All subjects

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\Huge \text{Définition de}

\Huge \text{la dérivabilité}

\Huge \text{de } f \text{ en } a ?

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\huge \lim\limits_{h \rightarrow 0}\frac{f(a+h)-f(a)}{h}=L

\large \text{(Le taux d'accroissement}

\large \text{de }f \text{ en }a \text{ admet}

\large \text{une limite finie unique)}

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\Huge \text{Équation de}

\Huge\text{la tangente}

\Huge\text{à }\mathscr{C}_f \text{en } x=a?

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\huge y=f'(a)(x-a)+f(a)

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\text{(Seulement si f est dérivable en a)}

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\Huge f(x)=\frac{1}{x^n}, n\geq 1

\Huge f'(x)=?

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\Huge f'(x)=-\frac{n}{x^{n+1}}

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\huge \text{Ensemble de}

\huge \text{définition}

\huge\text{de }f(x)=\frac{2}{\sqrt{x}}?

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\Huge ]0;+\infty[

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\Huge \text{Pour } k\in\N,

\Huge f(x)=e^{2k^{2}x}

\Huge f'(x)=?

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\Huge (\frac{u}{v})'=?

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\Huge \forall x\in\R,

\Huge g(x)=\frac{2x-3}{x^{2}+1}

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\Huge g'(x)=?

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\LARGE \text{Si } f'(x)\leq 0 \text{ sur } I,

\LARGE \text{variations de f }?

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\Huge f(x)=\sqrt{\frac{5x}{3x+1}}

\Huge\text{Variations de f}

\Huge\text{sur } ]-\infty;-\frac{1}{3}[ ?

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