| 1 |
| a |
| 1 |
| c |
| 2 |
| b |
得b=
| 2ac |
| a+c |
a2+c2−b2=a2+c2−(
| 2ac |
| a+c |
| 4a2c2 |
| (a+c)2 |
| 2ac |
| (a+c)2 |
| 2ac |
| 4ac |
即cosB=
| a2+c2−b2 |
| 2ac |
故B<
| π |
| 2 |
法2:反证法:假设B≥
| π |
| 2 |
则有b>a>0,b>c>0.
则
| 1 |
| b |
| 1 |
| a |
| 1 |
| b |
| 1 |
| c |
可得
| 2 |
| b |
| 1 |
| a |
| 1 |
| c |
假设不成立,原命题正确.
| π |
| 2 |
| 1 |
| a |
| 1 |
| c |
| 2 |
| b |
| 2ac |
| a+c |
| 2ac |
| a+c |
| 4a2c2 |
| (a+c)2 |
| 2ac |
| (a+c)2 |
| 2ac |
| 4ac |
| a2+c2−b2 |
| 2ac |
| π |
| 2 |
| π |
| 2 |
| 1 |
| b |
| 1 |
| a |
| 1 |
| b |
| 1 |
| c |
| 2 |
| b |
| 1 |
| a |
| 1 |
| c |