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Математика

23.6-teorema. (Puasson teoremasi).

7- §. Puasson teoremasi

Biz yuqorida o`rgangan Bernulli sxemasida

ta erkli tajribada

hodisaning

marta ro`y

berishi ehtimoli Bernulli formulasi bilan hisoblanishini ko`rdik. Bernulli formulasini keltirib chiqarishda

A

hodisaning har bir tajribada ro`y berish ehtimoli o`zgarmas va u

ga teng bo`lsin deb olindi (0 < r <

1].

Ko`pgina masalalarda hodisaning ro`y berish ehtimoli

tajribalar soni

ga bog`liq bo`lib,

ning

ortib borishi bilan

r

ning kamayib borishiga bog`langan bo`ladi. Bunday holda Bernulli sxemasi uchun

kuyidagi teorema o`rinli bo`ladi.

23.6-teorema. (Puasson teoremasi).

Agar Bernulli sxemasida n

→∞

→

0

va

pr

→λ

(

λ

>0)

bo`lsa, u holda

→∞

da ushbu munosabat o`rinli bo`ladi:

( )

−

→

e

k

k

Р

k

n

yoki

( )

−

≈

e

k

k

Р

k

n

(23.16)

Bu taqribiy formulani Puasson formulasi deyiladi.

Isbot.

Ma`lumki,

ta o`zaro erkli tajribada

hodisaning

marta ro`y berish ehtimoli

( )

(

)

k

n

k

k

n

n

р

р

C

k

Р

−

bo`ladi, bunda

(

)

!

k

n

k

n

С

k

n

−

. Keyingi tenglikni quyidagicha yozib olamiz:

(

)

(

)(

)

(

)

(

) (

)

...













−











 −











 −













−











 −











 −

⋅

−

⋅

−

⋅

−

n

k

n

n

k

n

k

n

k

n

n

n

n

n

n

k

k

n

n

n

k

n

k

n

k

n

k

n

k

n

k

n

С

k

k

n

Bu tenglikdan esa













−











 −











 −

=

n

k

n

n

С

n

k

k

n

k

...

(23.17)

bo`lishi kelib chiqadi.

Endi

(

)

≥

≤

≤

n

n

k

a

k

sonlar uchun o`rinli bo`lgan ushbu

(

)(

) (

)

(

)

n

n

a

a

a

a

a

a

−

≥

−

...

sodda tengsizlikdan foydalanib topamiz.

...













−

≥













−











 −











 −

n

k

n

n

n

k

n

n

Ravshanki,

(

)

(

)

(

)

(

)

...

1

n

k

k

k

k

n

k

n

n

k

n

n

−

Demak,

(

)

...

1

n

k

k

n

k

n

n

−

≥













−











 −











 −

(23.18)

Natijada (23.17), (23.18) munosabatlardan

(

)

n

k

k

С

n

k

k

n

k

−

≥

bo`lishi kelib chiqadi. Agar

≤

k

n

k

С

n

k

ekanligini e`tiborga olsak, u holda

(

)

1

≤

−

−

k

n

k

С

n

k

n

k

k

bo`lishini, ya`ni

(

)

!

k

n

С

n

k

k

k

n

k

k

n

k

≤













−

bo`lishini topamiz. Bu tengsizlikni

(

)

k

n

k

p

p

−

ga ko`paytirsak, unda quyidagi tengsizliklar

hosil bo`ladi:

(

)

(

)

(

)

(

)

k

n

k

k

k

n

k

k

n

k

n

k

k

p

р

k

n

p

р

С

p

р

k

n

n

k

k

−

≤

−

≤

−













−

Demak

(

)

(

)

( )

(

)

1

k

n

k

k

n

k

n

k

k

p

р

k

n

k

P

p

р

k

n

n

k

k

−

≤

−













−

(23.19)

Endi shu tengsizlikda qatnashuvchi

(

)

k

n

k

k

p

p

k

n

−

ifodani quyidagicha

yozamiz:

(

)

( ) ( ) ( )

( ) ( )

np

np

n

k

k

n

k

k

n

k

k

k

n

k

k

n

np

p

k

np

n

np

p

k

np

p

p

k

np

p

p

k

n

−























 −

−











 −

−

Agar

→∞

→λ

,

(

)

(

)

(

)

→

−

→

−

p

p

n

k

k

k

( ) ( )

−

→























 −

−

e

k

n

np

p

k

np

k

np

np

n

k

k

bo`lishini e`tiborga olsak, unda (23.19) munosabatdan

( )

(

)

−

→

−

e

k

р

р

C

k

Р

k

k

n

k

k

n

n

bo`lishini topamiz. Teorema isbotlandi.

Puasson formulasi tajribalar soni etarlicha katta bo`lib, har bir tajribada

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