study program 2016/2017 subjects of the 1-2. …. bugyi beáta 16 indefinite integrals: basic...
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UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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University of Pécs Faculty of Pharmacy
PHARMACY Major
STUDY PROGRAM 2016/2017
Subjects of the 1-2. semesters
(obligatory subjects and criterion requirements)
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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1st semester
OPA-AM1 General and Inorganic Chemistry 1 _________________________________________________________________ 3
OPA-B1E Biomathematics 1 - Theory _______________________________________________________________________ 6
OPA-B1G Biomathematics 1 - Practice _______________________________________________________________________ 8
OPA-L1E Analytical Chemistry 1 - Theory __________________________________________________________________ 10
OPA-L1G Analytical Chemistry 1 - Practice __________________________________________________________________ 13
OPG-GPR Pharmaceutical Propedeutics _____________________________________________________________________ 15
OPO-GL1 Pharmaceutical Biology 1 ________________________________________________________________________ 17
OPR-ESE First Aid _____________________________________________________________________________________ 20
OPR-LAT Pharmaceutical Terminology _____________________________________________________________________ 21
2nd semester
OPA-B2E Biomathematics 2 - Theory ______________________________________________________________________ 23
OPA-B2G Biomathematics 2 - Practice ______________________________________________________________________ 25
OPA-FZ1 Physical Chemistry 1 ___________________________________________________________________________ 27
OPA-L2E Analytical Chemistry 2 - Theory __________________________________________________________________ 30
OPA-L2G Analytical Chemistry 2 - Practice __________________________________________________________________ 32
OPA-M2E General and Inorganic Chemistry 2 - Theory _________________________________________________________ 34
OPA-M2G General and Inorganic Chemistry 2 - Practice ________________________________________________________ 36
OPA-Z2E Physics-Biophysics 2 - Theory ____________________________________________________________________ 38
OPA-Z2G Physics-Biophysics 2 - Practice ___________________________________________________________________ 40
OPO-AI1 Human Anatomy, Histology and Embriology 1 _______________________________________________________ 42
OPO-GB2 Pharmaceutical Biology 2 ________________________________________________________________________ 44
ATT1-2-3-4 Physical Education 1-2-3-4 ____________________________________________________________________ 47
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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OPA-AM1 GENERAL AND INORGANIC CHEMISTRY 1
Course director: DR. PÁL PERJÉSI, professor
Department of Pharmaceutic Chemistry
3 credit ▪ semester exam ▪ Basic module ▪ autumn semester ▪ recommended semester: 1
Number of hours/semester: 28 lectures + 0 practices + 14 seminars = total of 42 hours
Course headcount limitations (min.-max.): 5 – 50 Prerequisites:
Topic
The course includes the General Chemistry topics that are essential for pharmacy students to study the Chemistry-related subjects in the higher semesters.
Conditions for acceptance of the semester
Acknowledgement of the course is in accord with the Code of studies and Examinations. Maximum three absences can be accepted both
from lectures and seminars. Two tests will be written during the semester (on the 7th and the 12th weeks) based on the topics of the lectures
and the seminars. The result of both tests should be above 60%. One re-take chance is allowed after both tests. Evaluation of semester
performance is based on the results of the written tests.
Mid-term exams
Making up for missed classes
There is no opportunity to make up missed classes (lectures and seminars).
Reading material
- Obligatory literature
Ebbing D.D., Gammon S.D.: General Chemistry, Houghton Miffilin Co., Boston, 2009.
- Literature developed by the Department
Almási A., Kuzma M., Perjési P.: General and Inorganic Chemistry - Laboratory Techniques and Practices, University of Pécs, 2014. Electronic educational material.
- Notes
- Recommended literature
en.wikibooks.org/wiki/General_Chemistry
Lectures
1 Classification of matter. Atomic structure. Electron configuration and periodicity. The periodic table. Periodic properties.
Dr. Perjési Pál
2 Classification of matter. Atomic structure. Electron configuration and periodicity. The periodic table. Periodic properties.
Dr. Perjési Pál
3 Structure of molecules. Chemical bonding. Chemical bonding theories. Valence bond theory. Hybrid orbitals. Molecular orbital theory. Moleculas geometry.
Dr. Molnár Péter
4 Structure of molecules. Chemical bonding. Chemical bonding theories. Valence bond theory. Hybrid orbitals. Molecular orbital
theory. Moleculas geometry.
Dr. Molnár Péter
5 States of matter. The gaseous state. Gas laws. Intermolecular forces. The liquid state. The solid state. Phase transitions. Phase
diagrams.
Dr. Molnár Péter
6 States of matter. The gaseous state. Gas laws. Intermolecular forces. The liquid state. The solid state. Phase transitions. Phase
diagrams.
Dr. Molnár Péter
7 Water and the aqueous solutions. Dissolution of gases, liquids and solids in liquids. Types of electrolytes. Electrolytic
dissociation, degree of dissociation, conductivity, and their relationships
Dr. Molnár Péter
8 Water and the aqueous solutions. Dissolution of gases, liquids and solids in liquids. Types of electrolytes. Electrolytic dissociation, degree of dissociation, conductivity, and their relationships.
Dr. Molnár Péter
9 Chemical kinetics. Reaction rates. The collision theory. Rate laws and reaction mechanisms.
Dr. Molnár Péter
10 Chemical kinetics. Reaction rates. The collision theory. Rate laws and reaction mechanisms.
Dr. Molnár Péter
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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11 Chemical equilibria. LeChatelier’s principle. Protolytic reactions I. Ionization of water. The pH scale.
Dr. Lóránd Tamás
12 Chemical equilibria. LeChatelier’s principle. Protolytic reactions I. Ionization of water. The pH scale.
Dr. Lóránd Tamás
13 Protolytic reactions II. Acid-base concepts. Acid-base equilibria.
Dr. Lóránd Tamás
14 Protolytic reactions II. Acid-base concepts. Acid-base equilibria.
Dr. Lóránd Tamás
15 Buffers. Physiological buffer systems. Acid-base titrations.
Dr. Lóránd Tamás
16 Buffers. Physiological buffer systems. Acid-base titrations.
Dr. Lóránd Tamás
17 Heterogeneous equilibria. Thermodynamics and equilibrium.
Dr. Perjési Pál
18 Heterogeneous equilibria. Thermodynamics and equilibrium.
Dr. Perjési Pál
19 Colligative properties. Colloids.
Dr. Perjési Pál
20 Colligative properties. Colloids.
Dr. Perjési Pál
21 Thermochemistry. Basic thermodynamics.
Dr. Perjési Pál
22 Thermochemistry. Basic thermodynamics.
Dr. Perjési Pál
23 Electrochemistry I.
Dr. Perjési Pál
24 Electrochemistry I.
Dr. Perjési Pál
25 Electrochemistry II.
Dr. Perjési Pál
26 Electrochemistry II.
Dr. Perjési Pál
27 Complex ions and coordination compounds I. Structure and isomerism.
Dr. Perjési Pál
28 Complex ions and coordination compounds I. Structure and isomerism.
Dr. Perjési Pál
Practices
Seminars
1 The periodic table. Periodic properties.
2 The gaseous state. Kinetic theory of gases. Thermodynamic parameters, state functions.
3 Basics of thermodynamics. Internal energy and enthalpy. Entropy.
4 Chemical kinetics. Rate of reactions and reaction order. Temperature dependence of the reaction rate.
5 Homogeneous and heterogeneous chemical equilibria. Equilibrium constant. Le Chateleir principle.
6 Free energy change of chemical reactions. Thermodynamic requirements of spontaneous chemical reactions.
7 Conductivity of electrolytes. Strong and weak electrolytes.
8 Acid-base theories. (Arrhenius, Bronsted-Lowry, Lewis, Pearson)
9 Formation and stability of complexes. Theories of complex formation.
10 pH of aqueous solutions I. Hydrolysis of salts. The hydrolysis constant.
11 pH of aqueous solutions II. Buffers. Buffer capacity.
12 Galvanic cells. Electrode potential. Electrodes of first and second kind.
13 Redox potential. Thermodynamic requirements of spontaneous redox reactions.
14 Electrolysis. Decomposition voltage. Polarization.
Exam topics/questions
Written test covering the topics of the lectures and the laboratory practices. The result of the written test must be above 60%. The final
grade is based on results of the midterm tests and the written test. Maximum contribution of the results of the midterm tests to to the total score of the written test can be 25%. Participation on the first exam is compulsory.
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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Participants
Gulyás Gergely (GUGSAAP.PTE), Kulcsár Győző (KUGDAA.T.JPTE)
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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OPA-B1E BIOMATHEMATICS 1 - THEORY
Course director: DR. LÁSZLÓ GRAMA, assistant professor
Department of Biophysics
2 credit ▪ semester exam ▪ Basic module ▪ autumn semester ▪ recommended semester: 1
Number of hours/semester: 28 lectures + 0 practices + 0 seminars = total of 28 hours
Course headcount limitations (min.-max.): 1 – Prerequisites: OPA-B1G parallel
Topic
Introduction into fundamentals and methods of mathematical analysis. Applications in the fields of physics, chemistry and biology. The course focuses on the acquisition of the basic knowledge of mathematics and special courses will introduce the special applications.
Topics discussed during the course: Definition, type and discussion of the functions. Derivatives of elementary functions, geometrical
interpretation, differentiation rules and applications. Integration. Solving basic integral problems and differential equations. Examples from physics, chemistry and biology.
