Lösung 2.2:6a
Aus Online Mathematik Brückenkurs 1
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According to the definition, the point of intersection between two lines is that point which lies on both lines; it must therefore satisfy the equations of both lines. | According to the definition, the point of intersection between two lines is that point which lies on both lines; it must therefore satisfy the equations of both lines. | ||
| - | If the point of intersection has coordinates | + | If the point of intersection has coordinates (''x'',''y''), then |
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| - | <math>y=3x+5</math> | + | {{Displayed math|| |
| + | <math>\left\{\begin{align} y&=3x+5\,,\\ y&=0\,\textrm{.}\qquad\quad\text{(x-axis)}\end{align}\right.</math>}} | ||
| - | + | If we substitute <math>y=0</math> into the first equation, we obtain | |
| - | <math> | + | {{Displayed math||<math>0=3x+5,\qquad\text{i.e.}\quad x=-\frac{5}{3}\,\textrm{.}</math>}} |
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| - | + | The point of intersection is (-5/3,0). | |
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| - | < | + | <center>[[Image:2_2_6_a.gif|center]]</center> |
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| - | [[Image:2_2_6_a.gif|center]] | + | |
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Version vom 13:00, 24. Sep. 2008
According to the definition, the point of intersection between two lines is that point which lies on both lines; it must therefore satisfy the equations of both lines.
If the point of intersection has coordinates (x,y), then
If we substitute \displaystyle y=0 into the first equation, we obtain
The point of intersection is (-5/3,0).
