An Approximated Paper Screw Based on a N-Diagonal Matrix
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An Approximated Paper Screw Based on a N-Diagonal Matrix
In my studies I learned how to think in an abstract way, without considering the whole details.
Visually the n-diagonal matrix was something familiar for me, it was the fascinating pattern, that reminded me of the windings of a screw or a spiral fusilli pasta. You can see how a full diagonal matrix is structured, it is also known as Toeplitz Matrix. As you can see it's a complex n-dimensional matrix, but think simple.
Numeric Matrix
Substitute the variables into numeric values (for example a 4x7 Matrix), well the readability is much more better.
Substitute the Numbers With the Pattern
If you insert and/or substitute the numbers (4x10 Matrix) with these straight regular lines, you'll get a folding diagram of an approximated trigonal screw.
The Folding Pattern
Print it at full size and cut the excessive part on the left and right side.
Downloads
Prefold the Lines
blue: mountain folds
red: valley folds
Folding Preparation
Form the paper into a triangle by overlapping one column.
N-closures
Then you fold the n-closures counter-clockwise, if you can fold the first, the rest of all is repetition.
The Result
Then the screw should look like shown in the pictures and you are done!