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Course Unit Title | Course Unit Code | Type of Course Unit | Level of Course Unit | Year of Study | Semester | ECTS Credits |
---|---|---|---|---|---|---|
Theory of Symmetry and Group | KIM326 | Elective | Bachelor's degree | 3 | Spring | 5 |
Prof. Dr. Asgar KAYAN
Prof. Dr. Muhammet Erkan KÖSE
Assistant Prof. Dr. Saadet BEYAZ
1) Recognizing the symmetry concepts
1) Recognizing the symmetry concepts
2) Identifying the symmetry elements
2) Identifying the symmetry elements
3) Defining the symmetry operations
3) Defining the symmetry operations
4) Explaning the point groups
4) Explaning the point groups
5) Recognizing the reducable representations
5) Recognizing the reducable representations
6) Differantiating the vibrations by using symmetry knowledge
6) Differantiating the vibrations by using symmetry knowledge
Program Competencies | |||||||||||||
1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | 11 | 12 | ||
Learning Outcomes | |||||||||||||
1 | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | |
1 | Middle | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | |
2 | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | |
2 | Middle | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | |
3 | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | |
3 | High | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | |
4 | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | |
4 | Middle | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | |
5 | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | |
5 | Middle | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | |
6 | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | |
6 | High | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation |
Face to Face
None
there is not
This course includes symmetry theory, symmetry operations and point groups, reducable representation and character tables, molecular vibrations, molecular orbital and energy diagrams.
1- Molecular symmetry and group theory, Alan Vincent.
2- Inorganic Chemistry, James E. Huheey.
3- Chemical application of the group theory, F. Albert cotton.
English
Not Required