题目内容
向量
=(3,2),
=(-1,2),
=(4,1):
(1)求满足
=m
+n
的实数m,n;
(2)若(
+k
)∥(2
-
),求实数k.
| a |
| b |
| c |
(1)求满足
| a |
| b |
| c |
(2)若(
| a |
| c |
| b |
| a |
(1)由题意得,m
+n
=m(-1,2)+n(4,1)=(-m+4n,2m+n),
∵
=m
+n
,∴(3,2)=(-m+4n,2m+n),
即
,解得m=
,n=
,
(2)由题意得,
+k
=(3,2)+k(4,1)=(3+4k,2+k),
2
-
=2(-1,2)-(3,2)=(-5,2),
∵(
+k
)∥(2
-
),
∴2(3+4k)+5(2+k)=0,解得k=-
.
| b |
| c |
∵
| a |
| b |
| c |
即
|
| 5 |
| 9 |
| 8 |
| 9 |
(2)由题意得,
| a |
| c |
2
| b |
| a |
∵(
| a |
| c |
| b |
| a |
∴2(3+4k)+5(2+k)=0,解得k=-
| 16 |
| 13 |
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