References of "Mathematical Intelligencer"
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See detailA hyperbolic proof of Pascal's Theorem
acosta, Miguel; Schlenker, Jean-Marc UL

in Mathematical Intelligencer (2021), 43(2), 130--133

We provide a simple proof of Pascal's Theorem on cyclic hexagons, as well as a generalization by Möbius, using hyperbolic geometry.

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See detailWalking on Real Numbers
Aragón Artacho, Francisco Javier UL; Bailey, D. H.; Borwein, J. M. et al

in Mathematical Intelligencer (2013), 35(1), 42-60

Motivated by the desire to visualize large mathematical data sets, especially in number theory, we offer various tools for representing floating point numbers as planar(or three dimensional) walks and for ... [more ▼]

Motivated by the desire to visualize large mathematical data sets, especially in number theory, we offer various tools for representing floating point numbers as planar(or three dimensional) walks and for quantitatively measuring their “randomness.” [less ▲]

Detailed reference viewed: 49 (5 UL)