Comment by 🐐 namark
Re: "I have another math question, and it's if this introduction…"
omg no, don't listen to the infinite guy, polynomials are finite, for the infinite stuff they have a separate name "power series", cause those abominations are so far removed from actual polynomials that it's not funny anymore.
Your stuff is totally correct, I just meant that it's too much information for an intro, like if you were writing a book or something, but if it's notes for an exams it all makes sense. Exams test breadth instead of depth, otherwise most people would fail them and the all them institutions would make no money.
Polynomials are extremely basic, and you can define them with just addition and multiplication and that's all you need to understand them. If it were me, I might've even defined multiplication to really drive the point home how basic we are talking. Now actually putting that on paper in a way you could fight an examiner over its correctness, that's some hard work (and you would need to fight, cause you would get bashed just for going out of line), so yeah, better stick with what you've got there.
Feb 04 · 3 months ago
1 Later Comment
👻 darkghost · Feb 04 at 10:12:
Agreed polynomials are pretty simple. They're purposely scope limited to be the format of (number)(variable)^(integer exponent) + (number)(variable)^(integer exponent) + (repeat this pattern a finite number of times)
2x + 4x² + 5x³ + 2x⁴ + 9x⁵ + 5x⁶ - 3x⁷ - x⁸ is an example.
Original Post
I have another math question, and it's if this introduction to polynomials I wrote for myself is any good. The things in parentheses like (positive whole numbers) are for later if I come back to do a quick read-through given my less than stellar memory. A polynomial (from the Greek word poly, meaning many, and the Latin nomial, meaning names or terms) is an algebraic expression which consists of variables (also referred to as indeterminates) and coefficients that only involves the operations...