Sketch the graph of f(x) = 1 - \frac{2x}{(x - 3)^2} close


Sketch the graph of {eq}f(x) = 1 - \dfrac{2x}{(x - 3)^2} {/eq}

Rational Functions

A rational function is a function in which is a ratio of two functions, that is, {eq}h(x) = \dfrac{m(x)}{n(x)} {/eq}. A rational function {eq}h(x) {/eq} in which has {eq}m(x) {/eq} and {eq}n(x) {/eq} defined for all {eq}x\in \mathbb{R}, {/eq} is defined for all {eq}n(x) \neq 0 {/eq} in {eq}\mathbb{R}. {/eq}

Answer and Explanation:

Our rational function {eq}f(x) = 1 - \dfrac{2x}{(x - 3)^2} {/eq} is not in the base form as above, cause for each {eq}x {/eq} in its domais we add...

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Learn more about this topic:

Graphing & Analyzing Rational Functions

from Precalculus: High School

Chapter 13 / Lesson 2

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