Differentiation Formulas
http://archives.math.utk.edu/visual.calculus/2/formulas.1/index.html


||$f(x)$   ||$\frac{d}{dx}f(x)$ ||증명 ||
||$\sin x$ ||$\cos x$ ||[[RR:sin_x_미분_증명]] ||
||$\cos x$ ||$-\sin x$ ||[[RR:cos_x_미분_증명]] ||
||$\tan x$ ||$\sec^2 x$ ||[[RR:tan_x_미분_증명]] ||
||$\cot x$ ||$-\csc^2 x$ ||[[RR:cot_x_미분_증명]] 작성예정||
||$\sec x$ ||$\sec x \tan x$ ||[[RR:sec_x_미분_증명]] ||
||$\csc x$ ||$-\csc x \cot x$ ||
||$\sin^{-1}x$ ||$\frac{1}{\sqrt{1-x^2}}$ ||[[RR:arcsin_x(아크사인)_미분_증명]] ||
||$\cos^{-1}x$ ||$\frac{-1}{\sqrt{1-x^2}}$ ||[[RR:arccos_x(아크코사인)_미분_증명]] ||
||$\tan^{-1}x$ ||$\frac{1}{1+x^2}$ ||[[RR:arctan_x(아크탄젠트)_미분_증명]] ||
||$\cot^{-1}x$ ||$\frac{-1}{1+x^2}$ ||
||$\sec^{-1}x$ ||$\frac{1}{|x|\sqrt{x^2-1}}$ ||[[RR:arcsec_x(아크시컨트)_미분_증명]] ||
||$\csc^{-1}x$ ||$\frac{-1}{|x|\sqrt{x^2-1}}$ ||
||$\sinh x$ ||$\cosh x$ ||
||$\cosh x$ ||$\sinh x$ ||
||$\tanh x$ ||$\operatorname{sech}^2 x$ ||[[RR:tanh_x_미분_증명]] ||
||$\coth x$ ||$-\operatorname{csch}^2 x$ ||
||$\operatorname{sech} x$ ||$-\operatorname{sech} x \tanh x$ ||
||$\operatorname{csch} x$ ||$-\operatorname{csch} x \coth x$ ||
||$\sinh^{-1} x$ ||$\frac1{\sqrt{1+x^2}}$ ||
||$\cosh^{-1} x$ ||
||$\tanh^{-1} x$ ||$\frac1{1-x^2}\;|x|<1$ ||
||$\coth^{-1} x$ ||$\frac1{1-x^2}\;|x|>1$ ||
||$\operatorname{sech}^{-1} x$ ||
||$\operatorname{csch}^{-1} x$ ||
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Up: [[미적분,calculus]], [[삼각함수,trigonometric_function]], [[쌍곡선함수,hyperbolic_function]], [[여러가지미분표와적분표]]