Reminds me of the conundrum of being unable to measure shoreline
Alan Davies (of qi fame) once made a documentary where he tried to measure the length of a piece of string, the shoreline issue also comes up.
Just get a small enough ruler either you'll measure the shoreline and disprove calculus or you'll solve quantum physics.
Well, if you get a small enough ruler you will already disprove quantum physics. No need to use it for anything.
At best you'll disprove shoreline.
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Imagine an island (e.g: Bermuda, Hook Island, Sardinia, etc)
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Draw a square or rectangle approximating all of the land not currently touching water (e.g: All pixels must not contain water)
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Draw a larger red square encompassing the smaller red square or rectangle.
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Subtract any brown, green, or "land" pixels, and add them to the total count of Box_1.
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Remove green, blue and other "water" pixels from Box_2.
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Your final result will be a red outline precisely mapping the coastline of the island in question. You can now measure distance by taking
pixelsand multiplying by the scale of the zoom-distance (parralax).
This measurement is a factor of pixel size. As resolution increases and pixel width approaches 0, the shoreline length approaches infinity.
Though I guess you'd eventually run into the problem of clearly defining the shoreline once you're distinguishing between water molecules and grains of sand. is the water between the sand molecules part of the ocean? How concave is the boundary on the stretches between sand grains?
And of course, it's dynamic as tides and waves change it. And how does wet sand due to rain play into it - we're now having to differentiate based on salinity of water.
Oh that's funny. I see what you're doing 😆
Philosophers are no longer permitted on the beach 🚧 (/s)
Over a very broad range of scales (like, from the scale of 10km down to the scale of 1mm) the number of boundary pixels of a natural shape like an island increases according to a power law as you increase the resolution.
This means that your approach doesn't give you an objective value because it depends so strongly on the resolution.
This way of computing the length of a boundary leads to the concept of box-counting dimension. When you increase the resolution of the pixel grid, you'll get a larger number of pixels on the boundary. Keep refining the grid many times. Graph the log of the total number of pixels against the log of the number of boundary pixels. The box counting dimension is the slope of that graph.
Why would we call this "dimension"? Because if you do this to a line, the slope is 1, and if you do it to a square, the slope is 2.
More information: https://en.wikipedia.org/wiki/Fractal_dimension?wprov=sfla1
you could approximate it using Taylor expansions, although this generally isn't a rapidly convergent series. You might take a fancy for some other numerical method that would get really precise digits really quickly...
Glad I made it to the end. Totally worth it
This is an evil comment
loves to see the world burn
Fractal shorelines. Always a pleasure to behold.
hmm yes this beach is made of beach
Son of a beach
Does a nude woman jiggling down a beach not count as NSFW anymore!?
This successfully hurt my brain.
No I can't see it. Anyone willing to enlighten me?
Edit: nm, didn't realize it was a gif.
Same here.-
It took me a while, but the payoff when it finally gets there is great.
You fucker
Infuriating but pretty cool
It's Fractal Beach, DUH!
infinite real estate! how practical :D
This made me research the coastline paradox
This made me research the coastline paradox
Thanks I hate it
Those are turtles!
Alright….. I fell for that.
damn. only found out its a gif due to other comments, for me its just a static image
computer, enhance photo...
ENHAAAAAAAAAAA
This would make for a pretty cool SCP: A place or a person whom you can't get super close to, because space around them behaves in a fractal manner.
I'm still squinting to see...
Unexpected Dumpert.nl
Crime shows; Pull up the satilight view. Zoom in. There, what's that spec? Enhance. There's our guy, move out!
I do not like this one bit