山东省德州、滨州市2022-2023学年高三下学期一模数学试题答案

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高三数学答案(第 1 页,共 7 页)
2023 年高考诊断性测试
数学参考答案及评分标准
一、选择题
A C B B A D B C
二、选择题
9.AC 10.ACD 11. ABD 12.ABD
三、填空题
11.
60
12.
43
75
13.
2 1 0xy  
14.
5
148
5
四、解答题
17.解:1)设数列
 
n
a
的公比为
q
因为
1 3 2
3 , ,5a a a
成等差数列,
所以
······································································ 1
2
3 5 2qq
解得
3q
1
2
q
因为
 
n
a
各项均为正数,所以
0q
,所以
3q
. ····································· 2
43
55Sa
,得
 
4
121
315 5 3
31
aa
 
解得
11a
. ··························· 4
所以
11
133
nn
n
aa


. ········································································· 5
2)由(1)知
1
3n
n
bn

. ·································································· 6
0 1 2 1
1 3 2 3 3 3 3n
n
Tn
 
所以
1 2 3
3 1 3 2 3 3 3 3n
n
Tn 
··········································· 7
两式相减可得
0 1 1
2 3 3 3 3
nn
n
Tn
 
······································· 8
13 3
13
nn
n
 
整理可得
2 1 1
3
44
n
n
n
T
 
. ······························································· 10
18.解:1)因为
2 cosc b A b
,由正弦定理得
sin 2sin cos sinC B A B
. ··· 2
πA B C 
所以
高三数学答案(第 2 页,共 7 页)
   A B B A A B A B A B Bsin( ) 2sin cos sin cos cos sin sin( ) sin
. ···· 4
因为
ABC
为锐角三角形,所以
AB
22
(0, ), (0, )
ππ
 AB 22
( , )
ππ
yxsin
22
( , )
ππ
上单调递增,所
A B B
,即
AB2
. ··············· 6
2)由(1)可知,
AB2
,所以在
ABD
中,
 ABC BAD
由正弦定理得:

B B B
AD AB
2 ) sin2πsin sin(
2
所以
B
AD BD cos
1
所以
 
B
S AB AD B B
B
ABD 2 cos
sin tan
1 sin
. ···································· 9
又因为
ABC
为锐角三角形所以
B2
0π
B2
02 π
  B2
3π0π
解得
B
64
ππ
··············································································· 11
所以
B3
tan ( ,1)
3
,即
ABD
面积的取值范围
3
( ,1)
3
. ······················· 12
19.解:1Logistic 非线性回归模型
yu
a bt
1e
拟合效果更好. ····················· 1
从散点图看,点更均匀地分布在该模型拟合曲线附近;从残差图看,模型下的残
差更均匀地集中在以残差
0
的直线为对称轴的水平带状区域内. ···················· 3
2)将
yu
a bt
1e
两边取对数得
 
ya bt
u
ln( 1)
, ··································· 5
 

tt
b
w w t t
ii
iii
() 665 0.208
ˆ138.32
( )( )
1
2
20
1
20
,
b0.208
ˆ
, ····················· 7
  a w b t( ) 1.608 0.208 10.5 0.576
ˆˆ
. ···································· 9
高三数学答案(第 3 页,共 7 页)
z
y
x
E
O
A
B
C
D
V
所以
y
关于
t
的经验回归方程
0.576 0.208
12.5
1e t
y
. ·································· 10
22t
体长
0.576 0.208 22 4
12.5 12.5 12.28
1 e 1 e
y 
 

mm. ························· 12
20. 解:1)证明:
BC
中点
E
连接
,,BD DE VE
因为
ABCD
为菱形,且
60BAD
所以
BCD
为等边三角形,
DE BC
.···· 1
又在等边三角形
VBC
中,
VE BC
······· 2
DE VE E
,所以
BC
DEV
. ·········· 4
VD
DEV
,所以
BC VD
············· 5
2)由
VE BC
DE BC
,可得
DEV
就是二面角
A BC V
的平面角,
所以
60DEV
·········································································· 6
DEV
中,
3VE DE
所以
DEV
为边长为
3
的等边三角形,
由(1)可知,面
DEV
底面
ABCD
,取
DE
中点
O
O
为坐标原点
,,DA OE OV
所在的方向为
,,x y z
轴的正向,建立空间直角坐标系
O xyz
···· 7
VOE
中,
33
,
22
OE OV
可得
3
(2, ,0)
2
A
3
(1, ,0)
2
B
3
( 1, ,0)
2
C
3
(0,0, )
2
V
,故
(2,0,0)CB
33
(1, , )
22
CV 
33
( 2, , )
22
AV 
. ········· 8
( , , )x y zn
为平面
VBC
的一个法向量,则有
20
330
22
x
x y z
 
,令
3y
,则
1z
,得
(0, 3,1)n
················· 10
设直线
VA
与平面
VBC
所成角为
则有
| | 3 3 7
sin | cos , | 14
27
| || |
AV
AV AV
 
n
nn
故直线
VA
与平面
VBC
所成角的正弦值为
37
14
. ······································ 12
山东省德州、滨州市2022-2023学年高三下学期一模数学试题答案.pdf

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