Conditions for acceptance of the semester
Maximum of 25 % absence allowed
Mid-term exams
Making up for missed classes
Reading material
- Obligatory literature
- Literature developed by the Department
biofizika.aok.pte.hu
- Notes
József Belágyi, László Mátyus, Miklós Nyitrai: Mathematics, textbook
Péter Hajdu, László Grama: Selected Problems in Mathematics, problems booklet
- Recommended literature
Lectures
1 Introduction: a biological example. Variables and functions
Dr. Grama László
2 Introduction: a biological example. Variables and functions
Dr. Grama László
3 Properties of functions: monotonic, periodic, exponential and log functions. Family of standard functions
Dr. Grama László
4 Properties of functions: monotonic, periodic, exponential and log functions. Family of standard functions
Dr. Grama László
5 Limits and continuity of functions
Dr. Grama László
6 Limits and continuity of functions
Dr. Grama László
7 Sequences and series. Infinite series, test of convergence
Dr. Grama László
8 Sequences and series. Infinite series, test of convergence
Dr. Grama László
9 Rate of change and its limit. Derivatives of elementary functions. Rules of differentiation
Pirisi Katalin Erzsébet
10 Rate of change and its limit. Derivatives of elementary functions. Rules of differentiation
Pirisi Katalin Erzsébet
11 Higher order derivatives. Taylor’s expansion of functions
Pirisi Katalin Erzsébet
12 Higher order derivatives. Taylor’s expansion of functions
Pirisi Katalin Erzsébet
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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13 Maximum and minimum of functions. Applications for physical problems
Pirisi Katalin Erzsébet
14 Maximum and minimum of functions. Applications for physical problems
Pirisi Katalin Erzsébet
15 Indefinite integrals: basic integrals. Techniques of integration
Dr. Bugyi Beáta
16 Indefinite integrals: basic integrals. Techniques of integration
Dr. Bugyi Beáta
17 Integration by parts and substitutions, composite functions
Dr. Bugyi Beáta
18 Integration by parts and substitutions, composite functions
Dr. Bugyi Beáta
19 Definite integral. Newton-Leibniz’s rule. Applications
Dr. Bugyi Beáta
20 Definite integral. Newton-Leibniz’s rule. Applications
Dr. Bugyi Beáta
21 Differential equations. Types of differential equations. Separable differential equations
Dr. Bugyi Beáta
22 Differential equations. Types of differential equations. Separable differential equations
Dr. Bugyi Beáta
23 Solution of first-order differential equations
Dr. Bugyi Beáta
24 Solution of first-order differential equations
Dr. Bugyi Beáta
25 Application of differential equations: chemical reactions, enzymatic reactions
Dr. Bugyi Beáta
26 Application of differential equations: chemical reactions, enzymatic reactions
Dr. Bugyi Beáta
27 Higher order differential equations. Compartment models
Dr. Bugyi Beáta
28 Higher order differential equations. Compartment models
Dr. Bugyi Beáta
Practices
Seminars
Exam topics/questions
biofizika.aok.pte.hu
Participants
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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OPA-B1G BIOMATHEMATICS 1 - PRACTICE
Course director: DR. LÁSZLÓ GRAMA, assistant professor
Department of Biophysics
2 credit ▪ midsemester grade ▪ Basic module ▪ autumn semester ▪ recommended semester: 1
Number of hours/semester: 0 lectures + 28 practices + 0 seminars = total of 28 hours
Course headcount limitations (min.-max.): 1 – Prerequisites:
Topic
Introduction into fundamentals and methods of mathematical analysis. Applications in the fields of physics, chemistry and biology. The course focuses on the acquisition of the basic knowledge of mathematics and special courses will introduce the special applications.
Topics discussed during the course: Definition, type and discussion of the functions. Derivatives of elementary functions, geometrical
interpretation, differentiation rules and applications. Integration. Solving basic integral problems and differential equations. Examples from physics, chemistry and biology.
Conditions for acceptance of the semester
Maximum of 25 % absence allowed
Mid-term exams
Making up for missed classes
Reading material
- Obligatory literature
- Literature developed by the Department
biofizika.aok.pte.hu
- Notes
József Belágyi, László Mátyus, Miklós Nyitrai: Mathematics, textbook
Péter Hajdu, László Grama: Selected Problems in Mathematics, problems booklet
- Recommended literature
Lectures
Practices
1 Introduction: a biological example. Variables and functions
2 Introduction: a biological example. Variables and functions
3 Properties of functions: monotonic, periodic, exponential and log functions. Family of standard functions
4 Properties of functions: monotonic, periodic, exponential and log functions. Family of standard functions
5 Limits and continuity of functions
6 Limits and continuity of functions
7 Sequences and series. Infinite series, test of convergence
8 Sequences and series. Infinite series, test of convergence
9 Rate of change and its limit. Derivatives of elementary functions. Rules of differentiation
10 Rate of change and its limit. Derivatives of elementary functions. Rules of differentiation
11 Higher order derivatives. Taylor’s expansion of functions
12 Higher order derivatives. Taylor’s expansion of functions
13 Maximum and minimum of functions. Applications for physical problems
14 Maximum and minimum of functions. Applications for physical problems
15 Indefinite integrals: basic integrals. Techniques of integration
16 Indefinite integrals: basic integrals. Techniques of integration
17 Integration by parts and substitutions, composite functions
18 Integration by parts and substitutions, composite functions
19 Definite integral. Newton-Leibniz’s rule. Applications
20 Definite integral. Newton-Leibniz’s rule. Applications
21 Differential equations. Types of differential equations. Separable differential equations
22 Differential equations. Types of differential equations. Separable differential equations
23 Solution of first-order differential equations
24 Solution of first-order differential equations
25 Application of differential equations: chemical reactions, enzymatic reactions
26 Application of differential equations: chemical reactions, enzymatic reactions
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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27 Higher order differential equations. Compartment models
28 Higher order differential equations. Compartment models
Seminars
Exam topics/questions
biofizika.aok.pte.hu
Participants
Dr. Bugyi Beáta (BUBEAB.T.JPTE), Dr. Grama László (GRLHAAO.PTE), Pirisi Katalin Erzsébet (PIKPACT.PTE)
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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OPA-L1E ANALYTICAL CHEMISTRY 1 - THEORY
Course director: DR. IMRE HUBER, senior research fellow
Department of Pharmaceutic Chemistry
2 credit ▪ semester exam ▪ Basic module ▪ autumn semester ▪ recommended semester: 1
Number of hours/semester: 28 lectures + 0 practices + 0 seminars = total of 28 hours
Course headcount limitations (min.-max.): 5 – 65 Prerequisites: OPA-L1G parallel
Topic
Topic
Within the frame of the theoretical and practical trainings of this subject students will study the analytical approach of chemistry. This
approach is crucial for the study of almost all pharmaceutical sciences like pharmaceutical chemistry, pharmaceutical technology etc.
Students have to learn and examine the theory and practice of analytical reactions, methods, rules and calculations. Students will learn
how to identify an unknown inorganic sample in both simple and complex manner of the analysis. At the end of the semester they should
be able to know how to analyze an unknown sample for the most important cations and anions. Students should prove to demonstrate that they know how to use the theoretical knowledge in the pharmaceutical practice while finding out what their unknown sample is.
Conditions for acceptance of the semester
Maximum of 15 % absence allowed
Mid-term exams
The students will have to write two written mid-term tests. Both can be repeated one time only. The result must be above 60%,
respectively!!
Exam topics/questions
The semester is closed with a written test. In the case the result will not reach the 60% level, the student fails, she or he has to repeat the
exam. In all other cases (above 60%), the student will receive a grade from qualitative inorganic analysis, based on the results of the two
written tests and the overall result of the practical work throughout the semester (maximum score: 5 points).
The maximum number of absences is three. Above this number the acceptance of the semester is to be refused!
Making up for missed classes
Reading material
- Obligatory literature
A. Lásztity, J. Gyimesi: Qualitative Inorganic Analysis
- Literature developed by the Department
The students will receive lecture notes from the lecturer.
- Notes
- Recommended literature
1. P.W. West, M.M. Vieck, A.L. LeRosen: Qualitative Analysis and Analytical Chemical Separations
2. H F. Holtzclaw, W. R. Robinson: College Chemistry with Qualitative Analysis
Lectures
1 Definition, principles
Dr. Huber Imre
2 Topic of qualitative inorganic analysis
Dr. Huber Imre
3 Equilibrium reactions in solution
Dr. Huber Imre
4 Definition, calculations
Dr. Huber Imre
5 Classification of chemical reactions
Dr. Huber Imre
6 Electrode potentials
Dr. Huber Imre
7 Sensitivity and
Dr. Huber Imre
8 Specificity of a chemical reaction
Dr. Huber Imre
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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9 Classification of the cations
Dr. Huber Imre
10 1st group of cations
Dr. Huber Imre
11 2nd group of cations
Dr. Huber Imre
12 Separation of the first two groups
Dr. Huber Imre
13 3rd group of cations I
Dr. Huber Imre
14 3rd group of cations II
Dr. Huber Imre
15 3rd group of cations III
Dr. Huber Imre
16 Separation of the 3rd group
Dr. Huber Imre
17 4th group of cations
Dr. Huber Imre
18 5th group of cations
Dr. Huber Imre
19 Classification of anions
Dr. Huber Imre
20 1st anion group
Dr. Huber Imre
21 2nd anion group I
Dr. Huber Imre
22 2nd anion group I
Dr. Huber Imre
23 3rd anion group
Dr. Huber Imre
24 3rd anion group II
Dr. Huber Imre
25 4th anion group I
Dr. Huber Imre
26 4th anion group II
Dr. Huber Imre
27 Final written test
Dr. Huber Imre
28 Summary
Dr. Huber Imre
Practices
Seminars
Exam topics/questions
1.) Definition, principles and topic of qualitative inorganic analysis. Quality assurance and control of chemical substances and active
pharmaceutical ingredients. Available reactions. Stoichiometry.
2. Equilibrium reactions in solution, definition, calculations. Acid-base theories, calculation of pH, complexes (steric structures and isomerism), precipitate formation, solubility.
3.) Classification of chemical reactions: acid-base, complex-forming, and redox reactions. Electrode potentials.
4.) Sensitivity and specificity of chemical reactions. Dilution limit, limit-concentration. Analytical equipment, methods (macro, micro, semimicro, etc.). Preliminary investigations: sample-taking, homogenization, dissolution, digestion, direct heating, flame-test, etc.
5.) Classification of the cations: 1st group of cations (Ag+, Pb2+, Hg22+, Hg2+, Cu2+, Cd2+, Bi3+).
6.) 2nd group of cations (As3+, As5+, Sb3+, Sb5+, Sn2+, Sn4+. Separation of the first two groups of cations.
