"Q
=SDyú
? [?�
?Ds� [?T
�Z?�
??c�?
??±s�
B �a 'à
Q �
1.
!f
?
¥
#×
=μ?l
?
K )(xfy =
0
x
0
0
()(
lim
0 xx
xfxf
xx
?
?
→
i
5?f
?
? ) V?i??
K1
? )¥?
?:T �b' f
0
x f
0
x )('
0
xf
0
0
0
()(
lim)('
0 xx
xfxf
xf
xx
?
?
=
→
?
?
K?i
5?
? )? V?�b f
0
x
2.
!f
?
? ¥
·
#×)(xfy =
0
x ),(
00
δ+xx
μ?l
?·
K
x
xfxxf
x
y
xx
?
??+
=
?
?
++
→→
00
00
()(
limlim
00
δ<?< x0
i
5??
K1
? ¥·?
?:T �b f
0
x )('
0
xf
+
P?
?
x
y
xf
x
?
?
=
?
→
?
0
0
0
lim)(' �b
P�a·?
?d?1?§?
?�b
3. f
? ?l
?()xff =
0
x ¥
#×
=�b?ó
0
()ux
0
x B?9
x?
0
()
0
x xUx+? ∈
H M?1¤?f
?¥9
1
0
()(yfx x fx
0
)? =+?? �b
?Ti
è
? A
P¤
?μ y?
()yAxox?=?+ ?
1
5?f
?
?f
0
x V±i?
1?·
?B[ Ax? 1
?f
0
x ¥±s:T
0
xx
dy A x
=
=? or
0
()
xx
df x A x
=
= ?
= �a '? ? �
1.
?f
?
? V?5
? ??�b f
0
x f
0
x
- 1 -
"Q
=SDyú
? [?�
?Ds� [?T
�Z?�
2.
?f
?
? ¥
#×
=μ?l 5 i
)(xfy =
0
x )('
0
xf ? )('
0
xf
+
?
i
O = �b
)('
0
xf
?
)('
0
xf
+
)('
0
xf
?
3.
? �a
? V? 5f
?)(xu )(xv
0
x )()()( xvxuxf ±=
? V?
O
'
0
x
)(')(')('
000
xvxuxf ±= )(')(')())'()((
000
xvxuxxvxu mm = �b
4.
? �a
? V? 5f
?)(xu )(xv
0
x )()()( xvxuxf =
? V?
O
'
0
x
)(')()()(')('
00000
xvxuxvxuxf += )(')()()(')())'()((
00000
xvxuxvxuxxvxu += �b
5.
?f
?
? ? V?
O)(xu )(xv
0
x 0)(
0
≠xv 5
)(
)(
)(
xv
xu
xf =
? 9 V?
O
0
x
2
0
0000
00
))((
)(')()()('
)()'
)(
)(
()('
xv
xvxuxvxu
x
xv
xu
xf
?
== �b
6.
! 1)(xfy = )(yx ?= ¥Q f
?
? )(y?
? ¥
#×
= ??? ì??
O
0
y
0)('
0
≠y? 5
?
)(xf
0
x )(
00
yx ?= V?
O
)('
1
)('
0
0
y
xf
?
= �b
7.
! )(xu ?=
? V?
0
x )(ufy =
? )(
00
xu ?= V? 5ˉ?f
? ?ofy =
? V?
O
0
x )('))((')(')(')()'(
00000
xxfxufxf ???? ==o �b
8. f
?
?f
0
x V±
?? f
0
x V?7
O
0
()Afx′= �b
? �a '1
p �
1.
' Y ?3 ?
?¥à
Q
?
?Vr
?l
ü
?
L=
?iót ?�a +?3
d
?V?l?
p
tf
?¥?
? ???
?D?f
?¥Mo ó"?
uY
ü
??
?D?§
?
?�a V?D ??¥1"
? ?¨?
?à
Q3 %Bt
#f
?M?
q¥
L=?¨18 ?
p
wL
B?)¥
MLZ?�b
2.
?
�g? ?
?¥
15
?E 5 ˉ?f
?¥
p?E 5 ?
pQ f
? ¥?
? i
?
:' ? f
??
?
T¥ $
8? ¨? tE5 DZ E
?
�
? 1
p ? f
?¥ ?
?�b
3. ?
p??
?Z?
?ó¥f
?¥?
