Determine a equação da reta tangente ao gráfico de f(x)=
![\sqrt[4]{x}](/latexrender/pictures/c0e46d4c908766f6783b14291952c9c5.png "\sqrt[4]{x}")
no ponto da abcissa x=256
por ezidia51 » Dom Ago 26, 2018 17:03
no ponto da abcissa x=256
por Gebe » Dom Ago 26, 2018 19:15
![\\
f(x) = \sqrt[4]{x} = {x}^{\frac{1}{4}}\\
\\
f'\;(x) = \frac{1}{4}{x}^{\frac{1}{4}-1}\\
\\](/latexrender/pictures/dfd897ed3c6220d878b8d9e2abbb3872.png "\\
f(x) = \sqrt[4]{x} = {x}^{\frac{1}{4}}\\
\\
f'\;(x) = \frac{1}{4}{x}^{\frac{1}{4}-1}\\
\\")
![\\
f'\;(x) = \frac{1}{4}{x}^{-\frac{3}{4}} = \frac{1}{4\sqrt[4]{{x}^{3}}}\\](/latexrender/pictures/0d5d5108e02105c4598d7f9a31b4e2e3.png "\\
f'\;(x) = \frac{1}{4}{x}^{-\frac{3}{4}} = \frac{1}{4\sqrt[4]{{x}^{3}}}\\")
![\\
f'\;(256) = \frac{1}{4\sqrt[4]{{256}^{3}}} = \frac{1}{256}](/latexrender/pictures/e2bd9cc422bf3cd5e2c014a284fe939d.png "\\
f'\;(256) = \frac{1}{4\sqrt[4]{{256}^{3}}} = \frac{1}{256}")
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![\frac{\sqrt[]{\sqrt[4]{8}+\sqrt[]{\sqrt[]{2}-1}}-\sqrt[]{\sqrt[4]{8}-\sqrt[]{\sqrt[]{2}-1}}}{\sqrt[]{\sqrt[4]{8}-\sqrt[]{\sqrt[]{2}+1}}}](/latexrender/pictures/981987c7bcdf9f8f498ca4605785636a.png "\frac{\sqrt[]{\sqrt[4]{8}+\sqrt[]{\sqrt[]{2}-1}}-\sqrt[]{\sqrt[4]{8}-\sqrt[]{\sqrt[]{2}-1}}}{\sqrt[]{\sqrt[4]{8}-\sqrt[]{\sqrt[]{2}+1}}}")
![\sqrt[]{2}](/latexrender/pictures/f21662d1cabab6e8b273a4b6f1cd663a.png "\sqrt[]{2}")
(dica : igualar a expressão a 
e elevar ao quadrado os dois lados)