How do you find the second derivative of $f(t)=tsqrtt$ ?

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How do you find the second derivative of $f(t)=tsqrtt$ ?

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Answer 1 · 2017-06-21T06:38:29

$(d^2f)/(dt^2)=3/(4sqrtt)$

Explanation:

As $tsqrtt$ can be written as $f(t)=tsqrtt=txxt^(1/2)=t^(3/2)$ , we can use the formula $d/(dx) x^n=nx^(n-1)$

Hence $(df)/(dt)=3/2xxt^(3/2-1)=3/2t^(1/2)=3/2sqrtt$

and $(d^2f)/(dt^2)=3/2xx1/2xxt^(1/2-1)=3/4t^(-1/2)=3/(4sqrtt)$

Answer 2 · 2017-06-21T07:02:08

$f''(t)=3/(4sqrtt)$

Explanation:

$f(t)=tsqrtt=txxt^(1/2)=t^(3/2)$

$"differentiate using the "color(blue)"power rule"$

$• d/dx(ax^n)=nax^(n-1)$

$rArrf'(t)=3/2t^(1/2)$

$rArrf''(t)=3/2xx1/2t^(-1/2)$

$color(white)(rArrf''(t))=3/4xx1/t^(1/2)=3/(4sqrtt)$

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How do you find the second derivative of $f(t)=tsqrtt$ ?

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