\(\int \sec ^2 x dx = \tan x + c\\ \int cosec ^2 x dx = \cot x + c\\ \int \sec x \tan x dx = \sec x + c\\ \int cosec \cot x dx = -cosec x + c\\ \int \tan x dx = ln|\sec x| + c\\ \int \cot x dx = -ln |cosec x| + c\\ \int \sec x dx = ln |\sec x tan x| + c\\ \int cosec x dx = -ln |cosec x + cot x| + c\\ \)

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\(\int (ax+b)^n dx = \frac{1}{a(n+1)}(ax+b)^{n+1}+c\)

\(f(x)=\tan x \quad maka \quad f’(x)=\sec ^2 x\\ f(x)=\cot x \quad maka \quad f’(x)= -cosec ^2 x\\ f(x)=\sec x \quad maka \quad f’(x)=\sec x \tan x\\ f(x)=cosec x \quad maka \quad f’(x)= -cosec x \cot x\\ \)

\(\text{Jika }f (x)=k[g(x)]^n \text{ maka } f’(x)=k.n.[g(x)]^(n-1).g’(x)\\ \text{Jika }f (x)=u(x).v(x) \text{ maka } f’(x)=u’(x).v(x) + v’(x).u(x)\\ \text{Jika }f (x)=\frac{u(x)}{v(x)} \text{ maka } f’(x)=\frac{ u’(x).v(x) - v’(x).u(x)}{[v(x)]^2}\)