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

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

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Answer 1 · 2018-05-03T11:22:05

Domain: $x \neq 3$ $x!=3$
Range: $y \neq 3$ $y!=3$

Explanation:

the denominator cannot equal zero, as this is where the function is undefined. $x = 3$ $x=3$ will make the denominator zero, therefore this value is not part of the domain, in fact the line $x = 3$ $x=3$ becomes a vertical asymptote, meaning the graph on either side of this line never touches it. The Domain is the set of all real $x$ $x$ values that DEFINE the function. The range is the set of all real $y$ $y$ values that correspond with the domain. The line $y = 3$ $y=3$ is a horizontal asymptote. graph{(3x+2)/(x-3) [-25.66, 25.65, -13.37, 13.37]}

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

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