Course Objectives
Learning purposes : Learn topology and its way of thinking.
Course Objectives :
1. Acquire the knowledge of mathematics, computational skills, and applied skills necessary to solve basic engineering problems.
2. Understand Euclidean geometry and topology.
3. Understand Euclidean space and its shapes.
4. Understand the deformation and mapping of figures.
Rubric
| Excellent | Good | Acceptable | Not acceptable |
Achievement 1 | Have mastered the applied skills of mathematics necessary to solve basic engineering problems. | Be familiar with the knowledge of mathematics and have mastered computational skills necessary to solve basic engineering problems. | Have acquired the knowledge of mathematics necessary to solve basic engineering problems. | Insufficient knowledge of mathematics and calculation skills necessary to solve basic engineering problems. |
Achievement 2 | Understand the relationship between isometric transformations and joint transformations. | Understand the concept of topology. | Understands Euclidean geometry and similar geometry. | Lack of understanding of Euclidean geometry and topology. |
Achievement 3 | Understands figure crafting, graphs, and self-similar figures. | Understand the concept of figures from a topological point of view. | Understand distance and Euclidean space. | Lack of understanding of the concept of Euclidean space and figures. |
Achievement 4 | Understand the sequence of points in a shape and its convergence. | Understand the nature of mapping. | Understand that the deformation of a figure is represented by a map. | There is a lack of understanding of the deformation of figures and the sequence of points. |
Assigned Department Objectives
Teaching Method
Outline:
General or Specialized : Specialized
Field of learning : Common and basics of natural science
Foundational academic disciplines : Mathematical science / mathematics / mathematics in general
Relationship with Educational Objectives : This class is equivalent to "(1) To deepen the knowledge of natural science subjects centered on mathematics and physics, broaden their knowledge of the humanities and social sciences, and acquire the ability to apply it as basic academic ability related to mechanical / control system engineering and electronic / information system engineering".
Relationship with JABEE programs : The main goals of learning / education in this class are "(A), A-1".
Course outline : One way to solve problems that occur in engineering is to grasp the essence of the phenomenon and cut it down from what you can understand. The significance of this lecture is to learn how to see and use useful things in such cases. Topology is a discipline that examines the property of maintaining invariance even when a figure is continuously deformed. Through this, we learn how to see what is invariant, that is, what captures the essence.
Style:
Course method : Classes will be centered on board writing, but at the same time, as much exercise time as possible will be provided so that students can understand the content of the lecture more deeply and acquire the ability to solve problems on their own.
Grade evaluation method : Evaluate by regular examination (60%) and report (40%). For students whose grades at the end of the first semester are less than 60 points, a re-test or report assignment will be given with advance instructions if attendance and class attitude are good. Students who pass the re-test or the report assignment will receive a final grade of 60 points.
Notice:
Precautions on the enrollment : This is a class that requires study outside of class hours. A total of 45 hours of study is required per credit, including both class time and study outside class time. Follow the instructions of the instructor regarding study outside of class hours.
Course advice :
・ As a preparatory study to be conducted in advance, review the contents of basic mathematics I, basic mathematics II, calculus I, calculus II, and basic linear algebra, which are the basic subjects.
・ It is important to make sure to prepare and review, and to understand the lecture contents more deeply by solving the exercises on your own.
Foundational subjects : Basic Mathematics I (1st year), Basic Mathematics II (1), Calculus I (2), Calculus II (3), Basic Linear Algebra (2)
Related subjects : Subjects of each specialized department
Attendance advice : It is important to understand the content of the lecture well and solve the problem by yourself. I want you to value finding a solution on your own. If you are late a lot, you may be treated as absent after giving a warning.
Spiraling up from the regular course: This course is a subject that expands the mathematics-related subjects learned in the regular course into the study of topology.
Characteristics of Class / Division in Learning
Course Plan
|
|
|
Theme |
Goals |
1st Semester |
1st Quarter |
1st |
Guidance, Euclidean geometry
Learning content outside class hours: Report assignment (1) "Euclidean geometry and topology" |
Understand congruence transformation and become familiar with the properties of invariant figures under congruence transformation.
|
2nd |
Similar geometry
Learning content outside class hours: Report assignment (1) "Euclidean geometry and topology |
Understand similarity transformations and become familiar with the properties of invariant figures under similarity transformations.
|
3rd |
topology
Learning content outside class hours: Report assignment (1) "Euclidean geometry and topology |
Familiarize yourself with the idea of topology.
|
4th |
Isometric transformation and joint transformation
Learning content outside class hours: Report assignment (1) "Euclidean geometry and topology |
Understand the relationship between isometric transformation and joint transformation.
|
5th |
Exercise (Euclidean geometry and topology)
Learning content outside class hours: Report assignment (1) "Euclidean geometry and topology |
|
6th |
Distance and Euclidean space
Learning content outside class hours: Report assignment (2) "Euclidean space and its figures" |
Familiarize yourself with distance and Euclidean space.
|
7th |
Shape
Learning content outside class hours: Report assignment (2) "Euclidean space and its figures" |
Familiarize yourself with some examples of shapes in Euclidean space.
|
8th |
Crafting figures, graphs, and self-similar figures
Learning content outside class hours: Report assignment (2) "Euclidean space and its figures" |
Familiarize yourself with figure work, graphs, and self-similar figures.
|
2nd Quarter |
9th |
Set and logic
Learning content outside class hours: Report assignment (2) "Euclidean space and its figures" |
Familiarize yourself with sets and logic.
|
10th |
Exercise (Euclidean space and its figures)
Learning content outside class hours: Report assignment (2) "Euclidean space and its figures" |
|
11th |
Shape transformation
Learning content outside class hours: Report assignment (3) "Transformation and mapping of figures" |
Understand the basic properties of figure deformation and represent the deformation by mapping.
|
12th |
Map
Learning content outside class hours: Report assignment (3) "Transformation and mapping of figures" |
Familiarize yourself with the nature of mapping.
|
13th |
Sequences and point sequences of figures
Learning content outside class hours: Report assignment (3) "Transformation and mapping of figures" |
Understand the sequence of numbers and the sequence of points of figures, and show convergence by the ε-N theory.
|
14th |
Exercise (transformation and mapping of figures)
Learning content outside class hours: Report assignment (3) "Transformation and mapping of figures" |
|
15th |
(final exam) |
|
16th |
Return and commentary of the final exam answer |
|
Evaluation Method and Weight (%)
| Examination | Presentation | Mutual Evaluations between students | Behavior | Portfolio | Other | Total |
Subtotal | 60 | 0 | 0 | 0 | 0 | 40 | 100 |
Basic Proficiency | 0 | 0 | 0 | 0 | 0 | 0 | 0 |
Specialized Proficiency | 60 | 0 | 0 | 0 | 0 | 40 | 100 |
Cross Area Proficiency | 0 | 0 | 0 | 0 | 0 | 0 | 0 |