differantialfunktioner

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(f o g)

(f(g(x)))' = g'(x)*f'(g(x))

f(x)=x^2 - tretrinsreglen 1. trin

Df=(Xo+h)-(Xo) (x2 sættes ind på x's plads) Df=(Xo+h)^2-(Xo)^2 Df=Xo^2+h^2+2Xoh-Xo^2 Df=h^2+2Xoh

f(x)=x^2 - tretrinsreglen 2. trin

a=Df/h = h^2+2Xoh/h a=h(h+2Xo)/h (h går ud mod hinanden) a=h+2Xo

kontinuerte

alle differentierede funktioner (der er ikke nogen 'knæk' eller løft med blyanten

cos(x)

cos'(x)=-sin(x)

f(x) = k

f'(x) = 0 konstant d

(f*g)'(x)

f'(x)*g(x)+f(x)*g'(x)

(f/g)'(x)

f'(x)*g(x)-f(x)*g'(x)/g(x)^2

(f+g)'(x)

f'(x)+g'(x)

(f-g)'(x)

f'(x)-g'(x)

f(x)=1/x

f'(x)1/x^2

f(x)=k*x^n

f'(x)= k*n*x^n-1

f(x)=ln(x)

f'(x)=1/x

f(x)=e^2x

f'(x)=2*e^2x

f(x)=e^x

f'(x)=e^x

f(x)=x^2 - tretrinsreglen 3. trin

f'(x)=lim(h+2Xo) h--> o

sin(x)

sin'(x)=cos(x)

tan(x)

tan'(x)=1+tan(x^2)

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