Ευκλείδης Β 105

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x.

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f (x, y) g(x, y) h(x, y) p( x, y) g( x, y) x(b1x a1 y)(b2 x a2 y)}(bk x ak y), f (ai , bi ) 1 1 d i d k f (1, 0) 1 . P f (1,0) g(1,0) bb 1 2 }bk ,

1. & ! f ( x, y)

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q(x, y) (g(x, y))s , s . ' f (x, y) (g(x, y))s Cxp(x, y), C . s # f (1,0) ( g (1,0)) Cb1b2 }bk .

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5 . ' : n 2 , / . = n t 4 , NDW ! a t 1 , b t 1 . 8 J ! NDW 1 ! NDW 2 M1 a ! , M 2 b. B J NDW 2 NDW ! , n : ! NDW , M1 ! 105 .1/25

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105 .1/37

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f(x1 ) f (x 2 ) Â&#x; x1 x 2 + , 2 " x1 , x 2 Â? D ( f, ] $ : 5 f(x1 ) f (x 2 ) Â&#x; 3 2 5x1 3 2 5x 2 Â&#x;

2 5x 2 Â&#x; 2 5x1 2 5x 2 Â&#x; x1

x2 .

2 ( : " ! " y Â? R , ! f (x) y $ x Â? D #

f D ! : " y Â? f D , ! f (x)

y $ "

x Â? D . " " " " # .

y Â? ( f,3] . & f D ( f,3] " "

y Â? f D ! f x

y $ "

2 3 y

. 5 5 2

x Â? D x

2 3 x

& : f :(-f,3] o \ f (x)= 5 5 ) : G " # ! f(x) $# " # . H

" . 1

2) f (x)

1

3 2ln 3 x

* f(x) $ " " : 3 x ! 0 , , x 3 & $ D ( f,3) . * " y � R $ : f(x) y œ3 2ln(3 x) y œ ln(3 x)=

3 y œ 3 x=e 2

3 y 2

œ x 3 e

3 y 2

3.

& f D R " f 1 : \ o \ f 1 (x) 3 e

3) f (x)

+ " y Â? R $ :

f (x) y œ 3 - 2 - 5x

5

2

? f(x) $# , 1-1 " .

2 5x1

5

3 x 2

ex 2 ex 1

y œ 2 - 5x 3 y (1)

x

3 y 0 , y ! 3 , (1)

x

3 y t 0 ,

y d 3,

:

2 3 y

. 5 5 2

(1) œ 2 5x (3 y)2 œ

x

& " y Â? R (1) $

A # $ D \ # , e x 1 ! 0 , " x � \ . %! " y � \ $ : ex 2 y œ e x 2 ye x y œ ex 1 œ e x (1 y) y 2 (1) x A y 1 (1)

f (x) y œ

105 .1/54

_______________________________

x

y z 1 , : (1) ย e x

D [0,1) ย (1, f) . * " y ย \ $ :

y 2 (2) 1 y

x

y 2 d 0 , y ย ( f, 2] ย 1, f , 1 y

x

(2) . y 2 ! 0 , y ย ( 2,1) , : 1 y

y 2 . & f D \ " 1 y x 2 f 1:( 2,1) o \ f 1 (x) ln 1 x

2 ย x

_____________________________

- 6 " $ ! #" * #

ln

f (x) y ย

3 x 5

y ย 3 x 5

x 1

y x y

ย (y 3) x y 5 (1) x y 3 (1) . y 5 x y z 3 : (1) ย x (2) y 3 y 5 0 , 3 y 5 , (2) x y 3 . x y 5 t 0 y ย ( f,3) ย [5, f) y 3

4) f (x)

5 x 1

(2) ย x

* f(x) $ " " : x 1 t 0 " 5 x 1 t 0 . D , x t 1 NDL x 1 d 5 ย x t 1 NDL x 1 d 25 ย x t 1 NDL x d 26 . & $ D [1, 26] . * " y ย \ $ :

f (x) y ย 5 x 1

y (1).

x

y 0 , (1)

x

y t 0 , (1) ย 5 x 1

x

. 5 y 2 t 0 ,

(2)

0 d y d 5 , :

(2) ย x 1 (5 y ) ย x 1 (5 y 2 )2 . 2 2

%! $ y ย ยชยฌ0, 5 ยบยผ 1 d 1 (5 y 2 ) 2 d 26 (3) H :

3 ย (5 y2 )2 d 25 ย 5 d 5 y2 d 5 ย y2 d 10 ย ย 10 d y d 10 ย y ย ยชยฌ0, 5 ยบยผ & f D ยชยฌ0, 5 ยบยผ " f 1:[0, 5] o \ f 1 (x) 1 (5 x 2 )2

5) f (x)

y ย ( f,3) ย [5, f)

2

y 5 ยง y 5ยท z1 0dยจ ยธ z 1 (3) H : 3 ย y 3 y 3 ยฉ ยน " y 5 z 1 ย 0 y z 2 " y z 4 ย y 3

ย y ย ( f,3) ย [5, f) , # 4 ย ( f,3) ย [5, f) . & f D ( f,3) ย [5, f) " 2

x 2 6x 3 , x ย (-f, 3]

6) f (x)

ย x 1 5 y (2). 5 y 0 , y ! 5 ,

%!

ยฉ x 3ยน

2

x

2

f 1:( f,3) ย [5, f) o \ f 1 (x) ยงยจ x 5 ยทยธ

y2 ย

2

$

ยง y 5ยท ยจ ยธ ยฉ y 3ยน

* " y ย \ $ :

f (x) y ย (x - 3)2 6 y ย (x - 3)2 = y 6 (1) x y 6 (1) x y t 6 , (1) ย (x 3) 2 ย x 3

y 6 ย x 3 = y 6 ย

y 6 ย x

3 y 6

A # 3 y 6 d 3 " y t 6 & f D

> 6, f

" f 1 : > 6, f o \

f 1 (x) 3 x 6 .

3 x 5 x 1

7) f (x)

* f(x) $ " " : x t 0 NDL x 1 z 0 . & $

H :

105 .1/55

x 2 6x 5 , x ย >1, 4@

1ยท 15 ยง ยง5ยท f ยจ3 ยธ f ยจ ยธ 2ยน 4 ยฉ ยฉ2ยน

"

____________________________________

- 6 " $ ! #" * #

1¡ 15 § §7¡ §5¡ §7¡ f ¨ 3 ¸ f ¨ ¸ , f ¨ ¸ f ¨ ¸ 2š 4 Š Š2š Š2š Š2š 5 7 z . & f(x) 1-1, 2 2 $# 5 7 , x " $ 2 2 [1,4] $ x=3 2 y x 6x 5 VWR \ 5x 2 x 1

8) f (x)

f D \

&

­ 3x + 2, $ x < 2 ¯ 7x - 6, $ x t 2

f(x) = ÂŽ

10)

A # f x $ D \ . * " y Â? \ $ :

f x

\ {1}

* " y Â? \ $ : f (x)

5x 2 x 1 y 2 (1)

yœ

œ 5x 2

yx y œ (y 5)x

x y

5 (1)

y 2 x y z 5 : (1) œ x= #

y 5 y 2 y 2 z 1 , Â? D , " y z 5 . y 5 y 5 & f D \ {5} " f 1 : \ {5} o \

f 1 (x)

9) f (x)

x 2 x 5

11)

f (x) y œ x 1 8 y œ x 1

3

3

y - 8 (1)

x y 8 t 0 , y t 8 , : 3

y -8 œ x

3

y -8 1

x y 8 0 , y 8 , : (1) œ x 1 3 8 - y œ x

" 1 œ x

3 8 - y 1

­°1 3 y - 8 , DQ y t 8 Ž °¯ 1- 3 8 - y , DQ y 8

­ x 2 °° 3 , x<8 Ž ° x 6 , x t 8 °¯ 7

­ 3x + 2, $ x < 2 ¯ 7x - 9, $ x t 2

f(x) = ÂŽ

f x

A # f (x) $ D \. * " yÂ?\ $ :

y 2¡ § y 6¡ § x ¨x ¸ ¨ 3 7 ¸ ¨¨ ¸¸ ¨¨ ¸¸ Šy 8 š Šyt8 š

& f D \ " f 1 (x)

%

x 3 - 3x2 3x 7

(1) œ x 1

y 2¡ § x § 3x 2 y ¡ § 7x 6 y ¡ ¨ 3 ¸ yÂœ¨ ¸ ¸ ¨ ¸Âœ¨ Šx 2 š Šx t 2 š ¨ y 2 2 ¸ ¨ ¸ Š 3 š

y 6¡ § ¨x 7 ¸ ¨ ¸Âœ ¨y 6 t2 ¸ ¨ ¸ Š 7 š

y

f 1 : \ o \

"

