题目内容
设x,y∈R,向量
=(x,1),
=(1,y),
=(2,-4)且
⊥
,
∥
,则|
+
|=______.
| a |
| b |
| c |
| a |
| c |
| b |
| c |
| a |
| b |
∵向量
=(x,1),
=(2,-4),且
⊥
,
∴x×2+1×(-4)=0,解得x=2,得
=(2,1),
又∵
=(1,y),
=(2,-4),且
∥
,
∴1×(-4)=y×2,解得y=-2,得
=(1,-2),
由此可得:
+
=(2+1,1+(-2))=(3,-1)
∴|
+
|=
=
故答案为:
| a |
| c |
| a |
| c |
∴x×2+1×(-4)=0,解得x=2,得
| a |
又∵
| b |
| c |
| b |
| c |
∴1×(-4)=y×2,解得y=-2,得
| b |
由此可得:
| a |
| b |
∴|
| a |
| b |
| 32+(-1)2 |
| 10 |
故答案为:
| 10 |
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相关题目
设x,y∈R,向量
=(x,1),
=(1,y),
=(2,-4),且
⊥
,
∥
,则
+
=( )
| a |
| b |
| c |
| a |
| c |
| b |
| c |
| a |
| b |
| A、(3,3) | ||
| B、(3,-1) | ||
| C、(-1,3) | ||
D、(3,
|