Logarifmik funksiyalarning xossalari va grafigi

43

8.

(

)

log

,    0,   1,   0

a

y

x

a

a

x

=

>

¹

>

 funksiyaning grafigi:

(

)

( )

0;

D y

=

+ ¥

,

(

)

( )

;

E y

= -¥ + ¥

.

Logarifmik   tenglamalar

Ushbu

(

)

log   

0,  1,

a

x

b

a

a

b

R

=

>

¹

Î

 ko`rinishdagi

tenglamalarga sodda logarifmik tenglama diyiladi.

Yechishda qo’llaniladigan asosiy ekvivalent almashtirishlar:

1.

log

,

0 (

1,

0)

b

a

x

b

x

a

x

a

a

= Û =

>

¹

>

.

2.

log

( )

( )

,

( )

0,

b

a

f x

b

f x

a

f x

b

R

= Û

=

>

Î

(

1,

0)

a

a

¹

>

.

3.

( )

( )

0,

( )

0,

( )

1,

log

( )

( )

( ).

x

b

f x

x

x

f x

b

f x

x

j

j

j

j

>

>

¹

ìï

= Û í

=

ïî

4.

( )

( )

0 ,     0 ,     1,

lo g

( )

( )

( )

.

a

x

f

x

a

a

f

x

x

f

x

a

j

j

>

>

¹

ìï

=

Û í

=

ïî

5.

( )

0,    

( )

0,   0,   1,

log

( )

log

( )

( )

( ).

a

a

f x

g x

a

a

f x

g x

f x

g x

>

>

>

¹

ì

=

Û í

=

î

6.

( )

( )

( ) 0,

( ) 0,

log

log

( ) 1,  0,    

( ) 1,  0,

( )

( );

( )

( ).

f x

g x

f x

g x

A

A

f x

A

yoki

g x

A

f x

g x

f x

g x

>

>

ì

ì

ï

ï

=

Û

¹

>

¹

>

í

í

ï

ï

=

=

î

î

7.

og

( )

l

( )

0,

( )

0,

( )

0,

1,

( )

( ).

g x

a

f x

g x

f x

a

a

a

f x

g x

>

>

ì

ï

=

Û

>

¹

í

ï

=

î

8.

(

)

( )

( )

0,

  ( )

0,

log

( )

log

( )

log

( )  0,

1

( )

( )

.

a

a

a

f x

g x

f x

g x

m x

a

a

f x

g x

m x

>

>

ìï

+

=

>

¹

Û í

×

=

ïî

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A

B

B

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44

9.

(

)

(

)

2

1

( )

0,

2

1 log

( )

log

( )

 

 0,

1,

( )

( ).

a

a

n

g x

n

f x

g x

a

a

n

N

f

x

g x

+

>

ìï

+

=

>

¹

Î

Û í

=

ïî

10.

(

)

2

( )

0,

2 log

( )

log

( )  0,

1,

( )

( ).

a

a

n

f x

n

f x

g x

a

a

n

N

f

x

g x

>

ìï

=

>

¹

Î

Û í

=

ïî

11.

(log

)

0,   0,  1

log

,  

( )

0.

a

a

f

x

a

a

x

t

f t

=

>

¹ Û

=

=

12.

log

log

log

,  0,

0,

0,  1,

1,

1,

0

a

b

c

x

x

x

d

a

b

c

a

b

c

x

+

+

=

>

>

>

¹

¹

¹

> Û

log

log

log

.

log

log

a

a

a

a

a

x

x

x

d

b

c

Û

+

+

=

Logarifmik   tengsizliklar

Logarifmik tengsizliklar ushbu ekvivalent almashtirish

yordamida yechiladi:

1.

0

1,

lo g

( )

( )

0 ,

( )

.

a

b

a

f x

b

f x

f x

a

ì < <

ï

³

Û

>

í

ï

£

î

  2.

1,

lo g

( )

( )

0,

( )

.

a

b

a

f x

b

f x

f x

a

ì >

ï

³

Û

>

í

ï

³

î

3.

0

1,

( )

0,

1,

( )

0,

log

( )

log

( )

( )

0,

( )

0,

( )

( );

( )

( ).

a

a

a

g x

a

g x

f x

g x

f x

f x

f x

g x

f x

g x

<

<

>

>

>

ì

ì

ï

ï

<

Û

>

>

í

í

ï

ï

>

<

î

î

U

4.

[

]

[

]

( )

0

( )

1,

( )

1,

lo g

( )

( )

0,        

( )

0,

( )

( )

;

( )

( )

.

f x

a

a

f x

f x

g x

a

g x

g x

g x

f x

g x

f x

ì

ì

<

<

>

ï

ï

ï

ï

<

Û

>

>

í

í

ï

ï

>

<

ï

ï

î

î

U

5.

