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Count
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Coded Questions
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Chapter 1: Preliminaries
|
| 1.1 |
5 |
004
008
018
024
034
|
| 1.2 |
9 |
010
016
022
026
044
046
068
082
094
|
| 1.3 |
9 |
002
006
010
014
016
020
028
038
041
|
| 1.4 |
9 |
002
004
010
018
020
024
030
034
036
|
| 1.5 |
11 |
002
004
006
012
014
018
020
022
028
056
060
|
| 1.6 |
11 |
002
004
008
010
014
020
040
044
066
068
069
|
|
Chapter 2: Limits and Continuity
|
| 2.1 |
8 |
004
006
010
010.alt
022
028
030
032
|
| 2.2 |
7 |
002
006
014
020
024
044
050
|
| 2.3 |
7 |
016
020
024
030
032
052
056
|
| 2.4 |
13 |
002
002.alt
004
004.alt
014
016
022
026
034
038
048
066
070
|
| 2.5 |
7 |
002
004
008
010
018
022
044
|
| 2.6 |
10 |
006
008
014
018
022
030
032
052
058
058.alt
|
| 2.7 |
6 |
012
016
028
030
034
034.alt
|
|
Chapter 3: Differentiation
|
| 3.1 |
8 |
002
004
006
008
012
016
024
046
|
| 3.2 |
8 |
002
004
010
014
022
030
032
051
|
| 3.3 |
5 |
008
010
024
026
028
|
| 3.4 |
7 |
006
012
020
024
044
054
056
|
| 3.5 |
10 |
006
008
020
030
040
050
052
054
064
098
|
| 3.6 |
6 |
004
010
016
028
038
058
|
| 3.7 |
4 |
002
008
016
020
|
| 3.8 |
5 |
020
026
038
048
056
|
|
Chapter 4: Applications of Derivatives
|
| 4.1 |
9 |
002
002.alt
006
006.alt
018
026
038
046
056
|
| 4.2 |
6 |
002
024
024.alt
028
034
058
|
| 4.3 |
9 |
002
004
008
014
018
032
034
048
048.alt
|
| 4.4 |
7 |
002
004
072
074
076
082
082.alt
|
| 4.5 |
8 |
004
008
010
012
018
022
032
044
|
| 4.6 |
6 |
008
010
014
024
026
030
|
| 4.7 |
4 |
004
012
016
022
|
| 4.8 |
9 |
002
004
012
018
022
054
068
094
096
|
|
Chapter 5: Integration
|
| 5.1 |
7 |
002
012
014
015
016
019
020
|
| 5.2 |
8 |
002
004
008
012
014
018
020
022
|
| 5.3 |
11 |
002
004
008
012
014
016
018
030
034
052
064
|
| 5.4 |
8 |
002
006
008
014
020
032
038
056
|
| 5.5 |
9 |
002
004
005
006
008
022
046
054
058
|
| 5.6 |
10 |
002
004
006
018
020
022
026
044
064
070
|
|
Chapter 6: Applications of Definite Integrals
|
| 6.1 |
5 |
006
008
011
014
016
|
| 6.2 |
8 |
008
010
012
016
018
022
028
030
|
| 6.3 |
6 |
002
004
006
010
026
028
|
| 6.4 |
11 |
002
004
006
008
010
012
016
020
026
036
038
|
| 6.5 |
11 |
010
012
014
016
018
022
024
034
036
038
042
|
| 6.6 |
9 |
002
003
004
005
006
008
010
018
022
|
| 6.7 |
3 |
010
012
020
|
|
Chapter 7: Transcedental Functions
|
| 7.1 |
8 |
002
004
006
014
020
022
036
046
|
| 7.2 |
10 |
002
006
008
022
030
038
040
050
056
062
|
| 7.3 |
9 |
004
008
012
014
022
038
044
046
052
|
| 7.4 |
4 |
002
012
022
043
|
| 7.5 |
12 |
002
004
008
009
010
012
012.alt
014
018
022
024
026
|
| 7.6 |
6 |
002
002.alt
004
004.alt
006
006.alt
|
| 7.7 |
8 |
006
014
026
032
057
062
074
100
|
| 7.8 |
7 |
002
004
014
026
036
043
052
|
|
Chapter 8: Techniques of Integration
|
| E |
11 |
002
004
012
022
026
034
042
044
050
054
072
|
| 8.2 |
7 |
004
006
010
012
022
030
034
|
| 8.3 |
7 |
002
008
012
016
024
030
034
|
| 8.4 |
6 |
