Lösung 2.1:1d - Online Mathematik Brückenkurs 1

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                      2. Algebra
                       
                        2.1 Algebraische Ausdrücke 
                        2.2 Lineare Gleichungen 
                        2.3 Quadratische Gleichungen
                      
                    
                      3. Wurzeln und Logarithmen
                       
                        3.1 Wurzeln 
                        3.2 Wurzelgleichungen 
                        3.3 Logarithmen 
                        3.4 Logarithmusgleichungen
                      
                    
                      4. Trigonometrie
                       
                        4.1 Winkel und Kreise 
                        4.2 Trig. Funktionen 
                        4.3 Trig. Eigenschaften 
                        4.4 Trig. Gleichungen
                      
                    
                      5. Schriftliche Mathematik
                       
                        5.1 Formeln schreiben 
                        5.2 Texte schreiben
                      
                    
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			Lösung 2.1:1d
			
			  Aus Online Mathematik Brückenkurs 1
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				Version vom 07:48, 23. Sep. 2008 (bearbeiten)
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← Zum vorherigen Versionsunterschied
				Version vom 08:20, 22. Okt. 2008 (bearbeiten) (rückgängig)
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		Zeile 1:
Zeile 1:
 After <math> x^3y^2 </math> are multiplied inside the bracket, we can eliminate factors which occur in both the numerator and denominator,  After <math> x^3y^2 </math> are multiplied inside the bracket, we can eliminate factors which occur in both the numerator and denominator,
  
- {{Displayed math||<math>\begin{align} + {{Abgesetzte Formel||<math>\begin{align}
 x^3y^2\Big( \frac{1}{y} - \frac{1}{xy} +1 \Big) &= x^3y^2 \cdot\frac{1}{y} -x^3y^2 \cdot \frac{1}{xy} +x^3y^2\cdot 1 \\  x^3y^2\Big( \frac{1}{y} - \frac{1}{xy} +1 \Big) &= x^3y^2 \cdot\frac{1}{y} -x^3y^2 \cdot \frac{1}{xy} +x^3y^2\cdot 1 \\
 &=\frac{x^3y^2}{y} -\frac{x^3y^2}{xy} +x^3y^2 \\  &=\frac{x^3y^2}{y} -\frac{x^3y^2}{xy} +x^3y^2 \\
Zeile 9:
Zeile 9:
 where we have used  where we have used
  
- {{Displayed math||<math>\begin{align} + {{Abgesetzte Formel||<math>\begin{align}
 \frac{x^3y^2}{y} &= \frac{x^3\cdot y\cdot{}\rlap{/}y}{\rlap{/}y}= x^3y\,,\\[5pt]  \frac{x^3y^2}{y} &= \frac{x^3\cdot y\cdot{}\rlap{/}y}{\rlap{/}y}= x^3y\,,\\[5pt]
 \frac{x^3y^2}{xy} &= \frac{\rlap{/}x\cdot x\cdot x \cdot y \cdot {}\rlap{/}y}{\rlap{/}x\cdot {}\rlap{/}y} = x\cdot x\cdot y = x^2y\,\textrm{.}\end{align}</math>}}  \frac{x^3y^2}{xy} &= \frac{\rlap{/}x\cdot x\cdot x \cdot y \cdot {}\rlap{/}y}{\rlap{/}x\cdot {}\rlap{/}y} = x\cdot x\cdot y = x^2y\,\textrm{.}\end{align}</math>}}
Version vom 08:20, 22. Okt. 2008
After \displaystyle  x^3y^2  are multiplied inside the bracket, we can eliminate factors which occur in both the numerator and denominator,





\displaystyle \begin{align}
x^3y^2\Big( \frac{1}{y} - \frac{1}{xy} +1 \Big) &= x^3y^2 \cdot\frac{1}{y} -x^3y^2 \cdot \frac{1}{xy} +x^3y^2\cdot 1 \\
&=\frac{x^3y^2}{y} -\frac{x^3y^2}{xy} +x^3y^2 \\
&=x^3y - x^2y +x^3y^2\,,
\end{align}



where we have used





\displaystyle \begin{align}
\frac{x^3y^2}{y} &= \frac{x^3\cdot y\cdot{}\rlap{/}y}{\rlap{/}y}= x^3y\,,\\[5pt]
\frac{x^3y^2}{xy} &= \frac{\rlap{/}x\cdot x\cdot x \cdot y \cdot {}\rlap{/}y}{\rlap{/}x\cdot {}\rlap{/}y} = x\cdot x\cdot y = x^2y\,\textrm{.}\end{align}




