An Alternating Product Representation for Real Numbers
Arnold Knopfmacher and
John Knopfmacher
A chapter in Applications of Fibonacci Numbers, 1990, pp 209-216 from Springer
Abstract:
Abstract In 1770 Lambert introduced two positive series expansions for the real numbers in terms of rationals. These were subsequently rediscovered by Sylvester (1880) and Engel (1913) after whom they are respectively named. A further positive series expansion for the real numbers was discovered by Lüroth (1883). Also of particular interest to us is the product expansion of Cantor (1869). More recently, Oppenheim [3] defined a general algorithm for expressing real numbers in terms of a positive series of rational numbers. All of the previously mentioned expansions were shown to be special cases of the Oppenheim algorithm.
Date: 1990
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Persistent link: https://EconPapers.repec.org/RePEc:spr:sprchp:978-94-009-1910-5_24
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DOI: 10.1007/978-94-009-1910-5_24
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