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Course Information
Course Unit Title : Quantum Mechanics (I)
Course Unit Code : FIZ405
Type of Course Unit : Compulsory
Level of Course Unit : First Cycle
Year of Study : 4
Semester : 7.Semester
Number of ECTS Credits Allocated : 7,00
Name of Lecturer(s) : ---
Course Assistants :
Learning Outcomes of The Course Unit : 1) To learn some basic principles of Quantum mechanics 2) To understand the hermitian operators 3) To understand the commutation of two operators 4) To learn the solving of Schrödinger Equation for the hydrogen atom 5) To learn the simulation of Schrödinger equation to three dimension problems
Mode of Delivery : Face-To-Face
Prerequisities and Co-requisities Courses : Unavailable
Recommended Optional Programme Components : Unavailable
Course Contents : Wave function space, Closery relation, Schwartz inequality, Matrix representations of linear operators, Hermitian operators, Gram-Schmidt orthogonality, Superposition principle, III. and IV. Postulates of quantum mechanics, Commutation and commutators, Dirac notation, Parity and projection operators, the eigenvalue equations of angular momentum operators, Legendre polynomials, Spherical harmonics, Radial Schrodinger wave equation, Bessel functions, Three-dimensional potential problems, Laguerre polynomials
Languages of Instruction : Turkish-English
Course Goals :
Course Aims : To understand and interpret on some basic principles of Quantum Mechanics
WorkPlacement   Not Available
Recommended or Required Reading
Textbook : Bekir Karaoğlu ?Kuantum Mekaniğine Giriş? Güven Kitap Evi, İstanbul,1998.
Additional Resources : David J. Griffits ?Kuantum Mekaniğine Giriş? Prentice Hall, New Jersey, 1995.
Material Sharing
Documents :
Assignments :
Exams :
Additional Material :
Planned Learning Activities and Teaching Methods
Lectures, Practical Courses, Presentation, Seminar, Project, Laboratory Applications (if necessary)
ECTS / Table Of Workload (Number of ECTS credits allocated)
Student workload surveys utilized to determine ECTS credits.
Activity :
Number Duration Total  
Course Duration (Excluding Exam Week) :
14 6 84  
Time Of Studying Out Of Class :
14 5 70  
Homeworks :
5 9 45  
Presentation :
0 0 0  
Project :
0 0 0  
Lab Study :
0 0 0  
Field Study :
0 0 0  
Visas :
1 2 2  
Finals :
1 2 2  
Workload Hour (30) :
30  
Total Work Charge / Hour :
203  
Course's ECTS Credit :
7      
Assessment Methods and Criteria
Studies During Halfterm :
Number Co-Effient
Visa :
1 70
Quiz :
2 15
Homework :
3 15
Attendance :
0 0
Application :
0 0
Lab :
0 0
Project :
0 0
Workshop :
0 0
Seminary :
0 0
Field study :
0 0
   
TOTAL :
100
The ratio of the term to success :
40
The ratio of final to success :
60
TOTAL :
100
Weekly Detailed Course Content
Week Topics  
1 Wave Function Space, Closery relation, Linear operators
 
2 Hermitic operators, Gramm-Schmidt ortagonality method, Superposition principle
 
3 Commutation, Commutators and calculus, The uncertainty principle
 
4 Time evaluation of a physical quantity. Physical comment on Energy-time uncertainty relationship
 
5 Common properties of operators commuting, Dirac Bra-ket notation and some special operators
 
6 Problems
 
7 Spherical symmetric potential
 
8 Angular momentum special functions
 
9 Legendre polynomials and their properties
 
10 Spherical harmonics
 
11 Radial Schrödinger equation 1)General properties 2) their applications
 
12 Hydrogen atom and its reducing to a two-particle system
 
13 Hydrogen atom, Radial wave function, Properties of Laguerre polynomials
 
14 Problems