7.) 3rd group of cations I. (Co2+, Ni2+, Fe2+, Fe3+, Cr3+, Mn2+, Al3+, Zn2+).
8.) 3rd group of cations II. (Co2+, Ni2+, Fe2+, Fe3+, Cr3+, Mn2+, Al3+, Zn2+). Separation of the 3rd group of cations.
9.) 4th and 5th group of cations (Ca2+, Sr2+, Ba2+; Mg2+, Li+, Na+, K+, NH4+). Separation of the 4th and 5th group. Separation of
magnesium ion from the other ions of the 5th group.
10.) Classification of the anions: 1st group of anions (CO32-, HCO3-, SO32-, S2O32-, S2- and Sx2-, SiO32-, OCl-).
11.) 2nd group of anions (IO3-, BrO3-, SO42-, PO43-, B(OH)4-, F-).
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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12.) 3rd group of anions (Cl-, Br-, I-, CN-, SCN-).
13.) 4th group of anions (NO2-, NO3-, ClO3-, ClO4-, CH3COO-). Complex analysis: cation(s) and anion(s) in the same sample. Practices
Participants
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
13
OPA-L1G ANALYTICAL CHEMISTRY 1 - PRACTICE
Course director: DR. IMRE HUBER, senior research fellow
Department of Pharmaceutic Chemistry
3 credit ▪ midsemester grade ▪ Basic module ▪ autumn semester ▪ recommended semester: 1
Number of hours/semester: 0 lectures + 42 practices + 0 seminars = total of 42 hours
Course headcount limitations (min.-max.): 5 – 65 Prerequisites:
Topic
Topic
Within the frame of the theoretical and practical trainings of this subject students will study the analytical approach of chemistry. This
approach is crucial for the study of almost all pharmaceutical sciences like pharmaceutical chemistry, pharmaceutical technology etc.
Students have to learn and examine the theory and practice of analytical reactions, methods, rules and calculations. Students will learn
how to identify an unknown inorganic sample in both simple and complex manner of the analysis. At the end of the semester they should
be able to know how to analyze an unknown sample for the most important cations and anions. Students should prove to demonstrate that they know how to use the theoretical knowledge in the pharmaceutical practice while finding out what their unknown sample is.
Conditions for acceptance of the semester
Maximum of 15 % absence allowed
Mid-term exams
The knowledge and practical ability of the students will be measured by unknown tests. That means, that they will be given certain
amount (number) of unknown analytical samples to be identified by the usual chemical reactions, possible analytical methods! Every
student will have his or her own sample set for individual practical work. The result of this work must be above 70%!
Making up for missed classes
All missed practicals are to be recovered on the next meeting (next week)!
Reading material
- Obligatory literature
A. Lásztity, J. Gyimesi: Qualitative Inorganic Analysis
- Literature developed by the Department
The students will receive practical guidance from the given instructor week by week.
- Notes
- Recommended literature
Lectures
Practices
1 Laboratory regulations, safety, protection against accidents, notebook (keeping and recording), laboratory equipment and working place.
2 Safety instructions
3 Laboratory equipment
4 Investigation of the reactions of silver, lead,
5 Mercury(I) and (II),
6 Copper, cadmium and bismuth cations.
7 Study of arsenic,
8 Antimony and
9 Tin ion couples.
10 Studies about nickel, cobalt, Iron(II) and
11 Iron(III), manganese and
12 Chromium cations.
13 Written midterm test.
14 Aluminium
15 Zinc
16 Simple analysis of the 1st group
17 Simple analysis of the 2nd group
18 Simple analysis of the 3rd group
19 Calcium
20 Strontium
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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21 Barium
22 Magnesium, Lithium
23 Sodium, Potassium
24 Ammonium
25 Written test II
26 Simple analysis of the 4th group
27 Simple analysis of the 4th group
28 Carbonate, Hydrocarbonate
29 Sulphite, Thiosulphate
30 Polysulphide, Silicate
31 Hypochloride, Iodate
32 Bromate, Sulfate
33 Phosphates
34 Borate, Fluoride
35 Chloride, Bromide
36 Thiocyanide
37 Iodode, Cyanide
38 Nitrite, Nitrate, Chlorate, Perchlorate, Acetate
39 Written test III
40 Complex
41 Summary
42 Closing
Seminars
Exam topics/questions
1.) Definition, principles and topic of qualitative inorganic analysis. Quality assurance and control of chemical substances and active pharmaceutical ingredients. Available reactions. Stoichiometry.
2. Equilibrium reactions in solution, definition, calculations. Acid-base theories, calculation of pH, complexes (steric structures and isomerism), precipitate formation, solubility.
3.) Classification of chemical reactions: acid-base, complex-forming, and redox reactions. Electrode potentials.
4.) Sensitivity and specificity of chemical reactions. Dilution limit, limit-concentration. Analytical equipment, methods (macro, micro, semimicro, etc.). Preliminary investigations: sample-taking, homogenization, dissolution, digestion, direct heating, flame-test, etc.
5.) Classification of the cations: 1st group of cations (Ag+, Pb2+, Hg22+, Hg2+, Cu2+, Cd2+, Bi3+).
6.) 2nd group of cations (As3+, As5+, Sb3+, Sb5+, Sn2+, Sn4+. Separation of the first two groups of cations.
7.) 3rd group of cations I. (Co2+, Ni2+, Fe2+, Fe3+, Cr3+, Mn2+, Al3+, Zn2+).
8.) 3rd group of cations II. (Co2+, Ni2+, Fe2+, Fe3+, Cr3+, Mn2+, Al3+, Zn2+). Separation of the 3rd group of cations.
9.) 4th and 5th group of cations (Ca2+, Sr2+, Ba2+; Mg2+, Li+, Na+, K+, NH4+). Separation of the 4th and 5th group. Separation of magnesium ion from the other ions of the 5th group.
10.) Classification of the anions: 1st group of anions (CO32-, HCO3-, SO32-, S2O32-, S2- and Sx2-, SiO32-, OCl-).
11.) 2nd group of anions (IO3-, BrO3-, SO42-, PO43-, B(OH)4-, F-).
12.) 3rd group of anions (Cl-, Br-, I-, CN-, SCN-).
13.) 4th group of anions (NO2-, NO3-, ClO3-, ClO4-, CH3COO-). Complex analysis: cation(s) and anion(s) in the same sample. Practices
Participants
Dr. Huber Imre (HUIRAAO.PTE), Dr. Rozmer Zsuzsanna (ROZQAAP.PTE), Gulyás Gergely (GUGSAAP.PTE)
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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OPG-GPR PHARMACEUTICAL PROPEDEUTICS
Course director: DR. SZILÁRD PÁL, assistant professor
Department of Pharmacotechnology
1 credit ▪ midsemester grade ▪ Pharmaceutical science theoretical knowledge and practical skills module ▪ autumn semester ▪ recommended semester: 1
Number of hours/semester: 14 lectures + 0 practices + 0 seminars = total of 14 hours
Course headcount limitations (min.-max.): 1 – 80 Prerequisites:
Topic
This course is an introduction to the discipline of pharmaceutics (propedeutics), within pharmacist’s hierarchy, their relationship with
other healthcare workers and current specialties are also introduced. Students get a review on fundamentals and basic terms of pharmaceutics. Design and manufacture of medicine, and proper use of dosage forms is also demonstrated.
Conditions for acceptance of the semester
- students must fulfil requirements determined by the Code of Studies and Examinations
- attendance of the lectures according to the Code of Studies and Examinations
Mid-term exams
Students have to write three assessments during the semester. The first two assessments should reach together at least 60%.
The third assessments is from the whole semester’s lectures. Students have to reach 60,1 % in this case. In case of confirmed absence
from the assessment, re-take chance is possible for the student. Missing the re-take results 0 % assessment.
Making up for missed classes
Students must fulfil requirements determined by the Code of Studies and Examinations. Students have to bring a medical certificate.
Topic of missed lectures has to be made up for in the form of a short written report (approx. 1 page, font size: 12)
Reading material
- Obligatory literature
- Literature developed by the Department
- Notes
- Recommended literature
Official pharmacopoeias (Ph. Hg. VIII., Ph. Eur.)
Formulae Normales VII. (FoNo VII.)
Pharmindex Compendium
Lectures
1 Pharmacist’s hierarchy in the healthcare
Dr. Pál Szilárd
2 Characteristics of the pharmaceutical education, its structure, disciplines, career opportunities
Dr. Pál Szilárd
3 Origin of pharmacy, present and future
Dr. Pál Szilárd
4 Pharmacy as a healthcare institution
Dr. Pál Szilárd
5 Role of the pharmaceutical industry and wholesalers, drug control
Dr. Pál Szilárd
6 Mid-term written assessment
Dr. Pál Szilárd
7 Relationship between the healthcare workers (physicians, medical staff, pharmacists, nurses)
Dr. Pál Szilárd
8 Equipment in the pharmacy, appliances for the manufacture of medicines
Dr. Pál Szilárd
9 Equipment and methods for pharmaceutical measurement, concept of the pharmaceutical accuracy; preparation
Dr. Pál Szilárd
10 Mid-term written assessment
Dr. Pál Szilárd
11 Basics of preparation processes liquid
Dr. Pál Szilárd
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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12 Basics of preparation processes semi-solid and solids
Dr. Pál Szilárd
13 Pharmaceutical literature, pharmacopoeias, Formulae Normales in Hungary
Dr. Pál Szilárd
14 End-year assessment
Dr. Pál Szilárd
Practices
Seminars
Exam topics/questions
Students will receive the topic lists in the Institute and/or on the website.
http://gytsz.pte.hu/?q=node/45
Participants
Dr. Pál Szilárd (PASMAAO.PTE), Rezesné dr. Börzsei Rita Judit (BORPAAO.PTE)
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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OPO-GL1 PHARMACEUTICAL BIOLOGY 1
Course director: DR. KATALIN SIPOS, associate professor
Department of Pharmaceutical Biology
4 credit ▪ semester exam ▪ Pharmaceutical biology and medical theoretical knowledge module ▪ autumn semester ▪ recommended semester: 1
Number of hours/semester: 42 lectures + 1 practices + 13 seminars = total of 56 hours
Course headcount limitations (min.-max.): 5 – Prerequisites:
Topic
The 2-semester Biology course provides the essential fundamental molecular biological knowledge for the pharmaceutical students. In
the first semester students will study the structure and main functions of the living eukaryotic cells. We will discuss briefly the structural
features of prokaryotes as well as viruses. The majority of the topics will deal with the information storage and utilization of the cells, and the regulation of these processes.
