题目内容
在△ABC所在平面内有一点O,满足2
+
+
=
,|
|=|
|=|
|=1,则
•
等于( )
| OA |
| AB |
| AC |
| 0 |
| OA |
| OB |
| AB |
| CA |
| CB |
A.
| B.
| C.3 | D.
|
∵2
+
+
=
,|
|=|
|=|
|=1,
∴
+
+
+
=
,
∴
=-
,
∴O,B,C共线,BC为圆的直径,如图
∴AB⊥AC.
∵|
|=|
|,
∴|
|=|
|=1,|BC|=2,|AC|=
,故∠ACB=
.
则
•
=|
||
|cos30°=2
×
=3,
故选C.
| OA |
| AB |
| AC |
| 0 |
| OA |
| OB |
| AB |
∴
| OA |
| AB |
| OA |
| AC |
| 0 |
∴
| OB |
| OC |
∴O,B,C共线,BC为圆的直径,如图
∴AB⊥AC.
∵|
| OA |
| AB |
∴|
| OA |
| AB |
| 3 |
| π |
| 6 |
则
| CA |
| CB |
| CA |
| CB |
| 3 |
| ||
| 2 |
故选C.
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|=|
|=|
|,
+
+
=
,
•
=
•
=
•
,则点O、N、P依次为△ABC的( )
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| OB |
| OC |
| NA |
| NB |
| NC |
| 0 |
| PA |
| PB |
| PB |
| PC |
| PC |
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