*specific*constant $C$ and also not simply leave at together an arbitrarily constant? and why perform we discover the specific continuous we require by setup x=0 and also solve the provided equation?

$\begingroup$ The logarithm is a function, an interpretation that it has a well defined value because that a given $x$. Friend can't leaving an undetermined continuous in the meaning ! $\endgroup$

Because the is

*not*true that us have$$\log(1+x)=x-\fracx^22+\fracx^33-\fracx^44+\cdots+C$$for an

*arbitrary*continuous $C$. Since, once $x=0$, the LHS is $0$ and also RHS is $C$, $C=0$.

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Since the original function is $\log (1+x)$ and also for $x=0$ we have $\log (1+0)=0$ we need that also the collection is zero because that $x=0$.

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