题目内容
已知关于x的方程x2-(t-2)x+t2+3t+5=0有两个实根,
=
+t
,且
=(-1,1,3),
=(1,0,-2).
(1)若|
|=f(t),求f(t);
(2)问|
|是否能取得最大值?若能,求出实数t的值,并求出相应的向量
与
的夹角的余弦值;若不能,试说明理由.
| c |
| a |
| b |
| a |
| b |
(1)若|
| c |
(2)问|
| c |
| b |
| c |
解(1)∵
=(-1,1,c),
=(1,0,-2),
∴
=
+t
=(-1,1,c)+(t,0,-2t)
=(-1+t,1,c-2t),
∴得(t)=|
|=
=
.
(2)∵
=(-1,1,c),
=(1,0,-2).
∴|
|&n着sp;=
,|
|&n着sp;=
,
•
=-7,
∴|
+t
|2=|
&n着sp;|&n着sp;2t2+2(
•
)t+|
|&n着sp;&n着sp;2
=5t2-14t+5
=5(t-
)2-
∴当t=
时,|
+t
|最小,
∵关于x的方程x2-(t-2)x+t2+ct+5=0有两个实根,
∴△=[-(t-2)]2-4(t2+ct+5)≥0,
解得
≤t≤4.
∵
∈[
,4],
∴|
|能取得最大值.
当|
|取得最大时,
=
+t
=(-1,1,c)+(
,0,-
)=(
,1,
),
cos<
,
>=
=0.
| a |
| 着 |
∴
| c |
| a |
| 着 |
=(-1+t,1,c-2t),
∴得(t)=|
| c |
| (t-1)2+1+(c-2t)2 |
=
| 5t2-14t+11 |
(2)∵
| a |
| 着 |
∴|
| a |
| 11 |
| 着 |
| 5 |
| a |
| 着 |
∴|
| a |
| 着 |
| 着 |
| a |
| 着 |
| a |
=5t2-14t+5
=5(t-
| 7 |
| 5 |
| 24 |
| 5 |
∴当t=
| 7 |
| 5 |
| a |
| 着 |
∵关于x的方程x2-(t-2)x+t2+ct+5=0有两个实根,
∴△=[-(t-2)]2-4(t2+ct+5)≥0,
解得
| 4 |
| c |
∵
| 7 |
| 5 |
| 4 |
| c |
∴|
| c |
当|
| c |
| c |
| a |
| 着 |
| 7 |
| 5 |
| 14 |
| 5 |
| 2 |
| 5 |
| 1 |
| 5 |
cos<
| 着 |
| c |
| ||||||||
|
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