Conditions for acceptance of the semester
Maximum of 25 % absence allowed
Mid-term exams
There are two mid-term exams the results of which is included in the semester exam.
Making up for missed classes
According to personal agreement
Reading material
- Obligatory literature
- Literature developed by the Department
The materials of the lectures and seminars will appear on Neptune.
- Notes
- Recommended literature
Cooper GM: The Cell: A Molecular Approach, 2nd edition, PubMed
Elliott WH, Elliott DC: Biochemistry and Molecular Biology, 3rd edition
Thompson & Thompson: Genetics in Medicine
Crai NL: Molecular Biology, Principles of Genome Function, OUP 2010
Young ID: Medical Genetics
Lectures
1 Introduction.
Dr. Sipos Katalin
2 Building blocks of the cell.
Dr. Sipos Katalin
3 Genom and gene expression.
Varga Edit
4 Tools and techniques in molecular biology I.
Poór Viktor Soma
5 Tools and techniques in molecular biology II.
Poór Viktor Soma
6 Cellular differentiation.
Poór Viktor Soma
7 Stem cells.
Poór Viktor Soma
8 The nucleus and the cellular membranes.
Dudás Réka
9 Structure of DNA.
Dr. Pandur Edina
10 Chromosomes and genomes.
Dr. Pandur Edina
11 Mitochondrium: structure and function. Mitochondrial DNA.
Dudás Réka
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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12 Cytoplasmic organelles: endoplasmic reticulum, Golgi apparatus, lysosomes.
Dr. Pandur Edina
13 Replication I.
Poór Viktor Soma
14 Replication II.
Poór Viktor Soma
15 Repair mechanisms.
Poór Viktor Soma
16 Transcription in prokaryotic cells.
Dr. Sipos Katalin
17 Eukaryotic transcription: mRNA.
Dr. Sipos Katalin
18 Eukaryotic transcription: tRNA, rRNA.
Dr. Sipos Katalin
19 Regulation of transcription.
Dr. Sipos Katalin
20 Transcription factors.
Dr. Pandur Edina
21 The genetic code.
Varga Edit
22 Structure and functions of ribosomes. tRNA
Dr. Pandur Edina
23 Steps of translation.
Dr. Pandur Edina
24 Protein analysing methods I.
Nagy Laura
25 Protein analysing methods II.
Nagy Laura
26 Gene regulation: prokaryotes.
Poór Viktor Soma
27 Regulation of gene expression in eukaryotes I.
Nagy Laura
28 Regulation of gene expression in eukaryotes II.
Nagy Laura
29 Posttranslational modifications.
Poór Viktor Soma
30 Degradation of proteins.
Poór Viktor Soma
31 Intracellular trafficing of proteins: nucleus, mitochondrion.
Dr. Sipos Katalin
32 Intracellular trafficing of proteins: ER.
Dr. Sipos Katalin
33 Intracellular trafficing of proteins: Golgi, lysosomes.
Dr. Sipos Katalin
34 Antibiotics.
Nagy Laura
35 Cell cycle I
Dr. Sipos Katalin
36 Cell cycle II
Dr. Sipos Katalin
37 Mitosis I
Dr. Pandur Edina
38 Mitosis II
Dr. Pandur Edina
39 Meiosis I
Poór Viktor Soma
40 Meiosis
Poór Viktor Soma
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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41 Transport through biological membranes
Dr. Sipos Katalin
42 Consultation.
Dr. Sipos Katalin
Practices
1 Preparation of biological buffers (TE, loading, PAGE, DNA isolation solutions).
Seminars
1 Macromolecules as building blocks of living cells.
2 Separation techniques.
3 Detection in molecular biology.
4 Cytoskeleton.
5 Bases of PCR.
6 Sequencing methods.
7 Transcription: summary.
8 Viruses.
9 Human Genome Project.
10 Molecular biological methods in Pharmaceutical research.
11 Intracellular targeting: summary.
12 Mechanisms of antibiotics.
13 Signal transduction: summary.
Exam topics/questions
There are no given exam questions. The topics of the exam will be the materials of lectures and seminars.
Participants
Dr. Pandur Edina (PAEFAA.T.JPTE), Dr. Sipos Katalin (SIKMAAO.PTE), Dudás Réka (DURGAAT.PTE), Nagy Laura
(NALPACT.PTE), Poór Viktor Soma (POVFAB.T.JPTE), Varga Edit (VAEQABT.PTE)
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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OPR-ESE FIRST AID
Course director: DR. LAJOS BOGÁR, professor
Department of Operational Medicine
0 credit ▪ signature ▪ Criterion requirement module ▪ autumn semester ▪ recommended semester: 1
Number of hours/semester: 0 lectures + 6 practices + 8 seminars = total of 14 hours
Course headcount limitations (min.-max.): 5 – Prerequisites:
Topic
To learn how to give the temporary help to an injured or a sick person before professional medical treatment can be provided. To get familiar with the timely assistance, comprising of simple medical and life saving techniques.
Conditions for acceptance of the semester
Signature
Mid-term exams
Making up for missed classes
It is possible to make up for missed classes by appointment.
Reading material
- Obligatory literature
- Literature developed by the Department
- Notes
- Recommended literature
Göbl Gábor: Oxyológia, Medicina Könyvkiadó, Budapest, 2001.
Bogár Lajos: Érzéstelenítés - Esetfantáziák vészhelyzetekről medikusoknak és fiatal orvosoknak, Medicina Könyvkiadó, Budapest, 2010.
Bogár Lajos: Intenzív - Egy pályakezdés esetfantáziái, Akadémiai Kiadó, Budapest, 2013.
Lectures
Practices
1 Patient examination
2 Recovery position and rescue technics
3 BLS
4 BLS AED
5 First aid in trauma
6 Comatose patient
Seminars
1 First aid in general, emergency care systems
2 CPR
3 Chest and abdominal pain
4 First aid in trauma cases
5 Burns, frostbites, electrical shock
6 Poisoning
7 Stroke, head and spinal trauma
8 Convulsion, diabetes, allergy, fever
Exam topics/questions
Participants
Dr. Bátai István (BAIMABO.PTE), Dr. Bogár Lajos (BOLGAAO.PTE), Dr. Csontos Csaba (CSCSAAP.PTE), Dr. Kiss Tamás
(KITFAAO.PTE), Dr. Molnár Tihamér (MOTTAA0.PTE), Dr. Nagy Bálint János (NABGAAO.PTE), Dr. Nagy Judit (NAJFAAO.PTE), Dr. Szabó Zoltán (SZZFABP.PTE)
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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OPR-LAT PHARMACEUTICAL TERMINOLOGY
Course director: GABRIELLA HÁBEL, language teacher
Department of Languages for Specific Purposes
0 credit ▪ signature ▪ Criterion requirement module ▪ autumn semester ▪ recommended semester: 1
Number of hours/semester: 0 lectures + 28 practices + 0 seminars = total of 28 hours
Course headcount limitations (min.-max.): 3 – 50 Prerequisites:
Topic
This course will enable students to acquire the basic vocabulary of pharmaceutical Latin so that they can use it creatively in their future profession. Students will become acquainted with the
- elements and formulae of prescribing,
- main categories of common medicines in Latin and English,
- routes of drug administration (absorption, inhalation, intramuscular...)
- basic terminology alluding to drug preparations (liquid, semisolid, solid),
- most frequently used abbreviations in prescriptions etc.
Conditions for acceptance of the semester
Two midterm tests
Mid-term exams
Making up for missed classes
If appropriate, making up the midterm test is possible.
Reading material
- Obligatory literature
- Literature developed by the Department
- Notes
- Recommended literature
University Script
Materials available on Neptun
Lectures
Practices
1 Introduction to pharmaceutical terminology. Significance of pharmaceutical terminology in practice. Greek and Latin word parts pertaining to drugs.
2 Introduction to pharmaceutical terminology. Significance of pharmaceutical terminology in practice. Greek and Latin word parts pertaining to drugs.
3 Routes of drug-administration (absorption, inhalation, oral, intravenous).
4 Routes of drug-administration (absorption, inhalation, oral, intravenous).
5 Drug preparations (liquid, semisolid).
6 Drug preparations (liquid, semisolid).
7 Terminology of the digestive system. Main categories of medicines and their actions concerning the gastrointestinal tract.
8 Terminology of the digestive system. Main categories of medicines and their actions concerning the gastrointestinal tract.
9 Vitamins. Classification. Terminology.
10 Vitamins. Classification. Terminology.
11 Terminology of the heart and circulation. Main categories of medicines and their actions concerning the cardiovascular system.
12 Terminology of the heart and circulation. Main categories of medicines and their actions concerning the cardiovascular system.
13 Test I.
14 Test I.
15 Terminology of the respiratory system. Main categories of medicines and their actions.
16 Terminology of the respiratory system. Main categories of medicines and their actions.
17 About asthma in a nut shell. Anti-inflammatory drugs and bronchodilators. Terminology (inhalers, nebulizers, pills).
18 About asthma in a nut shell. Anti-inflammatory drugs and bronchodilators. Terminology (inhalers, nebulizers, pills).
19 Therapeutic uses of herbal medicines. Parts of plants (nomina drogarum)
20 Therapeutic uses of herbal medicines. Parts of plants (nomina drogarum)
21 Introduction to prescriptions. Abbreviations used in prescriptions.
22 Introduction to prescriptions. Abbreviations used in prescriptions.
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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23 Reading and explanations of prescriptions. Pharmaceutical terminology in case reports.
