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Humanity's love affair with mathematics and mysticism reached a critical juncture, legend has it, on the back of a turtle in ancient China. As Clifford Pickover briefly recounts in this enthralling book, the most comprehensive in decades on magic squares, Emperor Yu was supposedly strolling along the Yellow River one day around 2200 B.C. when he spotted the creature: its shell had a series of dots within squares. To Yu's amazement, each row of squares contained fifteen dots, as did the columns and diagonals. When he added any two cells opposite along a line through the center square, like 2 and 8, he always arrived at 10. The turtle, unwitting inspirer of the ''Yu'' square, went on to a life of courtly comfort and fame. Pickover explains why Chinese emperors, Babylonian astrologer-priests, prehistoric cave people in France, and ancient Mayans of the Yucatan were convinced that magic squares--arrays filled with numbers or letters in certain arrangements--held the secret of the universe. Since the dawn of civilization, he writes, humans have invoked such patterns to ward off evil and bring good fortune. Yet who would have guessed that in the twenty-first century, mathematicians would be studying magic squares so immense and in so many dimensions that the objects defy ordinary human contemplation and visualization? Readers are treated to a colorful history of magic squares and similar structures, their construction, and classification along with a remarkable variety of newly discovered objects ranging from ornate inlaid magic cubes to hypercubes. Illustrated examples occur throughout, with some patterns from the author's own experiments. The tesseracts, circles, spheres, and stars that he presents perfectly convey the age-old devotion of the math-minded to this Zenlike quest. Number lovers, puzzle aficionados, and math enthusiasts will treasure this rich and lively encyclopedia of one of the few areas of mathematics where the contributions of even nonspecialists count.
Please note that the content of this book primarily consists of articles available from Wikipedia or other free sources online. Pages: 44. Chapters: Ahmad al-Buni, Alphamagic square, Antimagic square, Arthur Cayley, Associative magic square, Bernard Frenicle de Bessy, Broken diagonal, Broken space diagonal, Claude Gaspard Bachet de Meziriac, Conway's LUX method for magic squares, D. R. Kaprekar, Diagonal magic cube, Frenicle standard form, Heterosquare, John Horton Conway, John R. Hendricks, Lee Sallows, Lo Shu Square, Luca Pacioli, Magic constant, Magic cube classes, Magic hexagon, Magic hyperbeam, Magic hypercube, Magic series, Magic star, Magic tesseract, Manuel Moschopoulos, Most-perfect magic square, Multimagic cube, Multimagic square, Mystic square, Nasik magic hypercube, Pandiagonal magic cube, Pandiagonal magic square, Pantriagonal magic cube, Perfect magic cube, Philippe de La Hire, Prime reciprocal magic square, Richard Schroeppel, Semiperfect magic cube, Siamese method, Simon de la Loubere, Simple magic cube, Simple magic square, Strachey method for magic squares, W. W. Rouse Ball, Water retention on mathematical surfaces, Yang Hui.
These Pan Magic Square puzzles in this book consists of 25 rectangles built as a 5x5 rectangle shape. A panmagic square, pandiagonal magic square, diabolic square, diabolical square or diabolical magic square is a magic square with the additional property that the broken diagonals, i.e. the diagonals that wrap round at the edges of the square, also add up to the magic constant.
A remarkable account of the life of Dame Kathleen Ollerenshaw, former Lord Mayor, Freeman of the City of Manchester, and President of the Insitute of Mathematics.