Lösung 4.4:1d
Aus Online Mathematik Brückenkurs 1
(Unterschied zwischen Versionen)
K |
|||
| Zeile 1: | Zeile 1: | ||
| - | Because | + | Because <math>\tan v = \frac{\sin v}{\cos v}</math>, the condition <math>\tan v = 1</math> gives <math>\sin v = \cos v</math>, i.e. we look for angles in the unit circle whose ''x''- and ''y''-coordinates are equal. |
| - | <math>\tan v=\frac{\sin v}{\cos v}</math>, the condition | + | |
| - | <math>\ | + | |
| - | gives | + | |
| - | <math>\ | + | |
| - | + | ||
| - | - and | + | |
| - | + | ||
| - | -coordinates are equal. | + | |
| - | + | ||
| - | + | ||
| - | + | ||
| - | + | ||
| - | + | ||
| - | + | ||
| - | + | ||
| + | After drawing the unit circle and the line y=x, we see that there are two angles which satisfy these conditions, <math>v=\pi/4</math> and <math>v = \pi + \pi/4 = 5\pi/4\,</math>. | ||
[[Image:4_4_1_d.gif|center]] | [[Image:4_4_1_d.gif|center]] | ||
Version vom 13:16, 10. Okt. 2008
Because \displaystyle \tan v = \frac{\sin v}{\cos v}, the condition \displaystyle \tan v = 1 gives \displaystyle \sin v = \cos v, i.e. we look for angles in the unit circle whose x- and y-coordinates are equal.
After drawing the unit circle and the line y=x, we see that there are two angles which satisfy these conditions, \displaystyle v=\pi/4 and \displaystyle v = \pi + \pi/4 = 5\pi/4\,.