?i?iD
?E5¥8??¨�b
4. g?ú¨ ?
?D ú¨ ±s¥ ?l ?
p ú¨ ?
?D ú¨ ±s�b
??
? ?3 ? ¨ B
- 2 -
"Q
=SDyú
? [?�
?Ds� [?T
�Z?�
¨±s¥?
T?M?iDú¨±s
b#1F[
us�b
5.
b#1 ? 3f
?
B ?¥± s¥ ?l ió
+ ?3
d
? V? l?
p
t e
?f
?¥±s�a
?
?
�¨'±sV?±s
?
T
p?f
?¥±s�b
6.
ü
?f
?
B? V? ?DB ? V ±-W ¥B á? i? ?¨?
?1 ±s�a ?¨ ± s
p?
?�b??¨±s¥
L=il3 %
t9
?ù5�b
1 �a? ? è5 �
è 1.�
!f
? ( )xf ?l
uW ( )ba,
=�
� ( )bax ,
0
∈
k£
ü�� ( )xf
? V?¥
1Hq
^i
=¥f
?
?G ?? ? ���
P
0
x
(ba, ) ()xf
?
f
0
x ( )xf
?
? ??
O
a?Hq �
0
x
��������������� ( )()( )( ),
00
xfxxxfxf
?
?=? � ( ).,bax∈ �
iμ ������() ().0
'
fxf =
?
£
ü �
! i
�
��?l�)? ()xf
'
������������� ()
() ( )
()
?
?
?
?
?
?
?
?
?
=
?
0
'
0
0
xf
xx
xfxf
xf �������
0
0
xx
xx
=
≠
�
�
�
^£f
?
? ??�
��()xf
?
0
x ( ) ( ) ( ) ( ),
00
xfxxxfxf
?
?=? �
O ( )(
0
'
xfxf =
?
)
�
)? ��
! () ( ) ( ) ( ),
00
xfxxxfxf
?
?=?
�
��? ( )xf
?
? ??���5 μ �
0
x
������ ()
() ( )
() ( )
0
0
0
0
'
00
limlim xfxf
xx
xfxf
xf
xxxx
??
→→
==
?
?
= .�
' i
O()xf
'
( )=xf
'
()xf
?
��
- 3 -
"Q
=SDyú
? [?�
?Ds� [?T
�Z?�
è 2��
!
^
}f
?
O
?()xf 0=x V?�
��5 ( ) 00
'
=f ��
£
ü �
()
() () ( ) ( ) ( ) ( )
()0
0
lim
0
lim
0
lim0
'
000
'
?
→→
=
→
+
?=
?
?=
?
??
====
?
=
+?+
f
t
ftf
t
ftf
x
fxf
f
tt
xt
x
�
�
�
���' ����() ()00
''
?+
?= ff
? i
()0
'
f () () ( ) ( ) ( ) ( ) .00,00,000
''''''
=?=?==?
?+
ffffff
��
è 3�� ()
?
?
?
?
?
?
=
?
0
2
1
x
e
xf
?
�������
0
0
=
≠
x
x
���
p
( )
( ).0
n
f
��
3 :�� () .0limlim0
2
2
0
1
1
0
'
======
→
=
?
→
t
x
x
t
x
x
e
t
x
e
f �
()
?
?
?
?
?
?
?
=∴
?
0
2 2
1
3
x
e
x
xf
����
��
0
0
=
≠
x
x
!
()
()
?
?
?
?
?
?
?
?
?
?
?
?
?
?
?
=
?
0
12 2
1
3
x
n
e
x
P
x
xf � �
�
?
0
0
=
≠
x
x
?
?
?
?
?
?
x
P
1
1
x
1
¥ [
T��?i?
????
?
0lim, =
+∞→
t
m
t
e
t
m 5μ�
�����������
()
() .0
11
lim0
2
1
0
1
=
?
?
?
?
?
?
=
?
→
+
x
x
n
e
x
P
x
f ��
- 4 -
"Q
=SDyú
? [?�
?Ds� [?T
�Z?�
�
��μ ��,n?
()
() 0.0 =
n
f
è 4��£ f
?
?@±sZ?�xy arcsin=
������������( )
()
()
( ) ( )
.0121
2122
=?+??
++ nnn
ynxynyx
��
( ).3≥n �
iGN
p �
()
()0
n
y
3 :�� .11,
1
1
'2
2
'
=?
?
