Function Notation

Site: Clare
Course: Michigan Algebra I Sept. 2012
Book: Function Notation
Printed by: Guest user
Date: Saturday, November 23, 2024, 11:55 PM

Description

Function Notation

Evaluating Functions

Recall from the linear unit that f(x) and y can be used interchangeably and that function notation is a shortened method of writing a function. Functions are represented using parentheses such as f(x). This notation indicates "f" is a function of, or depends on, the variable x. A quadratic equation might be y = x2 + 2x - 4, while the equivalent function would be f( x) = x2 + 2x - 4. Both the equation and the function create the same table and graph. However, function notation states the input and the output at the same time, something the equation cannot do.

The expression f(x) means "plug a value for x into the formula f "; the expression does not mean multiply f and x . In function notation, the x in f(x) is called the argument of the function, or just the argument. When given f(2), it means to replace any x in the function with 2 and then find the function's value.


Example 1

Given f(x) = x2 + 2x - 1, find f(2).

Step 1. Eliminate the input value "x" and replace it with parentheses.

f() = ()2 + 2() - 1

Step 2. Place the input value of 2 inside the parentheses.

f(2) = (2)2 + 2(2) - 1

Step 3. Simplify the right side of the equation.

f(2)= 4 + 4 - 1

f( 2)= 7

Example 2

Given f(x) = x2 + 2x - 1, find f(-3).

Step 1. Eliminate the input value "x" and replace it with parentheses.

f() = ()2 + 2() - 1

Step 2. Place the input value of -3 inside the parentheses.

f(-3) = (-3)2 + 2(-3) - 1

Step 3. Simplify the right side of the equation.

f(-3) = 9 - 6 - 1

f(-3) = 2

Evaluating Symbolically

Functions can also be evaluated for inputs that are variables or expressions.

Example 1 Given f(x) = 3x2 + 2x, find f(h).

Step 1. Eliminate the input value "x" and replace it with parentheses.

f() = 3()2 + 2()

Step 2. Place the input value of h inside the parentheses.

f(h) = 3(h)2 + 2(h)

Step 3. Simplify the right side of the equation.

f(h) = 3h2+ 2h

.

Example 2

Given f(x) = 3x2 + 2, find f(2x).

Step 1. Eliminate the input value "x" and replace it with parentheses.

f() = 3()2 + 2

Step 2. Place the input value of 2x inside the parentheses.

f(2x) = 3(2x)2 + 2

Step 3. Simplify the right side of the equation.

f(2x) = 3(4x2)+ 2

f(2x) = 12x2+ 2

Practice

Evaluating Functions Worksheet

*Note: If Google Docs displays “Sorry, we were unable to retrieve the document for viewing,” refresh your browser.

Answer Key

Evaluating Functions Answer Key

*Note: If Google Docs displays “Sorry, we were unable to retrieve the document for viewing,” refresh your browser.

Sources

Embracing Mathematics, Assessment & Technology in High Schools; A Michigan Mathematics & Science Partnership Grant Project

Kuta Software, www.kutasoftware.com/free.html (accessed 07/19/2010).

Stapel, Elizabeth. "Function Notation: Introduction/Evaluation." http://www.purplemath.com/modules/fcnnot.htm (accessed 7/15/2010).