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Aus Online Mathematik Brückenkurs 2

Version vom 14:25, 16. Sep. 2008 (bearbeiten) Tekbot (Diskussion | Beiträge) K (Lösning 1.2:2d moved to Solution 1.2:2d: Robot: moved page) ← Zum vorherigen Versionsunterschied		Version vom 13:13, 11. Okt. 2008 (bearbeiten) (rückgängig) Ian (Diskussion | Beiträge) Zum nächsten Versionsunterschied →
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-	{{NAVCONTENT_START}}	+	We can see the expression as "ln of something",
-	<center> [[Image:1_2_2d.gif]] </center>	+
-	{{NAVCONTENT_STOP}}	+
		+	<math>\ln \left\{ \left. {} \right\} \right.</math>,
		+
		+	where "something" is
		+	<math>\ln x</math>.
		+
		+	Because we have a compound expression, we use the chain rule and obtain, roughly speaking, the outer derivative multiplied by the inner derivative,
		+
		+
		+	<math>\frac{d}{dx}\ln \left\{ \left. \ln x \right\} \right.=\frac{1}{\ln x}\centerdot \left( \left\{ \left. \ln x \right\} \right. \right)^{\prime }</math>
		+
		+
		+	where the first factor on the right-hand side
		+	<math>\frac{1}{\ln x}</math>
		+	is the outer derivative of
		+	<math>\ln \left\{ \left. \ln x \right\} \right.</math>
		+	and the other factor
		+	<math>\left( \left\{ \left. \ln x \right\} \right. \right)^{\prime }</math>
		+	is the inner derivative. Thus, we get
		+
		+
		+	<math>\frac{d}{dx}\ln \left\{ \left. \ln x \right\} \right.=\frac{1}{\ln x}\centerdot \frac{1}{x}=\frac{1}{x\ln x}</math>

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Version vom 13:13, 11. Okt. 2008

We can see the expression as "ln of something",

ln,

where "something" is lnx.

Because we have a compound expression, we use the chain rule and obtain, roughly speaking, the outer derivative multiplied by the inner derivative,

ddxlnlnx=1lnxlnx 

where the first factor on the right-hand side 1lnx is the outer derivative of lnlnx and the other factor lnx  is the inner derivative. Thus, we get

ddxlnlnx=1lnxx1=1xlnx