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Derivative Of E^3x use a chain rule to find the derivative of f(x)=e^3x
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Derivative Of E^3x use a chain rule to find the derivative of f(x)=e^3x

User Sukru
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Answer:


3e^(3x)

Step-by-step explanation: By the chain rule,


(d)/(dx) (e^(3x)) = (d)/(dx) (e^(3x)) * (d)/(dx) (3x).

The derivative of e^(function) is just e^(function). The derivative of 3x is 3.

User Linus Oleander
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you have to change the variable, u=3x and from this can derivate u and get du=3, so the derivate for e^u is u'*e^u so the answers is 3e^3x
User Shamia
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