Von „http://wiki.sommarmatte.se/wikis/2009/bridgecourse1-TU-Berlin/index.php/L%C3%B6sung_2.1:1d“
                       Willkommen zum Kurs
                       
                        Infos zum Kurs 
                        Infos zu den Prüfungen
                      
                    
                      1. Numerische Berechnungen
                       
                        1.1 Verschiedene Zahlen 
                        1.2 Brüche 
                        1.3 Potenzen
                      
                    
                      2. Algebra
                       
                        2.1 Algebraische Ausdrücke 
                        2.2 Lineare Gleichungen 
                        2.3 Quadratische Gleichungen
                      
                    
                      3. Wurzeln und Logarithmen
                       
                        3.1 Wurzeln 
                        3.2 Wurzelgleichungen 
                        3.3 Logarithmen 
                        3.4 Logarithmusgleichungen
                      
                    
                      4. Trigonometrie
                       
                        4.1 Winkel und Kreise 
                        4.2 Trig. Funktionen 
                        4.3 Trig. Eigenschaften 
                        4.4 Trig. Gleichungen
                      
                    
                      5. Schriftliche Mathematik
                       
                        5.1 Formeln schreiben 
                        5.2 Texte schreiben
                      
                    
                      Kurs als PDF
                                            
                    
                    
		       Suche
		       
		         

                           
                            
			 
		       
		    
		    
		  
		  
		  
		    
		      
		        
			
			Lösung 2.1:1d
			
			  Aus Online Mathematik Brückenkurs 1
			  (Unterschied zwischen Versionen)
			  			                            Wechseln zu: Navigation, Suche
                          
		          
			
			
			
			
			
			
				Version vom 07:48, 23. Sep. 2008 (bearbeiten)
Tek  (Diskussion | Beiträge)
K 
← Zum vorherigen Versionsunterschied
				Version vom 08:20, 22. Okt. 2008 (bearbeiten) (rückgängig)
Tekbot  (Diskussion | Beiträge) 
K  (Robot: Automated text replacement  (-{{Displayed math +{{Abgesetzte Formel))
Zum nächsten Versionsunterschied →
			
		Zeile 1:
Zeile 1:
 After <math> x^3y^2 </math> are multiplied inside the bracket, we can eliminate factors which occur in both the numerator and denominator,  After <math> x^3y^2 </math> are multiplied inside the bracket, we can eliminate factors which occur in both the numerator and denominator,
  
- {{Displayed math||<math>\begin{align} + {{Abgesetzte Formel||<math>\begin{align}
 x^3y^2\Big( \frac{1}{y} - \frac{1}{xy} +1 \Big) &= x^3y^2 \cdot\frac{1}{y} -x^3y^2 \cdot \frac{1}{xy} +x^3y^2\cdot 1 \\  x^3y^2\Big( \frac{1}{y} - \frac{1}{xy} +1 \Big) &= x^3y^2 \cdot\frac{1}{y} -x^3y^2 \cdot \frac{1}{xy} +x^3y^2\cdot 1 \\
 &=\frac{x^3y^2}{y} -\frac{x^3y^2}{xy} +x^3y^2 \\  &=\frac{x^3y^2}{y} -\frac{x^3y^2}{xy} +x^3y^2 \\
Zeile 9:
Zeile 9:
 where we have used  where we have used
  
- {{Displayed math||<math>\begin{align} + {{Abgesetzte Formel||<math>\begin{align}
 \frac{x^3y^2}{y} &= \frac{x^3\cdot y\cdot{}\rlap{/}y}{\rlap{/}y}= x^3y\,,\\[5pt]  \frac{x^3y^2}{y} &= \frac{x^3\cdot y\cdot{}\rlap{/}y}{\rlap{/}y}= x^3y\,,\\[5pt]
 \frac{x^3y^2}{xy} &= \frac{\rlap{/}x\cdot x\cdot x \cdot y \cdot {}\rlap{/}y}{\rlap{/}x\cdot {}\rlap{/}y} = x\cdot x\cdot y = x^2y\,\textrm{.}\end{align}</math>}}  \frac{x^3y^2}{xy} &= \frac{\rlap{/}x\cdot x\cdot x \cdot y \cdot {}\rlap{/}y}{\rlap{/}x\cdot {}\rlap{/}y} = x\cdot x\cdot y = x^2y\,\textrm{.}\end{align}</math>}}
Version vom 08:20, 22. Okt. 2008
After \displaystyle  x^3y^2  are multiplied inside the bracket, we can eliminate factors which occur in both the numerator and denominator,





