Lösung 4.3:1b
Aus Online Mathematik Brückenkurs 1
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| - | Because the sine value for an angle is equal to the angle's | + | Because the sine value for an angle is equal to the angle's ''y''-coordinate on the unit circle, two angles have the same sine value only if they have the same ''y''-coordinate. Therefore, if we draw in the angle <math>\pi/7</math> on a unit circle, we see that the only angle between <math>\pi/2</math> and <math>\pi</math> which has the same sine value lies in the second quadrant, where the line <math>y = \sin (\pi/7)</math> cuts the unit circle. |
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| - | -coordinate on | + | |
| - | <math> | + | |
| - | on a unit circle, we see that the only angle between | + | |
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| - | <math>\pi </math> | + | |
| - | which has the same sine value lies in the second quadrant, where the line | + | |
| - | <math> | + | |
| - | cuts the unit circle. | + | |
| + | [[Image:4_3_1_b.gif||center]] | ||
| - | + | Because of symmetry, we have that this angle is the reflection of the angle <math>\pi/7</math> in the ''y''-axis, i.e. <math>v = \pi - \pi/7 = 6\pi/7\,</math>. | |
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| - | Because of symmetry, we have that this angle is the reflection of the angle | + | |
| - | <math> | + | |
| - | in the | + | |
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| - | <math>v=\pi - | + | |
Version vom 13:03, 9. Okt. 2008
Because the sine value for an angle is equal to the angle's y-coordinate on the unit circle, two angles have the same sine value only if they have the same y-coordinate. Therefore, if we draw in the angle \displaystyle \pi/7 on a unit circle, we see that the only angle between \displaystyle \pi/2 and \displaystyle \pi which has the same sine value lies in the second quadrant, where the line \displaystyle y = \sin (\pi/7) cuts the unit circle.
Because of symmetry, we have that this angle is the reflection of the angle \displaystyle \pi/7 in the y-axis, i.e. \displaystyle v = \pi - \pi/7 = 6\pi/7\,.
