1. The concept of a unique factorization domain (UFD) has been defined, for commutative (e.g. (4) page 21) and non-commutative (1) integral domains. We take the theory a stage further here by defining a unique factorization ring (UFR), where throughout, a ring is understood to mean a commutative ring with identity, possibly containing proper zero-divisors.
1. Introduction. In (1) we proved that the direct sum of a finite number of unique factorization rings is a unique factorization ring (UFR), and in particular that the direct sum of a finite number of unique factorization domains (UFD's) is a UFR. The converse, however, does not hold i.e. not every UFR can be expressed as a direct sum of UFD's. Here we investigate the structure of UFR's and show that every UFR is a finite direct sum of UFD's and of special UFR's. There is thus a relationship with the structure theorem for principal ideal rings ((2), p. 245).
In a recent Student's problem in the Gazette, a triangle is formed from three rectangular strips of paper lying on a flat surface. Their widths were given and the challenge was to find the sides of the triangle so formed. These turned out to be in the proportions 7: 15: 20 [1].The triangle with sides , , is a curious one. It has both perimeter and area ( ) equal to 42. In his Hitchhiker's Guide to the Galaxy Douglas Adams thought '42' the 'answer to the ultimate question of life, the universe, and everything' and it has achieved cult status. For this reason, we may term this particular triangle the 'hitchhiker triangle'.A B C a b c 42 FIGURE 1: The hitchhiker triangle The investigation of integer-sided triangles with perimeter = area originated in the nineteenth century with mentions in the Lady's Diary (1828) and the Lady's and Gentleman's Diary (1865) [2]. In 1904 William Allen Whitworth (1840-1905) and Daniel Biddle (1840-1924) added to triangle lore by proving the startling result that there are exactly five such triangles with this property, one of which is the hitchhiker triangle.Whitworth set the question in the Educational Times, and provided an elegant solution [3]. Biddle also proved the result and made the interesting aside that such triangles could be regarded as the subtraction of one rightangled triangle from another [4].Ensuing problems of this kind are accessible at school level and offer an avenue into geometry, number theory, algorithms, and computer programming. They also present theoretical challenges. We consider an extension of the 'perimeter = area' property and offer a proof of a conjecture on the longest possible side of these integer-sided triangles [5].
Mathematicians are fascinated by relatios and have worked our extensive theories about them. The treatments tend to be abstract and sometimes the basic ideas are lost in the abstraction. Here we investigate some common ground between mathematical relations and down-to-earth genealogy, the study of family relations.Family relations have been studied by mathematicians, perhaps none more playfully than Thomas P. Kirkman (the nineteenth century expert in combinatorial mathematics) in his little puzzle rhyme he sent to the Educational Times [1, p.117]:Baby Tom of Bay HughThe nephew is and uncle too;In how many ways can this be true
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