limits, continuity - karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · the function question 2 (...
TRANSCRIPT
![Page 1: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/1.jpg)
LIMITS CONTINUITYLIMITS, CONTINUITY AND
DIFFERENTIATION
![Page 2: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/2.jpg)
Question 1
![Page 3: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/3.jpg)
The functionQuestion 2
The function
( ) ( ) ( )log 1 log 1ax bxf x
+ − −
i d fi d h l hi h
( ) ( ) ( )f xx
=
is not defined at x = 0. The value which should be assigned to f at x = 0 so that it is gcontinuous at x = 0 is a) loga + logba) loga + logbb) 0) bc) a – b
d) a + b
![Page 4: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/4.jpg)
If the function Question 3
1 cos x−⎧⎪ 2( ) 0f x for xx
k
⎪= ≠⎨⎪⎩
is continuous at x = 0 then the value of k is
k⎪⎩ X =0is continuous at x 0 then the value of k is
a)1 b)0c)1/2 d)-1
![Page 5: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/5.jpg)
Question 4
− nxcos1=
→ mxnx
x cos1cos1lim
0 −→ mxx cos10
nma)
mnb)n m
c) 2m 2nd)c)2n
m2md)
![Page 6: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/6.jpg)
Question 5
11
1a) b)x1− x1+
x
a) b)
c) d) 0x1x+
c) d) 0
![Page 7: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/7.jpg)
Question 6
a) b)e9 e3a) b)
c) d) 0e9 e3
ec) d) 0e
![Page 8: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/8.jpg)
Question 7
![Page 9: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/9.jpg)
Question 8
If f:R→R is continuous such that f( + ) f( ) +f( ) ∀ R &f(x+y) = f(x) +f(y) ∀ x, y ∈R, &f(1) = 2 then f(100) =
a) b)0 100a) b)
c) d) 4000 100
200c) d) 400200
![Page 10: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/10.jpg)
Question 9
where n is a non zero positive integer, th i l tthen a is equal to
![Page 11: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/11.jpg)
Question 10
![Page 12: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/12.jpg)
Question 11
![Page 13: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/13.jpg)
Question 12
![Page 14: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/14.jpg)
Question 13
![Page 15: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/15.jpg)
Question 14
![Page 16: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/16.jpg)
Question 15
![Page 17: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/17.jpg)
Question 16
![Page 18: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/18.jpg)
Question 17
![Page 19: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/19.jpg)
Question 18
![Page 20: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/20.jpg)
Question 19
![Page 21: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/21.jpg)
Question 20
![Page 22: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/22.jpg)
Question 21
![Page 23: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/23.jpg)
Question 22
![Page 24: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/24.jpg)
Question 23Q
![Page 25: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/25.jpg)
Question 24Q
![Page 26: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/26.jpg)
Question 25Q
![Page 27: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/27.jpg)
Question 26Q
![Page 28: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/28.jpg)
Question 27Q
![Page 29: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/29.jpg)
Question 28
![Page 30: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/30.jpg)
Question 29Q
![Page 31: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/31.jpg)
Question 30Q
![Page 32: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/32.jpg)
Question 31Q
![Page 33: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/33.jpg)
Question 32
![Page 34: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/34.jpg)
Question 33Q
![Page 35: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/35.jpg)
Question 34Q
![Page 36: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/36.jpg)
Question 35Q
![Page 37: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/37.jpg)
Question 36Q
![Page 38: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/38.jpg)
Question 37Q
![Page 39: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/39.jpg)
Question 38Q
![Page 40: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/40.jpg)
Question 39Q
![Page 41: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/41.jpg)
Question 40Q
![Page 42: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/42.jpg)
Question 41Q
![Page 43: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/43.jpg)
Question 42Q
![Page 44: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/44.jpg)
Question 43Q
![Page 45: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/45.jpg)
Question 44Q
![Page 46: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/46.jpg)
Question 45Q
![Page 47: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/47.jpg)
Question 46Q
![Page 48: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/48.jpg)
Question 47Q
![Page 49: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/49.jpg)
Question 48Q
![Page 50: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/50.jpg)
Question 49Q
![Page 51: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/51.jpg)
Question 50Q
![Page 52: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/52.jpg)
Question 51Q
![Page 53: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/53.jpg)
Question 52Q
![Page 54: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/54.jpg)
Question 53Q
![Page 55: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/55.jpg)
Question 54Q
![Page 56: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/56.jpg)
Question 55Q
![Page 57: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/57.jpg)
Question 56Q
![Page 58: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/58.jpg)
Question 57Q
![Page 59: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/59.jpg)
Question 58Q
![Page 60: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/60.jpg)
Question 59Q
![Page 61: LIMITS, CONTINUITY - Karkea.kar.nic.in/vikasana/maths/e1_questions.pdf · The function Question 2 ( ) log1 log1(ax bx) ( ) fx +− − idfid hlhih x = is not defined at x = 0. The](https://reader030.vdocuments.net/reader030/viewer/2022040617/5f1c5a4f96544813a621aa07/html5/thumbnails/61.jpg)
Question 60Q