Categories: All - factoring - quadratic

by rafaeel rehman 6 years ago

166

Quadratic Relations

The text discusses various methods for working with quadratic expressions, including expanding, factoring, and using the distributive property. It explains how to expand expressions by squaring binomials and applying the FOIL method.

Quadratic Relations

Quadratic Expressions

Expanding

Difference of squares
Follow FOIL method and remember to cancel out reciprocals.

(a-b)(a+b) =A^2+ab-ab+B^2 =A^2+B^2

Squaring binomials
Expand, then follow foil method.

(a+b)^2 =(a+b)(a+b) =a^2+2ab+b^2

Multiplying Binomials
Follow FOIL method.

(2x+4)(3x+2) =6x^2+12x+6

Distributive property
Multiply everything inside the brackets by the number(s) outside of it.

3(2x+4) =6x+12

Factoring

Difference of Squares
square root both terms and have a square outside the bracket to show it was factored, expand both terms, and follow binomial common factor.

36y^2-100 =(6y)^2-(10)^2 =(6y)(6y)-(10)(10) =(6y-10)(6y+10)

Perfect Square Trinomials
A^2-2AB+B^2 =(A-B)(A-B)
A^2+2AB+B^2 =(A+B)(A+B)
A=/=1
ax+bx+c

_ * _=ac

_+_=b

A=1
(1)x^2+bx+c =(x+1)(x+c)
Group Common Factors
Group both sides so to factor them separately

X^4-2x^3 + 4x-8

Binomial Common Factors
x-3 is multiplied by both 2 and 3y, making it able to factor out.

2(x-3)+3y(x-3) =(x-3)(2+3y)

Monomial Common Factors
Both x and y are being multiplied by 3, making it able to be factored out.

3y+3x =3(x+y)