Algebra: Groups, Rings, And Fields -

💡 These structures are nested. Every field is a ring, and every ring is a group. By stripping away specific numbers and focusing on these structures, mathematicians can solve massive classes of problems all at once.

(like cryptography or particle physics) Formal mathematical proofs for specific properties Practice problems to test your understanding Algebra: Groups, rings, and fields

You can add, subtract, and multiply, but you can’t always divide (e.g., 1 divided by 2 is not an integer). Polynomials: Expressions like 💡 These structures are nested

If you'd like to dive deeper into one of these structures, let me know if you want: but you can’t always divide (e.g.