Derivada parcial de função vetorial

Seja \(f: D \subset \mathbb{R^2} \to \mathbb{R^3} \) uma função dada por \(f\)\(\left(\begin{array}{c}x\\y\\\end{array}\right)\)=\(\left(\begin{array}{c}-x^3y^3-\cos(2x)\\\log\left(x^ey^e\right)\\-2\log\left(x^2+y^e\right)\\\end{array}\right)\). Então a derivada parcial de \(f\) em ordem a \(x\) é igual a:

A) \(\overset{\longrightarrow}{\text{D}_1\pmb{\text{f}}}\left(\begin{array}{c}x\\y\\\end{array}\right)=\left(\begin{array}{c}2\sin(2x)-3x^2y^3\\\frac{e}{x}\\-\frac{4x}{y^e+x^2}\\\end{array}\right)\)

B) \(\overset{\longrightarrow}{\text{D}_1\pmb{\text{f}}}\left(\begin{array}{c}x\\y\\\end{array}\right)=\left(\begin{array}{c}2\sin(2x)-3x^2y^3\\\frac{e}{y}\\-\frac{4x}{y^e+x^2}\\\end{array}\right)\)

C) \(\overset{\longrightarrow}{\text{D}_1\pmb{\text{f}}}\left(\begin{array}{c}x\\y\\\end{array}\right)=\left(\begin{array}{c}-3x^3y^2\\\frac{e}{x}\\-\frac{2ey^{-1+e}}{y^e+x^2}\\\end{array}\right)\)

D) \(\overset{\longrightarrow}{\text{D}_1\pmb{\text{f}}}\left(\begin{array}{c}x\\y\\\end{array}\right)=\left(\begin{array}{c}-3x^3y^2\\\frac{e}{y}\\-\frac{4x}{y^e+x^2}\\\end{array}\right)\)

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