How do you find the domain and range of $(5x-3) / (2x +1)$ ?

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How do you find the domain and range of $(5x-3) / (2x +1)$ ?

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Answer 1 · 2017-05-31T10:03:55

$x inRR,x!=-1/2$
$y inRR,y!=5/2$

Explanation:

$"the domain is defined for all real values of x except for"$
$"values of x which make the denominator equal zero"$

$"to find the value that x cannot be, equate the denominator"$
$"to zero and solve"$

$"solve "2x+1=0rArrx=-1/2larrcolor(red)" excluded value"$

$rArr"domain is "x inRR,x!=-1/2$

$"to find any excluded values in the range, rearrange"$

$y=(5x-3)/(2x+1)" making x the subject"$

$rArry(2x+1)=5x-3larrcolor(blue)" cross-multiplying"$

$rArr2xy+y=5x-3$

$rArr2xy-5x=-3-y$

$rArrx(2y-5)=-(3+y)$

$rArrx=-(3+y)/(2y-5)$

$"the denominator cannot equal zero"$

$"solve "2y-5=0rArry=5/2larrcolor(red)" excluded value"$

$rArr"range is " y inRR,y!=5/2$

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How do you find the domain and range of $(5x-3) / (2x +1)$ ?

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How do you find the domain and range of $(5x-3) / (2x +1)$ ?