Difference between revisions of "IU:TestPage"
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+ | == Formative Assessment and Course Activities == |
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+ | === Ongoing performance assessment === |
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+ | ==== Section 1 ==== |
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+ | | Question || A sequence, limiting value || 1 |
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+ | | Question || Limit of a sequence, convergent and divergent sequences || 1 |
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+ | | Question || Increasing and decreasing sequences, monotonic sequences || 1 |
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+ | | Question || Bounded sequences Properties of limits || 1 |
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+ | | Question || Theorem about bounded and monotonic sequences || 1 |
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+ | | Question || Cauchy sequence The Cauchy Theorem (criterion) || 1 |
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+ | | Question || Limit of a function Properties of limits || 1 |
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+ | | Question || The first remarkable limit || 1 |
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+ | | Question || The Cauchy criterion for the existence of a limit of a function || 1 |
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+ | | Question || Second remarkable limit || 1 |
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+ | | Question || Find a limit of a sequence || 0 |
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Revision as of 17:46, 19 April 2022
Mathematical Analysis I
- Course name: Mathematical Analysis I
- Code discipline:
- Subject area: ['Differentiation', 'Integration', 'Series']
Short Description
Prerequisites
Prerequisite subjects
Prerequisite topics
Course Topics
Section | Topics within the section |
---|---|
Sequences and Limits |
|
Differentiation |
|
Integration and Series |
|
Intended Learning Outcomes (ILOs)
What is the main purpose of this course?
understand key principles involved in differentiation and integration of functions, solve problems that connect small-scale (differential) quantities to large-scale (integrated) quantities, become familiar with the fundamental theorems of Calculus, get hands-on experience with the integral and derivative applications and of the inverse relationship between integration and differentiation.
ILOs defined at three levels
Level 1: What concepts should a student know/remember/explain?
By the end of the course, the students should be able to ...
- Derivative. Differential. Applications
- Indefinite integral. Definite integral. Applications
- Sequences. Series. Convergence. Power Series
Level 2: What basic practical skills should a student be able to perform?
By the end of the course, the students should be able to ...
- Derivative. Differential. Applications
- Indefinite integral. Definite integral. Applications
- Sequences. Series. Convergence. Power Series
- Taylor Series
Level 3: What complex comprehensive skills should a student be able to apply in real-life scenarios?
By the end of the course, the students should be able to ...
- Take derivatives of various type functions and of various orders
- Integrate
- Apply definite integral
- Expand functions into Taylor series
- Apply convergence tests
Grading
Course grading range
Grade | Range | Description of performance |
---|---|---|
A. Excellent | 90-100 | - |
B. Good | 75-89 | - |
C. Satisfactory | 60-74 | - |
D. Poor | 0-59 | - |
Course activities and grading breakdown
Activity Type | Percentage of the overall course grade |
---|---|
Labs/seminar classes | 20 |
Interim performance assessment | 30 |
Exams | 50 |
Recommendations for students on how to succeed in the course
Resources, literature and reference materials
Open access resources
- Zorich, V. A. “Mathematical Analysis I, Translator: Cooke R.” (2004)
Closed access resources
Software and tools used within the course
Teaching Methodology: Methods, techniques, & activities
Activities and Teaching Methods
Learning Activities | Section 1 | Section 2 | Section 3 |
---|---|---|---|
Homework and group projects | 1 | 1 | 1 |
Midterm evaluation | 1 | 1 | 0 |
Testing (written or computer based) | 1 | 1 | 1 |
Discussions | 1 | 1 | 1 |
Formative Assessment and Course Activities
Ongoing performance assessment
Section 1
Activity Type | Content | Is Graded? |
---|---|---|
Question | A sequence, limiting value | 1 |
Question | Limit of a sequence, convergent and divergent sequences | 1 |
Question | Increasing and decreasing sequences, monotonic sequences | 1 |
Question | Bounded sequences Properties of limits | 1 |
Question | Theorem about bounded and monotonic sequences | 1 |
Question | Cauchy sequence The Cauchy Theorem (criterion) | 1 |
Question | Limit of a function Properties of limits | 1 |
Question | The first remarkable limit | 1 |
Question | The Cauchy criterion for the existence of a limit of a function | 1 |
Question | Second remarkable limit | 1 |
Question | Find a limit of a sequence | 0 |
Question | Find a limit of a function | 0 |