­°1 3 x - 8 , DQ x t 8 f 1 x Ž °¯ 1- 3 8 - x , DQ x 8

A # f x $ D

___________________________________

"

yÂ?\

$ :

y 2¡ y 9¡ § § x x ¨ ¸ ¨ x y 3 7 ¸ ¨¨ ¸¸ ¨¨ ¸¸ Šy 8 š Šyt5 š

% $ " y Â? [5,8) ! f x

y

$ f(x) 1-1, $# . . y=6 $

6 2 4 x1 2 3 3 6 9 15 t 2, " x 2 7 7 §4¡ § 15 ¡ f ¨ ¸ f ¨ ¸ , Š3š Š7š 4 15 z . 3 7

105 .1/56

_______________________________

" #$ #

- 6 " $ ! #" * #

_____________________________

3 ) 6 1 – 5 2

# 6 ( # ( , D A %B% C "

€ " 1 : . 7 ˆ ÇŁČ?Ͳǥ Í´ČŒ o \ #$ ) #$ $ ( * )& x 2 + 4x + f x = , Â? \ " 6 x Â? 0,2

x Q % * $ ( " 6 " $

&( #$ f .

%. *$ (* #$ g x = f e-x

i. Q % * ( '* & #$ g . ii. Q ' *? g $ A " $ % * $ $ * A . & : . i. G f [0, 2), lim f x = f 0 . x o0

% $ , šʹ ͜š ɉ šˆ Č‹ÂšČŒ Â&#x; Ž‹Â? šʹ ͜š ɉ š oͲ

O 0f 0 Â&#x; O 0

Ž‹Â? šˆ Č‹ÂšČŒ Â&#x; š oͲ

(> # " : * O z 0 $ lim f x z f 0 ,

1-1 # . ) , # ) # . * " y Â? \ $ :

f x y œ e x 4 y œ e x y 4 (1) y 4 d 0, y d 4, (1) . y 4 ! 0, y ! 4 , (1)

1 œ x

ln y 4 œ x ln y 4

H x � A , f 1 1. * f(A) ! $ y � 4, f . / ln y 4 �A (2) H : 2 œ ln y 4 ! ln 2 œ

œ ln y 4 ln 2 œ y 4 2 œ y 6 œ 4 y 6

& f A

x o0

# lim f x f f , ) x o0

B O

0 $ : x 2 4x x x 4

" f x

x 4 x x x Â? 0, 2 , lim f x 4 . % $ " x o0

­ x 4, DQ x � 0, 2

f 0 4 . & f x ÂŽ , DQ x 0 ÂŻ 4, f x x 4, x Â? [0, 2) .

%. i. G g É”Č‹ÂšČŒ ‡ š ÇĄ š Â?\

f, $ : ‡ š !Ͳ

ȓš Â? \ Č€ Ͳ d ‡ š Í´Č” ȓš Â? \ Č€ ‡ š Í´Č” ȓš Â?\ Č€ š ÂŽÂ? Í´Č” ȓš Â?\ Č€ š ! ÂŽÂ? Í´Č” Č‹ ÂŽÂ? Í´ÇĄ fČŒ

" g x e x 4 , x Â? ln 2, f . ii. H x1 , x 2 Â? ln 2, f . ? :

g x1 g x 2 Â&#x; e x1 4 e x 2 4 Â&#x; e x1 Â&#x; x1

x 2 Â&#x; x1

e x2

x2

& g 1-1, $ $# . ) : ' f(A) ) x Â? A $ f x y y Â? f A , f 1-1 # .

4,6 " g 1 : 4,6 o R : g 1 x ln x 4 .

€ " 2 *$ #$ ­ 1 , $ x < 1 ° . f x = ÂŽ x - 1 ° ex-1 + lnx - 2 , $ x t 1 ÂŻ . Q ? $ f *$ #$ ) . %. Q ( ' *? ?* f x = 0 ) " %D *9 ' 1, 2 .

. Q & $ ?* f x = -1 " $ ? $ $ A f . '. Q % * &$ D$ f . . Q % * ( 6 $ 9D$ ?* f x = " 6 Â? \ . & : . + \ {1} f $ " ! ! . + " $ f š ‘ Íł $ : § 1 ¡ lim ¨ ¸ f z f 1

x o1 x o1 Š x 1 š % $ , f š ‘ Íł . G \ {1} %. G f [1,2] (1,2] " x 1 limf x lim e ln x 2 1 f 1

x o1 x o1 lim f x

105 .1/57

_______________________________

- 6 " $ ! #" * #

(> # " + [1, 2] f x

É”Č‹ÂšČŒ ‡š Íł ÂŽÂ?š Í´ , ’ ). % $ f 1 1 0 " f 2 e ln 2 2 ! 0 # Bolzano f(x)=0 $ Č‹ͳǥ Í´ČŒ .

%! " x1 , x 2 Â? >1, f ­°e e Â&#x; $ : x1 x 2 Â&#x; ÂŽ °¯ln x1 2 ln x 2 2 ex1 1 ln x1 2 e x2 1 ln x 2 2 Â&#x; f x1 f x 2 . x1 1

x 2 1

x 1

œ e ln x 1 0 . A # x=1 G " # f ! >1, f .

% $ ! f x 1 $ ,

x1

0 " x 2

# # " x1 , x 2 Â? f, 1 $ : x1 x 2 Â&#x; x1 1 x 2 1 0 1 1 Â&#x; ! Â&#x; f x1 ! f x 2 . x1 1 x 2 1

% $ limf x f lim x 1 0 " x o1

x o1

x 1 0 # x<1 " lim f x 0 x o f

& f '1 §¨ limf x , lim f x ¡¸ f, 0 . x o f Š x o1 š % , ' 2 >1, f f ! " x 1 lim f x lim e ln x 2 f " x o f

" "

>1, f . : x D Â? f, 1

, D Â? f '1

D Â? f ' 2 % $ ! f x D ! ' 2

f 1 e0 ln1 2 1 0 2 1 .

% $ f ' 2 ÂŞ f 1 , lim f x > 1, f . ÂŤÂŹ x o f &

f f \ f ' 2 f,0 * > 1, f \ . G f " # -

" $

" '1 .

x D Â? > 1,0 D Â? f '1 " D Â? f ' 2 .

,

% $ ! f x D $ " '1 " " ' 2 , " " $ ( " $ " " 1-1) x D � > 0, f , D � f '1 " D � f ' 2 . % $ ! f x D $ " ' 2 . € " 3 7 #$ ) #$ f : 0,+ o \ D f 4 x + 4f 2 x lnx = 4

(1) " 6 x Â? 0, f " f 2 > 0 . . Q ( ' *? f x > 0 .

%. Q #( * f 1

. Q % * $ &( f '. Q % * limf x " lim f x . + xo+ f

xo0

1.

% f 0 f 1 , " 0 z 1 , f 1 1 $# . '. + '1 f, 1 f

x o f

f, 1

ࡹ

& f ! >1, f ,

" . . * x 1 $ 1 f x 1 œ 1 œ x 1 1 œ x 0 ( x 1 " ). * x t 1 $ f x 1 œ e x 1 ln x 2 1

'1

_____________________________

. Q ( ' *? #( ) x0 Â? 1, 2 D f x 0 = x0 . . Q ( ' *? #( ) ? > 0 f ? = 2017 . & : . H UÂ? 0, f A , $

f U 0 . * x

U $ (1) 0 4 -

. & f x z 0 " x Â? 0, f ,

f 0, f . % -

$ , f 2 ! 0 ,

x Â? 0, f

%. * x 1 f 4 1 4 Â&#x; f 1

f x ! 0

"

$ (1)

2 f 1 2 Â&#x;

2 , f x ! 0 .

f 1

. % : f 4 x 4f 2 x ln x

4

x f x ln x 4ln x 4 4ln 2 x 2 Â&#x; f 2 x 2ln x 4 4ln 2 x z 0 . g x f 2 x 2ln x , g x z 0 " $ g 0, f , Â&#x;f

4

105 .1/58

2

2

_______________________________

0, f . % $ & g x ! 0

g 1 f 1 2ln1 f 1 ! 0 . 2

2

" x Â? 0, f .

H g x

$ x 0 � 1, 2 $ h x0 0 œ f x0 x0

0 œ f x0

x0 .

