Difference between revisions of "Single Transformations of Functions"
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A function f is odd if for all values of x, <math> f(x) = -f(-x) </math>; that is, a function <math> f(x) </math> is odd if a horizontal reflection and vertical reflection of the function results in the same function. For example, <math> f(x) = x^3 </math> is an odd function since <math> -f(-x) = -(-x)^3 = (-1)(-1)^3(x)^3 = x^3 = f(x)</math>. | A function f is odd if for all values of x, <math> f(x) = -f(-x) </math>; that is, a function <math> f(x) </math> is odd if a horizontal reflection and vertical reflection of the function results in the same function. For example, <math> f(x) = x^3 </math> is an odd function since <math> -f(-x) = -(-x)^3 = (-1)(-1)^3(x)^3 = x^3 = f(x)</math>. | ||
− | If a function satisfies neither of these conditions, then it is neither even nor odd. For example, <math> f(x) = x^2 + x </math> is neither even nor odd because <math> f(-x) = (-x)^2 + (-x) = x^2 - x </math>, which is not equal to <math> f(x) | + | If a function satisfies neither of these conditions, then it is neither even nor odd. For example, <math> f(x) = x^2 + x </math> is neither even nor odd because <math> f(-x) = (-x)^2 + (-x) = x^2 - x </math>, which is not equal to <math> f(x) </math>, and <math> -f(-x) = -(-x)^2 - (-x) = -x^2 + x </math>, which is also not equal to <math> f(x) </math>. |
==Resources== | ==Resources== | ||
* [https://courses.lumenlearning.com/wmopen-collegealgebra/chapter/introduction-transformations-of-functions/ Intro to Transformations of Functions], Lumen Learning | * [https://courses.lumenlearning.com/wmopen-collegealgebra/chapter/introduction-transformations-of-functions/ Intro to Transformations of Functions], Lumen Learning | ||
* | * |
Revision as of 18:20, 15 September 2021
Introduction
Translations
One kind of transformation involves shifting the entire graph of a function up, down, right, or left. The simplest shift is a vertical shift, moving the graph up or down, because this transformation involves adding a positive or negative constant to the function. In other words, we add the same constant to the output value of the function regardless of the input. For a function , the function is shifted vertically k units. For example, is the function shifted up by 4 units. is the function shifted down by 7.7 units.
Given a function f, a new function , where h is a constant, is a horizontal shift of the function f. If h is positive, the graph will shift h units to the right. If h is negative, the graph will shift h units to the left. For example, is the graph of shifted 3 units to the right. is the function shifted units to the left.
Reflections
Given a function , a new function is a vertical reflection of the function , sometimes called a reflection about (or over, or through) the x-axis. For example, is a vertical reflection of the function .
Given a function , a new function is a horizontal reflection of the function , sometimes called a reflection about the y-axis. For example, is a horizontal reflection of the function .
Even and Odd Functions
A function f is even if for all values of x, ; that is, a function is even if its horizontal reflection is identical to itself. For example, is an even function since .
A function f is odd if for all values of x, ; that is, a function is odd if a horizontal reflection and vertical reflection of the function results in the same function. For example, is an odd function since .
If a function satisfies neither of these conditions, then it is neither even nor odd. For example, is neither even nor odd because , which is not equal to , and , which is also not equal to .
Resources
- Intro to Transformations of Functions, Lumen Learning