lim_(x→0) ((e^x −e^(−x) −2x)/(x−sin(x)))=L >0 , L∈R find L with out using hopital and Taylor methods


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Question Number 80276 by M±th+et£s last updated on 01/Feb/20

$\underset{x \to 0}{l i m} \frac{e^{x} - e^{- x} - 2 x}{x - s i n (x)} = L > 0, L \in R$ $f i n d L$ $w i t h o u t u s i n g h o p i t a l a n d T a y l o r m e t h o d s$
Commented bymathmax by abdo last updated on 01/Feb/20

$w i t h o u t u s i n g a n y m e t h o d . . . h a h a h a . .$
	Answered by M±th+et£s last updated on 02/Feb/20

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