24 Reading and explanations of prescriptions. Pharmaceutical terminology in case reports.
25 Summary and repetition. Exercises.
26 Summary and repetition. Exercises.
27 Test II.
28 Test II.
Seminars
Exam topics/questions
- elements and formulae of prescribing
- main categories of common medicines in Latin and English
- routes of drug administration (absorption, inhalation, intramuscular)
- basic terminology alluding to drug preparations (liquid, semisolid, solid)
- most frequently used abbreviations in prescriptions
Participants
Hábel Gabriella (HAGTAAP.PTE)
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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OPA-B2E BIOMATHEMATICS 2 - THEORY
Course director: DR. LÁSZLÓ GRAMA, assistant professor
Department of Biophysics
2 credit ▪ semester exam ▪ Basic module ▪ spring semester ▪ recommended semester: 2
Number of hours/semester: 28 lectures + 0 practices + 0 seminars = total of 28 hours
Course headcount limitations (min.-max.): 1 – Prerequisites: OPA-B1E completed + OPA-B2G parallel
Topic
Basic data handling and computer use. Exploring data by graphical and numerical characterisation. Basic concepts of probability and statistical inference. The basic methods for statistical inference most frequently used in medicine.
Conditions for acceptance of the semester
Maximum of 25 % absence allowed
Mid-term exams
Making up for missed classes
Reading material
- Obligatory literature
- Literature developed by the Department
biofizika.aok.pte.hu
- Notes
József Belágyi: Medical Biometry, textbook
- Recommended literature
Lectures
1 Introduction
Dr. Bódis Emőke
2 Introduction
Dr. Bódis Emőke
3 The applied methods, Experimental data analysis, Histogram
Dr. Bódis Emőke
4 The applied methods, Experimental data analysis, Histogram
Dr. Bódis Emőke
5 The characteristics of population and sample, Elements of standard error calculation, Probability
Dr. Bódis Emőke
6 The characteristics of population and sample, Elements of standard error calculation, Probability
Dr. Bódis Emőke
7 Discrete and continuous distributions
Dr. Bódis Emőke
8 Discrete and continuous distributions
Dr. Bódis Emőke
9 Statistical hypothesis testing: the sign test
Dr. Bódis Emőke
10 Statistical hypothesis testing: the sign test
Dr. Bódis Emőke
11 Statistical hypothesis testing: the u-test
Dr. Bódis Emőke
12 Statistical hypothesis testing: the u-test
Dr. Bódis Emőke
13 Analysis of the means with t-test
Dr. Bódis Emőke
14 Analysis of the means with t-test
Dr. Bódis Emőke
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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15 The chi-squere test and its application
Dr. Hild Gábor
16 The chi-squere test and its application
Dr. Hild Gábor
17 Analysis of variance
Dr. Hild Gábor
18 Analysis of variance
Dr. Hild Gábor
19 Regression analysis
Dr. Hild Gábor
20 Regression analysis
Dr. Hild Gábor
21 Least squares principle
Dr. Hild Gábor
22 Least squares principle
Dr. Hild Gábor
23 Correlation analysis. Rank correlation
Dr. Hild Gábor
24 Correlation analysis. Rank correlation
Dr. Hild Gábor
25 Survival analysis. The logrank test
Dr. Hild Gábor
26 Survival analysis. The logrank test
Dr. Hild Gábor
27 Summary
Dr. Hild Gábor
28 Summary
Dr. Hild Gábor
Practices
Seminars
Exam topics/questions
The exam consists of problem solving related to the topics of lectures and practices, using tables and making graphs using computers.
Participants
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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OPA-B2G BIOMATHEMATICS 2 - PRACTICE
Course director: DR. LÁSZLÓ GRAMA, assistant professor
Department of Biophysics
2 credit ▪ midsemester grade ▪ Basic module ▪ spring semester ▪ recommended semester: 2
Number of hours/semester: 0 lectures + 28 practices + 0 seminars = total of 28 hours
Course headcount limitations (min.-max.): 1 – Prerequisites: OPA-B1E completed
Topic
Basic data handling and computer use. Exploring data by graphical and numerical characterisation. Basic concepts of probability and statistical inference. The basic methods for statistical inference most frequently used in medicine.
Conditions for acceptance of the semester
Maximum of 25 % absence allowed
Mid-term exams
Making up for missed classes
Reading material
- Obligatory literature
- Literature developed by the Department
biofizika.aok.pte.hu
- Notes
József Belágyi: Medical Biometry, textbook
- Recommended literature
Lectures
Practices
1 Introduction
2 Introduction
3 The applied methods, Experimental data analysis, Histogram
4 The applied methods, Experimental data analysis, Histogram
5 The characteristics of population and sample, Elements of standard error calculation, Probability
6 The characteristics of population and sample, Elements of standard error calculation, Probability
7 Discrete and continuous distributions
8 Discrete and continuous distributions
9 Statistical hypothesis testing: the sign test
10 Statistical hypothesis testing: the sign test
11 Statistical hypothesis testing: the u-test
12 Statistical hypothesis testing: the u-test
13 Analysis of the means with t-test
14 Analysis of the means with t-test
15 The chi-squere test and its application
16 The chi-squere test and its application
17 Analysis of variance
18 Analysis of variance
19 Regression analysis
20 Regression analysis
21 Least squares principle
22 Least squares principle
23 Correlation analysis. Rank correlation
24 Correlation analysis. Rank correlation
25 Survival analysis. The logrank test
26 Survival analysis. The logrank test
27 Summary
28 Summary
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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Seminars
Exam topics/questions
The exam consists of problem solving related to the topics of lectures and practices, using tables and making graphs using computers.
Participants
Dr. Bódis Emőke (BOEAAD.T.JPTE), Dr. Hild Gábor (HIGMAAO.PTE)
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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OPA-FZ1 PHYSICAL CHEMISTRY 1
Course director: DR. GÉZA NAGY, professor
Faculty of Natural Sciences - Department of General and Physical Chemistry
2 credit ▪ semester exam ▪ Basic module ▪ spring semester ▪ recommended semester: 2
Number of hours/semester: 28 lectures + 0 practices + 0 seminars = total of 28 hours
Course headcount limitations (min.-max.): 5 – 100 Prerequisites: OPA-BM1 completed + OPA-AM1 completed
Topic
The physical chemistry deals with the basic properties and structure of the matter. It discusses the chemical properties, events, reactions
and interactions generally, using the tools of physics. This basic course on physical chemistry helps the students to understand the basic
principles of chemistry and to handle quantitatively the chemical problems. The course intends to acquaint the students with the ways of calculating some basic physical chemical properties, changes, parameters needed for successful experimental work.
The following main chapters are be discussed:
The laws of thermodynamics, and state functions
The thermo chemistry and experimental techniques
The chemical equilibrium
Properties of gases, liquids and solids, Phase transitions
Transport processes, kinetic theory of gases,
Rate distribution law
Reaction kinetics
Electrochemistry
The structure of the matter, atoms, chemical bonding
Physical chemical basis of some instrumental methods
Conditions for acceptance of the semester
The exam starts with a short written test. The students solve simple physical chemistry problems and answer basic questions about
definitions, equations. Usually 20 questions are given. If the 10 of these are answered correctly than the student gets two randomly
selected questions from the text covered in the lectures. After a short preparation time the oral section starts. The student standing in
front of a black board, using chalk presents his answers. Score from 1 to 5 can be obtained. In case of failing in the written test or
obtaining 1; the entire exam has to be repeated.
Mid-term exams
Making up for missed classes
Being absent from three lectures will be tolerated. Text book and electronic hand out matter help students to catch up.
Reading material
- Obligatory literature
1. P.W. Atkins and J. de Paula: Physical Chemistry, 8th edition, Oxford University Press 2002
2. R. A. Alberty and R.J. Silbey: Physical Chemistry, 4th edition, John Wiley 2002
3. K. J. Laidler, J. H. Meiser and B. C. Santuary: Physical Chemistry, Houghton Mifflin Company 2003
- Literature developed by the Department
The slides discussed during the lectures are given to the student as hand out in electronic form recorded on their pen drive
- Notes
The slides discussed during the lectures are given to the student as hand out in electronic form recorded on their pen drive
- Recommended literature
Chang, Physical Chemistry
Lectures
1 The scope of physical chemistry. The gas state, perfect and real gases, transport processes in gases, diffusion heat conduction, and viscosity. Heat capacity and structure in gases. The principle of corresponding states
Dr. Nagy Géza
2 Work heat and energy, basic concepts in thermodynamics, expansion work, internal energy. The first law, reversible and irreversible expansion
Dr. Nagy Géza
3 Enthalpy, Calorimetry, Thermo chemistry, Hess’s law, Kirchhoff’s law, Adiabatic changes
Dr. Nagy Géza
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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4 TG, TA, DSC methods for investigation different processes, formation enthalpy
Dr. Nagy Géza
5 Heat capacity, Joule-Thomson effect, changes in internal energy
Dr. Nagy Géza
6 The second law, entropy, changing of entropy in different processes, heat pumps, the Carnot cycle
Dr. Nagy Géza
7 The third law of thermodynamics, The Helmholz and Gibbs energies, combination of the first and second Laws, the fundamental
equation
Dr. Nagy Géza
8 Phase diagrams, stability of phases, phase transition, Clausius Clapeyron equation, supercritical fluids
Dr. Nagy Géza
9 Dependence of phase stability on temperature and pressure
Dr. Nagy Géza
10 Pressure over curved surfaces, the surface tension, the Laplace equation, the Kelvin equation, capillary action
Dr. Nagy Géza
11 Partial molar quantities, the thermodynamics of mixing, chemical potential of liquids, Gibbs Duham equation, Raoult’s law, Henry’s law. Properties of liquid mixtures
Dr. Nagy Géza
12 Colligative properties, lowering of freezing point, elevation of boiling point, osmosis
Dr. Nagy Géza
13 Distillation, vapor pressure diagrams, the phase rule, liquid-liquid phase diagrams, liquid solid phase diagrams
Dr. Nagy Géza
14 Chemical equilibrium, effect of pressure and temperature on equilibrium
Dr. Nagy Géza
15 The kinetic model of gases, collision with walls and surfaces, effusion
Dr. Nagy Géza
16 The rates of chemical reactions. Basic equations in case of elementary processes. Ways of studying reaction rate, Determination of ages by reaction kinetic base