\displaystyle \begin{align}
x^3y^2\Big( \frac{1}{y} - \frac{1}{xy} +1 \Big) &= x^3y^2 \cdot\frac{1}{y} -x^3y^2 \cdot \frac{1}{xy} +x^3y^2\cdot 1 \\
&=\frac{x^3y^2}{y} -\frac{x^3y^2}{xy} +x^3y^2 \\
&=x^3y - x^2y +x^3y^2\,,
\end{align}



where we have used





\displaystyle \begin{align}
\frac{x^3y^2}{y} &= \frac{x^3\cdot y\cdot{}\rlap{/}y}{\rlap{/}y}= x^3y\,,\\[5pt]
\frac{x^3y^2}{xy} &= \frac{\rlap{/}x\cdot x\cdot x \cdot y \cdot {}\rlap{/}y}{\rlap{/}x\cdot {}\rlap{/}y} = x\cdot x\cdot y = x^2y\,\textrm{.}\end{align}




Von „http://wiki.sommarmatte.se/wikis/2009/bridgecourse1-TU-Berlin/index.php/L%C3%B6sung_2.1:1d“
-                      Willkommen zum Kurs
                       
                        Infos zum Kurs 
                        Infos zu den Prüfungen
                      
                    
                      1. Numerische Berechnungen
                       
                        1.1 Verschiedene Zahlen 
                        1.2 Brüche 
                        1.3 Potenzen
                      
                    
                      2. Algebra
                       
                        2.1 Algebraische Ausdrücke 
                        2.2 Lineare Gleichungen 
                        2.3 Quadratische Gleichungen
                      
                    
                      3. Wurzeln und Logarithmen
                       
                        3.1 Wurzeln 
                        3.2 Wurzelgleichungen 
                        3.3 Logarithmen 
                        3.4 Logarithmusgleichungen
                      
                    
                      4. Trigonometrie
                       
                        4.1 Winkel und Kreise 
                        4.2 Trig. Funktionen 
                        4.3 Trig. Eigenschaften 
                        4.4 Trig. Gleichungen
                      
                    
                      5. Schriftliche Mathematik
                       
                        5.1 Formeln schreiben 
                        5.2 Texte schreiben
                      
                    
                      Kurs als PDF
                                            
                    
                    
		       Suche
+			Lösung 2.1:1d
			
			  Aus Online Mathematik Brückenkurs 1
			  (Unterschied zwischen Versionen)
			  			                            Wechseln zu: Navigation, Suche
                          
		          
			
			
			
			
			
			
				Version vom 07:48, 23. Sep. 2008 (bearbeiten)
Tek  (Diskussion | Beiträge)
K 
← Zum vorherigen Versionsunterschied
				Version vom 08:20, 22. Okt. 2008 (bearbeiten) (rückgängig)
Tekbot  (Diskussion | Beiträge) 
K  (Robot: Automated text replacement  (-{{Displayed math +{{Abgesetzte Formel))
Zum nächsten Versionsunterschied →
			
		Zeile 1:
Zeile 1:
 After <math> x^3y^2 </math> are multiplied inside the bracket, we can eliminate factors which occur in both the numerator and denominator,  After <math> x^3y^2 </math> are multiplied inside the bracket, we can eliminate factors which occur in both the numerator and denominator,
  
- {{Displayed math||<math>\begin{align} + {{Abgesetzte Formel||<math>\begin{align}
 x^3y^2\Big( \frac{1}{y} - \frac{1}{xy} +1 \Big) &= x^3y^2 \cdot\frac{1}{y} -x^3y^2 \cdot \frac{1}{xy} +x^3y^2\cdot 1 \\  x^3y^2\Big( \frac{1}{y} - \frac{1}{xy} +1 \Big) &= x^3y^2 \cdot\frac{1}{y} -x^3y^2 \cdot \frac{1}{xy} +x^3y^2\cdot 1 \\
 &=\frac{x^3y^2}{y} -\frac{x^3y^2}{xy} +x^3y^2 \\  &=\frac{x^3y^2}{y} -\frac{x^3y^2}{xy} +x^3y^2 \\
Zeile 9:
Zeile 9:
 where we have used  where we have used
  
