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integrallar. Chegaralanmagan funksiyalarning xosmas

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Integrallar

Quyidagi funksiyalarning o’rta qiymatlari aniqlansin

integrallar. Chegaralanmagan funksiyalarning xosmas
itegrallari. Xosmas integrallarning yaqinlashish
alomatlari.

§9.5. Xosmas integral
10.Integralni ta’rifigi ko’ra
 

b
a
dx
x
f
quyidagi shartlarni qanoatlantirishi zarur:
-
integrallash oralig’i [a,b] kesmada chegaralangan;
-
 
x
f
funksiya [a,b] kesmaning har bir nuqtasida aniqlangan;
Agar yuqoridagi shartlardan birortasi buzilsa, bunday integral xosmas integral deyiladi.
Agar
 
x
f
funksiya x ning



x
a
oraliqdagi barcha qiymatlarida aniqlangan va uzluksiz bo’lsa,
 



b
a
b
dx
x
f
lim
integral
 
x
f
funksiyaning a dan


gacha olingan xosmas integrali deyiladi va
 


0
dx
x
f
kabi
belgilanadi. Ta’rifga ko’ra
 
 






b
a
b
a
dx
x
f
dx
x
f
lim
(9.29)
Boshqa cheksiz intervallar uchun ham xosmas integrallar shunga o’xshash aniqlanadi:
 
 
 












b
c
b
c
a
a
dx
x
f
dx
x
f
dx
x
f
lim
lim
.
Agar ko’rsatilgan limitlar mavjud va chekli bo’lsa, xosmas integrallar yaqinlashuvchi, aks holda uzoqlashuvchi
deyiladi. Ko’p hollarda berilgan xosmas integralning yaqinlashuvchi yoki uzoqlashuvchi ekanligini bilish va uning
qiymatini baholash yetarli bo’ladi.
3)
 
x
f
funksiya [


b
a
,
]


a
b





,
0
kesmada aniqlangan va integrallanuvchi bo’lib, b nuqta
atrofida chegaralanmagan bo’lsa,
b
x

nuqta
 
x
f
funksiyaning maxsus nuqtasi deyiladi
da
 



b
a
dx
x
f
integralning chekli limiti mavjud bo’lsa, bu limit
 
x
f
funksiyaning
a
dan
b
gacha xosmas integrali (2 tur xosmas
integrali) deyiladi va
 
 







b
a
b
a
dx
x
f
dx
x
f
0
lim
(9.30)
kabi belgilanadi. Bu holda (8.30) xosmas integral yaqinlashuvchi, aks holda uzoqlashuvchi deyiladi.
0



11.
Funksiyaning o’rta qiymati. Agar
 
x
f
funksiya [a,b] kesmada integrallanuvchi bo’lsa, u holda, shunday
 
b
a
c
;

nuqta topiladiki,
 
 



b
a
dx
x
f
a
b
c
f
1
bo’ladi.

“A” guruh

Xosmas integralni hisoblang (
agar yaqinlashuvchi bo’lsa
).
9.188
a)



2
2
1
x
dx
b
)


1
2
x
dx
9.189 a)

2
/
0
cos

x
dx
b)


1
x
dx
9.180 a)
;
3
4
3
1
2



x
x
dx
b)


1
x
dx
9.181


1
n
x
dx
9.182



0
dx
e
x
9.183



0
2
dx
xe
x
9.184



1
2
1
x
dx
9.185



1
2
2
1
x
x
dx
9.186



1
2
x
x
dx
9.188



0
2
2
dx
e
x
x
9.188



1
2
1
x
x
dx
9.189
dx
x
arctgx


1
2
9.190





1
2
2
1
x
dx
9.191
a
)



1
1
2
x
dx
b)




6
2
3
2
4
x
dx
9.192
a
)


1
0
4
1
x
dx
b
)




