What is the equation of the line tangent to $f (x) = \frac{x^{2}}{e^{x}} - \frac{x}{e^{x^{2}}}$ $f(x)=x^2/e^x-x/e^(x^2)$ at $x = 0$ $x=0$ ?

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What is the equation of the line tangent to $f (x) = \frac{x^{2}}{e^{x}} - \frac{x}{e^{x^{2}}}$ $f(x)=x^2/e^x-x/e^(x^2)$ at $x = 0$ $x=0$ ?

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Answer 1 · 2016-11-02T17:34:40

$f'(x)=-1$

Explanation:

Let's rewrite the function as $f(x)=x^2e^{-x}-xe^{-x^2}$

Reminding that the Mac Laurin of $e^x$ is $1+x+x^2/2+o(x^2)$ ,
the one of $e^{-x}$ is $1-x+x^2/2+o(x^2)$ ,
and the one of $e^{-x^2}$ is $1-x^2+x^4/2+o(x^4)$
By replacing them, we get
$f(x)=x^2(1-x+x^2/2+o(x^2))-x(1-x^2+x^4/2+o(x^4))$ .
By carrying out the multiplication we get
$-x+x^2+x^4/2-x^5/2+o(x^4)$
In the end $f'(0)=-1$ , i.e. the coefficient of the linear term in the Mac Laurin polynomial for $f(x)$
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What is the equation of the line tangent to $f (x) = \frac{x^{2}}{e^{x}} - \frac{x}{e^{x^{2}}}$ $f(x)=x^2/e^x-x/e^(x^2)$ at $x = 0$ $x=0$ ?

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What is the equation of the line tangent to f(x)=x^2/e^x-x/e^(x^2) f(x)=x2ex−xex2 f(x)=x^2/e^x-x/e^(x^2) at x=0x=0 x=0?

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What is the equation of the line tangent to $f (x) = \frac{x^{2}}{e^{x}} - \frac{x}{e^{x^{2}}}$ $f(x)=x^2/e^x-x/e^(x^2)$ at $x = 0$ $x=0$ ?