. % f 0, f " -

4 4ln 2 x Â&#x;

f 2 x 2ln x

_____________________________

- 6 " $ ! #" * #

lim f x f " lim f x 0 " x o f

x o0

4 4ln 2 x Â&#x;

"

0, f ÂŽ f A ( ;). f x ! 0 " x Â? 0, f , f A ÂŽ 0, f . & f A 0, f . % $ , 2017 Â? 0, f f A

$ [ ! 0 $ f [ 2017 .

§ ¡ 2 lim ¨ 4 4ln x 2ln x ¸ f , Š š Í´ # Ž‹Â? Íś Íś ÂŽÂ? š f " Ž‹Â? Í´ÂŽÂ? š f .

€ " 4 *$ #$ f &( § 4¡ f x = ln ¨ 1- ¸ Š xš . Q % * ( '* & . %. Q #( * limf(x) , limf(x) ,

f

2

x

f x

4 4ln x 2ln x Â&#x; 2

4 4ln 2 x 2ln x , #

4 4ln 2 x 2ln x ! 4ln 2 x 2ln x 2 ln x ln x t 0 " f x ! 0

x Â? 0, f . '. lim f x

x o 0

š oͲ

x o 0

%! f x

§ ¨ Š

š oͲ

§ ¨ Š

4 4ln x 2ln x ¡¸ š

4 4ln 2 x 2ln x ¡§ ¸¨ šŠ

x o- f

4 4ln 2 x 2ln x ¸¡ š

4 4ln 2 x 2ln x 4 4ln 2 x 4 ln 2 x

4 4 4ln 2 x 2ln x

4 4 ln 2 x 2ln x

lim §¨ x o f Š

4 4ln 2 x 2ln x ¡¸ f , š lim f x 0 x o f

. L$ h x f x x . G h

ª1, 2 ºŸ #

" $ h 1 f 1 1

h

2 f 2

2 1 ! 0 "

§ 2¨ Š § 2¨ Š

§ 2¨ ¨ Š

1 ln 1 ln

2

2

2 ln 2 2

1

"

4 !0 x

(1)

B

xz0

$ :

x 4 ! 0 œ x x 4 ! 0 œ x � ( f ,0) * (4, f ) , x $ ( f,0) * (4, f )

1 œ

lim f x .

x o 0

g x 1

h x ln x . lim g x 1 f

lim h u

"

¡ 2 ln 2 1¸ š

x o+ f

D f x h g x

x o0

u ou0

4 " x f u 0

lim ln u f .

u o f

&

lim h g x f Â&#x; lim f x f

¡ 1 ln2 2 2ln 2 ln 2 1¸ š ¡ 2 1 ln 2 ln 2 1¸ 2 1 ln 2 ln 2 1 ¸ š

x o4

. Q ? $ *$ ) $ $ " $ % * &$ D$ '. Q ( ' *? f $ A " $ % * $ * A . 1 1 . Q % * lim " lim . x o + f f(x) x o - f f(x) . ! $ f x $ " " x z 0

%. ‹ H lim f x

x o0

2

4 4ln 2 2 2ln 2 2

2

x o0

lim f(x) " lim f(x) .

2

2 1 1 0 % $ Bolzano "

x o 0

x

lim f x

x o4

x o0

lim f x $

x o 4

lim g x 0 g x ! 0 x ! 4 " x o4

lim h u

u o 0

x

lim ln u f . & lim f x f

u o f

x o4

lim g x 1

H :

"

x o f

limh u lim lnu ln1 0 . & lim f x 0 uo1

105 .1/59

uo1

x o f

_______________________________

- 6 " $ ! #" * #

lim g x 1

x :

"

x o f

lim h u lim ln u ln1 0 . & lim f x 0 u o1

u o1

. * " x1 , x 2 Â? f,0 $

x o f

1 1 4 4 ! Â&#x;0 Â&#x; x1 x 2 0 Â&#x; 0 ! x1 x 2 x1 x2 4 4 Â&#x;1 1 1 Â&#x; x1 x2

§ § 4¡ 4¡ Â&#x; ln ¨1 ¸ ln ¨ 1 ¸ Â&#x; f x1 f x 2

Š x1 š Š x1 š & f ! f,0 . " f ! 1 § 1¡ §9¡ 4, f . D f ¨ ¸ ln 9 " f ¨ ¸ ln , 9 Š 2š Š2š 1 9 § 1¡ §9¡ f ¨ ¸ ! f ¨ ¸ & f(x) 2 2 Š 2š Š2š (N ! " x1 0 4 x 2 Â&#x; f x1 ! f x 2 ) . : * f(A)

f f,0

lim f (x),lim f (x)

x o f

" f 4, f

x o0

0, f

limf (x), lim f (x)

x o4

x o f

B2

y Â? f A Â&#x; y z 0 Â&#x; 1 e y z 0 , 4 4 #

� A, # y 1 e 1 ey 4 4 z 0, & f 1 : ƒ* o ƒ f 1 x

. y 1 e 1 ex ) . ‹ / f f,0 0, f

1 œ x

,

f x ! 0 " f " lim f x 0 & x o f

x

f

/ f 4, f

"

f

f,0 , f x 0 " lim f x 0 x o f

1 f . f (x) € " 5 7 f #$ ) \ $ ( * )& #$: lim

x o f

lim f x = 1

x

x o f

x f *$ $ * &? # > 0, +f

. Q $ f ( $ $ $* " " " $ % * &$ D$

f %. Q ( ' *? ?* f x = x )

# ) $ * 6 " *9 . & . * " šͳ ÇĄ š Í´ Â? f ÇĄ Ͳ@ $ : š Íł š Í´ d Ͳ Â&#x; š Íł ! š Í´ t Ͳ Â&#x; ˆ šͳ ! ˆ šʹ

ˆ É™É?ɒɇȽ

Â&#x; ˆ šͳ ! ˆ šʹ . % ˆ -

! >Ͳǥ f . % $ f

# f,0@ . % , f

! > 0, f . % $ f $ x

0 f 0 0 .

* lim f x f x f x f g x g x x,

f f $ B1 * B2 f,0 * 0, f ƒ* '. * " › Â? ÂˆČ‹ ČŒ $ : 4 4 f (x) y Âœ ln(1 ) y Âœ 1 ey Âœ x x Âœ x(1 e y ) 4 (1)

1 lim x o f f (x)

x f *$ x f 0 = 0 " f x z 1 " 6 x Â? \

x o f

B1

f,0

_____________________________

lim g x f

x o f

u0 ,

limf u lim f u 1Â&#x; lim f g x 1Â&#x; lim f x 1.

uou0

uo f

xo f

xo f

% f " # '1 f,0@ , $ :

f '1 ÂŞf 0 , lim f x > 0,1 . x o f ÂŹ % f " ! ' 2 > 0, f $ :

ÂŞf 0 , lim f x > 0,1 . x o f ÂŹ & f f ƒ f '1 ‰ f ' 2 > 0,1 . f '2

%. L g x f (x) KPx

S SÂş ÂŞ ÂŤ 2 NS , 2 NS Âť , N "

2 2Âź ÂŹ "$ . S SÂş ÂŞ H g ÂŤ 2 NS , 2 NS Âť ,

2 2Ÿ  # " $ S¡ S¡ S¡ § § § : g ¨ 2NS ¸ f ¨ 2NS ¸ KP ¨ 2NS ¸ 2š 2š 2š Š Š Š S¡ § f ¨ 2 NS ¸ 1 t 1 ! 0 " 2š Š

105 .1/60

_______________________________

- 6 " $ ! #" * #

S¡ S¡ S¡ § § § g ¨ 2NS ¸ f ¨ 2 NS ¸ KP ¨ 2 NS ¸ 2š 2š 2š Š Š Š S¡ § f ¨ 2 NS ¸ 1 1 1 0, # 0 d f x 1 2š Š + # Bolzano g x f (x) KPx $ S S¡ § ¨ 2NS , 2 NS ¸ , " " 2 2š Š "$ . G " , # S S 3S 2 NS ! 2S ! 0 . % $ $

2 2 2 "$ . € " 6 7 ˆ ÇŁ \ o \ #$ ) #$

$ ( * )& 2 2 2 f x + 2 x x = x + x (1) " 6 x Â? \ . . Q % * f 0

%. Q ( ' *? f ' * (

" 6 $ ( ' -f,0 "

0, +f

f x

_____________________________

KPx x " x � ƒ

°­ x KPx , f x Ž °¯ KPx x , °­ KPx x , f x Ž °¯ -x KPx ,

xt0 x<0 xt0 x<0

.