2
1
2
1
x
dx
9.193




2
0
3
2
1
x
dx
9.194





1
1
x
x
dx
9.195





1
4
5
4
1
x
dx
x
9.196





2
2
1
x
x
dx
9.198
dx
x
sh
shx


0
2
9.198



0
x
x
e
e
dx
9.199



2
3
1
x
xdx
9.200





1
4
1
x
dx
9.201






1
3
2
1
2
x
dx
9.202


1
3
ln
dx
x
x
9.203






9
4
2
x
x
dx
9.204



0
sin
xdx
e
x
9.205


0
arctgxdx
9.206




dx
xe
x
2
9.208





dx
e
x
2
9.208


3
0
2
9
x
dx
9.209


5
1
5
x
dx
9.210





0
1
2
1
x
dx
9.211

0
1
ln
xdx

“B” guruh

Xosmas integrallarni hisoblang (
yoki uzoqlashuvchi ekanligini ko’rsatib bering
).

9.212.

1
0
x
dx
9.213.


2
1
x
dx
9.214.

1
0
p
x
dx
9.215.




3
0
2
1
x
dx
9.216.


1
0
2
1
x
dx
9.218.


1
x
dx
9.218.


1
e
x
dx
9.219.


1
p
x
dx
9.220.





2
1
x
dx
9.221.






9
4
2
x
x
dx
9.222.


0
sin
xdx
9.223.

2
/
1
0
ln
x
x
dx
9.224.

2
/
1
0
2
ln
x
x
dx
9.225.


1
ln
2



a
x
x
dx
a
9.226.

2
/
0

ctgxdx
9.228.


0
0




k
dx
e
kx
9.228.
dx
x
arctgx



0
2
1
9.229.





2
2
2
1
x
dx
9.230.



0
3
1
x
dx

“C” guruh

Quyidagi integralni hisoblang.
9.231.










29
3
3
3
/
2
3
/
2
2
,
3
2
2
z
x
dx
x
x
9.232.
2
2
ln
0
1
,
1
z
e
dx
e
x
x




9.233.
z
t
tg
t
dt



2
,
cos
2
3
0

9.234.
t
tgx
t
a
dx



,
sin
1
2
/
0
2
2

Quyidagi funksiyalarning o’rta qiymatlari aniqlansin:
9.235
 

;
0
,
sin
x
y

intervalda 9.236





3
;
0
,

tgx
y
intervalda
9.238
 
e
x
y
;
1
,
ln

intervalda 9.238
 
b
a
x
y
;
,
2

intervalda
9.239
 
1
;
1
,
1
1
2



x
y
intervalda.

JAVOBLAR

9.1
а
)
















1
0
1
0
2
1
0
2
2
2
2
1
2
0
1
1
1
1
2
1
1
x
x
x
x
d
x
xdx
.
в
)


3
/
1
8
2

9.2
72
/
7
9.3


1
16
5
5


9.4
3
2
7
9.5
0
cos


T
9.6
12
9.7


5
1
2
,
0

e
9.8
a
b
b

ln
3
9.9
4
/
1
9.10
2
/

9.11
 
e
lg
2
/
1
1

9.12
e
e

9.13
6
/


9.14
2
9.15
3
/
4
9.16
2
/
3
ln
9.18
3
/
4
ln
2
,
0
9.18
7
/
1
arctg
9.19
5
8
ln
2
1
9.20
6
/

9.21
2
9.22
7
/
2
9.23
3
/
4
9.24
 


2
/
9.25
...
083
,
0

9.26




ctg
ctg




3
4
3
2
3
9.28
1
9.28
3
2

9.29.
6
3
3

9.30
15
5
2
2
5

9.31
9
ln
4
1
9.32
4
20


9.33
3
5

9.34.
2
12
3
1
e
e

9.35
6
2
9.36
4

9.38
7
4
ln
6
1
9.38
5
3
3
2
4
ln
3


9.39
0
9.40
3
8
11

9.41
e
4
9.42
3
2
6
9.43
3
8

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