1 Answer

Angel Fraga Parodi · Answer 1 · 2018-09-20T18:44:23+0000

$\displaystyle\lim_(x\to1)(\ln x)/(\sin7\pi x)$

Note that both the numerator and denominator approach 0 as
$x\to1$ , so we can try using L'Hopital's rule.

$\displaystyle\lim_(x\to1)(\lnx )/(\sin7\pi x)=\lim_(x\to1)(\frac1x)/(7\pi\cos7\pi x)=\lim_(x\to1)\frac1{7\pi x\cos7\pi x}$

The denominator is nonzero at
x=1

, so the limit is equivalent to

$\displaystyle\frac1{\lim\limits_(x\to1)7\pi x\cos7\pi x}=\frac1{7\pi\cos7\pi}=-\frac1{7\pi}$

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