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Course Unit Title | Course Unit Code | Type of Course Unit | Level of Course Unit | Year of Study | Semester | ECTS Credits |
---|---|---|---|---|---|---|
Molecular Orbital Theory | KIM524 | Elective | Master's degree | 1 | Spring | 8 |
Prof. Dr. Asgar KAYAN
Associate Prof. Dr. MELTEM GÖKSEL ŞAHIN
Associate Prof. Dr. Duygu İNCİ
1) Aply molecular orbital theory in interaction between molecules.
2) Explain the Huckel theory and applications.
3) Comprehending the symmetry and group theory.
4) Defining the character table and applications of symetry.
5) Constructing the MOED of octahedral molecules with MOT.
6) Constructing the MOED of tetrahedral molecules with MOT.
Program Competencies | |||||||
1 | 2 | 3 | 4 | 5 | 6 | ||
Learning Outcomes | |||||||
1 | Middle | No relation | No relation | No relation | No relation | No relation | |
2 | Middle | No relation | No relation | No relation | No relation | No relation | |
3 | Middle | No relation | No relation | No relation | No relation | No relation | |
4 | Middle | No relation | No relation | No relation | No relation | No relation | |
5 | Middle | No relation | No relation | No relation | No relation | No relation | |
6 | Middle | No relation | No relation | No relation | No relation | No relation |
Face to Face
None
Symmetry and group theory
This course provides candidates with profound knowledge specifically on molecular orbital theory, Schrödinger equations, LCAO method, Huckel theory and applications, secular determinant determination, delocalization enegry, charge density, bond order, symmetry elements and applications ,schoenflies point groups, chracteric tables, and symmetry applications.
1) Lecture
2) Discussion
3) Demonstration
4) Group Study
5) Problem Solving
Contribution of Midterm Examination to Course Grade |
40% |
---|---|
Contribution of Final Examination to Course Grade |
60% |
Total |
100% |
Turkish
Not Required