Munching Squares -- from Wolfram MathWorld
Por um escritor misterioso
Descrição
A plot of the cells on a grid satisfying bitwise XOR(a,b)<n for consecutive values of n=1, 2, . It is thought that it was discovered by Jackson Wright on the RLE PDP-1 around 1962 (Beeler et al. 1972). The plots above show the results in static and animated form for n=1 to 15 on a grid running from 0 to 15.
Associative Magic Square -- from Wolfram MathWorld
![Munching Squares -- from Wolfram MathWorld](https://content.wolfram.com/sites/43/2023/10/sw-ted-2010-min.jpg)
Wolfram Language – Stephen Wolfram Writings
![Munching Squares -- from Wolfram MathWorld](https://content.wolfram.com/sites/43/2023/11/sw1103023eightcellAimg4.png)
Stephen Wolfram Writings
![Munching Squares -- from Wolfram MathWorld](http://www.streppone.it/cosimo/blog/wp-content/uploads/2022/03/Screenshot-2022-03-27-at-14-47-43-volume-of-solid-of-revolution-about-the-y-axis-for-y-0.0902209-e%5E0.458166-x-for-x-0-to-10-Wolfram-Alpha.png)
Random hacking Assume nothing. Code defensively. Keep it simple
How much is (1) +(1/2) +(1/3) +(1/4) +… (infinite terms)? - Quora
![Munching Squares -- from Wolfram MathWorld](https://static.wikitide.net/rosettacodewiki/0/04/XORPatternCSharp.png)
Munching squares - Rosetta Code
![Munching Squares -- from Wolfram MathWorld](https://i.stack.imgur.com/qUjrW.gif)
wolfram alpha - Why is $f(x)$ an odd function? does not work
Pius Wong (@PiusWong) / X
![Munching Squares -- from Wolfram MathWorld](https://content.wolfram.com/sites/35/2012/12/nobel-prize-2012-WolframAlpha.png)
2012—Wolfram
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