What is $f(x) = int 1/(x+3)$ if $f(2)=1$ ?

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What is $f(x) = int 1/(x+3)$ if $f(2)=1$ ?

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Answer 1 · 2016-07-11T13:36:12

$f(x)=ln((x+3)/5)+1$

Explanation:

We know that $int1/xdx=lnx+C$ , so:
$int1/(x+3)dx=ln(x+3)+C$

Therefore $f(x)=ln(x+3)+C$ . We are given the initial condition $f(2)=1$ . Making necessary substitutions, we have:
$f(x)=ln(x+3)+C$
$->1=ln((2)+3)+C$
$->1-ln5=C$

We can now rewrite $f(x)$ as $f(x)=ln(x+3)+1-ln5$ , and that is our final answer. If you want to, you can use the following natural log property to simplify:
$lna-lnb=ln(a/b)$

Applying this to $ln(x+3)-ln5$ , we obtain $ln((x+3)/5)$ , so we can further express our answer as $f(x)=ln((x+3)/5)+1$ .

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What is $f(x) = int 1/(x+3)$ if $f(2)=1$ ?

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