Dr. Nagy Géza
17 Rate of complex reactions, consecutive reactions, parallel reactions, reactions approaching equilibrium
Dr. Nagy Géza
18 Lindemann - Hinshelwood mechanism, steady state, rate laws of chain reaction, explosions,
Dr. Nagy Géza
19 Enzyme catalysis, autocatalysis, oscillating reactions
Dr. Nagy Géza
20 Heterogeneous reactions, photochemical reactions, polymerization
Dr. Nagy Géza
21 The rate coefficient, collision theory, diffusion controlled reactions, Arrhenius equation
Dr. Nagy Géza
22 Electrolytes, Debye-Hückel theory, mean activity coefficient, ionic strength. Formation enthalpy of ions.
Dr. Nagy Géza
23 Conductivity in electrolytes, transfer number, conductivity measurements, its applications, Kohlrausch’s law, Ostwald’s dilution law
Dr. Nagy Géza
24 Electrode potential, electrodes, Nernst equation, Galvan cells, potentiometric cells, ion selective electrodes, the diffusion potential
Dr. Nagy Géza
25 Electrode processes, polarization, over potential, Tafel equation
Dr. Nagy Géza
26 Polarization curves, Cottrell experiment, Faraday’s laws, electrolysis, Voltammetry, CV, corrosion
Dr. Nagy Géza
27 Physical chemistry basis of instrumental methods, Spectroscopy
Dr. Nagy Géza
28 Physical chemistry basis of instrumental methods, magnetic, electrical properties.
Dr. Nagy Géza
Practices
Seminars
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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Exam topics/questions
The gas state, perfect and real gases, transport processes in gases, diffusion heat conduction, and viscosity, Heat capacity and structure in gases. The principle of corresponding states
Work heat and energy, basic concepts in thermodynamics, expansion work, internal energy, The first law, reversible and irreversible
expansion
Enthalpy, Calorimetry, Thermo chemistry, Hess law, Kirchhoff law, Adiabatic changes
TG, TA, DSC methods for investigation different processes, formation enthalpy
Heat capacity, Joule-Thomson effect, changes in internal energy
The Second law, entropy, changing of entropy in different processes, heat pumps, the Carnot cycle
The third law of thermodynamics
The Helmholz and Gibbs energies, combination of the first and second Laws, the fundamental equation
Phase diagrams, stability of phases, phase transition, Clausius Clapeyron equation, supercritical fluids,
Dependence of phase stability on temperature and pressure,
Pressure over curved surfaces, the surface tension, the Laplace equation, the Kelvin equation, capillary action
Partial molar quantities, the thermodynamics of mixing, chemical potential of liquids, Gibbs Duham equation, Raoult’s law, Henry’s law. Properties of liquid mixtures
Colligative properties, lowering of freezing point, elevation of boiling point, osmosis
Distillation, vapor pressure diagrams, the phase rule, liquid-liquid phase diagrams, liquid solid phase diagrams
Chemical equilibrium, effect of pressure and temperature on equilibrium, the description of equilibrium.
The kinetic model of gases, collision with walls and surfaces, effusion,
The rates of chemical reactions, Basic equations in case of elementary processes. Ways of studying reaction rate, Determination of ages
by reaction kinetic base
Rate of complex reactions, consecutive reactions, parallel reactions, reactions approaching equilibrium,
Lindemann - Hinshelwood mechanism, steady state, rate laws of chain reaction, explosions,
Enzyme catalysis, autocatalysis, oscillating reactions,
Heterogeneous reactions, photochemical reactions, polymerization
The rate coefficient, collision theory, diffusion controlled reactions, Arrhenius equation,
Electrolytes, Debye-Hückel theory, mean activity coefficient, ionic strength. Formation enthalpy of ions.
Conductivity in electrolytes, transfer number, conductivity measurements, its applications, Kohlrausch’s law, Ostwald’s dilution law
Electrode potential, electrodes, Nernst equation
Galvan cells, potentiometric cells, ion selective electrodes, the diffusion potential
Electrode processes, polarization, over potential, Tafel equation
Polarization curves, Cottrell experiment, Faraday’s laws, electrolysis
Voltammetry, CV, corrosion
Participants
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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OPA-L2E ANALYTICAL CHEMISTRY 2 - THEORY
Course director: DR. PÁL PERJÉSI, professor
Department of Biochemistry and Medical Chemistry
2 credit ▪ final exam ▪ Basic module ▪ spring semester ▪ recommended semester: 2
Number of hours/semester: 28 lectures + 0 practices + 0 seminars = total of 28 hours
Course headcount limitations (min.-max.): 5 – 60
Prerequisites: OPA-L1E completed + OPA-AM1 completed + OPA-L2G parallel
Topic
Within the frame of the theoretical part of this subject students will study the analytical approach of Chemistry. This approach is crucial
for study of almost all pharmaceutical sciences like Pharmaceutical chemistry, Pharmaceutical technology etc. Students have to learn and examine the theory and practice of analytical reactions, methods, rules and calculations.
Conditions for acceptance of the semester
Participation in the lectures of the course is obligatory. Maximum 3 absences are allowed. 80% of the performed quantitative
determinations should be accepted. Two midterm tests will be written during the semester covering both theoretical and practical parts
of the subject. The result of both tests should be above 60%. One re-take chance is allowed after both tests. Students have to write at least
four short tests on the practices. The average of the results must be above 50%. The practical work (based on the results of the written
tests and the quantitative determinations) is evaluated by a practice grade. Satisfactory (2) evaluation is the minimum requirement of
acknowledgement of the semester.
Mid-term exams
Making up for missed classes
There is no opportunity to make up missed classes (lectures and practices).
Reading material
- Obligatory literature
Harris D.C.: Quantitative Chemical Analysis, 8th ed., W.H. Freeman and Co., New York, 2010.
- Literature developed by the Department
Laboratory handouts - describing details of the experiments.
- Notes
- Recommended literature
Lectures
1 Introduction to quantitative chemical analysis. The volumetric analysis.
Dr. Perjési Pál
2 Introduction to quantitative chemical analysis. The volumetric analysis
Dr. Perjési Pál
3 The experimental error.
Dr. Perjési Pál
4 The experimental error.
Dr. Perjési Pál
5 Acid-base equilibria. Acid-base titrations I.
Dr. Perjési Pál
6 Acid-base equilibria. Acid-base titrations I
Dr. Perjési Pál
7 Acid-base equilibria. Acid-base titrations II.
Dr. Perjési Pál
8 Acid-base equilibria. Acid-base titrations II
Dr. Perjési Pál
9 Acid-base equilibria. Acid-base titrations III.
Dr. Perjési Pál
10 Acid-base equilibria. Acid-base titrations III
Dr. Perjési Pál
11 Acid-base titrations IV. Titrations in non-aqueous solutions.
Dr. Perjési Pál
12 Acid-base titrations IV. Titrations in non-aqueous solutions.
Dr. Perjési Pál
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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13 Complexometry I.
Dr. Perjési Pál
14 Complexometry I.
Dr. Perjési Pál
15 Complexometry II.
Dr. Perjési Pál
16 Complexometry II.
Dr. Perjési Pál
17 Redox titrations. Titration curve. Indication of endpoint.
Dr. Perjési Pál
18 Redox titrations. Titration curve. Indication of endpoint.
Dr. Perjési Pál
19 Redox titrations. Oxidimetry I.
Dr. Perjési Pál
20 Redox titrations. Oxidimetry I.
Dr. Perjési Pál
21 Redox titrations. Oxidimetry II.
Dr. Perjési Pál
22 Redox titrations. Oxidimetry II.
Dr. Perjési Pál
23 Redox titrations. Reductometry.
Dr. Perjési Pál
24 Redox titrations. Reductometry.
Dr. Perjési Pál
25 Precipitate formation titrations.
Dr. Huber Imre
26 Precipitate formation titrations.
Dr. Huber Imre
27 Gravimetry.
Dr. Huber Imre
28 Gravimetry.
Dr. Huber Imre
Practices
Seminars
Exam topics/questions
Oral exam covering the topics of Analytical Chemistry 1 and Analytical Chemistry 2. The list of questions of the final exam is available on the home page of the Institute.
Participants
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OPA-L2G ANALYTICAL CHEMISTRY 2 - PRACTICE
Course director: DR. PÁL PERJÉSI, professor
Department of Biochemistry and Medical Chemistry
3 credit ▪ midsemester grade ▪ Basic module ▪ spring semester ▪ recommended semester: 2
Number of hours/semester: 0 lectures + 42 practices + 0 seminars = total of 42 hours
Course headcount limitations (min.-max.): 5 – 60 Prerequisites: OPA-L1E completed + OPA-AM1 completed
Topic
Within the frame of the practical training of this subject students will study the analytical approach of Chemistry. This approach is crucial
for the study of almost all pharmaceutical sciences like Pharmaceutical chemistry, Pharmaceutical technology etc. Students have to learn and practice analytical reactions, methods, rules and calculations.
Conditions for acceptance of the semester
Participation in the practices of the course is obligatory. Maximum 3 absences are allowed. 80% of the performed quantitative
determinations should be accepted. Two midterm tests will be written during the semester. The result of both tests should be above 60%.
One re-take chance is allowed after both tests. Students have to write at least four short tests on the practices. The average of the results
must be above 50%. The practical work (based on the results of the written tests and the quantitative determinations) is evaluated by a
practice grade. Satisfactory (2) evaluation is the minimum requirement of acknowledgement of the semester.
Mid-term exams
Making up for missed classes
There is no opportunity to make up missed classes (lectures and practices).
Reading material
- Obligatory literature
Harris D.C.: Quantitative Chemical Analysis, 8th ed., W.H. Freeman and Co., New York, 2010.
- Literature developed by the Department
Laboratory handouts - describing details of the experiments.
