Una mi ha chiesto di stampare una busta paga in A3, perché non ci vede.Ellamadonna!
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Una mi ha chiesto di stampare una busta paga in A3, perché non ci vede.
Ellamadonna! Mettiti gli occhiali no?
Ho pensato.Alla fine ho capito che pensava venisse piccola come la vedeva sul telefono, e le ho spiegato che la stampa sarebbe comunque venuta "a tutta pagina".
Quindi un A4 andava benone. -
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Gli ultimi otto messaggi ricevuti dalla Federazione
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Why Nextcloud feels slow to use
https://ounapuu.ee/posts/2025/11/03/nextcloud-slow/
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I like what Nextcloud offers with its feature set… but no matter how hard I try… it feels slow.
[…]
It’s the Javascript.
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- I can't reach my RasPi
- It didn't get an IP assigned on the network
- No I mean I cannot reach it *physically*.Strong bash.org feelings from this one:
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@emilia Then I undrestood right.
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@FraEmme concordo in pieno!
Io faccio un lavoro in un posto vicino a casa e con alcune possibilità di libertà che altrove non avrei. Solo per la famiglia e il mio tempo!
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I wonder how many times it's possible to be wrong in sequence about the same thing.
In my last blog post about tilings and finite-state transducers, I mentioned making a mistake about the Ammann-Beenker tiling. I had a description of it in my software, and I had believed it didn't admit a deterministic transducer, because my code reported failure when trying to construct one. But I later found out that it did: my construction algorithm had an overzealous failure detector, and had given up too soon.
But it turns out I was right the first time, if for the wrong reasons. It _doesn't_ admit a transducer after all, because I _also_ got the tiling description slightly wrong!
The Ammann-Beenker rhombus tile is 180° symmetric, but its orientation matters nonetheless (it forms part of the proof of aperiodicity). My description of the tiling had the rhombuses wrongly oriented, in a way that – as it turns out – made the system accidentally simpler.
The first picture here is the Ammann-Beenker analogue of the Penrose 'cartwheel pattern': a singular instance of the tiling, having the symmetry group of a regular octagon _except_ for the dark-coloured tiles, of which the blue ones vary their shape under rotation by some multiple of 45°, and the red ones keep the same shape but change orientation.
The second picture is the same pattern, but generated using my earlier wrong description of the tiling. Because I got some of the rhombus orientations wrong, the red tiles are in much weirder places. _That_ diagram has been puzzling me for a week, until I figured out last night what mistake had caused it!
Oh well, at least I got some pretty pictures out of it.
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Use an unacceptable color
