| 1. | Therefore the law of sines can also be expressed as:
|
| 2. | The angle of this change can be determined using the law of sines.
|
| 3. | Theorems on the lengths of chords are applications of the law of sines.
|
| 4. | We can then find all the other segments using the law of sines.
|
| 5. | Applying the small angle approximations to the law of sines above results in;
|
| 6. | The law of sines can be generalized to higher dimensions on surfaces with constant curvature.
|
| 7. | In his " On the Sector Figure ", appears the famous law of sines for plane triangles.
|
| 8. | With these functions, one can answer virtually all questions about arbitrary triangles by using the law of sines and the law of cosines.
|
| 9. | The law of sines is useful for computing the lengths of the unknown sides in a triangle if two angles and one side are known.
|
| 10. | The plane law of sines was described in the 13th century by Nas + �r al-D + �n al-Tk�s + �.
|
