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Brando Zhang · Answer 1 · 2019-03-04T15:48:46+0000

as you may know, we start off by doing a quick switcharoo on the variables, in order to get the inverse, and then solve for "y",

$\bf \stackrel{f(x)}{y}=\cfrac{2x+3}{5}\qquad \qquad \stackrel{inverse}{\underline{x}=\cfrac{2\underline{y}+3}{5}}\qquad \implies 5x=2y+3 \\\\\\ 5x-3=2y\implies \cfrac{5x-3}{2}=\stackrel{f^(-1)(x)}{y} \\\\\\ \cfrac{5(3)-3}{2}=f^(-1)(3)$

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