Determine the second derivative evaluated at t=0

Ergelo asked Dec 28, 2022

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Ergelo asked Dec 28, 2022

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12 votes

M(t) = e^(3(e^t-1))

then using the chain rule, we have

M'(t) = e^(3(e^t-1)) * 3e^t = 3e^(3(e^t-1)+t)

M''(t) = 3e^(3(e^t-1)+t) * (3e^t+1)

Then

$M''(0) = 3e^(3(e^0-1)+0) * (3e^0+1) = 3e^0 * (3+1) = \boxed{12}$

Israfel answered Jan 3, 2023

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