NPTEL :: Mathematics - NOC:Basic Calculus 1 and 2

Modules / Lectures

Assignments

Module Name	Download
noc21_ma20_assignment_Week_1	noc21_ma20_assignment_Week_1
noc21_ma20_assignment_Week_2	noc21_ma20_assignment_Week_2
noc21_ma20_assignment_Week_3	noc21_ma20_assignment_Week_3
noc21_ma20_assignment_Week_4	noc21_ma20_assignment_Week_4
noc21_ma20_assignment_Week_5	noc21_ma20_assignment_Week_5
noc21_ma20_assignment_Week_6	noc21_ma20_assignment_Week_6
noc21_ma20_assignment_Week_7	noc21_ma20_assignment_Week_7
noc21_ma20_assignment_Week_8	noc21_ma20_assignment_Week_8

Sl.No	Chapter Name	MP4 Download
1	Lecture 1: Real numbers and Archimedean property	Download
2	Lecture 2: Supremum and Decimal representation of Reals	Download
3	Lecture 3: Functions	Download
4	Lecture 4: Functions continued and Limits	Download
5	Lecture 5: Limits continued.	Download
6	Lecture 6: Limits (continued) and Continuity	Download
7	Lecture 7: Continuity and Intermediate Value Property	Download
8	Lecture 8: Differentiation	Download
9	Lecture 9: Chain Rule	Download
10	Lecture 10: Nth derivative of a function	Download
11	Lecture 11: Local extrema and Rolle's theorem	Download
12	Lecture 12: Mean value theorem and Monotone functions	Download
13	Lecture 13: Local extremum tests	Download
14	Lecture 14: Concavity and points of inflection	Download
15	Lecture 15: Asymptotes and plotting graph of functions.	Download
16	Lecture 16: Optimization and L'Hospital Rule	Download
17	Lecture 17: L'Hospital Rule continued and Cauchy Mean value theorem	Download
18	Lecture 18: Approximation of Roots	Download
19	Lecture 19: Antiderivative and Riemann Integration	Download
20	Lecture 20: Riemann's criterion for Integrability	Download
21	Lecture 21: Integration and its properties	Download
22	Lecture 22: Area and Mean value theorem for integrals	Download
23	Lecture 23: Fundamental theorem of Calculus	Download
24	Lecture 24: Integration by parts and Trapezoidal rule	Download
25	Lecture 25: Simpson's rule and Substitution in integrals	Download
26	Lecture 26: Area between curves	Download
27	Lecture 27: Arc Length and Parametric curves	Download
28	Lecture 28: Polar Co-ordinates	Download
29	Lecture 29: Area of curves in polar coordinates	Download
30	Lesson 30: Volume of solids	Download
31	Lecture 31: Improper Integrals	Download
32	Lecture 32: Sequences	Download
33	Lecture 33: Algebra of sequences and Sandwich theorem	Download
34	Lecture 34: Subsequences	Download
35	Lecture 35: Series	Download
36	Lecture 36: Comparison tests for Series	Download
37	Lecture 37: Ratio and Root test for series	Download
38	Lecture 38: Integral test and Leibniz test for series	Download
39	Lecture 39: Revision I	Download
40	Lecture 40: Revision II	Download

English

Sl.No	Chapter Name	English
1	Lecture 1: Real numbers and Archimedean property	Download To be verified
2	Lecture 2: Supremum and Decimal representation of Reals	Download To be verified
3	Lecture 3: Functions	Download To be verified
4	Lecture 4: Functions continued and Limits	Download To be verified
5	Lecture 5: Limits continued.	Download To be verified
6	Lecture 6: Limits (continued) and Continuity	Download To be verified
7	Lecture 7: Continuity and Intermediate Value Property	Download To be verified
8	Lecture 8: Differentiation	Download To be verified
9	Lecture 9: Chain Rule	Download To be verified
10	Lecture 10: Nth derivative of a function	Download To be verified
11	Lecture 11: Local extrema and Rolle's theorem	Download To be verified
12	Lecture 12: Mean value theorem and Monotone functions	Download To be verified
13	Lecture 13: Local extremum tests	Download To be verified
14	Lecture 14: Concavity and points of inflection	Download To be verified
15	Lecture 15: Asymptotes and plotting graph of functions.	Download To be verified
16	Lecture 16: Optimization and L'Hospital Rule	Download To be verified
17	Lecture 17: L'Hospital Rule continued and Cauchy Mean value theorem	Download To be verified
18	Lecture 18: Approximation of Roots	Download To be verified
19	Lecture 19: Antiderivative and Riemann Integration	Download To be verified
20	Lecture 20: Riemann's criterion for Integrability	Download To be verified
21	Lecture 21: Integration and its properties	Download To be verified
22	Lecture 22: Area and Mean value theorem for integrals	Download To be verified
23	Lecture 23: Fundamental theorem of Calculus	Download To be verified
24	Lecture 24: Integration by parts and Trapezoidal rule	Download To be verified
25	Lecture 25: Simpson's rule and Substitution in integrals	Download To be verified
26	Lecture 26: Area between curves	Download To be verified
27	Lecture 27: Arc Length and Parametric curves	Download To be verified
28	Lecture 28: Polar Co-ordinates	Download To be verified
29	Lecture 29: Area of curves in polar coordinates	Download To be verified
30	Lesson 30: Volume of solids	Download To be verified
31	Lecture 31: Improper Integrals	PDF unavailable
32	Lecture 32: Sequences	PDF unavailable
33	Lecture 33: Algebra of sequences and Sandwich theorem	PDF unavailable
34	Lecture 34: Subsequences	PDF unavailable
35	Lecture 35: Series	PDF unavailable
36	Lecture 36: Comparison tests for Series	PDF unavailable
37	Lecture 37: Ratio and Root test for series	PDF unavailable
38	Lecture 38: Integral test and Leibniz test for series	PDF unavailable
39	Lecture 39: Revision I	PDF unavailable
40	Lecture 40: Revision II	PDF unavailable

Sl.No	Language	Book link
1	English	Not Available
2	Bengali	Not Available
3	Gujarati	Not Available
4	Hindi	Not Available
5	Kannada	Not Available
6	Malayalam	Not Available
7	Marathi	Not Available
8	Tamil	Not Available
9	Telugu	Not Available