= yx
x
y ��
p ? ,0
1
1
2
'
'2
=
?
???
x
xy
yx
�
'
( ) .01
'"2
=?? xyyx �N
T
p ¨?
?�
�� ?¨ �-�F�J�C�O�J�[
T�
��μ �n
�����������( )
()
()
( )
( )
( ) ( ) n
n
nn
n
n
n
n
yCxyyCyxCyx
1121122
221 ???+?+?
+++ ()
�����������
( )
()
()
( ) ( )
.0121
2122
=?+??=
++ nnn
ynxynyx �
Vnf
?
?@
?·Z?�
T?
7xy arcsin= 0=x ¤?w
T
( )(
.
22 nn
yny =
+ )
�
?i? ? �
��üμ�() 00
"
=y () .10
'
=y
kn 2=
H�
��
( )
() ;00 =
n
y �
12 += kn
H�
�
()
() ( )( ) ( ) ( )[ ] .!!1201332120
2
'2222
?=????= kfkky
n
L ��
è 5��¨
?
p?E
p
( )( )
()()43
21
??
??
=
xx
xx
y ¥?
?�b�
3 ��5
H
|
?
L? ¤�4>x
1
ln [ln( 1) ln( 2) ln( 3) ln( 4)]
2
yx x x x= ?+?????
�b�
T
p?i?i?x y
^ ¥f
?¤�x
111111
()
21234
y
yxxxx
′=+??
? ???
- 5 -
"Q
=SDyú
? [?�
?Ds� [?T
�Z?�
?
^
?
?
?
?
?
?
?
?
?
?
?
+
?
=
4
1
3
1
2
1
1
1
2
'
xxxx
y
y �
6?�
?
H1<x
()( )
()()xx
xx
y
??
??
=
43
21
�
�����?
H32 << x
( )( )
()()xx
xx
y
??
??
=
43
21
�b�
¨]"¥ZE V¤?D
?M]¥2T�b�
#
?
?
?
?
?
?
?
?
?
?
?
+
?
=
4
1
3
1
2
1
1
1
2
'
xxxx
y
y �b�
è 6��9
? ??L¥?
?Z?�
(sin)
(1 cos )
x at t
ya t
=?
?
?
=?
?
?
??¥f
?¥=¨?
?�b�
3 �
() 2cos1
sin
cos
sin t
ctg
t
t
taa
ta
dt
dx
dt
dy
dx
dy
=
?
=
?
== ����
nnt ,2 π≠ 1?
?�
2
2
1
()() ()
22
dy d dy d t dt d t
ctg ctg
dx
dx dt dx dt dx dt
dt
== =
�����
2
2
11 1
(1 cos ) (1 cos )
2sin
2
t
atat
=? ? =?
??
(2tn≠π)
è 7��
p? Z?
??¥?c
?0=?+ exye
y
( )xyy = ¥=¨?
?�b�
3 ��Z?
H
p?¤
? ú
^ ¥f
?
^ ¥ˉ?f
? �x y x
y
e x
0
''
=++? xyyye
y
3¤�
y
ex
y
y
+
?=
'
�b�
( )(
()
)
2
''
"
1
y
yy
ex
yeyexy
y
+
+?+
?=∴
'
y
^¥f
?�
������
2
3
()
y
y
ye
x e
=?
+
?i
p
''
y
H9 V
Z?�
0
y
eyyxy′′?++ =
H
p?3x
''
y |
'
y ¥Vr
T}
??e'¤
''
y
?¤2TD
-E?
?
^M]¥�b �
- 6 -
"Q
=SDyú
? [?�
?Ds� [?T
�Z?�
?�aˉ
5 �
1
p
?tL
2
yx=
??(1,1)A (2,4)B ? ?¥
MLZ??ELZ?
2
!
2
,3
()
,3
xx
fx
ax b x
? ≥
=
?
+ <
?
,
k
?? ¥′
P
) V? ,ab ()fx 3x =
3
p/
f
?¥?f
? .
1
3
()fx x=
2
10
()
xx
fx
x
+ , ≥
?
=
?
,
; , <
?
4
!f
?
1
sin , 0
()
0,
m
xx
fx
x
x
?
≠
?
=
?
?
=
?
0
m1??
?
kù
1 m???′
H
()fx 0x = ??
2 m?? ?′
H
()fx 0x = V?
3 m?? ?′
H
'( )fx 0x = ??
