Microsoft Word Formula kitobcha

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Bog'liq
Formula-kitobcha

Hosila y  f ( x ) funksiyaning

Logarifmik funksiya

^y^log_a^x

⁰^^a^¹

^Aniqlanish^sohasi:^D⁽^y⁾^^0;^ ^.
^Qiymatlar^sohasi:^E⁽^y⁾^^^;^ ^.
^a^¹^bo‘lsa,^0;^ ^oraliqda^o‘suvchi;

⁰^^a^¹^bo‘lsa,^0;^
oraliqda kamayuvchi.

Grafigi (1;0) nuqtadan o‘tadi.

Asimptotasi:

x  0 .

y  sin x

funksiya

. Aniqlanish sohasi:
. Qiymatlar sohasi:

D( y)  R .
E( y)  [1;1] .

. Toq funksiya: sin( x)  sin x .

. Eng kichik musbat davri:

T  2π .

. Nollari: x₀  πn, n  Z .

. Ishora o‘zgarmas oraliqlar:

^x^²^πⁿ^,^π^²^πⁿ ⁿ^^Z

bo‘ lsa,

Sinx  0 ;

^x^^^π^²^πⁿ^,²^πⁿ ⁿ^^Z
bo‘ lsa,
Sinx  0 .

7 . ^ ^π 2πn; ^π 2πn^
ⁿ^^Z
oraliqlarda o‘suvchi;

_ _{2 2}_

^^π 2πn; ³^π 2πn^
ⁿ^^Z
oraliqlarda kamayuvchi.

__{2 2}_

. Eng katta qiymati 1 :

Sinx  1  x  ^π
2

2πn,

n  Z .

. Eng kichik qiymati  1 : Sinx  1  x  ^π

2πn, n  Z .

¹⁰^.²^πⁿ^;^π^²^πⁿ ⁿ^^Z
oraliqlarda qavariq;

^π^²^πⁿ^;²^π^²^πⁿ
ⁿ^^Z ^oraliqlarda^botiq.

y  cos x

funksiya

. Aniqlanish sohasi:
. Qiymatlar sohasi:

D( y)  R .
E( y)  [1;1] .

. Juft funksiya: cos( x)  cos x .

. Eng kichik musbat davri:

T  2π .

. Nollari:

x  ^π
0 ₂

πn,

n  Z .

. Ishora o‘zgarmas oraliqlar:

x ^ ^π 2πn, ^π 2πn ^
ⁿ^^Z
bo‘lsa,
Cosx  0 ;

 _{2 2}
 

x ^^π 2πn, ³^π 2πn ^
ⁿ^^Z
bo‘lsa,
Cosx  0 .

 _{2 2}
 

^.^^π^²^πⁿ^;²^πⁿ ⁿ^^Z ^oraliqlarda^o‘suvchi;

²^πⁿ^;^π^²^πⁿ ⁿ^^Z ^oraliqlarda^kamayuvchi.

. Eng katta qiymati 1 ,

Cosx  1 
x  2πn,
n  Z .

. Eng kichik qiymati  1 , Cosx  1  x  π  2πn, n  Z .

^π 2πn  x ^π

 2πn
ⁿ^^Z
oraliqlarda qavariq.

2 2
^π 2πn  x  ³^π

2πn

ⁿ^^Z

oraliqlarda botiq.

2 2

y  tgx

funksiya

. Aniqlanis h s ohas i :

x  ^π
2

πn,

n  Z .

. Qiymatlar sohas i :

E( y)  R .

. Toq funks iya :

tg(x)  tgx .

. Eng kichik musbat davri: T  π .
. Nollari: x₀  πn, n  Z .
. Is hora o‘ zgarmas oraliqlar:

x ^πn, ^π πn ^
ⁿ^^Z
bo‘ lsa,
tgx  0 ;

 ₂
 

x ^ ^π πn,πn ^
ⁿ^^Z
bo‘ lsa,
tgx  0 .

 ₂
 

. ^^π πn; ^π πn ^

ⁿ^^Z
oraliqlarda o‘ s uvchi.

 _{2 2}
 

As imptotalari:

x  ^π
2

πn,

n  Z .

y  ctgx

funksiya

. Aniqlanis h s ohas i :
. Qiymatlar sohas i :

x  πn,
E( y)  R .
n  Z .

. Toq funks iya :

ctg(x)  ctgx .

. Eng kichik musbat davri: T  π .

. Nollari:

x  ^π
0 ₂

πn,

n  Z .

. Is hora o‘ zgarmas oraliqlar:

x ^πn, ^π πn ^
ⁿ^^Z
bo‘ lsa,
сtgx  0 ;

 ₂
 

x ^ ^π πn,πn ^
ⁿ^^Z
bo‘ lsa,
сtgx  0 .

 ₂
 

^.^πⁿ^;^π^^πⁿ^,ⁿ^^Z

oraliqlarda ka mayuvchi.

As imptotalari:

x  πn,
n  Z .

. Aniqlanis h s ohas i :
. Qiymatlar sohas i :

y  arcsin x

D( y)  [1;1] .
E( y)  ^ ^π; ^π^.

funksiya

_ _{2 2}_

. Toq funks iya :

arcSin(x)  arcSinx .

. Aniqlanis h s ohas ida o‘ s uvchi funks iya.

y  arccos x

funksiya

. Aniqlanis h s ohas i :
. Qiymatlar sohas i :

D( y)  [1;1] .
^E⁽^y⁾^^0;^π^.

. Toq ha m, juft ham e mas :

arcCos(x)  π  arcCosx .

. Aniqlanis h s ohas idakamayuvchi funks iya.

y  arctgx

funksiya

. Aniqlanis h s ohas i :
. Qiymatlar sohas i :

D( y)  R .
E( y)  ^ ^π; ^π^.

 ₂₂

. Toq funks iya :

 
arctg(x)  arctgx .

. Aniqlanish sohasida o‘suvchi funksiya.

. As imtotalari

y   ^π.
2
y  arcctgx

funksiya

. Aniqlanish sohasi:

D( y)  R .

. Qiymatlar sohas i :

^E⁽^y⁾^^0;^π^.

. Toq ham emas, juft ha m e mas :

arcctg(x)  π  arcctgx .

. Aniqlanis h s ohas ida kamayuvchi funks iya.
As imptotalari y  0, y  π .

Hosila

y  f (x)

funksiyaning

x  x₀

nuqtadagi hosilasi

y^
f ^(x ) 
lim
y _

lim
f (x₀  x) 
f (x₀)

⁰xx₀__xxx₀__x

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