Aus Online Mathematik Brückenkurs 2

Version vom 14:42, 16. Sep. 2008 (bearbeiten) Tekbot (Diskussion | Beiträge) K (Lösning 2.2:2c moved to Solution 2.2:2c: Robot: moved page) ← Zum vorherigen Versionsunterschied		Version vom 12:10, 20. Okt. 2008 (bearbeiten) (rückgängig) Ian (Diskussion | Beiträge) Zum nächsten Versionsunterschied →
Zeile 1:		Zeile 1:
-	{{NAVCONTENT_START}}	+	If we focus on the integrand, then the substitution
-	<center> [[Image:2_2_2c.gif]] </center>	+	<math>u=\text{3}x+\text{1}</math>
-	{{NAVCONTENT_STOP}}	+	seems suitable, since we then get
		+	<math>\sqrt{u}</math>
		+	which we can integrate. There is also no risk involved in using a linear substitution such as
		+	<math>u=\text{3}x+\text{1}</math>, because the relation between
		+	<math>dx\text{ }</math>
		+	and
		+	<math>du</math>
		+	will be a constant factor,
		+
		+
		+	<math>du=\left( \text{3}x+\text{1} \right)^{1}\,dx=3\,dx</math>
		+
		+
		+	which does not cause any problems.
		+
		+	We obtain
		+
		+
		+	<math>\begin{align}
		+	& \int\limits_{0}^{5}{\sqrt{3x+1}}\,dx=\left\{ \begin{matrix}
		+	u=\text{3}x+\text{1} \\
		+	du=3\,dx \\
		+	\end{matrix} \right\}=\frac{1}{3}\int\limits_{1}^{16}{\sqrt{u}}\,du \\
		+	& =\frac{1}{3}\int\limits_{1}^{16}{u^{{1}/{2}\;}}\,du=\frac{1}{3}\left[ \frac{u^{\frac{1}{2}+1}}{\frac{1}{2}+1} \right]_{1}^{16} \\
		+	& =\frac{1}{3}\left[ \frac{2}{3}u\sqrt{u} \right]_{1}^{16}=\frac{2}{9}\left( 16\sqrt{16}-1\sqrt{1} \right) \\
		+	& =\frac{2}{9}\left( 16\centerdot 4-1 \right)=\frac{2\centerdot 63}{9}=14 \\
		+	\end{align}</math>

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Version vom 12:10, 20. Okt. 2008

If we focus on the integrand, then the substitution \displaystyle u=\text{3}x+\text{1} seems suitable, since we then get \displaystyle \sqrt{u} which we can integrate. There is also no risk involved in using a linear substitution such as \displaystyle u=\text{3}x+\text{1}, because the relation between \displaystyle dx\text{ } and \displaystyle du will be a constant factor,

\displaystyle du=\left( \text{3}x+\text{1} \right)^{1}\,dx=3\,dx

which does not cause any problems.

We obtain

\displaystyle \begin{align} & \int\limits_{0}^{5}{\sqrt{3x+1}}\,dx=\left\{ \begin{matrix} u=\text{3}x+\text{1} \\ du=3\,dx \\ \end{matrix} \right\}=\frac{1}{3}\int\limits_{1}^{16}{\sqrt{u}}\,du \\ & =\frac{1}{3}\int\limits_{1}^{16}{u^{{1}/{2}\;}}\,du=\frac{1}{3}\left[ \frac{u^{\frac{1}{2}+1}}{\frac{1}{2}+1} \right]_{1}^{16} \\ & =\frac{1}{3}\left[ \frac{2}{3}u\sqrt{u} \right]_{1}^{16}=\frac{2}{9}\left( 16\sqrt{16}-1\sqrt{1} \right) \\ & =\frac{2}{9}\left( 16\centerdot 4-1 \right)=\frac{2\centerdot 63}{9}=14 \\ \end{align}