€ " 7 7 ˆ ÇŁ \ o \ #$ ) #-

$ $ ( * )& : x f x z 1 " 6 x Â? \ , x x

lim

x o- f

1 = +f " f x - 1

1 =0. xo+ f f x

lim

. Q #( * lim f x .

lim f x

x o- f

x o f

"

%. Q ' *? ?* 2f x = ln e + 2 f x

) # ) $ *9 . f x - 1

. Q % * lim x o- f f 2 x - 1

. Q % * #$ ) * #$ ( # " $ ( &$ $ ) (1). & . G f 2 x 2 xKPx KP 2 x x 2

& : . % f \ , o f \

x

0 f 2 0 0 Â&#x; f 0 0

%. % : 1 Â&#x; f

x 2 xKPx KP x x Â&#x; 2 f 2 x KP2 x 2 xKPx x2 Â&#x; f 2 x KPx x . & f x z 0 " x z 0 # 2

2

2

KPx d x " x Â? \ , x=0. % f \ , " $ f,0 " 0, f . . ˆ š ! Ͳ " š Â? f ÇĄ Ͳ ˆ š

š ɄɊš

ˆ š

ɄɊš š

ˆ š Ͳ " š Â? f ÇĄ Ͳ , " f 0 0 $ : f x

" x Â? f,0@ f x

x KPx

KPx x

"

x Â? f,0@ . " :

f x

x KPx " x Â? > 0, f

.

f x z 1,

f \ ÂŽ f,1 f \ ÂŽ 1, f .

1 , lim ) x f . x o f f x 1

H ) x

?

) x

1 1 1 z 0 Â&#x; f x 1 Â&#x; f x

1 f x 1 ) x

) x

§ 1 ¡ 1 1¸¸ lim 1 1 lim ¨¨ x o f ) x

Š ) x š f R ÂŽ f,1 , f x 1 0 " x Â? \ " 1 lim f . & f R ÂŽ 1, f

x o- f f x 1

& : lim f x

x o f

x o f

H h x

1 . f x

1 ! 0, f x

# f \ $ 1, f % $

G h \ " h x

f x KPx x " x Â? > 0, f . + $

$ f : f x x KPx " x � ƒ

105 .1/61

lim h x

x o f

1 x o f f x

lim

0.

_______________________________

1 x o f h x

& : lim f x

lim

x o f

- 6 " $ ! #" * #

3 2 6 5 2 6

f .

%. * f \ ÂŽ 1, f .

lim f x 1 , lim f x f " x o f

x o f

f ƒ " 1, f Ž f \ .

& f \

1, f . :

2f x ln e

f x

2 œ ln e

2f x

ln e

f x

Âœ e e 2Âœ e e 2 ­°ef x y ­°ef x y Âœ Âœ ÂŽ 2 ÂŽ °¯ y 1 y 2 °¯ y y 2 0 2f x

œ ef x

f x

2f x

1 ef x

f x

2 œ ef x

2

0œ

2 œ f x ln 2

# ln 2 Â? 1, f f \ x 0 Â? \

$ f x 0 ln 2 . G " ! $ . KP f x 1

. 7 h g x

f 2 x 1 g x f x 1 " h x

lim g x

x o f

"

KPx

x 1

2

1

KPx 1 ˜ x x 2 lim f x 1 0 u 0

x o f

KPu 1 1 1 ˜ 1˜ . & u u 2 2 2 KP f x -1 1 1 , lim x o- f f 2 x -1 2 2

limh u lim

uou0

lim h g x

x o f

uo0

> " 8 7 #$ f #$ ) \ D f -2 = 5 " f 3 = -3 . Q

( ' *? : . ( ) " Â? 2, 3 D f " = 2 6

%. ( ) x0 Â? 2, 3 D f x 0 = x0 >$ ( ( $ f *$ $ * $ $ \ ,

: . Q ( ' *? f 5 ˜ f 10 > 0 ( $ *$ ( A $ ( *$ " '# $ " ) '. Q % * f > -2, 3@

. Q ( ' *? #( ) ? Â? -2, 3 D f ? =

_____________________________

2f 0 + 3f 1 + 5f 2

10

& >. . G f > 2,3@ "

2

24 25 52

" f 3 3 2 6 5 f 2 N Â? 2,3

$ f N 2 6 .

%. L$ h x f x x , x Â? > 2,3@

H h > 2,3@ # h 2 f 2 2 5 2 7 ! 0 "

h 3 f 3 3 3 3 6 0 . % $ Bolzano x 0 Â? 2,3 $

h x 0 0, f x 0 x 0 . H f . % $ 2 3 " f 2 5 ! 3 f 3 , f # . H f > 2,3@ " f 2 5 ! 0, f 3 3 0 ,

Bolzano U Â? 2,3

$ f U 0 . G U "

! f x 0 f # \ . G f " $ f, U " U, f

U Â? 2,3 . % 5 ! 3 ! U " 10 ! 3 ! U ,

f 5 " f 10

f 5 ˜ f 10 ! 0 '. G f " # > 2,3@ . & f > 2,3@ ÂŹÂŞf 3 ,f 2 ټ > 3,5@

. G f " # > 2,3@

& $ f 3 3 " $

f 2 5 . ? :

3 f 0 5 ½ 6 2f 0 10 ½ ° ° 3 f 1 5 ž Â&#x; 9 3f 1 15 ž Â&#x; 3 f 2 5°¿ 15 5f 2 25¿° 30 2f 0 3f 1 5f 2 50 Â&#x; 3

2f 0 3f 1 5f 2

5 10 " [ Â? 2,3 $ f [

105 .1/62

2f 0 3f 1 5f 2

10

2 1 2 , 1 + " 1 . + F + - >Q + 1949 ( % ) -> 2 *? ' ( " & 6 & ,%, ( ) 2 E d D d J ( $ ) ( : Dd

2 3

DJ E 2 . ( 9 " $ &$ -

* $ #$). ( $ & # ' *? $ DJ E 2 1 (% ) , " ( &$ $ ) *$ $ $ D 1 , E 0 , J 1 , " $ "D #( ) #$ ( ( $ ' " * $ 6 D$ ( &

$ ) , A’ $ DJ E 2 '*' ) $ $ $ " * $ 6 " $ $. & . A 0 d 2 E d D½ 4E2 d D 2 ½ $ ¾ 2 ¾ D d J ¿ 4D d 4DJ ¿

4E2 4D 2 d D 2 4DJ 3D 2 d 4 DJ E2

4 2 DJ E2 D d DJ E2 . 3 3 %!

% D2 d

2E dDd

1

dEd

2 3 1

1 E d

1 3

$

E =

E 0, 3 3 DJ E2 1 DJ 1 D, J z 0 . 2 Dz 0 0 d D d D 1 " J 1 . 3 D = & D 1, E 0, J 1 . * " , $ DJ E2

N2

1

N 2 E2 , " D N 2 E2

$ $ # D "$ .

) D, E, J B D z 0 $

1 J

, N 2 E2 D, E, N

D . " 2 . + - >Q XQ > L+ +L > ( ->) 1959 (! * ) 2 $ Q " " # * 6 D$ $ * $ $ > !

# ( * # '*' #( *$ # ! " 6 $ * $ # , ( * $ *$ " #A

D$ # $ # * $ $. >) $ '& " #A * # & % * " $ (*

#( $ & "

) $ " #A # D$ # # (*( $ " #A 6 $* # D$ # > !. & . >) >$ # H * " >%QG $ .

N =

" " N ! 0 . 2 ? $ 2 E d D d N , 3 2 1 1 N " NdEd N . & 0dDd 3 3 3 "$ $ D, E $ . A # D z 0 , # " , D 0 $ E 0 " 1 N 0 , . 105 .1/63

( 1)

_____________________________________

( $ ( )D$

A # > S T S ( ;). H > ! S, *. ? > " " * $ ;.

) >$ # H * " >% Q $ .

?

H :

ƣƥ ƣƧ

1

"

ƥƤ ƨƧ

ƥƬ ƥƤ 3

ƦƧ ƨƧ ƨƧ $ " ƥƬ ƥƤ .

: ƦƧ

ƥƬ ƦƧ

1 , 2

ƣƥ ƣƧ

ƨƣƦ

2

_____________________________________

ƦƣƧ

45ǐ , > $

$ B " " (C2) " " " .

" #

& ; " " , ( *;C # >%QG "$ ). ?

