Категории: Все - factoring - linear - graphing - quadratic

по Daniel Slavov 2 лет назад

104

Algebra A

The text delves into various foundational concepts of algebra, primarily focusing on different types of numbers and equations. It begins by exploring rational numbers, which can be expressed as fractions, and categorizes them into integers, whole numbers, natural numbers, composite numbers, and prime numbers.

Algebra A

Algebra A

Chapter 2 Expression

Term: The product of a constant and a variable raised to some power.
Others

420x^5+69x^4+420x^3-69x^2+420x

Polynomial: Four Terms

69x^4+420x^3-69x^2+420x

Trinomial: Three Term

420x^3-69x^2+420x

Binomial: Two Terms

69x^2-420x

Coefficients: Constant(numbers that never change)
69 and 420
Variables: Letters
X, Y

Chapter 3 Equations

Quadratic Equation
Solving Quadratics

(-b±√(b²-4ac))/(2a)

Factoring

General Quadratics

Monic Quadratics

When we turn x^2+bx+c to (x+r)(x+s), we need to use r+s=b rs=c

Vertex: A point where two curves meet

Shapes

a<0

Facing down

a=0

Line

a>0

Facing up

Roots

Vieta's Formula

x1+x2=-b/a; x1x2=c/a

Intercept Formula: Discriminant b2-4ac

Negative

Positive

Quadratic Formula

Factored

f(x)=a(x-r)(x-s)

A(x-h)^2+K

General

Ax^2+Bx+C=0

Linear Equation
Slope

Shape

Undefined: The line is vertical

0: The line is horizontal

Negative: The line goes downward as it goes from left to right.

Positive: The line goes upward as it goes from left to right

Relationship

Perpendicular: m1m2=-1

Parallel m1=m2

Undefined

Formula

(y1-y2)/(x1-x2)

Graphing

Distance

√[(x₂ - x₁)² + (y₂ - y₁)²]

Mid-Point

[(x)1 + (x)2]/2, [(y)1 + (y)2]/2

Linear Formulas

Horizontal

y=b

Vertical

x=a

Standard Form

Ax+By=C

Point-Slope Formula

y-y1=x(x-x1)

Slope-Intercept Formula

y=mx+b

Chapter 1 Numbers

Rational Numbers: Numbers that can be written as a fraction
integers

Negative Integers -420

Whole Numbers 69

Zero

Natural Number/Positive Integer

Prime Number 7

Composite Number(number that can be divisible by more than just itself and 1) Example: 69

1

Non integers

Mixed Units 69^(69/420)

Fractions 69/420

Decimals 69.420

Irrational Numbers: Numbers that cant be written as a fraction
sqrt69
π