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Version vom 08:50, 9. Sep. 2008 (bearbeiten) Tekbot (Diskussion | Beiträge) K (Lösning 2.2:6e moved to Solution 2.2:6e: Robot: moved page) ← Zum vorherigen Versionsunterschied		Version vom 12:11, 18. Sep. 2008 (bearbeiten) (rückgängig) Ian (Diskussion | Beiträge) Zum nächsten Versionsunterschied →
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		+	The lines have a point of intersection at that point which simultaneously satisfies the equations of both lines:
		+
		+
		+	<math>2x+y-1=0</math>
		+	and
		+	<math>y-2x-2=0</math>.
		+
		+	If we make
		+	<math>y</math>
		+	the subject of the second equation
		+	<math>y-2x-2=0</math>
		+	and substitute it into the first equation, we obtain an equation which only contains
		+	<math>x</math>,
		+
		+
		+	<math>2x+\left( 2x+2 \right)-1=0\ \Leftrightarrow \ 4x+1=0</math>
		+
		+
		+	which gives that
		+	<math>x=-{1}/{4}\;</math>. Then, from the relation
		+	<math>y=2x+2</math>, we obtain
		+	<math>y=2\left( -{1}/{4}\; \right)+2={3}/{2}\;</math>.
		+
		+	The point of intersection is
		+	<math>\left( -\frac{1}{4} \right.,\left. \frac{3}{2} \right)</math>.
		+
		+	We check for safety's sake that
		+	<math>\left( -\frac{1}{4} \right.,\left. \frac{3}{2} \right)</math>
		+	really satisfies both equations:
		+
		+
	{{NAVCONTENT_START}}		{{NAVCONTENT_START}}
-	<center> [[Image:2_2_6e-1(2).gif]] </center>	+
-	{{NAVCONTENT_STOP}}	+
-	{{NAVCONTENT_START}}	+
-	<center> [[Image:2_2_6e-2(2).gif]] </center>	+
	{{NAVCONTENT_STOP}}		{{NAVCONTENT_STOP}}
	[[Image:2_2_6_e.gif|center]]		[[Image:2_2_6_e.gif|center]]
		+	We check for safety's sake that
		+	<math>\left( -\frac{1}{4} \right.,\left. \frac{3}{2} \right)</math>
		+	really satisfies both equations:
		+
		+
		+	<math>2x+y-1=0</math>:
		+	LHS =
		+	<math>2\left( -\frac{1}{4} \right)+\frac{3}{2}-1=-\frac{1}{2}+\frac{3}{2}-\frac{2}{2}=0</math> =RHS
		+
		+	<math>y-2x-2=0</math>:
		+	LHS =
		+	<math>\frac{3}{2}-2\left( -\frac{1}{4} \right)-2=\frac{3}{2}+\frac{1}{2}-\frac{4}{2}=0</math> =RHS

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Version vom 12:11, 18. Sep. 2008

The lines have a point of intersection at that point which simultaneously satisfies the equations of both lines:

2x+y−1=0 and y−2x−2=0.

If we make y the subject of the second equation y−2x−2=0 and substitute it into the first equation, we obtain an equation which only contains x,

2x+2x+2−1=0  4x+1=0 

which gives that x=−14. Then, from the relation y=2x+2, we obtain y=2−14+2=32 .

The point of intersection is −4123 .

We check for safety's sake that −4123  really satisfies both equations:

We check for safety's sake that −4123  really satisfies both equations:

2x+y−1=0: LHS = 2−41+23−1=−21+23−22=0  =RHS

y−2x−2=0: LHS = 23−2−41−2=23+21−24=0  =RHS