- Notes
- Recommended literature
Lectures
Practices
1 Acceptance of lab equipment, stock-taking, fire prevention and safety education.
2 General Introduction: Burette calibration.
3 General Introduction: Pipette calibration.
4 Factor for 0.1 M hydrochloric acid measuring solution.
5 Factor for 0.1 M sodium hydroxide measuring solution.
6 Factor for 0.1 M sodium hydroxide measuring solution.
7 Acid-base titrations I.
8 Titration of a weak acid (acetic acid or propionic acid) using sodium hydroxide.
9 Determination of borax (sodium tetraborate) by acidimetry.
10 Acid-base titrations II.
11 Indirect determination of sodium thiosulfate by alkalimetry.
12 Parallel determination of sodium hydroxide and sodium carbonate by Winkler’s method.
13 Acid-base titrations III. - Non-aqueous titrations.
14 Determination of sodium acetate in glacial acetic medium.
15 Determination of sodium acetate in glacial acetic medium.
16 Complexometry I.
17 Measurements based on the formation of highly stable complexes. - Determination of mercury(II) using thiocyanate measuring
solution by Volhard’s method.
18 Direct chelatometric titrations. - Determination of nickel(II).
19 Complexometry II.
20 Indirect chelatometric titrations, measurement of the excess of measuring solution. - Determination of aluminium ions.
21 Complex chelatometry.- Parallel determination of calcium and magnesium ions.
22 Redox titrations I.- Permanganometry.
23 Factor for 0.1 N (0.02 M) potassium permanganate measuring solution.
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24 Factor for 0.1 N (0.02 M) potassium permanganate measuring solution.
25 Redox titrations II. - Permanganometry.
26 Determination of hydrogen peroxide by permanganate titration.
27 Determination of iron(II) by permanganate titration.
28 Redox titrations III. - Bromatometry.
29 Bromometric determination of arsenic(III).
30 Determination of ascorbic acid by bromatometry.
31 Redox titrations IV.- Bromatometry/Iodometry.
32 Determination of phenol by Kopeschar.
33 Factor for 0.01 N (0.01 M) sodium thiosulfate measuring solution.
34 Redox titrations V.- Iodometry.
35 Determination of copper(II) ions by direct iodometry.
36 Determination of potassium iodide by Winkler’s method.
37 Precipitate formation titrations.
38 Determination of silver ions by potassium iodide measuring solution.
39 Chloride ion determination by Volhard’s method.
40 Gravimetry
41 Determination of barium ion in form of barium sulfate.
42 Determination of barium ion in form of barium sulfate.
Seminars
Exam topics/questions
Oral exam covering the topics of Analytical Chemistry 1 and Analytical Chemistry 2. The list of questions of the final exam is available on the home page of the Institute.
Participants
Dr. Kuzma Mónika (KUMFABO.PTE), Nyúl Eszter (NYESAAO.PTE)
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OPA-M2E GENERAL AND INORGANIC CHEMISTRY 2 - THEORY
Course director: DR. PÁL PERJÉSI, professor
Department of Pharmaceutic Chemistry
2 credit ▪ final exam ▪ Basic module ▪ spring semester ▪ recommended semester: 2
Number of hours/semester: 28 lectures + 0 practices + 0 seminars = total of 28 hours
Course headcount limitations (min.-max.): 5 – 60 Prerequisites: OPA-AM1 completed + OPA-M2G parallel
Topic
This subject is based on the acquired theoretical knowledge on General Chemistry with adaptation of the principles to understand physical and chemical properties of the most important pharmacy-related elements and inorganic compounds.
Conditions for acceptance of the semester
Acknowledgement of the course is in accord with the Code of Studies and Examinations. Participation in the lectures is obligatory.
Maximum three absences can be accepted both from lectures and practices. Two midterm tests will be written during the semester on the
7th and the 12th weeks covering both theoretical and practical parts of the subject. The result of both tests should be above 60%. One re-
take chance is allowed after both tests. Students have to write at least four mini-tests on the practices. The average of the results must be
at least 50%. The practical work (results of the written tests and the experimental work) is evaluated by a practical grade.
Mid-term exams
Making up for missed classes
There is no opportunity to make up missed classes (lectures and practices).
Reading material
- Obligatory literature
Ebbing D.D., Gammon S.D.: General Chemistry, 9th edition, Houghton Miffin Co., Boston, 2009.
- Literature developed by the Department
Almási A., Kuzma M., Perjési P.: General and Inorganic Chemistry - Laboratory Techniques and Practices, University of Pécs, 2014.
Electronic educational material.
- Notes
- Recommended literature
en.wikobooks.org/wiki/General_Chemistry
Lectures
1 Classification of elements. Elements and compounds. Nomenclature of inorganic compounds.
Dr. Perjési Pál
2 Classification of elements. Elements and compounds. Nomenclature of inorganic compounds.
Dr. Perjési Pál
3 Halogens. Halogenids.
Dr. Huber Imre
4 Halogens. Halogenids.
Dr. Huber Imre
5 Hydrogen and hydrides. Noble gases.
Dr. Huber Imre
6 Hydrogen and hydrides. Noble gases.
Dr. Huber Imre
7 Oxygen and oxygen compounds.
Dr. Huber Imre
8 Oxygen and oxygen compounds.
Dr. Huber Imre
9 Sulfur and sulfur compounds.
Dr. Huber Imre
10 Sulfur and sulfur compounds
Dr. Huber Imre
11 Nitrogen and nitrogen compounds.
Dr. Huber Imre
12 Nitrogen and nitrogen compounds.
Dr. Huber Imre
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13 Phosphorus and phosphorus compounds.
Dr. Huber Imre
14 Phosphorus and phosphorus compounds.
Dr. Huber Imre
15 Arsenic, bismuth and their compounds. Carbon and carbon compounds.
Dr. Perjési Pál
16 Arsenic, bismuth and their compounds. Carbon and carbon compounds.
Dr. Perjési Pál
17 Silicon and silicon compounds.
Dr. Perjési Pál
18 Silicon and silicon compounds.
Dr. Perjési Pál
19 Boron and aluminium compounds. The alkali metals and their compounds.
Dr. Perjési Pál
20 Boron and aluminium compounds. The alkali metals and their compounds.
Dr. Perjési Pál
21 The alkaline earth metals and their compounds. Transition metals.
Dr. Perjési Pál
22 The alkaline earth metals and their compounds. Transition metals.
Dr. Perjési Pál
23 The structure of complexes. Manganase and manganase compounds.
Dr. Perjési Pál
24 The structure of complexes. Manganase and manganase compounds.
Dr. Perjési Pál
25 Iron and iron compounds.
Dr. Perjési Pál
26 Iron and iron compounds.
Dr. Perjési Pál
27 Copper, silver and their compounds. Zinc, cadmium mercury and their compounds.
Dr. Perjési Pál
28 Copper, silver and their compounds. Zinc, cadmium mercury and their compounds.
Dr. Perjési Pál
Practices
Seminars
Exam topics/questions
Oral exam covering the topics of the subjects General and Inorganic Chemistry 1 and General and Inorganic Chemistry 2. Before the
exam students should have a Minimum Requirement Test of which result should be at least 80%. Information on the topics of the
Minimum Requirement Tests and the list of questions of the find exam is available on the home page of the Institute.
Participants
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OPA-M2G GENERAL AND INORGANIC CHEMISTRY 2 - PRACTICE
Course director: DR. PÁL PERJÉSI, professor
Department of Pharmaceutic Chemistry
3 credit ▪ midsemester grade ▪ Basic module ▪ spring semester ▪ recommended semester: 2
Number of hours/semester: 0 lectures + 42 practices + 0 seminars = total of 42 hours
Course headcount limitations (min.-max.): 5 – 60 Prerequisites: OPA-AM1 completed
Topic
This subject is based on the acquired theoretical knowledge on General Chemistry with adaptation of the principles to understand physical and chemical properties of the most important pharmacy-related elements and inorganic compounds.
Conditions for acceptance of the semester
Acknowledgement of the course is in accord with the Code of Studies and Examinations. Participation in the practices is obligatory.
Maximum three absences can be accepted both from lectures and practices. Two midterm tests will be written during the semester on the
7th and the 12th weeks. The result of both tests should be above 60%. One re-take chance is allowed after both tests. Students have to
write at least four short tests on the practices. The average of the results must be at least 50%. The practical work (results of the written
tests and the experimental work) is evaluated by a practice grade.
Mid-term exams
Making up for missed classes
There is no opportunity to make up missed classes (lectures and practices).
Reading material
- Obligatory literature
Ebbing D.D., Gammon S.D.: General Chemistry, 9th edition, Houghton Miffin Co., Boston, 2009.
- Literature developed by the Department
Almási A., Kuzma M., Perjési P.: General and Inorganic Chemistry - Laboratory Techniques and Practices, University of Pécs, 2014.
Electronic educational material.
- Notes
- Recommended literature
en.wikobooks.org/wiki/General_Chemistry
Lectures
Practices
1 Laboratory safety. Introduction and handover of laboratory equipment. Basic principles. Classification of matter. Naming simple compounds: Acids, bases and salts. Weighing.
2 Laboratory safety. Introduction and handover of laboratory equipment. Basic principles. Classification of matter. Naming simple compounds: Acids, bases and salts. Weighing.
3 Laboratory safety. Introduction and handover of laboratory equipment. Basic principles. Classification of matter. Naming simple
compounds: Acids, bases and salts. Weighing.
4 Basic principles of calculations I: Concentrations. Delivering liquids. Preparation of solutions. Measuring density.
5 Basic principles of calculations I: Concentrations. Delivering liquids. Preparation of solutions. Measuring density.
6 Basic principles of calculations I: Concentrations. Delivering liquids. Preparation of solutions. Measuring density.
7 Basic principles of calculations II: Concentrations. Purification of inorganic compounds I.: Decantation, Filtration. Recrystallisation. Purification of alum by recrystallisation I, Dilution of solutions.
8 Basic principles of calculations II: Concentrations. Purification of inorganic compounds I.: Decantation, Filtration.
Recrystallisation. Purification of alum by recrystallisation I, Dilution of solutions.
9 Basic principles of calculations II: Concentrations. Purification of inorganic compounds I.: Decantation, Filtration. Recrystallisation. Purification of alum by recrystallisation I, Dilution of solutions.
10 Basic principles of calculations III: Concentrations. Purification of inorganic compounds II.: Destillation, Sublimation.
11 Basic principles of calculations III: Concentrations. Purification of inorganic compounds II.: Destillation, Sublimation.