;>. %! " " $ * . $ " " *

" " . H

;> " " (C1) " " " ( *,;). " # ; " " " (C) * " " * $

" " (C1) " " ƥƬ A Ƥƥ ƥƬ Ƥƥ . H (C1) ;>. >( ' ? D " " $ (3) $ ƥƬ Ƥƥ , ƦƧ ƨƧ . ? >%QG , " " " , . &$ Ʀ z ƣS $ " " " (C1) " "

*. Ʀ { ƣS .

? $

(C1) B>. G ; " , ! " > $ $ " "$ * " > !

,*. x " , # . F # , « " …» . % ( (( ) ? #

" 1956 67.

105 .1/64

7 02 15 0 1*2 15 , 15

" *' – 2 *%C ;

L f(x) = x2 + bx + c ( ,b,c R). % V 0,

. * ! f(x) = 0 $ "$

§ b r ' · ¨¨ x1,2 ¸ >>0, " 2D ¸¹ © b · § > = 0 " " ¨ x 0 ¸ 2D ¹ © " ><0. % $ f x D x x1 (x x 2 ) > > 0, 2

b · § f x D¨ x ¸ > = 0, 2D ¹ © 2 2 ª§ b · § ' · º f x D «¨ x ¸ » > < 0 ¸ ¨ 2D ¹ ©¨ 2D ¹¸ » «© ¬ ¼ D # f(x)

# $ x R, $ , C "

! > < 0 a·f(x) > 0, " x R, > = 0 a·f(x) X 0, "

b ), > > 0 2D ·f(x) < 0 " x (x1, x2) " ·f(x) > 0

x R ( x

" x f, x1 x 2 , f .

" " $

Vieta, > > 0

b c S x1 x 2 , P x1 x 2 . ?$ , D D " x1 , x 2 ! $

(x – x1)(x – x2) = 0 (1) S " ^, : 1 x 2 x1 x 2 x x1 x 2 0 x 2 S x P 0 * 1 ) A >> 0, ' x1 x 2 } D 2 ) , c , . ·c < 0, >=b2 – 4 c=b2+4( c)>b2 t0. _ " a, c , (>>0 ><0 >=0). 3 ) b = 0, f(x) = 0 x2 + c = 0

c , c , D , c $ c x1,2 r D 4 ) c = 0 f(x) = 0 x2 + bx = 0 b x( x + b) = 0 (x = 0 x ) D 5 ) f 1 0, + b + c = 0, f(x) = x2 + bx – – b = (x2 – 1) + b(x – 1) = (x + 1)(x – 1) + b(x – 1) = (x – 1)( x + + b) = c ) =(x – 1)( x – c), f(x)=0 (x = 1 x D f 1 0 , – b + c = 0 . 6 ) % (x – )2 + (x – b)2 + (x – c)2 X 0, . 3x2 – 2( + b + c)x + 2 + b2 + c2X0 " x R, # $ : > ` 0 3( 2 + b2 + c2) X X ( + b + c)2 2 + b2 + c2 X ab + bc + c 7 ) B

" f(x) = x2 + bx + c 2 x 2 . ? x2 " c # $

. % $ ax2 · c = kx · mx k + m = b. A : N

f(x) = 3x2 + 10x + 8 . A 3x2·8 = =6x · 4x (6 + 4 = 10) . + $ " " " " $ " . x2

4 3x

4x 3x2

8 6x

x

2

d f(x) = (3x + 4)(x + 2) # T ( " ) x ( ) = 4 – " , g(x) = 5x2 – 19x + 12

3 x

15x 5x2

4x

5x

4

12

A " , $ "

$

105 .1/65

------------------------------------------------------------------------------------------------------ $' A # A # $& # ---------------------------------------------------------------------------------------------------

( " ) . $ $ 1. >$ # 6 & , b, c Â? R* )& #$ ) b2 < 4 c, + c < b $ % *

c. & L f(x) = x2 + bx + c > < 0. & f(x) " x ‰ R . $ f(x) $ . f(– 1) < 0, f(0) < 0, c < 0 2. & D$# f(x) = x2 + bx + c ( > 0) " b t

1 . >( ' *? f( ) t 0 ( # 8D

' " *$ # # f(x). (' $ , 1989) & > ` 0, # f(>) p 0 # > 0.

> > 0, " ! > ` x1 > X x2, x1 < x2L ! . A , " > 0 b ' b ' x1 x 2 $ " 2D 2D 2 b ' , 2D ' ' b t 0 , 't 2D # f x 2Dx 2 x b $ " >S ( 1)2 4 ˜ 2D ˜ b 1 8Db d 0 " > 0. 3. >$ , b, c " ( # D$ D$ # " x, y, z ( " * 6 * D x + y + z = 0, ( ' *? 2yz + b2zx + c2xy � 0 [19th Lithuanian Team Contest in Mathematics 2004] & : S " " z = – x – y !

S = – {b2x2 + y(a2 + b2 – c2)x + 2y2} = – f(x), f(x) " > = y2( 2 + b2 – c2)2 – 4b2 2y2 = = y2( 2 + b2 – c2 – 2 b)( 2 + b2 – c2 + 2 b) = =y2[( – b)2 – c2][( + b)2 – c2] = = y2( – b – c)( – b + c)( + b – c)( + b + c) ` 0 " " x 2 , b2 > 0. & f(x) X 0Â&#x; S ` 0. 4. >$ $ *9 # ?* x2 + bx + c = 0 ( 6 " " $D b, c " ) ) '& ' A " " ( " *9 ' (0, 1) ( ' *? t 5. ( 8 & 1969, & # & " 1981)

& # 0 < x1 < x2 < 1, f(0) > 0, f(1) > 0, : f(0) = c > 0, f(1) = + b + c > 0 Â&#x; Â&#x; f(0) ¡ f(1) X 1 ( , b, c ‰ Z). f(x) = (x – x1)(x – x2), : f(0)f(1)= 2x1(1 – x1)x2(1 – x2) X 1. 1 % x(1 – x) ` " 4 1 " x ( x = ). % x1 V x2, 2 1 1 1 1 ˜ ! x1 1 x1 x 2 1 x 2 t 2 $ 16 4 4 D Â&#x; > 4 Â&#x; X 5 5. >$ # 6 & p, k, m Â? R* )& ) p = k + m + 1 ( ' *? # ) $ * ( ? D x2+x+k=0, x2+px+m=0 ) ( " " ' A " *9 . ($ $ ÂŤDruibaÂť, & " 1988) & : H " ! $ "$ . ? >1 = 12 – 4k <0 " >2 = p2 – 4m < 0. A $ " $ (k + m + 1)2 – 4k – 4m + 1 < 0 Â&#x; Â&#x; (k + m)2 + 2(k + m) + 1 – 4(k + m) + 1 < 0 Â&#x; [(k + m) – 1]2 + 1 <0, . 6. >$ x1, x2 *9 ?* x2 + bx + c=0 " x3, x4 *9 cx2 + bx+ =0 ( , b, c ‰ R*) ( ' *? x1 x 2 x 3 x 4 t 4 , $ , c . & : ; ! b2 – 4 c X b b b t 2 . % x1 x2 x3 x4 0Â&#x; D c Dc D c

D c

Dc

b

105 .1/66

Dc

tb

2 D c

b

t 2˜2 4 Dc q D c t 2 D ˜ c , | + c| = | | + |c| $ , c . 7. ! # ( " & 6 & s, t )& #$ ) : 19¡ s2+99¡s+1= 0 (1), t2 +99¡t+19=0 (2). Q #( * ( s˜t 4˜s 1 $ t (' $ , " 1999) & : % tV0, $ (2) t2 1 1 1 99 ˜ 19 ˜ 2 0 (3) $

t t (1), (3) ! 19¡x2+99¡x+1= 0 ଵ $ ‍Ý?‏ǥ , Vieta

b

Dc

௧

2

------------------------------------------------------------------------------------------------------ $' A # A # $& # ---------------------------------------------------------------------------------------------------

1 99 1 1 , s˜ . A t 19 t 19 § 1¡ § 1¡ $ ¨ s ¸ 4 ˜ ¨ s ˜ ¸ 5 tš Š Š tš 8. >$ , b ‰ Z $ % 6 &$ *9 s

?* Dbx 2 D 2 b 2 x 1 0 (1) [Romania, National Olympiad 1998] & : b = 1, ( =b= 1 =b=–1),

(1) œx2 + 2x + 1 = 0 œ x = –1‰Q b= – 1, ( =1, b = –1) ( = –1, b=1),

(1)œ – x2+2x+1 = 0, Q 1 = 0 " b V 0, (1) œ x 2 � Q b ( b = 0 " V 0) =b=0, # . b>1, " >=( 2+b2)2–4 b, ! $ . A $ ( 2+b2 – 1)2 < > < ( 2 + b2)2. G ! # , " ! ! : 1 (D b) 2 , # | – b| X 1, 2 zb. 2 * =b $ ' 4D 4 4D 2 2D D 2 1 ! 0 . 2

§ O ¡ 2 O 2 , D 2 1 ¨ ¸ N , D 2 Š š ", "$ " "

" ( ;) : D2 1 N2 Â&#x; D2 N2 1 Â&#x; D N D N 1 .