- {{Displayed math||<math>\begin{align} + {{Abgesetzte Formel||<math>\begin{align}
 \frac{x^3y^2}{y} &= \frac{x^3\cdot y\cdot{}\rlap{/}y}{\rlap{/}y}= x^3y\,,\\[5pt]  \frac{x^3y^2}{y} &= \frac{x^3\cdot y\cdot{}\rlap{/}y}{\rlap{/}y}= x^3y\,,\\[5pt]
 \frac{x^3y^2}{xy} &= \frac{\rlap{/}x\cdot x\cdot x \cdot y \cdot {}\rlap{/}y}{\rlap{/}x\cdot {}\rlap{/}y} = x\cdot x\cdot y = x^2y\,\textrm{.}\end{align}</math>}}  \frac{x^3y^2}{xy} &= \frac{\rlap{/}x\cdot x\cdot x \cdot y \cdot {}\rlap{/}y}{\rlap{/}x\cdot {}\rlap{/}y} = x\cdot x\cdot y = x^2y\,\textrm{.}\end{align}</math>}}
Version vom 08:20, 22. Okt. 2008
After \displaystyle  x^3y^2  are multiplied inside the bracket, we can eliminate factors which occur in both the numerator and denominator,





\displaystyle \begin{align}
x^3y^2\Big( \frac{1}{y} - \frac{1}{xy} +1 \Big) &= x^3y^2 \cdot\frac{1}{y} -x^3y^2 \cdot \frac{1}{xy} +x^3y^2\cdot 1 \\
&=\frac{x^3y^2}{y} -\frac{x^3y^2}{xy} +x^3y^2 \\
&=x^3y - x^2y +x^3y^2\,,
\end{align}



where we have used





\displaystyle \begin{align}
\frac{x^3y^2}{y} &= \frac{x^3\cdot y\cdot{}\rlap{/}y}{\rlap{/}y}= x^3y\,,\\[5pt]
\frac{x^3y^2}{xy} &= \frac{\rlap{/}x\cdot x\cdot x \cdot y \cdot {}\rlap{/}y}{\rlap{/}x\cdot {}\rlap{/}y} = x\cdot x\cdot y = x^2y\,\textrm{.}\end{align}




Von „http://wiki.sommarmatte.se/wikis/2009/bridgecourse1-TU-Berlin/index.php/L%C3%B6sung_2.1:1d“
@@ Zeile 1: / Zeile 1: @@
 After <math> x^3y^2 </math> are multiplied inside the bracket, we can eliminate factors which occur in both the numerator and denominator,
-{{Displayed math||<math>\begin{align}
+{{Abgesetzte Formel||<math>\begin{align}
 x^3y^2\Big( \frac{1}{y} - \frac{1}{xy} +1 \Big) &= x^3y^2 \cdot\frac{1}{y} -x^3y^2 \cdot \frac{1}{xy} +x^3y^2\cdot 1 \\
 &=\frac{x^3y^2}{y} -\frac{x^3y^2}{xy} +x^3y^2 \\
@@ Zeile 9: / Zeile 9: @@
 where we have used
-{{Displayed math||<math>\begin{align}
+{{Abgesetzte Formel||<math>\begin{align}
 \frac{x^3y^2}{y} &= \frac{x^3\cdot y\cdot{}\rlap{/}y}{\rlap{/}y}= x^3y\,,\\[5pt]
 \frac{x^3y^2}{xy} &= \frac{\rlap{/}x\cdot x\cdot x \cdot y \cdot {}\rlap{/}y}{\rlap{/}x\cdot {}\rlap{/}y} = x\cdot x\cdot y = x^2y\,\textrm{.}\end{align}</math>}}
 \displaystyle \begin{align}
x^3y^2\Big( \frac{1}{y} - \frac{1}{xy} +1 \Big) &= x^3y^2 \cdot\frac{1}{y} -x^3y^2 \cdot \frac{1}{xy} +x^3y^2\cdot 1 \\
&=\frac{x^3y^2}{y} -\frac{x^3y^2}{xy} +x^3y^2 \\
&=x^3y - x^2y +x^3y^2\,,
\end{align}
 \displaystyle \begin{align}
\frac{x^3y^2}{y} &= \frac{x^3\cdot y\cdot{}\rlap{/}y}{\rlap{/}y}= x^3y\,,\\[5pt]
\frac{x^3y^2}{xy} &= \frac{\rlap{/}x\cdot x\cdot x \cdot y \cdot {}\rlap{/}y}{\rlap{/}x\cdot {}\rlap{/}y} = x\cdot x\cdot y = x^2y\,\textrm{.}\end{align}