\( \sqrt{x+y} \)
\( \sqrt[n]{x+y} \)
$x_{1}, \ldots , x_{n}$
\( x_{1}, \ldots , x_{n} \)
$a + \vdots + z$.
$a + \ddots + z$.
$\pi$.
$a + \cdots + z$.
$\mathcal{F}$
$\theta$
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n
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0
\( \sqrt{x+y} \)
\( \sqrt[n]{x+y} \)
$x_{1}, \ldots , x_{n}$
\( x_{1}, \ldots , x_{n} \)
$a + \vdots + z$.
$a + \ddots + z$.
$\pi$.
$a + \cdots + z$.
$\mathcal{F}$
$\theta$