'

D (D Nt1 NDL D N!D Nt1) Â&#x; D N D N !1, . b < – 1, > $ ( 2 + b2)2 < > < ( 2+b2 + 1)2. G # , ! " ! ! : 0 < 1 + 2( + b)2, . H " >

$ . & $

. 9. * # " # 6 & m, n ( # " $ ( &$ $ 9m2 + 3n = n2 + 8. [Romania, National Olympiad 2001] & * # # !

2 n, n2–3n+(8–9m2)=0 (1), > = 36m2 – 23 = k2 (2) ( " " $ "$ > $

, " " ), (2) Â&#x; (6m + k)(6m – k) = 23 Â&#x;

Â&#x; (6m + k = 23, 6m – k = 1) (6m + k = – 1, 6m – k = – 23)Â&#x; m = o Í´. ? 1 Âœ n 2 3n 28 0 Âœ n = 7 n=– 4 10. & D$# f(x) = x2 + bx + c.

!$ *9 # ?* f (x) f x 0 ) " %D 3 ' A " ( " *9 . § b ¡

* $ # . f ¨ ¸ .. Š 2D š [Albania, National Olympiad 2012] & : G ! # f(x)¡(f(x) + 1)¡(f(x) – 1) = 0. A # " $ . H >1, >2, >3 "

( ). A >2 = >1 – 4 , >3 = >1 + 4 . >2 = 0, >1=4 V0, >3 = 8 V 0. & f(x), f(x) + 1 $ 2 0 " $ , . D >3 = 0. d >1 = 0, § b ¡ f ¨ ¸ 0. Š 2D š 11. *$ $ ( " * 6 * , b, c Â?0 D 2 + 3b + 6c = 0. (1) >( ' *? ?* x2 + bx + c = 0 ) '& ( " $ *9 , " $ ( * $ # ) $ * % * " ' [0, 1] [' $ , Gheorghe Mihoc – Romania 2003] & : A 1

(2D 3b) ) ' b 2 4Dc b 2 4D( 6 3b 2 2D(2D 3b) D 2 3(D b) 2 !0 3 3 b c 02 3 x1 x2 6 ˜ x1 ˜ x2 % 1 Â&#x; 2 3 6 D D 2 2 0 x1 x 2 2x1 ˜ x 2 Â&#x; x1 1 2x 2 x 2 Â&#x; 3 3 2 1 1 1 1 Â&#x; x1 1 2x2 1 2x2 1 2x2 (x1 ) Â&#x; 3 2 2 6 2 1 ¡§ 1¡ 1 § Â&#x; ¨ x1 ¸¨ x 2 ¸ . 2 šŠ 2š 12 Š x1 > 1 " x2 > 1, 1 1 1 ¡§ 1¡ 1 1 1 § Â&#x; ! , ¨ x1 ¸¨ x 2 ¸ ! ˜ 12 4 2 šŠ 2š 2 2 4 Š x1 < 0 " x2 < 0, 1 ¡§ 1¡ §1 § ¡§ 1 ¡ 1 1 1 Â&#x; ¨ x1 ¸¨ x 2 ¸ ¨ x1 ¸¨ x 2 ¸ ! ˜ 2 šŠ 2š Š 2 Š šŠ 2 š 2 2 4 1 1 ! , . H x1 < 0 " x2 > 1. 12 4

105 .1/67

3

------------------------------------------------------------------------------------------------------ $' A # A # $& # ---------------------------------------------------------------------------------------------------

1 1 1 1 0 i " x 2 ! ! 0 ii

2 2 2 2 1 ·§ 1· 1§ 1· § & i Â&#x; ¨ x1 ¸¨ x 2 ¸ ¨ x 2 ¸ " 2 ¹© 2¹ 2© 2¹ © 1 1 1 1 1 ii Â&#x; §¨ x 2 ·¸ ˜ . % $

2© 2¹ 2 2 4 1 ·§ 1· 1 1 1 § ¨ x1 ¸¨ x 2 ¸ Â&#x; , . 2 ¹© 2¹ 4 12 4 ©

? x1

d x1 ‰ [0, 1] x2 ‰ [0, 1] . ? " 1) > f(x) = x2 – 9x – 10 ) N f(x)

# $ " x ) – 2 < k < – 1 " 8 < m < 9 k·f(k)·m·f(m) ) N 2 2016 § 2016 · F ¨ 10 ( ¸ 9˜ 2017 © 2017 ¹ $ ) ) N x(x – 9) < 10 (8! ) 2) G " ! x2 + 2 x + b2 =0 " x2 + 2bx + c2 = 0 $ # "$

"$ . N " ! x2 + 2cx + 2 = 0 (Finnish High School Math Contest 2004) 3) b

D c ! 2

(b – c)x2 + (c – )x + ( – b) = 0 . [Mathematics Competition, USA – March 2000] 4) * f(x) = x2 + bx + c $ # "$ "$ x1, x2 – 1 < x1 < 1 < x2 . ! | + c| < |b| [& : f(– 1) > 0 f(1) <0, a2f( – 1)f(1)<0] 5) , b, c ‰ R* $ 2 + b + c < 0 ! b2 – 4 c > 0 (& : * & * * 1) ( «' 8! " », 1988 P " ) 6) p, q ! x2 + x + 1 = 0 k, m ! x2 + bx + 1 = 0 ! (p – k) (q – k) (p + m) (q + m) = b2 – 2 (' " $ " P " 1950, " 1969, ( 1978) [#( ' ? : 1 =…=(1+k2+ k)(1+m2–am)= = (– bk + k) ( – bm – m) = …….] 7) ! ! x2 + x + b + 1=0 (a, b "$ ) $ "$ "$ ,

2 + b2 . ( 8 & 1986) [& : + , b &

+ & & Vieta " ] 8) G B $ T

! " x " . + " " $ 2x2 – ….. x + 60 = 0 x = 6 x = ….. B ; (Brazilian Math Competitions of Public Schools, 2005) 9) > ! x2 + bx + c = 0 $ "$ . ; Adam " 2 " 4 " $ a. % Ben " – 1 " 4 ! o " , b, c ! B 2b 3c ; 6 D (' $ , " 1991) [Z : + Vieta + … - * , : 6] 10) L f (x) = 4x2 + kx + m " $ " " $ " " (0,1) . N $ k, m "$ . (' $ «(& " » 2015, \ @& " &) (& : * & * * 4) 11) > ! x2 + (2 – 1)x + 2 = 0 a " "$ $ # "$

"$ "$ x1, x2 . <

S

x1 x 2

( " 1997) [Z : & " & S2] 12) H , , " , $ >0, > + . ! ! x2 + x + = 0, $ "$ " . [' $ «< », 1997] [Z : < 0 = 0 " + . 8 " & > 0 &) + * > + - * * 4 ] 13) !

x2 + bx + c = 0, x2 + dx + e = 0 ( , b, c, d, e ‰ R, V 0) $ # "$ " "$ , ! ! 4 2x2 + 4 2x + bc + de =0 $ "$ . [' $ , Alba – Romania 2003] [Z : - " bc + de < 0, & + + ! Vieta & ]

105 .1/68

1 -3 15 5 7

% $ : ! $$ – # 6* #

. ! D . F ( # ! x =5 $ \ , x1 = 5 , x2 = 5 (" 2

" , ’ , ), x2= 5 # . %! ! x3=5 " x3= 5 $ " x1 = 3 5 " x2 = 3 5 . H $ " #

Q

D >0, N* (1).

> $ x2 = 3 5 x3= 5 . + x2 " x2 = 3 5 . $ :

5 = 3 5 (1), $

3

3

$ " $

(1). * 1 $ , # " " " , $ 2 $ ( . . 3 x 5 V 6 x 10 , x<0). % $ $ $ " " # " , # $ , " . ! # $ ( ). B >0 " Q ` * : 2Q 1

D =x x2 +1 = ,

Q

§x · ¸ , Q D >0, <0 " Q ` : D =x ¨¨ ¸ RU ©x ! 0 ¹

2Q 1

RU

D <0. (G

2Q 1

D >0 $ ).