( )

0

( )

1,

( )

1,

lo g

( )

0

0

( )

1

( )

1 .

f

x

f

x

f

x

g x

g x

g x

<

<

>

ì

ì

>

Û í

í

<

<

>

î

î

U

6.

( )

0

( )

1,

( )

1,

lo g

( )

0

( )

1

0

( )

1 .

f

x

f x

f x

g x

g x

g x

<

<

>

ì

ì

<

Û í

í

>

<

<

î

î

U

7.

( )

0

( )

1,

( )

1,

lo g

( )

0

0

( )

1

( )

1 .

f

x

f x

f

x

g x

g x

g x

<

<

>

ì

ì

³

Û í

í

<

£

³

î

î

U

8.

( )

0

( )

1,

( )

1,

lo g

( )

0

( )

1

0

( )

1 .

f x

f x

f x

g x

g x

g x

<

<

>

ì

ì

£

Û í

í

³

<

£

î

î

U

9.

( )

( )

( )

1,

( )

0 ,

lo g

( )

lo g

( )

( )

0 ,  

0

( )

1,

( )

( );

( )

( ).

x

x

x

f x

f x

g x

g x

x

f x

g x

f x

g x

j

j

j

j

>

>

ì

ì

ï

ï

>

Û

>

<

<

í

í

ï

ï

>

<

î

î

U

Click here to buy

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B

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2

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w

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B B Y Y.

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A

B

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45

10.

( )

(

)

( )

1,

( )

0 ,

lo g

( )

lo g

( )

( )

0 ,  

0

( )

1,

( )

( ) ;

( )

( ) .

x

x

x

g x

f

x

g x

f

x

x

f

x

g x

f

x

g x

j

j

j

j

>

>

ì

ì

ï

ï

£

Û

>

<

<

í

í

ï

ï

£

³

î

î

U

T R I G O N O M E T R I Y A

Boshlang’ich   tushunchalar

1.

0

a

-gradusdan radianga o’tish:

1 8 0

r a d

p

a

a

=

×

o

o

.

2.

rad

a

-radiandan gradusga o’tish:

1 8 0

r a d

a

a

p

=

×

o

o

.

3. Ta`riflar:

  1)

y

sin

y

r

a = = ;       2)

x

cos

x

r

a

= = ;

  3)

,

0

y

tg

x

x

a

=

¹

; 4)

,

0

x

ctg

y

y

a =

¹

;

  5)

sin

cos

tg

a

a

a

=

;      6)

cos

sin

ctg

a

a

a

=

.

Trigonometrik funksiyalar qiymatlari jadvali

Funksiyalar

Burchak α,

gradus(radian)

sin α

cos α

tg α

ctg α

0° (0)

0

1

0

Mavjud emas

15° (π/12)

3 1

2 2

-

3 1

2 2

+

2

3

-

2

3

+

18° (π /10)

5 1

4

-

5

5

2 2

+

5 1

10 2 5

-

+

10 2 5

5 1

+

-

22,5° (π /8)

2

2 2

-

2

2 2

+

2 1

-

2 1

+

30° (π /6)

1 2

3 2

1

3

3

36° (π /5)

5

5

2 2

-

5 1

4

+

10 2 5

5 1

-

+

5 1

10 2 5

+

-

45° (π /4)

2 2

2 2

1

1

60° (π /3)

3 2

1 2

3

1

3

90° (π /2)

1

0

Mavjud

emas

0

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A

B

B

Y

Y

PD

F Transfo

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2

.0

w

w

w .A

B B Y Y.

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m

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A

B

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2

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46

75° (5 π /12)

3 1

2 2

+

3 1

2 2

-

2

3

+

2

3

-

180° (π)

0

-1

0

Mavjud emas

270° (3 π /2)

-1

0

Mavjud

emas

0

360° (2 π)

0

1

0

Mavjud emas

Trigonometrik funksiyalarning ishoralari

Asosiy trigonometrik ayniyatlar

1.

2

2

cos

sin

1

a

a

+

=

.     2.

(

)

sin

1

;

2

1 ,

cos

2

tg

n

n

Z

ctg

a

p

a

a

a

a

=

=

¹

+

Î

.

3.

1

tg

ctg

a

a

×

= .        4.

cos

1

;

,

sin

ctg

n

n

Z

tg

a

a

a p

a

a

=

=

¹

Î

.

5.

2

2

1

1

cos

tg

a

a

+

=

.       6.

2

2

1

1

;

,

sin

ctg

n

n

Z

a

a p

a

+

=

¹

Î

.

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