How do you find the domain and range of $f (x) = \frac{2 x}{x - 3}$ $f(x) = (2x)/(x-3)$ ?

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How do you find the domain and range of $f (x) = \frac{2 x}{x - 3}$ $f(x) = (2x)/(x-3)$ ?

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Answer 1 · 2016-05-28T02:25:25

Domain of function $f (x) = \frac{2 x}{x - 3}$ $f(x)=(2x)/(x-3)$ is all real numbers except $3$ $3$ .

Range is all real numbers except $2$ $2$ .

Explanation:

Graph of $f (x) = \frac{2 x}{x - 3}$ $f(x)=(2x)/(x-3)$ is

graph{2x/(x-3) [-20, 20, -10, 10]}

Domain, the set of argument values where the function is defined, is, obviously all real numbers except those where denominator $(x - 3)$ $(x-3)$ is zero, and it happened to be only $x = 3$ $x=3$ . So, for all $x \neq 3$ $x!=3$ the function is defined and its domain is $x \neq 3$ $x!=3$ .

One of the ways to determine the range of a function $f (x)$ $f(x)$ is to consider a domain of an inverse function $f^{- 1} (x)$ $f^(-1)(x)$ . In our case, if $y = \frac{2 x}{x - 3}$ $y=(2x)/(x-3)$ then $x = \frac{3 y}{y - 2}$ $x=(3y)/(y-2)$ . Therefore, inverse function is $f^{- 1} = \frac{3 x}{x - 2}$ $f^(-1)=(3x)/(x-2)$ , and its domain is $x \neq 2$ $x!=2$ . So, the range of the original function is all real numbers except $2$ $2$ .

Actually, the number $2$ $2$ is the limit our function is approaching as $x$ $x$ tends to $+ \infty$ $+oo$ or $- \infty$ $-oo$ .

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How do you find the domain and range of $f (x) = \frac{2 x}{x - 3}$ $f(x) = (2x)/(x-3)$ ?

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Explanation:

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