Resposta: D) df/dt = - 10t⁻¹¹ + 207t⁻²⁴
Vamos lá. Aparentemente a função é:
[tex]\sf f(x,y)=-\,23+x^2y^2-9xy^7[/tex]
Dado que x = 1/t² e y = 1/t³, faça a substituição para colocar f em função de t:
[tex]\begin{array}{l}\sf f(t)=-\,23+\bigg(\dfrac{1}{t^2}\bigg)^{\!\!2}\bigg(\dfrac{1}{t^3}\bigg)^{\!\!2}-9\bigg(\dfrac{1}{t^2}\bigg)\bigg(\dfrac{1}{t^3}\bigg)^{\!\!7}\\\\\sf f(t)=-\,23+\bigg(\dfrac{1}{t^4}\bigg)\bigg(\dfrac{1}{t^6}\bigg)-9\bigg(\dfrac{1}{t^2}\bigg)\bigg(\dfrac{1}{t^{21}}\bigg)\\\\\sf f(t)=-\,23+\dfrac{1}{t^{10}}-\dfrac{9}{t^{23}}\\\\\sf f(t)=-\,23+t^{-10}-9t^{-23}\end{array}[/tex]
Agora calcule df/dt, ou seja, a derivada de f em relação a t. Para facilitar nossas vidas, utilize as seguintes regras:
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.
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[tex]\begin{array}{l}\sf\dfrac{df}{dt}=\dfrac{d}{dt}\big(-\,23+t^{-10}-9t^{-23}\big)\\\\\sf\dfrac{df}{dt}=\dfrac{d}{dt}(-\,23)+\dfrac{d}{dt}t^{-10}-\dfrac{d}{dt}9t^{-23}\\\\\sf\dfrac{df}{dt}=0-10\cdot t^{-10-1}+23\cdot9t^{-23-1}\\\\\red{\boldsymbol{\sf\dfrac{df}{dt}=-\,10t^{-11}+207t^{-24}}}\end{array}[/tex]
Letra D
