GMU:I and my Max/Elizabeth McTernan: Difference between revisions

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15:41:05.887 -> Distance: 68.54

15:41:05.958 -> Distance: 68.54

15:41:06.063 -> Distance: 50.18

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15:41:06.278 -> Distance: 50.98

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Now that I'm thinking more of the aesthetic exploration, I would be interested to have this data converted into a digital drawing that changes over time, so I suppose that would be a video. I'm particularly interested in how a drawn line in digital space can be infinitely thin (unlike a pencil line, which is defined by the material), and so I could imagine playing with what are known as "space-filling curves" that approach infinity – for example, Peano curves or Hilbert curves. Here's the wikipedia page for an overview of what's behind them:

https://en.wikipedia.org/wiki/Space-filling_curve

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 :41:05.887 -> Distance: 68.54
 :41:05.958 -> Distance: 68.54
 :41:06.063 -> Distance: 50.18
 :41:06.171 -> Distance: 50.17
 :41:06.278 -> Distance: 50.98
 :41:06.387 -> Distance: 51.39
 :41:06.459 -> Distance: 51.37
 :41:06.563 -> Distance: 50.93
 :41:06.667 -> Distance: 50.52
 :41:06.769 -> Distance: 50.52
 Now that I'm thinking more of the aesthetic exploration, I would be interested to have this data converted into a digital drawing that changes over time, so I suppose that would be a video. I'm particularly interested in how a drawn line in digital space can be infinitely thin (unlike a pencil line, which is defined by the material), and so I could imagine playing with what are known as "space-filling curves" that approach infinity – for example, Peano curves or Hilbert curves. Here's the wikipedia page for an overview of what's behind them:
 https://en.wikipedia.org/wiki/Space-filling_curve