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Golden and Silver Ratios in Bargaining
The Fibonacci Quarterly, 2015We examine a specific class of bargaining problems where the golden and silver ratios appear in a natural way.
Berg, K., Flesch, J., Thuijsman, F.
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1998
Abstract It is standard when studying expansions of this kind to restrict attention to continued fractions in which all numerators equal 1. None the less, expansions that allow for other numerators have been investigated. Here, however, we shall confine ourselves to the normal type.
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Abstract It is standard when studying expansions of this kind to restrict attention to continued fractions in which all numerators equal 1. None the less, expansions that allow for other numerators have been investigated. Here, however, we shall confine ourselves to the normal type.
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Mathematics Teacher: Learning and Teaching PK-12, 2021
This piece is a rumination on flow, pattern, and edges/transitions, focusing on polynomials of odd degree and overlaying/underlaying the flow of the graphical structure with a rainbow to suggest the central importance of queer visibility in mathematics.
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This piece is a rumination on flow, pattern, and edges/transitions, focusing on polynomials of odd degree and overlaying/underlaying the flow of the graphical structure with a rainbow to suggest the central importance of queer visibility in mathematics.
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The Golden Section: The “True” Ratio?
Perceptual and Motor Skills, 1978Seven rectangles with different ratios of the lengths of their sides but of approximately equal areas were presented to 120 subjects to assess their aesthetic preferences for each rectangle. The method of pair comparisons was used for presentation of the rectangles. Subjects tended to prefer the golden rectangle. Also rectangles in the vicinity of the
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2015
In this article we discuss some ideas associated with the Golden Ratio and its alleged appearances in art and biology.
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In this article we discuss some ideas associated with the Golden Ratio and its alleged appearances in art and biology.
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The Golden Ratio: A Contrary Viewpoint
The College Mathematics Journal, 2005(2005). The Golden Ratio—A Contrary Viewpoint. The College Mathematics Journal: Vol. 36, No. 2, pp. 123-134.
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Are We Golden? Investigations with the Golden Ratio
Mathematics Teaching in the Middle School, 2007What do our skeletons have in common mathematically with nature, Greek statues, the Parthenon, and Leonardo da Vinci's artwork? Fascinating Fibonaccis: Mystery and Magic in Numbers (Garland 1987) sheds light on the answer to this question and provides the opportunity for readers to discover other wonderful connections among mathematics, art, and nature.
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Golden eagle optimizer: A nature-inspired metaheuristic algorithm
Computers and Industrial Engineering, 2021Abdolkarim Mohammadi-Balani +2 more
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