Alla tre bevis bygger på att f(x)=e^x är injektiv: e^VL = e^HL ⇔ VL=HL 1. ln(xy) = ln(x)+ ln(y) e^VL=e^ln(xy) = xy = e^ln(x) • e^ln(y) = e^ln(x)+ln(y) = HL ∴ ln(xy) = ln(x) + ln(y) 2. ln(x/y) = ln(x) - ln(y) e^VL=e^ln(x/y) = x/y = (e^ln(x))/(e^ln(y)) = e^ln(x)-ln(y)= e^HL ∴ ln(x/y) = ln(x)-ln(y) 3. ln(x^p) = p•ln(x) e^VL=e^ln(x^p) = x^p = (e^ln(x))^p = e^p•ln(x) = HL ∴ ln(x^p) = p•ln(x) VSV

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Alla tre bevis bygger på att f(x)=e^x är injektiv:

e^VL = e^HL ⇔ VL=HL

ln(xy) = ln(x)+ ln(y)
e^VL=e^ln(xy) = xy = e^ln(x) • e^ln(y) = e^ln(x)+ln(y) = HL
∴ ln(xy) = ln(x) + ln(y)
ln(x/y) = ln(x) - ln(y)
e^VL=e^ln(x/y) = x/y = (e^ln(x))/(e^ln(y)) = e^ln(x)-ln(y)= e^HL
∴ ln(x/y) = ln(x)-ln(y)
ln(x^p) = p•ln(x)
e^VL=e^ln(x^p) = x^p = (e^ln(x))^p = e^p•ln(x) = HL
∴ ln(x^p) = p•ln(x)

VSV

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Log↓a(x)= ln x / ln y

log↓a(x) <=> a^y=x
<=> ylna = ln x
<=> y= ln x / ln a
alltså log↓a(x) = ln x/lny
vsv

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