006
008
014
018
026
032
|
| 8.5 |
6 |
004
008
016
034
040
042
|
| 8.6 |
5 |
040
044
052
054
060
|
| 8.7 |
2 |
028
030
|
| 8.8 |
7 |
008
022
024
044
048
054
060
|
|
Chapter 9: Further Applications of Integration
|
| 9.1 |
8 |
012
014
016
018
019
020
021
022
|
| 9.2 |
9 |
002
006
008
014
016
018
024
028
030
|
| 9.3 |
4 |
002
004
008
012
|
| 9.4 |
5 |
002
004
006
010
016
|
| 9.5 |
7 |
001
002
003
004
005
008
010
|
|
Chapter 10: Conic Sections and Polar Coordinates
|
| 10.1 |
15 |
001
002
003
004
005
006
007
008
040
042
046
052
056
060
078
|
| 10.2 |
12 |
004
006
008
010
012
024
028
030
032
034
036
038
|
| 10.3 |
8 |
002
004
008
010
012
014
016
036
|
| 10.4 |
3 |
014
016
018
|
| 10.5 |
7 |
024
026
032
044
050
052
060
|
| 10.6 |
3 |
018
020
032
|
| 10.7 |
6 |
002
006
010
012
020
022
|
| 10.8 |
5 |
004
006
010
024
030
|
|
Chapter 11: Infinte Sequences and Series
|
| 11.1 |
10 |
006
014
018
024
032
042
052
076
098
102
|
| 11.2 |
9 |
006
008
016
020
030
036
052
056
070
|
| 11.3 |
5 |
002
008
010
014
024
|
| 11.4 |
4 |
006
010
020
026
|
| 11.5 |
5 |
006
010
024
030
042
|
| 11.6 |
5 |
006
008
018
022
051
|
| 11.7 |
6 |
006
014
024
034
040
042
|
| 11.8 |
6 |
002
006
010
020
022
024
|
| 11.9 |
5 |
004
006
012
020
036
|
| 11.10 |
5 |
002
008
012
020
032
|
| 11.11 |
2 |
002
008
|
|
Chapter 12: Vectors and the Geometry of Space
|
| 12.1 |
12 |
008
010
016
020
022
036
038
040
042
044
048
050
|
| 12.2 |
9 |
004
008
012
018
024
026
036
038
046
|
| 12.3 |
8 |
002
004
008
010
012
014
018
020
|
| 12.4 |
10 |
004
007
008
016
018
024
028
036
038
040
|
| 12.5 |
10 |
004
006
022
024
028
034
038
048
056
068
|
| 12.6 |
12 |
001
002
003
004
005
006
007
008
009
010
011
012
|
|
Chapter 13: Vector-Valued Functions and Motion in Space
|
| 13.1 |
9 |
002
006
012
016
018
022
024
028
040
|
| 13.2 |
6 |
002
004
008
012
018
026
|
| 13.3 |
6 |
004
006
010
012
014
016
|
| 13.4 |
4 |
002
010
019
022
|
| 13.5 |
4 |
004
006
008
012
|
| 13.6 |
5 |
002
004
006
010
012
|
|
Chapter 14: Partial Derivatives
|
| 14.1 |
8 |
002
004
006
008
010
012
030
046
|
| 14.2 |
11 |
004
006
008
016
018
022
028
032
044
052
054
|
| 14.3 |
11 |
002
004
006
008
016
024
026
030
044
054
058
|
| 14.4 |
8 |
004
006
009
026
030
036
040
048
|
| 14.5 |
6 |
004
006
010
014
018
022
|
| 14.6 |
8 |
004
012
016
020
028
028.alt
038
050
|
| 14.7 |
8 |
004
010
016
020
032
040
044
048
|
| 14.8 |
6 |
008
010
020
022
026
032
|
| 14.9 |
4 |
002
004
006
008
|
| 14.10 |
3 |
002
004
010
|
|
Chapter 15: Multiple Integrals
|
| 15.1 |
9 |
012
014
016
018
020
032
042
044
046
|
| 15.2 |
7 |
016
018
020
022
028
032
054
|
| 15.3 |
7 |
002
004
008
018
024
030
034
|
| 15.4 |
8 |
006
008
010
016
024
026
038
042
|
| 15.5 |
8 |
002
004
008
010
014
016
020
022
|
| 15.6 |
12 |
002
004
006
008
010
022
024
028
050
056
058
062
|
| 15.7 |
3 |
002
004
008
|
|
Chapter 16: Integration in Vector Fields
|
| 16.1 |
2 |
010
020
|
| 16.2 |
3 |
010
023
026
|
| 16.3 |
2 |
008
030
|
| 16.4 |
3 |
006
008
018
|
| Total |
830
|
|
