I've been experimenting with a symbolic mathematics system that uses custom glyphs instead of numeric coefficients.
Can anyone solve, simplify, or analyze the following equation?
⟴∴⊚·x^5 + ∞◦∮·x^4 + ⟴✧⊚·x^3 + ⟴◌⊚·x^2 + 〰∴≈·x + ⟴✦⊚ = 0
The coefficients are represented by symbolic glyphs rather than ordinary numbers.
I'm interested in seeing how people approach it before I reveal the mapping (if I reveal it at all).
Questions I'm curious about:
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Is there anything you can deduce from the notation alone?
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What information would you need to solve it rigorously?
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If you encountered something like this in a research paper, how would you begin reverse engineering the coefficient system?
This is part of a larger symbolic math project I've been working on, so I'm mainly interested in your reasoning process rather than just an answer.