This course is basically for 2nd-year undergraduate students only. If you are in 3rd or higher year and would like to register
this course, please contact the lecturer via email: ikegami@shibaura-it.ac.jp
This is a continuation of Calculus II. You will learn how to treat differentiation and integration of a function of multiple variables using partial derivatives and double integrals as well as the relationship between partial derivatives and tangent planes and that between double integrals and volumes of solids. Then you will study vector-valued functions and their integrals over lines and surfaces which are closely connected through Green's Theorem and Stokes' Theorem.
This is a continuation of Calculus II. You will learn how to treat differentiation and integration of a function of multiple variables using partial derivatives and double integrals as well as the relationship between partial derivatives and tangent planes and that between double integrals and volumes of solids. Then you will study vector-valued functions and their integrals over lines and surfaces which are closely connected through Green's Theorem and Stokes' Theorem.
You are expected to obtain skills, knowledge, and understandings of basics of multi-variable calculus, which are widely used
in science and engineering.
| Goals and objectives | Course Outcomes | |
|---|---|---|
| 1. | The students can use dot product and cross product of vectors to express lines and planes. |
A-1
|
| 2. | The students can compute partial derivatives of various functions using the chain rule and use them to describe tangent lines and to compute maximum and minimum values of a given function. |
A-1
|
| 3. | The students can compute double & triple integrals of various functions and use them to compute the volume of solids. |
A-1
|
| 4. | The students can compute line & surface integrals of simple functions and can use Green's Theorem for the computation of line integrals . |
A-1
|
| Class schedule | HW assignments (Including preparation and review of the class.) | Amount of Time Required | |
|---|---|---|---|
| 1. | Guidance 3d Coordinates Vectors Dot Product and Cross Product Conic Sections in Polar Coordinates Equations of Lines and Planes |
Read the lecture notes and work on exercises (Content is 10.6, 12.1-12.5 in the textbook) |
160分 |
| Work on exercises and preparation for Quiz | 220分 | ||
| 2. | Parametric Equations and Vector Functions Derivatives and Integrals of Vector Functions Velocity and Acceleration |
Read the lecture notes and work on exercises (Content is 13.1, 13.2, 13.4 in the textbook) |
120分 |
| Work on exercises and preparation for Quiz | 260分 | ||
| 3. | Functions of Several Variables Limits and Continuity |
Read the lecture notes and work on exercises (Content is 14.1, 14.2 in the textbook) |
120分 |
| Work on exercises and preparation for Quiz | 260分 | ||
| 4. | Partial Derivatives Tangent Planes and Linear Approximations |
Read the lecture notes and work on exercises (Content is 14.3, 14.4 in the textbook) |
140分 |
| Work on exercises and preparation for Quiz | 240分 | ||
| 5. | The Chain Rule Directional Derivatives and the Gradient Vector |
Read the lecture notes and work on exercises (Content is 14.5, 14.6 in the textbook) |
140分 |
| Work on exercises and preparation for Quiz | 240分 | ||
| 6. | Maximum and Minimum Values Lagrange Multipliers |
Read the lecture notes and work on exercises (Content is 14.7, 14.8 in the textbook) |
120分 |
| Work on exercises and preparation for Mid-term | 260分 | ||
| 7. | Mid-term exam and discussions on the solutions afterwards | Preparation for Mid-term | 380分 |
| 8. | Double Integrals Double Integrals in Polar Coordinates Applications of Double Integrals |
Read the lecture notes and work on exercises (Content is 15.1-15.4 in the textbook) |
180分 |
| Work on exercises and preparation for Quiz | 200分 | ||
| 9. | Triple Integrals Triple Integrals in Cylindrical and Spherical Coordinates |
Read the lecture notes and work on exercises (Content is 15.6-15.8 in the textbook) |
120分 |
| Work on exercises and preparation for Quiz | 260分 | ||
| 10. | Vector Fields Line Integrals |
Read the lecture notes and work on exercises (Content is 16.1, 16.2 in the textbook) |
160分 |
| Work on exercises and preparation for Quiz | 220分 | ||
| 11. | The fundamental Theorem of Line Integrals Green’s Theorem |
Read the lecture notes and work on exercises (Content is 16.3, 16.4 in the textbook) |
160分 |
| Work on exercises and preparation for Quiz | 220分 | ||
| 12. | Curl and Divergence Parametric Surfaces Surface Areas |
Read the lecture notes and work on exercises (Content is 16.5, 16.6 in the textbook) |
140分 |
| Work on exercises and preparation for Quiz | 220分 | ||
| 13. | Surface Integrals Stokes’ Theorem Divergence Theorem |
Read the lecture notes and work on exercises (Content is 16.7-16.9 in the textbook) |
120分 |
| Work on exercises and preparation for Final | 260分 | ||
| 14. | Final exam and discussions on the solutions afterwards | Preparation for Final | 380分 |
| Total. | - | - | 5300分 |
| Mid-term etc. | Final | Total. | |
|---|---|---|---|
| 1. | 12% | 3% | 15% |
| 2. | 30% | 5% | 35% |
| 3. | 20% | 10% | 30% |
| 4. | 8% | 12% | 20% |
| Total. | 70% | 30% | - |
Quiz and mid-term exam will contribute 50% of your grade.
Final exam will contribute 50% of your grade.
Those who get at least 60% of the full score will pass this course.
Final exam will contribute 50% of your grade.
Those who get at least 60% of the full score will pass this course.
Calculus: Early Transcendentals, 8th edition, James Stewart
ISBN: 978-1285741550
ISBN: 978-1285741550
Content of the syllabus of the courses "Calculus I" and "Calculus II". In particular, the topics such as derivatives of various
functions, definite & indefinite integrals, the fundamental theorem of calculus, and polar coordinates.
- By appointment. Contact e-mail address: ikegami@shibaura-it.ac.jp
- Course that cultivates an ability for utilizing knowledge
- Course that cultivates a basic interpersonal skills
| Work experience | Work experience and relevance to the course content if applicable |
|---|---|
| N/A | N/A |
Last modified : Wed Sep 14 04:03:35 JST 2022