Differentiate the function $\displaystyle y = \frac{e^u - e^{-u}}{e^u + e^{-u}}$
$
\begin{equation}
\begin{aligned}
\text{if } y = \frac{e^u - e^{-4}}{e^u + e^{-u}} \text{ then by using Quotient Rule}
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y' =& \frac{(e^u + e^{-u}) (e^u - e^{-u} (1)) - (e^u - e^{-u})(e^u + e^{-u} (-1)) }{(e^u + e^{-u})^2}
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y' =& \frac{(e^u + e^{-u})^2 - (e^u - e^{-u})^2}{(e^u + e^{-u})^2}
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y' =& \frac{e^{2u} + 2 + e^{-2u} - e^{2u} + 2 - e^{-2u} }{(e^u + e^{-u})^2}
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y' =& \frac{4}{(e^u + e^{-u})^2}
\end{aligned}
\end{equation}
$
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