Simplify $logleft(1+frac{x_i^2}{nu}right)$ with a $log(1+x)$ rule?

Question

How can the following logarithm be simplified? Is there a $log(1+x)$ rule to use?
$$ logleft(1+frac{x_i^2}{nu}right) = ?$$

PierreCarre · Answer

There is no realy usefull simplification... But if was about approximation, you could  use the fact that
$$
log(1+x) = x- frac{x^2}{2} + O(x^3)
$$
to say that, for small $x$,
$$
log(1+frac{x_i^2}{nu}) approx frac{x_i^2}{nu}-frac 12 left(frac{x_i^2}{nu}right)^2 = frac{x_i^2}{nu}left(1- frac{x_i^2}{2 nu}right).
$$

Parcly Taxel · Answer

If the $1$ was not there, we could have written the expression as
$$2log x_i-lognu$$
provided that the variables are positive. But the $1$ prevents this, though it does mean we get a Taylor series expansion
$$logleft(1+frac{x_i^2}nuright)=sum_{n=1}^infty(-1)^{n+1}frac{(x_i^2/nu)^n}n$$

Simplify $logleft(1+frac{x_i^2}{nu}right)$ with a $log(1+x)$ rule?

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