#1
| |||
| |||
Delhi University offers B.Sc. (Hons) Mathematics program. As you are looking for the syllabus so here I am attaching PDF file that have complete syllabus for it. Duration 6 Semester The syllabus is here :- Sem. I ; Sr. No. Subjects of Study 1 Calculus 2 Geometry 3 Algebra I Sem. II 1 Mechanics I 2 Differential Equations I 3 Algebra II Sem. III 1 Mechanics II 2 Differential Equations II 3 Analysis I Sem. IV 1 Vector Analysis 2 Differential Equations III 3 Analysis II Sem. V 1 Numerical Methods 2 Numerical Methods Practical using C 3 Algebra III 4 Analysis III Sem. VI 1 Probability Theory 2 Linear Programming and Optimization 3 Algebra IV 4 Analysis IV For detail visit here:- Last edited by Aakashd; May 21st, 2019 at 12:15 PM. |
#2
| |||
| |||
Re: BSC Hons Mathematics Syllabus DU
Request you to provide the maths(H) old syllabus for year 2004. I need the same to request transcripts at south campus DU. Please send an email at veer1singh@gmail.com Sincere thanks Veer Singh |
#4
| |||
| |||
Re: BSC Hons Mathematics Syllabus DU
The syllabus of B.Sc. (Hons) Mathematics Program offered by DU (Delhi University) is as follows: C1- Calculus (including practicals) Total marks: 150 Theory: 75 Practical: 50 Internal Assessment: 25 5 Lectures, 4 Practicals (each in group of 15-20) Hyperbolic functions, Higher order derivatives, Applications of Leibnitz rule. [2]: Chapter 7 (Section 7.8) The first derivative test, concavity and inflection points, Second derivative test, Curve sketching using first and second derivative test, limits at infinity, graphs with asymptotes. Graphs with asymptotes, LHopitals rule, applications in business, economics and life sciences. [1]: Chapter 4 (Sections 4.3, 4.4, 4.5, 4.7) Parametric representation of curves and tracing of parametric curves, Polar coordinates and tracing of curves in polar coordinates. Reduction formulae, derivations and illustrations of reduction formulae of the type , , , , , [1]: Chapter 9 (Section 9.4) [2]: Chapter 11(Section 11.1), Chapter 8 (Sections 8.2-8.3, pages 532-538 ) Volumes by slicing; disks and washers methods, Volumes by cylindrical shells. Arc length, arc length of parametric curves, Area of surface of revolution [2]: Chapter 6 (Sections 6.2-6.5) Techniques of sketching conics, reflection properties of conics, Rotation of axes and second degree equations, classification into conics using the discriminant [2]: Chapter 11 (Section 11.4, 11.5) ( Statements of Theorems 11.5.1 and 11.5.2) Introduction to vector functions and their graphs, operations with vector-valued functions, limits and continuity of vector functions, differentiation and integration of vector functions. Modeling ballistics and planetary motion, Keplers second law. Curvature, tangential and normal components of acceleration. [1]: Chapter 10 (Sections 10.1-10.4) [2]: Chapter 13 (Section 13.5)
__________________ Answered By StudyChaCha Member |