# Unit 2: Polyomials ## Introduction to Polynomials - A ```variable``` is a letter that represents one or more numbers - An ```algebraic expression``` is a combination of variables and constants (e.g. $`x+y+6, y + 8`$) - When a specific value is assigned to a variable in a algebraic expression, this is known as substitution. ## Methods to solve a polynomial 1. ```Combine like terms``` 2. ```Dividing polynomials``` 3. ```Multiplying polynomials``` ## Simplifying Alegebraic Expressions - An algebraic expression is an expression with numbers, variables, and operations. You may expand or simplify equations thereon. ## Factoring - Two methods of solving; decomposition and criss-cross. - First of all, the polynomial must be in the form of a quadratic equation ($`ax^2 + bx + c`$). - As well, simplify the polynomial, so that all common factors are outside (e.g $`5x + 10 = 5(x + 2) )`$. |Type of Polynomial|Definition| |:-----------------|:---------| |Monomial|Polynomial that only has one term| |Binomial|Polynomial that only has 2 terms| |Trinomial|polynomial that only has 3 terms| |Type|Example| |:--:|:-----:| |Perfect Square Trinomials| $`(a+b)^2 = a^2+2ab+b^2 or (a-b)^2 = a^2-2ab+b^2`$| |Difference with Squares|$`a^2-b^2 = (a+b)(a-b)`$| |Simple Trinomials|$`x^2+6x-7 = (x+7)(x-1)`$| |Complex Trinomials|$`2x^2-21x-11 = (2x+1)(x-11)`$| |Common Factor|$`2ab+6b+4 = 2(ab+3b+2)`$| |Factor By Grouping|$`ax+ay+bx+by = (ax+ay)+(bx+by) = a(x+y)+b(x+y) = (a+b)(x+y)`$| ## Shortcuts -

## Foil / Rainbow Method -

## Definitions - ```Term``` a variable that may have coefficient(s) or a constant - ```Alebraic Expressions```: made up of one or more terms - ```Like-terms```: same variables raised to the same exponent ## Tips - Be sure to factor fully - Learn the ```criss-cross``` (not mandatory but its a really good method to factor quadratics) - Learn ```long division``` (not mandatory but its a really good method to find factors of an expression) - Remember your formulas - Simplify first, combine like terms