基本运算

求导公式

基本求导

\begin{array}{lcl} C^{'} & = 0 \\ (x^{n})^{'} & = n x^{n - 1} \\ (s i n x)^{'} & = c o s x \\ (c o s x)^{'} & = - s i n x \\ (t a n x)^{'} & = s e c^{2} x \\ (c o t x)^{'} & = - c s c^{2} x \\ (a r c s i n x)^{'} & = \frac{1}{\sqrt{1 - x^{2}}} \\ (a r c c o s x)^{'} & = - \frac{1}{\sqrt{1 - x^{2}}} \\ (a r c t a n x)^{'} & = \frac{1}{1 + x^{2}} \\ (a r c c o t x)^{'} & = - \frac{1}{1 + x^{2}} \\ (e^{x})^{'} & = e^{x} \\ (a^{x})^{'} & = a^{x} l n a \\ (l n x)^{'} & = \frac{1}{x} \\ (l o g_{a} x)^{'} & = \frac{1}{x l n a} \end{array}

四则运算

\begin{array}{lcl} (u (x) \pm v (x))^{'} & = u^{'} (x) \pm v^{'} (x) \\ (u (x) v (x))^{'} & = u^{'} (x) v (x) + u (x) v^{'} (x) \\ (\frac{u (x)}{v (x)})^{'} & = \frac{u^{'} (x) v (x) - u (x) v^{'} (x)}{v^{2} (x)} \end{array}

反函数

f^{'} (x) = lim_{Δ x \to 0} \frac{Δ y}{Δ x} = lim_{Δ x \to 0} \frac{1}{\frac{Δ x}{Δ y}} = \frac{1}{lim_{Δ y \to 0}} \frac{Δ x}{Δ y} = \frac{1}{φ^{'} (x)}

例：

y^{'} = (a r c s i n x)^{'} = \frac{1}{(\sin y)^{'}} = \frac{1}{\cos y} = \frac{1}{\sqrt{1 - \sin^{2} y}} = \frac{1}{\sqrt{1 - x^{2}}}

复合函数

\frac{d y}{d x} = \frac{d y}{d u} \times \frac{d u}{d x}

幂指函数

\begin{array}{lcl} y = u (x)^{v (x)} \\ y^{'} = u (x)^{v (x)} (v^{'} (x) \ln u (x) + \frac{v (x)}{u (x)} u^{'} (x)) \end{array}

隐函数

\begin{array}{lcl} \sin x y - \ln (x + y) = 0 \\ \cos x y \times (1 \times y + x y^{'}) - \frac{1}{x + y} (1 + y^{'}) = 0 \end{array}

参数式方程

{\begin{cases} x = e^{t} \cos t, \\ y = e^{t} \sin t \end{cases}

\frac{d y}{d x} = \frac{\frac{d y}{d t}}{\frac{d x}{d t}}

微积分

\begin{array}{lcl} \int k d x & = k x + C \\ \int x^{μ} d x & = \frac{x^{μ + 1}}{μ + 1} + C, (μ \neq - 1) \\ \int \frac{1}{x} d x & = \ln x + C \\ \int \frac{1}{1 + x^{2}} d x & = \arctan x + C \\ \int \frac{1}{\sqrt{1 - x^{2}}} d x & = \arcsin x + C \end{array}

极限

运算法则

两个无穷小的和是无穷小，有限个无穷小和是无穷小
有界与无穷小的积是无穷小
常数与无穷小的积是无穷小
有限个无穷小的积是无穷小

lim f (x) = A, lim g (x) = B lim (f (x) \pm g (x)) = lim f (x) \pm lim g (x) = A \pm B lim (f (x) \cdot g (x)) = lim f (x) \cdot lim g (x) = A \cdot B lim \frac{f (x)}{g (x)} = \frac{lim f (x)}{lim g (x)} (B \neq 0)

lim (C f (x)) = C lim f (x C lim (f (x))^{n} = (lim f (x))^{n} 若 f (x) \geq g (x), 或 f (x) > f (x), 则 lim f (x) \geq lim g (x)

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