Lösung 4.4:8b
Aus Online Mathematik Brückenkurs 1
(Unterschied zwischen Versionen)
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| - | Suppose that | + | Suppose that <math>\cos x\ne 0</math>, so that we can divide both sides by <math>\cos x</math> to obtain |
| - | <math>\ | + | |
| - | , so that we can divide both sides by | + | |
| - | <math>\ | + | |
| - | to obtain | + | |
| - | + | {{Displayed math||<math>\frac{\sin x}{\cos x} = \sqrt{3}\qquad\text{i.e.}\qquad \tan x = \sqrt{3}\,\textrm{.}</math>}} | |
| - | <math>\frac{\sin x}{\cos x}=\sqrt{3} | + | |
| - | i.e. | + | |
| - | + | ||
| + | This equation has the solutions <math>x = \pi/3+n\pi</math> for all integers ''n''. | ||
| - | + | If, on the other hand, <math>\cos x=0</math>, then <math>\sin x = \pm 1</math> (draw a unit circle) and the equation cannot have such a solution. | |
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| - | + | ||
| - | + | ||
| - | + | ||
| - | If, on the other hand, | + | |
| - | <math>\ | + | |
| - | <math>\ | + | |
| - | ( draw a unit circle) and the equation cannot have such a solution. | + | |
Thus, the equation has the solutions | Thus, the equation has the solutions | ||
| - | + | {{Displayed math||<math>x = \frac{\pi}{3}+n\pi\qquad</math>(''n'' is an arbitrary integer).}} | |
| - | <math>x=\frac{\pi }{3}+n\pi </math> | + | |
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| - | an arbitrary integer). | + | |
Version vom 08:15, 14. Okt. 2008
Suppose that \displaystyle \cos x\ne 0, so that we can divide both sides by \displaystyle \cos x to obtain
This equation has the solutions \displaystyle x = \pi/3+n\pi for all integers n.
If, on the other hand, \displaystyle \cos x=0, then \displaystyle \sin x = \pm 1 (draw a unit circle) and the equation cannot have such a solution.
Thus, the equation has the solutions
