Categorias: Todos - domain - function - range - transformation

por Tanreet Dharni 3 anos atrás

287

FUNCTIONS Tanreet

In mathematics, a function is a special type of relation where each input is associated with exactly one output. The independent variable, or domain, consists of all possible values of x, while the dependent variable, or range, includes all possible values of y.

FUNCTIONS
      Tanreet

FUNCTIONS Tanreet

Parent Graphs (2.3)

Parent Functions Linear Function Quadratic Function Square Root Function Absolute Value Function Reciprocal Function
Reciprocal

Asymptote: A line that the graph of a relation or function gets close to, but never touches

Absolute Value
Square Root
Quadratic
Linear
The simplest, or base function in a family

Function Notation (2.2)

Solve?
Given: f(x) Find: X

solve for x

Given: X Find: f(x)

solve for y

f(x)=y; gives you a (x,y) pairing
Other symbols can be used to name the outputs of functions instead of “f” to fit problem
f(x) is used to represent the value of the dependant variable also known as the output
Read as “f at x” or “f of x”

Relations & Functions (2.1)

Function or Not
Lines: Always a function with the exception of vertical lines Circle: Never a function Parabola: Always a function
Check X Values: If there are 2 or more x-values for a single y-value, then the graph is not a function
Vertical Line Test: If any vertical line passes through more than one point on the graph of a relation then the relation is NOT a function

not a function

does not pass vertical line test

function

passes vertical line test

Relations vs Functions
Function: A special relation. An ordered pair where for every value of x, there is only one value of y.
Relation: is a set of ordered pairs (x,y)

Using Transformations to Graph Functions

Use this knowledge to graph functions
Vertical and Horizontal Stretches & Compressions
if k < 1 - horizontal stretch
if k > 1 - horizontal compression
if a < 1 - vertical compression
if a > 1 - vertical stretch
Reflections
if k < 0 - reflection in the y-axis
if a < 0 - reflection in the x-axis
Translations
Horizontal Translations

if the function is y = f(x-d) function shifts right if the function is y = f(x+d) function shifts left

Vertical Translations

if the function is y= f(x) + c, function shifts up if the function is y= f(x) - c, function shifts down

Inverse of a Function (2.5)

How do find inverse of a function?
switching x & y and isolating for y
The inverse of f (x), is denoted as f^-1(x)
read as “f inverse at x”
What is a inverse function ?
two functions that “reverse” each other

"x" and "y" are switched

Domain & Range (2.4)

Examples

By looking at the graph you can see all x values are greater than -5 and you can see all y values are great than o

states domain and range

By looking at the graph you can see all x values are less than 3 and you can see all y values are greater than 0

Format for stating the domain and range
Set Notation: a way of writing a set of items or numbers

ex. {XER-X cannot=0}

Range - Dependent Variable (all "y" values")
Domain - Independent Variable (all "x" values)