B ⊂ H, if the following criteria are met: d|b for all b ∈ B Suppose c ∈ H d|c and c|b for all b ∈ a. Then .".
• Maximal_common_divisor wikiPageID "24971513".
• Maximal_common_divisor wikiPageRevisionID "601821082".
• Maximal_common_divisor hasPhotoCollection Maximal_common_divisor.
• Maximal_common_divisor subject Category:Abstract_algebra.
• Maximal_common_divisor comment "In abstract algebra, particularly ring theory, maximal common divisors are an abstraction of the number theory concept of greatest common divisor (GCD). This definition is slightly more general than GCDs, and may exist in rings in which GCDs do not. Halter-Koch (1998) provides the following definition.d ∈ H is a maximal common divisor of a subset, B ⊂ H, if the following criteria are met: d|b for all b ∈ B Suppose c ∈ H d|c and c|b for all b ∈ a. Then .".
• Maximal_common_divisor label "Maximal common divisor".
• Maximal_common_divisor sameAs m.09gp2sg.
• Maximal_common_divisor sameAs Q6795633.
• Maximal_common_divisor sameAs Q6795633.
• Maximal_common_divisor wasDerivedFrom Maximal_common_divisor?oldid=601821082.
• Maximal_common_divisor isPrimaryTopicOf Maximal_common_divisor.