5
! (0) '(0) 0gg==
1
()sin 0,
()
00
gx x
fx
x
x
?
.
, ≠
?
=
?
?
, =
?
p '(0)f
6£
ü
?
0
'( )f x i
5
00
0
0
()()
lim '( )
2
x
fx x fx x
f x
x
?→
+?? ??
=
?
7
!
^?l
¥f
?
O
?i()fx (,) ?∞+∞
12
,(,xx
)∈ ?∞+∞μ
12 1 2
()()()f x x fx fx+ = .
? £
ü
?i μ'(0) 1f = (,)x∈ ?∞ +∞ '( ) ( )fx fx=
8
!
^
}f
?
O i
£
ü ()fx '(0)f '(0) 0f =
- 7 -
"Q
=SDyú
? [?�
?Ds� [?T
�Z?�
9
!
^
f
?
O()fx
0
'( ) 3fx=
p
0
'( )f x? .
10¨?l £
ü V?¥
}f
?¥?f
?
^
f
? V?¥
f
?¥?f
?
^
}f
?
11
p/
ˉ?f
?¥?f
?
1
22 2
()yxa x a x=+ ?
2
2
22
x
y
ax
=
?
3 ln(ln )yx=
4
1
ln
2
ax
y
ax
+
=
?
5
22
ln( )yxax=++
6 ln tan
2
x
y =
12
!
^ V?¥f
?
p()fx x
dy
dx
1
2
()yfx=
2
()
()
xfx
yfee=
3 ((())yfffx=
13
! ()x? ? ()xψ
^ V
p?¥f
?
px
dy
dx
1
22
() ()yx?ψ= + x
2
()
arctan ( ( ) 0)
()
x
yx
x
?
ψ
ψ
= ≠
3
()
() ( () 0, () 0)
x
yxxx
?
ψψ?= > ≠
4
()
log () ( () 0, () 0, () )
x
y x xxx
?
ψ ψ??= > > ≠1
14
!f
?
? =¨ V?
O()yfx= x '( ) 0fx≠
? i
Qf
?()fx
1
()x fy
?
=
k
p
1
) ''( )f y
?
(
15
! £
ü y
?@Z?
12
sin cosyc xc x=+ '' 0yy+ =
- 8 -
"Q
=SDyú
? [?�
?Ds� [?T
�Z?�
16
! arctanyx=
1£
ü y
?@Z?
2
(1 ) '' 2 ' 0xy xy++=
2
p
()
(0)
n
y
17
! i
Qf
?
O
?@Z? ()yyx=
2
3
2
() 0
dy dy
dxdx
+=
£
ü Qf
? ()x xy=
?@
2
2
1
dx
dy
= i
O?N
pB? ()yyx= .
18£
ü
wL
(cos sin )
(sin cos )
x attt
ya tt t
=+
?
?
=?
?
?B?¥EL?e?¥ ???? a
19
?
2
1
,0
()
0, 0
x
ex
fx
x
??
?
≠
=
?
?
=
?
£
ü
()
(0) 0
n
f =
- 9 -
| 课件名称: | 数学分析习题集锦(二) |
| 课件分类: | 数学 |
| 课件类型: | 试卷习题 |
| 文件大小: | 20.04MB |
| 下载次数: | 0 |
| 评论次数: | 0 |
| 用户评分: | 0 |
- 7. 数学分析习题集锦(二):ch15
- 8. 数学分析习题集锦(二):ch16-17
- 9. 数学分析习题集锦(二):ch18
- 10. 数学分析习题集锦(二):ch19
- 11. 数学分析习题集锦(二):ch20
- 12. 数学分析习题集锦(二):ch21
- 13. 数学分析习题集锦(二):ch22
- 14. 数学分析习题集锦(二):ch3
- 15. 数学分析习题集锦(二):ch4
- 16. 数学分析习题集锦(二):ch5
- 17. 数学分析习题集锦(二):ch6
- 18. 数学分析习题集锦(二):ch7
- 19. 数学分析习题集锦(二):ch8
- 20. 数学分析习题集锦(二):ch9
- 21. 数学分析习题集锦(二):chapter006
- 22. 数学分析习题集锦(二):chapter008
- 23. 数学分析习题集锦(二):chapter009
- 24. 数学分析习题集锦(二):chapter011
- 25. 数学分析习题集锦(二):chapter015