? 2Q 1 D <0 # " Q D >0 " # ! $ ( " , ) " " . . 2Q 1 D , " " $ <0, Q ` 2 Q 1 D =x RU

x

2 +1

= , $ (1) $ #

3

5 = 5 (2). 3

+ $ (2) # " (1), "

# "$ $ $ . G $ (2) " $ , $ $ 2 Q 1 D $

$

Q

D <0, 2Q 1 D . 5 " " "

, # " 3 5 ,

? 3 x3= 5 . G $ ! x3= (1) " D \ " " " ! : (1) (1)

Q

0 =0 " Q ` * 105 .1/69

--------------------------------------------------------------------------------------------------------- F % # #" *' ------------------------------------------------------------------------------------------------------

­°3 D , WDQ D t 0 . °¯ 3 D , WDQ D 0

œ x= Ž

­° 3 D , WDQ D t 0 A

$ (1) Âœ x= ÂŽ 3 " : D WDQ D , 0 °¯ (1) Âœ x= 3 D , ! , T , ! $ . x ( ) ) , " # V , , , W Z . x A ÂŤ Âť x <0 , " y

y Â? \ : x= 10

y

§1¡ ¨ ¸ , y = log( x). Š 10 š

log x " $ ( " ), " ! log x = log( x) (1) 3 x = 3 x (2) ), " x<0. + $ (2) ! # $ (1) $ : log x= log( x) 1, x =

1 " " x2 = 1, " x

" $ $ . ; " $ ÂŤ Âť " . . Log x = log( x), " 3 x = 3 x .

x

) " ' $ 9 "D$. * $ ! $ " " " "

" , " $ " . H $ ! . . 3 D ˜ 3 E = 3 D ˜ E , >0, >0 $ " <0,

<0 3

D

, ˜3

E =( D 3

)˜( 3

E )= D 3

˜3

"

E

=3

=3

( D )( E )

3

x,

x<0,

$ :

D ˜E .

L " " , $ , # $

3

D ,

3

3

3

D ˜E ,

x , x<0 (2) $ :

D ˜ 3 E =( 3 D )˜( 3 E )= 3 D ˜ 3 E = 3 ( D )( E ) = 3 D ˜ E .

D ˜ >0 , T : ˜ <0, 3

D , 3 E "

E <0, <0 ! $ .

B " " 3

3

3

3

D ˜ E = 3 D ˜E . #

D ˜ E = 3 D ˜E , #

3

3

D ˜E

D ˜E = 3 D ˜ E ,

D ˜ 3 E = 3 D ˜E (1).

B = <0 : ( 3 D )2 = 3 D 2 . %! <0, >0 $ 3

D ˜ 3 E = 3 D ˜ E , # 3 D , 3 D ˜ E $

:

3

D ˜3 E =

3

D ˜E (2), # :

(2) $

3

x , x<0 "

3

x , x>0 . 105 .1/70

3

E . G " "

--------------------------------------------------------------------------------------------------------- F % # #" *' -----------------------------------------------------------------------------------------------------3

D ˜ 3 E = 3 D ˜ 3 E = 3 ( D ) ˜ E = 3 D ˜ E = 3 D ˜E . 3

+ (1) A $ , , <0 (1) :

D

3

(2)

E ˜ 3 J =‌.=

3

q " "

3

3

D ˜ E ˜J =

3

3

"

3

.

D ˜E ˜ J (!!!).

x , x<0 (

) (1),

(2) " ( 3 D )˜( 3 E )= 3 D ˜ 3 E = 3 ( D )( E ) = 3 D ˜ E , 3

D ˜3 E =3 D ˜ E ,

3

D 3 E

3

<0,

<0

3 D 3 E

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3 ( D) ˜E = 3 D ˜ E ,

D ˜ E , <0, >0 3

$

3

Q

D , >0.

D D =3 <0 <0, " "

E E

" " , " $ # ! . $ ÂŤ Âť " . B x,T, <0 , $ : Logx +LogT = [log( x)+log( T)] = log( x)( T) = log(x˜T) = Log( x˜T), Logx +LogT +Log = ‌ = log( x˜T˜ )= Log(x˜T˜ ). %! x<0, T>0 $ :

§\ ¡ § \¡ §\ ¡ ¸ = log ¨ ¸ = Log ¨ ¸ ". . . Š xš Š xš Šxš

Logx+logT = log( x)+ logT= log ¨ x

$ , , # i )

1

$ . . i2 = 1 ˜ 1 = 1 = 1 =1, i2 = 1. ' , . 2

6 " ( ' ? . f : \ o \ f3(x)=x , " x Â? \ "

( " ) f(x)=

3

­°3 x , x t 0 x , " f(x) = Ž , °¯ 3 x , x 0

T \ * " . > f S(x) = 1 3

3

( x )S = ( x )S = ( e

1 ln x 3

)S = e

1 ln x 3

1

1

1

1

> ! $ . " x 3 " e 3 x " xVx0, 3

(x) =

x 3 x0

3

x x0

3

1

x 3 x0 x 3 3 x0 1

2

1 1 1 1 1 1 1 1 ˜ ˜ = x3 ˜ ˜ = ˜ x3 = ˜ x 3 = (3). 3 2 3 x 3 x 3 3 3 x

ln x

xV0, " x<0.

1 3

(3 x ) 2 3 x ˜ 3 x 0 3 x 0

2

, :

1

" x Â? \ * . 33 x0 33 x 2 %# $ , " " , #$ $ . lim O (x)

x ox0

3( 3 x 0 )

2

2

Â&#x; f S(x) =

3

(3) + x0=0 , # x>0 Â&#x; (x) =

x 3 0 x 0

3

1 Â&#x; lim O (x) f . x o0 x2

105 .1/71

--------------------------------------------------------------------------------------------------------- F % # #" *' ------------------------------------------------------------------------------------------------------

x

G " " f2 +1(x)=x xV0, , Q ` * P

$ , " $# f(x)= x 2Q 1 = e 2Q 1

#$ . ; $ $ :

ln x

,

1 P f S(x) = x 2 1 ( " $ ). 2Q 1

G \ * $ " ! : 1

1

x>0 f(x)= x 3 f S(x) = … =

1 3 1 1 x = . 3 33 x 2 1

1 3

1 1 1 1 = . x<0 f(x)= ( x) f S(x) = ( x) 3 ( x)S = 2 3 3 33 ( x) 3 x2

? " f S(x) =

1 33 x 2

1

2

1 1 1 " x R*, : f S(x) = x 3 = x 3 " x \ * ,

3 3

" " " $ . * " f2 +1(x)= x $ " : P

>) x>0, f(x) = x

2Q 1

P

B) x<0 " , f(x) = ( x)

2Q 1

P

!) x<0 "

, f(x) = ( x) ( #$ $ $ ).

2Q 1

". . .

x

'# $ «! ' » 1976 \ ^ –W Z `. ! w . z # ) $ , 114 2 # # . :

x

N f(x) =

3

x( x 2 1) , $"# :

N f : \ o \ f3(x) = x(x2 1) " x \ , : ­° 3 x(x 2 1), WDQ x(x 2 1) t 0, GKO. x [-1,0] [1, f) A , f(x) = ® °¯ 3 x(1 x 2 ), WDQ x(x 2 1) 0, GKO. x ( f, 1) (0,1) B + # " " (1976) f(x) = 3 x( x 2 1) $ " x \ " « " »

$ [0,+f). B f(x) =

3

x( x 2 1) ,

$

=[ 1,0] [1,+f) , ,

, # " 0. * !

>

@

1

f(x) = x( x 2 1) 3 , " $# «" " » " $ " " , $ " . G , $ " , $ " #$ $

, $ . 105 .1/72

_________________________________ - 6 " " )$* _______________________________

B " " C ? " " « / L% %/>%/+» * $ $ ( # #. % $ ! # " , $ .

Andrew Wiles (

1953 – $ …) D ! "

-; " ‡ ! ? $ ; H " ! . % ; -€, $ _ ! ? $" ! ! % # " 350 ; -D , ! , " $ . -N , ; ? ; * $" T ! " " ! " ; -A " ! ; -> !$ , # . % " , " B " , " " . * , " ; -N . B " $ ! . % # " " . + # " , $ , " . %! " " . -> " $ . A

, " ! ; -% " $ " $ , # " $ " $ . # $ . ? $ T " ! ; -G « " » ! 350 " $ . > ! $ . C$

. ˆ " , "$# " .

