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FUNCTIONS
...
CONTINUITY
Practical class №13
...
Solve inequalities:
а) x  4;

b) x 2  16;

d) 0  x  1  4;

c) x  3  1;

e) x 2  9;
f)  x  2   4
...

2
...

2

3
...

2

4
...

5
...

6
...

ba
b)   0  ,   1 ,    ,

Find the domain of the function:
7
...


10
...
y  ln

x 1

...

x5

8
...


9
...
y 

12
...
y 

x 1  3  x
...


1

...
y  4  x 
...


Determine if a Function is Even, Odd or Neithe

16
...

2 3

x 4  3x 2
17
...

x  x  2

18
...


For function y  f  x  and X find inverse function y  f 1  x  and its
domain
...
y  1  3x, x   ;   
...
y  x 2 , а) x   ; 0; b) x   0;   
...
y  x 2  6 x  5
...
y  

x   ; 1;
 log 2 x, x  1;   
...

x2

23
...

x

2 x  1,

25
...


24
...
y 

x 3

27
...


x  25
28
...

2

x 2  7 x  12
...
y  1  2 x  4log3 1  x 
...
For function y  x 2  1, x  0;   find inverse function and its
domain
...

31
...

2

3

32
...

2
33
...

34
...

1  x2  9





The solution of typical problems
Problem 1
...


 The domain of this function is x , satisfying the inequality x 2  3x  0
 x  3,
 x  x  3  0  
т
...
The range is
x

0
,

y  0 , since radical expression can take any positive value, then
E f   ; 0 
...
For function y  3x 1 find inverse function
...

y

y3

 From the equation y  f  x  , y  3x 1

x 1

express x : x  log3 y  1, т
...

Let argument of g be x , and function value be y ,

3

then we obtain y  f 1  x   log3 x  1 – inverse

х
3
x 1
y  log3 x  1 function to the function y  3
...
3
...
Graphs of the inverse functions are symmetric with re-

spect to the straight line y  x (рис
...
1)
...
Graph function y  x  2  3
...
According to
this rule its necessary to move the parabola y  x 2 on two units to the left
along the axis Ox and on three units
down along the axis Oy ,without changing its shape (pic
...
2)
...
3
...
а)  4; 4  ; b)  4; 4; c)  2; 4  ; d) 1; 5; e)  ;  3 and  3;    ;

1 3
f  1  1  4, f    ;
2 4
2
1
x2  1
5
 1  2x  x
b)   0   3,   1   ,     2

;
,
2
x  1   x 2x  3
 x
c) g  1  1, g  2   4, g  0   1; d) b  a
...
 2;   
...
 3; 3
...
 5;   
...
 1; 3
...
 1; 3
...
 ; 1   2;   
...
6
...
 ;  5   3;   
...
 ; 3   3; 4 
...
 4; 0    0; 4
...
Odd
function
...
The function of the General form
...
Even function
...


1 x
, D f 1   ;   
...
а) y   x , D 1   0;    ; b) y  x , D 1   0;   
...
 ;  5   5; 5   5;   
...
 ;  4   3;   
...
0; 
...
 0,5; 1
...
y  x  1, D 1  1;   
...
а)  2; 2;
f

b)  ;  3  3;    ; c)  ; 1  1;    ; d)  ;  1  1;   
...
Limit of the function
...

x 2 x  1

1
...
lim
x

1
2

4x  2
x3  1

1  sin 2 x

...

x 2 x  2

4
...
lim


...
6
...
lim 2
7
...

8
...

x 2 x  2
x 1 0 x  1
x 3 x  1
x 2 0
x  1 x  6 

2 x2  5x  3
x
9
...

10
...

11
...

x 3
x 1
x0 1  3 x  1
x2  1
x2  9
2 x3
2 x 2  x3  1
2x  7
12
...

13
...

14
...

x7 x  49
x 4 x3  2
x  5 x  2
3n 4  2
n
n2
15
...

16
...

17
...

3
n 
n  n  2
n  3n  4
n 1
 x4

6 
 1
2
18
...
20
...
19
...


x  x  2 x
x3  x  3 x  9 
x  


Choose the graph of function y  f x  , satisfying following conditions:
 lim f  x   ,
 lim f  x   ,
x

2

0
21
...





lim
f
x

0

...

x  0
 x  2  0
 x  0

1





y

y

y

O
x

а)

O

1

2
б)

х

1
1

O

х

в)
63

f  x   0,

 x lim


22
...


 x  
y

2) lim f  x   1
...


y
O

y

х

O
x

O

1

х

2

-1

-1
а)

б)

в)

Are these functions continuous at the given points:
23
...
f  x  

, x0  2
...


25
...
lim 2

...
lim

...
lim 2

...
lim

...
lim 2

...
lim

...
lim 2

...
lim

...
lim 2

...
Find points of discontinuity for the function and graph:

  x  12 , x  1;

y   1  x ,  1  x  2;
 2
x  2
...
lim x  x 2  x  1
...

1 2x 1
x

37
...


