143 bài tập giới hạn dãy số

Trang 1

I HN DÃY S

3

lim

−

2

lim

+

3

lim

4

lim

+

3 2

lim

5 4

lim

2

lim

+

3

2

lim

−

2

lim

5n 1

+

5 3

5 4

lim

2

lim

− +

2

lim

1 3n

−

3 3

lim

+

2

lim

lim3n6 7n3 5n 8

n 12

+

2

lim

3n 2

lim 3n( 3−7n 11+ )lim 2n4−n2+n+2 lim 1 2n3 + −n3

2

1 2 n lim

n + + +

2

n 2 4 2n

lim

3n n 2

+ + +

+ −

4 3

lim

2

n 1 3 (2n 1) lim

2n n 1

+ + + − + +

2

1 2 n

lim

11n n 2

+ + +

+ +

1 2 n

4

+

lim

+ + + +

n

n n

4

lim

2.3 +4

n

lim

+

−

n n

n

lim

7 3.5

− +

n n

lim

− +

n n

n 1 n 1

( 3) 5 lim

( 3) + 5 +

lim( 3n 1− − 2n 1− )lim( n 1+ − n) nlim( n2+n 1 n+ − )lim n2(n− n2+1)

lim( n2+n+2− n 1+ ) lim( n+3− n 5− ) lim( n2−n+3−n) 1

lim

n+2− n 1+

GII HN HÀM S

2

lim 3x 7x 11

x →

2 1

7x 11 lim

x

x x

→

+ +

x 2

3x 1 2 3x lim

x 1

→−

7x 11 lim 2 1

x x

x

→

+

−

3

x

→

2

x 9

lim 9x x

→

−

7

2 3 x

lim

→−∞

− 8

4

x

lim

→−∞

− 9

3 x

lim

→+∞

−

10

6 3 x

lim

→−∞

− 11

2 3 2 x

lim

→−∞

+

12

x 3

3 x lim

3 x

+

→

−

13

x 3

3 x

lim

3 x

−

→

−

3 x lim

3 x

→

−

lim

+

→

+

2

x 2

lim

−

→

−

− 17.

3 2

lim

→−

+

− 18

4

2

x 3

lim

→

−

− − 19.

4 2

x 2

lim

→−

−

5 3

x

lim

→+∞

21

2 x

lim

2x 3

→−∞

+

x

→+∞

+

xlim 2x 5x 3x 1

→+∞

xlim 2x 5x 1

→+∞

143 BAI TAP GIOI HAN DAY SO - HAM SO - WWW.MATHVN.COM

Trang 2

x 2

2x 1

lim

+

→

+

2x 1 lim

−

→

+

xlim 2x 5x 3x 1

→+∞

3 2 x

lim

→+∞

− +

29

3

2

x 2

lim

→

−

31

2 2

x 3

lim

−

→ −

+

32

3 2

x 0

lim

→

+ − + 33

2 3 x

lim

9 3x

→+∞

−

34

3

2

lim

→−

+

−

35

2

x 4

lim

→

−

36

2

x 1

x 1 lim

+

→

−

− 37

2

x 0

lim

3x

→

38

3

x 3

3 x

lim

27 x

−

→

−

− 39

3 2

x 2

lim

+

→

−

2 2

x 2

lim

→

2

x 2

lim

→

−

− 2

2

x 1

x 4x 3 lim

(x 1)

→

− +

−

x 1

lim

→

−

− 2

x 3

x 2x 15 lim

x 3

→

+ −

−

2

lim

→−

+

3

x 1

lim x(x 5) 6

→

−

2

x 4

lim

→−

+

2

x 4

lim

→−

2

x 2

x 3x 2x lim

x x 6

→−

− −

2

x 1

lim

→

−

3 2

2

x 2

x 4x 4x lim

x x 6

→−

− −

x 2

→

− 4

x 7

lim

→

x 5

5 x lim

→

−

x 2

lim

→

−

x 0

x lim

→ + −

2

x 1

x 1 lim

→−

+

x 0

lim

x

→

2

x 5

lim

→

−

2

x 0

1 2x x 1 x

lim

x

→

x 3

x 3 lim

2x 10 4

→

−

lim

→

2x 3x 1 lim

x 1

→

− +

−

2

x 1

lim

→

−

lim

x

→

x 0

lim

x

→

x 1

lim

x 1

→

− −

2

x 0

lim

x

→

2

x 1

lim

→

x 0

lim

x

→

x 4

3 5 x

lim

1 5 x

→

− +

− −

x 2

lim 4x 1 3

→

+ −

2

x 1

lim

→

−

2

lim

→−

+

2

x 0

lim

→

x 9

7 2x 5

lim

x 3

→

−

2

2 x

lim

→+∞

2

3 x

lim

→−∞

−

2 2 x

x 4x 3 lim

(x 1)

→+∞

− +

−

x

lim

→−∞

x

x x

→+∞

−

4 x

lim

→−∞

+

2 x

lim

→+∞

5

x

x 3x 2x

lim

x x 6

→−∞

− −

2

1 lim

x

→−∞

−

3 6 4 2 x

x 4x 4 lim

x x 6

→−∞

− −

x 2

lim

+

→−

+

x 0

2 x 3x lim

+

→

−

=

xlim f (x)1

→

2

mx ; x 2

f (x)

=

>

xlim f (x)2

→

2

f (x)

=

khi x→2

x

lim x x 1 x 2

→+∞

x

xlim x 4x 1 x 9x

→+∞

x

lim x 2x 1 x 6x 3

→+∞

x

Trang 3

60 BÀI T P GI I H N DÃY S www.MATHVN.com

1,

2

lim

( )( )

2

lim

( )( ) ( )( )

lim

4, limn n2 n 1

- +

3

lim

+ +

n 1

+

( ) ( )

2

lim

( ) ( )

lim

3

lim

3

lim

-13,

2

lim

+ +

2

lim

15,

lim

2007 2000

lim

( ) ( )( )

3 2

lim

-+

+ -+

19,

lim

20,

lim

n

2

lim

2

lim

25,

lim

5

lim

2

lim

( )

2

lim

-31,

n

lim

+

n 1 n 1

lim

+

( ) ( )

lim

-34,

n 1 n 2

lim

lim -n +4n-1

40,

2

lim

2 3

lim

(n 1)2 n lim

-+

4

lim

( )

2

3

lim

+

-+

lim n +4n+2- +n 2

55,

2

1 lim

n+ -1 n +2

+

lim

-+

60 BÀI T P GI I H N DÃY S www.MATHVN.com

1,

2

lim...

→+∞

xlim 2x 5x

→+∞

143 BAI TAP GIOI HAN DAY SO - HAM SO - WWW.MATHVN.COM

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