- $ , # $ . > « " » > # " $" B $. D # " , $" , A #

# A : «? " " , $ " " $ " $ ». + " 2 2 2 : G ! D E J , D " E , J " $ , $ "$ " , .

" $ 1:Andrew Wiles

? > # « " » , " " $# > , !$ $ $ . H , $" $# $# " " $ , 1637. B " " " $ " , #$

" , "$T " " . % $ , " " $ " . A ! , " , $" " , , 3 3 3 "$ , D E J .

105 .1/73

_________________________________ - 6 " " )$* _______________________________

& T $ , $ . ‰ " "

, $ " $ , . * " $ " , # $ . - " $ " ,

" " . -‰ $ " " . G "

" " " . A " " " $ , " "$ ! D 4 E 4 J 4 " D 5 E 5 J 5 ,

. -; $ T : Q EQ J Q $ « Q t 3 , ! D "$ ». -N , . > " , « " », $ T $# . ‰ " $ $! T

" $ " " T . " $ 2:Pierre Fermat - > #

"

, " " . %

T " , , " ! " ! ; -A , «$ ! , $ T ». - $ _ , ! " . > # , " $ ! . A !$

. . B " , $

" B " . A " $ $# , " " # " $ " . H $ « " » . -A $" ! ; - D‡ . ? 1753 " ! Q 3 . -N , . q " $ , $ «

" ». -? # Q 4 , . -< $ ! $ " $ ! $ " " $ " " " ’ . # " , ! $ . -+ $ # , " "

$ « » A . -_ " , $ " $T ! A . D H # . ; -% . L $ $ " .

" " . G + # Q . " , " " $ $ Q , " . %

« Q », p , p , " 2 p 1 . > $ ! " " " $ , $

N " $ " C . ? 1825 ! $

, $ ! Q 5 " 1839 C $, $ Q , $ ! Q 7 . -q , $# , * " .

105 .1/74

_________________________________ - 6 " " )$* _______________________________

-? ; ? B " " , $ . -? ! "

" . + $ . -? " * " " " $ . * ’ " * " " $ $ " " . + " C $ " ; " " " ! . -H ‌ -N , $ , $ " # . + , $ $ " , C , "

$ * " ; , $ ! " !

. -A ; -< $ " "$ # , "

, " # " . ; $ ! " T " . ; " # !

Q , . ! #$ $ " $ , ! . -? #$ . -B $ " B _$ C . % ! , 1901 " 1907, " . -% $ , ! , ! " . -N , 1882 C $ ! " " $ $ $ " " " . -+ $ , $ " . > $ " $ $ " , " $ $ " " " $ " , $ " . A

$ ;

- A # " , $ " # " , " $ . ? 1908 #$

" " $ , " $ 100.000 " , " # , D " $ . -_ " , "

! , " . % $ $ " . ; #

; -D " . A " " , " . ? " . _ $ 1955. + $ " $ ? " , # / " * " ? " *" + , " , $" . / " " # modular $ " ! . -> #$ modular. -% " , # . B " . * $ $ $ " " , " " " , $ , $ modular. D #

ÂŤ "$ ! Âť ÂŤ "$ " Âť, ! . - " $ " $ modular " "$ " , $ $ , " $ " / ; -D $ , $ . $ ! " " $ " . G " " # " " . + ! , " " !$ ! " B " . ? 1963 " ; *"$ $ ! " " ! . H " $ .

105 .1/75

_________________________________ - 6 " " )$* _______________________________

#

. -€ , $ $ ; -+ – , . ? 1984 * " *"$ _ ‡ " " " ? – + , ! " . -A $" T ; -/ " $ , ! DQ EQ J Q $ , " "

" ! 2 3 2 y x D x E x J , $ $ D , E , J " ! . " ! $ " # modular, $ , $ , $ , " . H " $ " "$ ! . -A "$ ; -G $ " ! , " #

& " *" . D "

B $ " ‡, ; ^ $ ! _ ‡, $ " " ? + . ? , " , " . -N , " . B$ / " " . ? " # "

; -% " . -+ " " " . -D $" , 1963, # . $ . -G # " " . # " " " " T

" . " , " $

! , $ . -C , , $ "

! . _ " $ " # . + " " , " " " .

? 1975 " # ;$ , " ? ;

. ? "$

! . + $ ! ! > # , # # "$ , # " $ $ . ! $ " $ mod(Q ) ,

^0 ,1, 2 , ...,Q ` .

-B $ # "$ !

… -D $ " ? – + " A . ; " !

" . H ! . " " # . % " , $ # " " " " . % " , ! " . -B $ . H " , " . A $ ! #$

modular, # " . -> " $ *" ! " $ $ A . H# " ; ; # ! ; - " " " ;$ , 23 / 1993, * " . -* ; > $ " " " ; -H " " " # . " $ $ " " ! , " $ " . q " $ " " ^ ?$‡ " T " ! . B ! $ " . A $ " " . -+ $ ! , " ? + . -? , # $ .

105 .1/76

_________________________________ - 6 " " )$* _______________________________

-L $ N ’ . - $ _ , " $ . > $ " ; -* ; > B " " ; % ! . -> !$ N " $ B " . C$ $ N " , # " $ T . H N " . -H " $ … -< _

, " $ . $ " "

" "

! . ! " . - C , " 350 " " . > !$ $ .

- $ " ! ; -L $ " ! " " . H $ " ; - $ . ! , ! ! " , . -A ,

$ " ; -N , " # , $ " $ . + " $

. ! " , $ $ "$ " " , $# $ . > . # $ . -; $ . + .

" ' " & ’69 # … , ) ) . " , & $ , : “ # ’ , ) , , ’ ? … ) # ” . " , & ) … # , , ’ $ , , # # # . # ) . " , & , ? ) .

+ # , " SISTE VIATOR 105 .1/77

O ΕυκΝξ Ε ΕυκΝξίδΡĎ‚ ξίδΡĎ‚ Ď€Ď ÎżĎ„ξίνξΚ Ď€Ď ÎżĎ„Îľ ξίνξΚ ...

ÂŤ

Âť.

. R. HALMOS % $ : !. ! . FL >Q QF+ - Q. . >QFXQ Q+ + + – . >. F‚ ‚ XF‚ + L+ + ->QF F +! ‚

D$ # $$D $ % ,* , ( % % *$ # ' 6 ( $ $ 6 3011 # &) # 104. >$ * ÂŤÂŤ&, > Âť $ A * ÂŤ&, , - Âť >$ * > ÂŤ &, A * ÂŤ " ' )

# ' ) # -QÂť $ -QÂť . + . > 274 (F + 100 ) N R ! : 4 x 2016xx 2 2015x 22016 0 ( A

/ " C " A A – ) 1 : * – B G ! # : x 4 2016xx 2 2015x 22016 0

" f (2), f ((3) " . H ,

x 4 x 20016(x 2 x 1))

L f (x) x x 2 x $ [0,33] . > ' $

0

x(x 1)(x x 1) 20116(x x 1) 2

2

(x x 1))(x x 20116) 2

2

0

0œ

x x 1 0 › x x 2016 0 , $ "$ " , R. 2 : ; / N – * # . ? f (x) 2016x 2 20 015x 2016 $ 2

2

" " ' 20152 4 ˜ 20 0162 0 D 2016 ! 0 . +

, f (x) ! 0 , " x Â? R .

% " x 4 t 0 , " x � R , $ : x 4 f (x) ! 0 , " x � R .& & , ! R. & $: / – , *

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L. Bolzzano. & , [ Â? ((1,3) : f ([)

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x 1, 2,3 2) ­ m d f (1) d M (2 ° Žm d f (2) d M (3) . $ ° m d f (3) d M (4 4) ¯

(2),(3 3),(4)

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> # , L ? " – A , - B , * > – , A * " – ,

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10 05 .1/78

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ˆ C . " > ;>C >GQ > '+ +4 . '= 4= 2 : A * " – . _$ +. , =/ A %* * . ;G " > $ : ;G ; ; (1), > > =/ */ Q*C " >* $ :: (2). B $' *' .+ + %. *' ˜ " $ (1),(2) $ : =/ / %' */ .+ %. *' ˜ (33). =/ */ %'

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$ #= " >L +'= . ?

10 05 .1/79

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10 05 .1/80

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