Mathematics Practical-I
This course will enable the students to -
- Familiarize with software MATHEMATICA for numerical computation of the fundamental arithmetic operations.
- Compute the fundamental concepts of higher mathematics.
- Enhance Problem-Solving skills through programming in different mathematical software.
- Produce and interpret graphs in various co-ordinate systems.
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Course |
Learning outcomes (at course level) |
Learning and teaching strategies |
Assessment Strategies |
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Course Code |
Course Title |
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24CMAT 112 |
Mathematics Practical-I(Practical)
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CO7: Articulate the relevance of theoretical concepts to the practical work conducted, demonstrating the understanding of the subject matter. CO8: Apply their knowledge and skills acquired to perform effectively, analyse the task and draw meaningful conclusions. CO9: Maintain accurate and detailed practical records, including observations, calculations, programming and interpretations. CO10: Enhance their communication skills by effectively presenting and defending their work. CO11: Contribute effectively in course-specific interaction. |
Approach in teaching: Interactive Lectures, Discussion, Power Point Presentations, Informative videos
Learning activities for the students: Self learning assignments, Effective questions, Assigned task
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Class test, Viva-voce, Practical File, Semester end examinations
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- Students are required to familiarize themselves with the software for numerical computation on the following topics:
- Introduction and simple arithmetic operations using Mathematica.
- Generates a power series expansion for f about the point x=x_0 to order (x-〖x_0〗^(n )).
- Differentiation of single variable functions y = f(x) and product of two and more than two single variable functions h(x) = f(x)g(x).
- Partial differentiation of order one and two of functions z = f (x,y) with matrix representation.
- Verification of Euler’s theorem.
- Derivative of an arc at particular point.
- Extreme point and value of a function of two variables.
- Tracing of polar curves, multiple polar curves, Curves with angle variation and Plot styling.
- Tracing of cartesian curves, Multiple curves and region plots
MATHEMATICA- Stephen Wolfram, Cambridge
e- RESOURCES
- https://library.wolfram.com/infocenter/Books/8511/NotebooksAndDocumentsPart1.pdf
- https://minerva.union.edu/labrakes/MathematicaIntro.pdf
- https://pages.mtu.edu/~msgocken/pdebook2/mathtut2.pdf
- https://www.wolfram.com/broadcast/video.php?c=89&v=327&disp=list&p=1
Scheme of Evaluation for Continuous AssessmentTime Duration: 90 minutes |
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Test |
Practical Record |
Viva Voce |
Attendance |
Total |
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10 |
10 |
05 |
05 |
30 |
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Students need to attempt any 2 out of 4 questions from four topics, each question carry 5 marks |
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Scheme of Evaluation for Semester End Examination Time Duration: 3 hrs. |
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Conduction
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Practical Record |
Viva-voce
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Total |
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40 |
10 |
20 |
70 |
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Students need to attempt any 8 out of 10 questions, each question carry 5 marks |
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