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111matematika togarak konspekti 10 11 si

(кх+ЬГ¹ , _ck(n +1)

,k ^ 0 kx +1	— ln\|A:x + b\ + C k
e^; кфО	-е^ы+ъ +C к
sin(kx+b); к Ф0	- cos(A:x + b) + C
cos(x+b); к Ф0	- — sin (kx+b) + C k

1. d	X
1. d	a + 1
	a + 1
2. d	a^x
	~~£na~~

= x^adx ia Ф -1).

6. J(^_c°sx) = sin dx

7. ditgx)

5—
COS Jf

a^xdx ia >0, a ^ 1) .

с?(^и|л:|) = — dx (л: Ф 0) .

d{e^x)=e^xdx
J(sinx) = cosxdx

8. d(-ctgx) =

sin² jf

dx

~~9. d~~(arcs in ~~x) = d{-~~ arccos ~~x) =~~

4\~.

- dx

10. d(arctgx) = d(-arcctgx) =

1 + x

-dx

Agar ~~F(x) =~~ /(A')boMsa, ~~dF(x) = F'(x)dx,~~ ya’ni ~~dF{x) =~~ /(x)~~F(x) + C =~~ J/~~(x)dx~~ yoki J/~~(x)dx =F(x) + C~~ ekani kelib chiqadi.
Bu formuladan va differensiallar jadvalidan foydalanib, aniqmas integralar jadvalini tuzamiz:

xⁿ⁺¹ a^x
1. \xⁿ~~dx =~~ 2. \a^x~~dx =~~ hC,a^l;a>-0
j И -1-1 J 1 v\ n

n + 1
3. j"—~~dx =~~ 1п|х| + ~~C,x~~ Ф- 0;
A*
5. j"cos~~xdx~~ = sinx + C;

7.

/ /

COS² Jf

dx = tgx + C

In a
3. $e^xdx = e^x +C;
6. Jsinjftix: = -cosx + C;
r 1
8. —-—dx = -ctgx + C;
J cin ²

sin² JC

~~-dx~~ = arcsin jc + C = -arccos jc + C

; io. j-L

^J 1 + Л

- б/л' = arctgx + C = -arcctgx + C .

Ayrim hollarda J/~~(x)dx~~ aniqmas integraini hisoblashda ishni osonlashtirish maqsadida
o'zgaruvchini almashtirish usuli qo'llaniladi. Faraz qilaylik, x=cp(t) differensiallanuvchi funksiya bo'lsin. U holdaj/(x)
formulani aniqmas integralda o'zgaruvchini almashtirish formulasi deyiladi. Bu usul bilan integral hisoblanganda hisoblash oxirida yana oldingi o'zgaruv-chiga o'tiladi. Buning uchun x=cp(t) funksiyaning teskari funksiyasi mavjud bo'-lishi kerak. Aniqmas integralda bo'laklab integrallash usuli quyidagi formulaga asoslangan. Ma'lumki, ~~u(x)~~ va v(3cjdifferensiallanuvchi funksiyalar bo'lsa,
~~d(uv) = udv + vdu~~ formula o'rinli bo'ladi. Bundan: ~~udv dfnvj-vdu~~ ni olamiz. Bu tenglikning har ikkala tomonini integrallab va aniqmas integralning xossasidan foy dal anib, J ~~udv = uv~~ - j ~~vdu~~ (1) formulani hosil qilamiz. Bu formula aniqmas integralda
bo'laklab integrallash formulasi deyiladi.

Mustahkamlash. Savollar:

Aniqmas integral deb nimaga aytiladi?
Integral ostidagi ifoda deb nimaga aytiladi?
Aniqmas integralda o’zgaruvchini almashtirish formulasini tushuntirib bering.
Bo’laklab integrallash formulasini tushuntirib bering

Darsni yakunlash.
Uyga vazifa: test yechish tematik axborotnomalardan

Tayyorladi:
Tekshirdi: O’TIBDCf :

“ ” 20 y.

Sana:

~~mas hs‘ulot~~

Dars mavzusi. Egri chiziqli trapetsiyaning yuzi. Aniq integral. Nyuton-Leybnis formulasi.
Dars maqsadlari: o‘quvchilarga egri chiziqli trapetsiyaning yuzi,aniq integral Nyuton- leybnis formulasini o‘rgatish, ularning fanga qiziqishlarini oshirish.
Darsning borishi:

Tashkiliy qism.
Egri chiziqli trapetsiyaning yuzi. Aniq integral. Nyuton-Leybnis formulasi.

~~[a; b\~~ kesmada uzluksiz va musbat bo'lgan f(h) funksiya grafigi, Ox o’q, hamda ~~h = a, h = b~~ to'g'ri chiziqlar kesmalari bilan chegaralangan figura ~~egri chivqli tra-petsiya~~ deb ataladi. ~~aABb~~ egri chiziqli trapetsiya yuzini hisoblash masalasini qaraymiz. ~~[a; b]~~ kesmada integrallanuvchi у ~~=f(h)~~ funksiyani qaraymiz. Agar hc[a;&]b o'lsa, u holda ~~f(h)~~ funksiya ~~\a\ b\~~ kesmada integrallanuvchi bo'lib, F(h) uning boshlang’ich funksiyasi bo’lsin. F(h)ning ~~\a\ b\~~ kesmadagi orttirmasi F(b)-
b
F(a) ayirma ~~jf(x)dx~~ aniq integralning qiymatiga teng bo’ladi, ya’ni

b
J f (x)dx = F(b) - F(a)

Nyuton-Leybnits formulasi deyiladi.

Aniq integral hossalari.

Agar aniq integralning chegaralari almashtirilsa, uning ishorasi qarama-qarshiga almashadi:

b a
J" / (x)dx = -J"/ (x)dx
a b

Yuqori v kuyi chegarasi teng bo‘lsa aniq integral nolga teng boMadi:

a
J" / (pc)dx = 0
a

Integrallash oraliqlarini boMaklarga boMisb mumkin:

b c b
J" / (x)dx = J"/ (x)dx + J"/ (x)dx , a
a a c

0‘zgarmas ko‘paytuvchini aniq integral belgisidan tashkariga chikarish mumkin:

b c
J" kf {x)dx = k^f {x)dx (k = const)
a a

Yigrindining aniq integrali qcfshiluvchilar aniq integrallarining yigMndisiga teng:

b b b
J" 1/(^x) + q(x)]dx = j/(x)dx + J" q{x)dx
a a a
Aniq integral Nyuton - Leybnitsining
b
J/(x)dx = F(x) \^b_a = F(b) - F(a)
a
formulasi yordamida hisoblanadi.

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