How do you solve $8^(x-y)=3^x$ and $8^y=2^(x-3)$ ?

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How do you solve $8^(x-y)=3^x$ and $8^y=2^(x-3)$ ?

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Answer 1 · 2016-05-17T13:54:31

$x = log(8)/(log(3/4)), y = (log(8)/(log(3/4))-3)/3$

Explanation:

From $8^y =2^{x-3}$ knowing that $8 = 2^3$ we can write
$2^{3y} = 2^{x-3}$ so we conclude that $3y=x-3$ . Operating now on $8^{x-y}=3^x->2^{3(x-y)}=3^x$ but $3y = x-3$ substituting we get
$2^{2x+3}=3^x->8 times 4^x= 3^x->(3/4)^x=8$ . Finally $x = log(8)/(log(3/4))$ . Solving for $y$ we get $y = (log(8)/(log(3/4))-3)/3$

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How do you solve $8^(x-y)=3^x$ and $8^y=2^(x-3)$ ?

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How do you solve 8^(x-y)=3^x8^(x-y)=3^x and 8^y=2^(x-3)8^y=2^(x-3)?

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Explanation:

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How do you solve $8^(x-y)=3^x$ and $8^y=2^(x-3)$ ?