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What is the derivative of # e^(1/x)#?

1 Answer

Shwetank Mauria

Mar 20, 2016

#d/(dx)e^(1/x)=-e^(1/x)/x^2#

Explanation:

To find derivative of #e^(1/x)#, we use function of a function i.e. if #f(g(x))#, #(df)/(dx)=(df)/(dg)xx(dg)/(dx)#

Hence #d/(dx)e^(1/x)# is equal to

#e^(1/x)xxd/(dx)(1/x)=e^(1/x)xx(-1/x^2)=-e^(1/x)/x^2#

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