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Tupper's number (so named by Cookie Fonster) is the 544-digit number that makes Tupper's self-referential formula work (although the formula is not actually very much self-referential, because the number below is as important as the formula itself).[1] It is approximately equal to \(4.85845 \times 10^{543}\). Its full decimal expansion is shown below:

4858450636189713423582095962494202044581400587983244549483093085061934704708809928450644769865524364849997247024915119110411605739177407856919754326571855442057210445735883681829823754139634338225199452191651284348332905131193199953502413758765239264874613394906870130562295813219481113685339535565290850023875092856892694555974281546386510730049106723058933586052544096664351265349363643957125565695936815184334857605266940161251266951421550539554519153785457525756590740540157929001765967965480064427829131488548259914721248506352686630476300

Tupper-out

The formula itself visually reproduced by graphing the set of points (x,y) satisfying Tupper's inequality, in the area 0<x<106 and N<y<N+17 where N is Tupper's number.

ReferencesEdit

  1. https://sites.google.com/site/pointlesslargenumberstuff/home/l/pgln2

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