Aus Online Mathematik Brückenkurs 2

Version vom 13:36, 17. Okt. 2008 (bearbeiten) Ian (Diskussion | Beiträge) ← Zum vorherigen Versionsunterschied		Version vom 13:11, 21. Okt. 2008 (bearbeiten) (rückgängig) Tek (Diskussion | Beiträge) K Zum nächsten Versionsunterschied →
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-	The notation ''<math>\int{\sin x\,dx}</math>'' is called the indefinite integral of	+	The notation "<math>\smallint\sin x\,dx</math>" is called the indefinite integral of
-	<math>\sin x</math>	+	<math>\sin x</math> and means all primitive functions of <math>\sin x</math>.
-	and means all primitive functions of	+
-	<math>\sin x</math>.	+
-	Because	+	Because <math>\sin x</math> is a standard function, we know from the course notes that its primitive functions are
-	<math>\sin x</math>	+
-	is a standard function, we know from the course notes that its primitive functions are	+
		+	{{Displayed math||<math>\int{\sin x\,dx}=-\cos x+C\,,</math>}}
-	<math>\int{\sin x\,dx}=-\cos x+C</math>	+	where <math>C</math> is an arbitrary constant.
-		+
-		+
-	where	+
-	<math>C</math>	+
-	is an arbitrary constant.	+

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Version vom 13:11, 21. Okt. 2008

The notation "\displaystyle \smallint\sin x\,dx" is called the indefinite integral of \displaystyle \sin x and means all primitive functions of \displaystyle \sin x.

Because \displaystyle \sin x is a standard function, we know from the course notes that its primitive functions are

\displaystyle \int{\sin x\,dx}=-\cos x+C\,,

where \displaystyle C is an arbitrary constant.