User talk:Ascii

= Desk =

Sampling

Sampling Notes

$GCSE$

Theorems

 * Coprime Relation is Non-Reflexive
 * Coprime Relation for Integers is Symmetric
 * Coprime Relation for Integers is Not Antisymmetric
 * Coprime Relation for Integers is Non-Transitive

Elementary Polynomials
The objective is for to lay out these concepts from elementary to advanced.

Polynomials

 * Definition:Monomial (Redirect: Definition:Mononomial)
 * Definition:Binomial
 * Definition:Trinomial
 * Definition:Polynomial


 * Definition:Polynomial/Term
 * Definition:Polynomial/Coefficient
 * Definition:Polynomial/Like Term (Redirect: Definition:Like Term)
 * Definition:Polynomial/Unlike Term (Redirect: Definition:Unlike Term)


 * Definition:Like Term Collection (Redirect: Definition:Collecting Like Terms)

Specific Polynomials

 * Definition:Linear Polynomial
 * Definition:Quadratic Polynomial
 * Definition:Cubic Polynomial

Equations

 * Definition:Linear Equation
 * Definition:Linear Equation/General Definition
 * Definition:Quadratic Equation
 * Definition:Cubic Equation

= Messages =

Refactoring
Hi,

I notice you've got stuck into some of the outstanding refactoring tasks. Normally we strongly discourage new contributors from doing this, as there are a number of pitfalls which can cause a lot of extra work (we have been bitten by this badly in the past). But you're doing a good job on this (a really good job), so it makes sense to leave you to it.

Please note that if there are source works cited at the bottom of these pages, the "prev" and "next" links usually need to be reviewed by someone who has direct access to those source works. If this is the case, can you please place an invocation of the SourceReview template at the top of the Sources section, to alert anyone on maintenance duty that this needs to be attended to?

Minor adjustments will be made to pages you edit in such a manner -- OCD affects different people in different ways. Please don't worry. --prime mover (talk) 04:20, 17 January 2019 (EST)


 * Thank you! I will from now on. -- 05:04, 17 January 2019 (EST)