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Muhun_Marroquín_Geldy Evelin-202150264_Administración Educativa-Test sobre Integración

Geldy Evelin Muhun Marroquín

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Reglas de Integración

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Flashcards by Freddy Ulate Agüero, updated more than 1 year ago

	Created by Freddy Ulate Agüero over 10 years ago

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Resource summary

Question	Answer
$\int x^n dx =$	$\frac{x^{n+1}}{n+1} + C , n \neq -1$
$\int a \, dx =$	$ax + C$
$\int \frac{1}{x} =$	$ln \|x\| + C$
$\int e^x dx =$	$e^x + C$
$\int a^x dx =$	$\frac{a^x}{\ln a} + C$
$\int \sin x \, dx =$	$-\cos x + C$
$\int \cos x \, dx =$	$\sin x + C$
$\int \tan x \, dx =$	$- \ln \|\cos x\| + C$
$\int \cot \, dx =$	$\ln \|\sin x\| + C$
$\int \sec x \, dx =$	$\ln\|\sec x + \tan x\| + C$
$\int \csc x \, dx =$	$\ln \|\csc x - \cot x\| + C$
$\int \csc^2 x \, dx =$	$-\cot x + C$
$\int \sec^2 x \, dx =$	$\tan x + C$
$\int \sec x \tan x \, dx$	$\sec x + C$
$\int \csc x \cot x \, dx =$	$- \csc x + C$
$\int \frac{1}{\sqrt{1-x^2}} dx =$	$\arcsin x + C$
$\int \frac{1}{x^2+1} dx =$	$\arctan x + C$

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