1

...
lim ln  x  1
...
lim  
...
lim

...

x 1
1  5x

 n  1
43
...

n   2n 
x2  x  2
46
...

x 1
x3  1

5n  3

...
lim

2n

 5n  4 
44
...
lim 

...
lim

...
lim 2

...
lim

...
lim n  2

...

lim



...
Find points of discontinuity: а) y  
б) y 

...

x 1 4 x  2

Problem 1
...
The point x0  1  D f , then by definition of
2 2


3x  5
3 1  5
continuous function lim
 f 1 
 4
...
If irrationality in-

 Since f x  

terferes with a given reduction, it is first eliminated
...
Calculate lim

x4

x 2  16
х 2  7 x  12


...
To cancel the fraction on  x  4  factor it:
0
x  4x  4  lim x  4  8  8
...
Calculate lim

...
Multiply numerator and denominator times
0
expression: 3  x  9
...

x 0 x  3  x  9
x 0 3  x  9
6

To calculate an indeterminate form   cancel the fraction
...
Calculate lim x

...
Since 7 x  2 x , we need to cancel the












x1
fraction on 7 , we obtain
x 1

2
x
  7
x 1
x
2 7 
7
2

lim
 7, since    0 when
   lim
x
x  2 x  7 x 1    x 
7
2
7   1
7
x  
...
 a1 x  a0 and

Qm ( x)  bm x m  bm1 x m1 
...

Problem 5
...


 Since the numerator and denominator are polynomials of the same degree, we
obtain:

8 х3  2 x 2  5 х  2    8
lim
    4
...

 0

terminate form 

1 
 4


...
Calculate lim 

1 
 4

    
 x2  4 x  2 
4  x  2 0
2 x
1
1
 lim
  lim
 
...
Calculate lim n  n 2  n
...
Then lim n  n2  n       lim
   lim
2
2
n 
n
n n n
n  n  n    n
n
1
1
  lim

...
Find points of discontinuity for the piecewise function


 x 2 , x  1;
f  x  

2 x, x  1
...


1

Рис
...
3

x10

Because one-sided limits are finite but not equal, then
in the point x0  1 the function has the jump

d

O

x10

f 1  0   lim f  x   lim 2 x  2, f 1  1
...
1
...
0
...
1
...
5
...
6
...
0
...
4
...
3,5
...


7
...
2
...
 1
...
0,4
...
0,25
...
16
...
17
...
1
...
0
...
1
...
1) б; 2) а; 3) в
...
1) в; 2) а; 3) б
...
No
...
Yes
...
а) x  1 ; b) x  2 ;
c) x  2; x  2
...
 0,5
...
0
...
0,5
...
0
...
31
...
32
...
0
...
0,5
...
0,5
...
x  1(jump)
...
38
...
40
...
41
...

42
...
43
...
44
...
45
...
 1
...
 2,5
...
 11
...
4
...
25
...

3
0,5
...
а) x  0 (asymptotic discontinuity); б) x  2 (removable)

Practical class №15
...

x 0
0
x 0
x 0

tan x  0 
lim
   1;
x 0 x  0 

The second special limit:
e ( e  2,71828182
...


x0

The third special limit:

log a 1  x   0 
ln 1  x   0 
1
,

lim
 
   1
...

x 0
x 0
x 0
x 0
lim


1 x 1 0 

lim
 
...
If lim
x  x0

  x
 1, then   x  and   x  are called equivalent
  x

infinitesimal functions
...


Equivalence of infinitesimal functions are:  x   0  x  х0  :

sin   x  ~   x 
...


tan   x  ~   x 
...


log a 1    x   ~
e  x   1 ~   x 
...


ln 1    x   ~   x 
...


а  x   1 ~  x   ln a
...

Problems

Calculate limits:

sin 5 x
1
...

x 0
x
1  e5 x
4
...

x 0 4 x

tg 2 x
2
...

x0 arcsin 3 x
1  2x  1
5
...

x 0
x

32 x  1
3
...

x 0 3x
ln 1  5 x 
6
...

x 0
2x
69

7
...


arctg 2 3x

10
...
lim

...
lim


...
lim n2  arctg
 tg
...
lim 2 2n
...



...
lim  n  1 sin
n 

p
2n


...
lim

...
lim 1  
...

x 0 sin 5 x
ln 1  2sin 2 x 
9
...

x 0

n

 n  3
18
...

n   n  1 

Material for individual work
Calculate limits:
19
...


20
...
lim n 2  1 tg 2
...
lim

...

n
 n
x2  2 x
24
...

x 2 sin  x  2 
21
...




1  cos x
25
...

x 0
x

x3
28
...

x 
x

26
...
lim


...
lim 

...
lim

x1

3

1  x 1

ln 11  10 x 
e5 x  5  1

The solution of typical problems
Problem 1
...


sin x  tg 3x  0 
 
x0
x2
0

 Since when x  0 : sin x ~ x, tg 3x ~ 3x , then lim
 lim

x  3x

x0

x2

 3
...
Calculate limit: lim

ln 1  10 x 


...



x  0 e5 x  1  0  x  0 5 x
x 0

70


...


Problem 3
...


x 1
 Here x 
/ 0 , but x  1  0 when x  1 use the equivalent:
sin x  1 ~ x  1, x  1
...

lim

lim

lim





x 1 x 2  1  0  x 1 x 2  1  0  x 1 x  1 2
x 1

2

Problem 4
...


 а)
1
15

e

5
lim(1  3x) x
x 0

1   lim(1  3x)




1
( 53)
3x

x 0

1

 
 lim  (1  3 x) 3 x 
x 0 




15




...

x   
x 



1

c) lim(2 x  3) x
x 2

2

1

4

 lim(1  2  x  2 ) x

2

4

x 2


 lim  1  2  x  2  
x 2 


1
2 x  2 

2
 x2




1
 e2



 e
...
5
...
2
...
2ln 3
...
 1,25
...
1
...
 2,5
...
0
...
0,3
...
0,4
...
18
...
12
...
13
...
14
...
15
...
16
...
17
...
18
...
19
...


2

2
2
20
...
21
...
p
...
1
...
 2
...
0
...
2
...
90
...
3
...
e
...
2

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