12 Basic principles of calculations III: Concentrations. Purification of inorganic compounds II.: Destillation, Sublimation.
13 Basic principles of calculations III: Stochiometry. Purification of inorganic compounds III. Desalination of water. Extraction.
14 Basic principles of calculations III: Stochiometry. Purification of inorganic compounds III. Desalination of water. Extraction.
15 Basic principles of calculations III: Stochiometry. Purification of inorganic compounds III. Desalination of water. Extraction.
16 Basic principles of calculations IV. Stochiometry. Basic thermodynamics. Hess’s law. Observation of thermal decompositions. Determination of melting point. Determination
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17 Basic principles of calculations IV. Stochiometry. Basic thermodynamics. Hess’s law. Observation of thermal decompositions. Determination of melting point. Determination
18 Basic principles of calculations IV. Stochiometry. Basic thermodynamics. Hess’s law. Observation of thermal decompositions. Determination of melting point. Determination
19 Basic principles of chemical kinetics. Observation of reaction rates. Landolt-reaction. Oscillating reactions.
20 Basic principles of chemical kinetics. Observation of reaction rates. Landolt-reaction. Oscillating reactions.
21 Basic principles of chemical kinetics. Observation of reaction rates. Landolt-reaction. Oscillating reactions.
22 Electrolytic dissociation. Weak and strong electrolytes. Preparation of boric acid from borax I., Preparation of potassium dihydrogenphosphate I.
23 Electrolytic dissociation. Weak and strong electrolytes. Preparation of boric acid from borax I., Preparation of potassium dihydrogenphosphate I.
24 Electrolytic dissociation. Weak and strong electrolytes. Preparation of boric acid from borax I., Preparation of potassium dihydrogenphosphate I.
25 Acid-base equilibrium I. Arrhenius concept, Brönsted-Lowry concept, Lewis concept.
26 Acid-base equilibrium I. Arrhenius concept, Brönsted-Lowry concept, Lewis concept.
27 Acid-base equilibrium I. Arrhenius concept, Brönsted-Lowry concept, Lewis concept.
28 Acid-base equilibrium II. Hydrolysis of ions. Buffers. Observation of hydrolysis of salts Demonstration of buffer capacity.
29 Acid-base equilibrium II. Hydrolysis of ions. Buffers. Observation of hydrolysis of salts Demonstration of buffer capacity.
30 Acid-base equilibrium II. Hydrolysis of ions. Buffers. Observation of hydrolysis of salts Demonstration of buffer capacity.
31 Acid-base equilibrium III. Acid-base titrations Determination of concentration of monoprotic acid solutions (hydrochloric acid, acetic acid) by titration.
32 Acid-base equilibrium III. Acid-base titrations Determination of concentration of monoprotic acid solutions (hydrochloric acid, acetic acid) by titration.
33 Acid-base equilibrium III. Acid-base titrations Determination of concentration of monoprotic acid solutions (hydrochloric acid, acetic acid) by titration.
34 Heterogenous equilibrium. Solubility calculations. Qualitative comparison of solubility products.
35 Heterogenous equilibrium. Solubility calculations. Qualitative comparison of solubility products.
36 Heterogenous equilibrium. Solubility calculations. Qualitative comparison of solubility products.
37 Redox reactions I. Oxidation state. Important oxidizing and reducing agents. Observation of oxidation-reduction reactions. Preparation of copper(I) oxide through copper(I) chloride
38 Redox reactions I. Oxidation state. Important oxidizing and reducing agents. Observation of oxidation-reduction reactions. Preparation of copper(I) oxide through copper(I) chloride
39 Redox reactions I. Oxidation state. Important oxidizing and reducing agents. Observation of oxidation-reduction reactions.
Preparation of copper(I) oxide through copper(I) chloride
40 Redox reactions II. Electrodes, electrochemical cells, electrolysis. Redox titrations
41 Redox reactions II. Electrodes, electrochemical cells, electrolysis. Redox titrations
42 Redox reactions II. Electrodes, electrochemical cells, electrolysis. Redox titrations
Seminars
Exam topics/questions
Oral exam covering the topics of the subjects General and Inorganic Chemistry 1 and General and Inorganic Chemistry 2. Before the
exam students should have a Minimum Requirement Test of which result should be at least 80%. Information on the topics of the
Minimum Requirement Tests and the list of questions of the find exam is available on the home page of the Institute.
Participants
Gulyás Gergely (GUGSAAP.PTE), Kulcsár Győző (KUGDAA.T.JPTE)
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OPA-Z2E PHYSICS-BIOPHYSICS 2 - THEORY
Course director: DR. ANDRÁS SZILÁRD LUKÁCS, associate professor
Department of Biophysics
2 credit ▪ final exam ▪ Basic module ▪ spring semester ▪ recommended semester: 2
Number of hours/semester: 28 lectures + 0 practices + 0 seminars = total of 28 hours
Course headcount limitations (min.-max.): 5 – 100 Prerequisites: OPA-Z1E completed + OPA-Z2G parallel
Topic
The course addresses the foundations of physical and biophysical methods used for exploring biological systems particularly the human
body, as well as those of physical diagnostic methods. The latter are discussed briefly with references made to a respective topical pre-clinical course.
Conditions for acceptance of the semester
Maximum of 25 % absence allowed
Mid-term exams
During the semester the student will have to write two tests on the 6th and 13th week, Based on the results those students who achieved
grade 4 or 5 can keep the obtained grade as an exam grade.
Making up for missed classes
Those students who missed the test due to medical reasons can write the tests at the end of the semester.
Reading material
- Obligatory literature
Damjanovich Sándor, Fidy Judit, Szöllősi János (eds.): Medical Biophysics, Medicina, Budapest, 2008
- Literature developed by the Department
Online materials on departmental website (http://biofizika.aok.pte.hu)
- Notes
Handouts on departmental website (http://biofizika.aok.pte.hu)
- Recommended literature
P.W. Atkins and Loretta Jones: Chemical Principles
Lectures
1 Electromagnetic waves
Dr. Szabó-Meleg Edina
2 Interference, diffraction of electromagnetic waves
Dr. Szabó-Meleg Edina
3 Radioactivity
Dr. Szabó-Meleg Edina
4 Biological effetcs of radioactivity
Dr. Szabó-Meleg Edina
5 Molecular orbitals
Dr. Bódis Emőke
6 Applications of molecular orbital theory
Dr. Bódis Emőke
7 Absorption spectroscopy.
Dr. Lukács András Szilárd
8 Instrumentation for absorption spectroscopy.
Dr. Lukács András Szilárd
9 Introduction to fluorescence.
Dr. Lukács András Szilárd
10 Application of fluorescence
Dr. Lukács András Szilárd
11 Introduction to lasers
Dr. Lukács András Szilárd
12 Application of lasers
Dr. Lukács András Szilárd
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13 Basics of vibrational spectroscopy
Dr. Lukács András Szilárd
14 Infrared spectroscopy
Dr. Lukács András Szilárd
15 Basics of Raman spectroscopy
Dr. Lukács András Szilárd
16 Applications of Raman spectroscopy
Dr. Lukács András Szilárd
17 Calorimetry
Leipoldné Vig Andrea
18 Differential scanning calorimetry
Dr. Lukács András Szilárd
19 Spin, Zeeman effect, Stern-Gerlach experiment
Leipoldné Vig Andrea
20 Intoduction to radiospectroscopy
Leipoldné Vig Andrea
21 The concept of EPR measurements.
Leipoldné Vig Andrea
22 The concept of NMR measurements
Leipoldné Vig Andrea
23 Introduction to diagnostical methods
Dr. Kengyel András Miklós
24 MRI, gamma camera, SPECT, PET
Dr. Kengyel András Miklós
25 Basics of reaction kinetics
Dr. Kengyel András Miklós
26 Stopped flow, flash photolysis
Dr. Kengyel András Miklós
27 Basics of microscopy
Huberné Barkó Szilvia
28 Microscopy methods
Huberné Barkó Szilvia
Practices
Seminars
Exam topics/questions
Can be found on the departmental website (http://biofizika.aok.pte.hu)
Participants
UP FP Pharmacy major – obligatory subjects of the 1-2. semester - Course descriptions – academic year of 2016/2017
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OPA-Z2G PHYSICS-BIOPHYSICS 2 - PRACTICE
Course director: DR. ANDRÁS SZILÁRD LUKÁCS, associate professor
Department of Biophysics
2 credit ▪ midsemester grade ▪ Basic module ▪ spring semester ▪ recommended semester: 2
Number of hours/semester: 0 lectures + 28 practices + 0 seminars = total of 28 hours
Course headcount limitations (min.-max.): 5 – 100 Prerequisites: OPA-Z1E completed
Topic
The aim of the course is to deepen the knowledge gained during the Physics Biophysics Theory 2 course.
Conditions for acceptance of the semester
Maximum of 25 % absence allowed
Mid-term exams
The students will write a test during the semester. The result of this test must be satisfactory in order to be eligible for the exam. The
grade of this test will be the final grade of this course.
Making up for missed classes
The students can be absent three times during the semester. We provide make-up labs (only three of them) at the end of semester.
Reading material
- Obligatory literature
Damjanovich Sándor, Fidy Judit, Szöllősi János (eds.): Medical Biophysics, Medicina, Budapest, 2008
- Literature developed by the Department
Online materials on departmental website (http://biofizika.aok.pte.hu)
- Notes
Biophysics Laboratory Manual, Pécs University Press, Pécs
- Recommended literature
P.W. Atkins and Loretta Jones: Chemical Principles
Lectures
Practices
1 Introduction. Laboratory safety rules
2 Introduction. Laboratory safety rules
3 The Geiger-Müller counter. Radioactive half-life I
4 The Geiger-Müller counter. Radioactive half-life I
5 Gamma-absorption and spectrometry
6 Gamma-absorption and spectrometry
7 Absorption of beta-radiation, dead time. Radioactive half-life II
8 Absorption of beta-radiation, dead time. Radioactive half-life II
9 Scintigraphy
10 Scintigraphy
11 Optics
12 Optics
13 Absorption photometry
14 Absorption photometry
15 Blood pressure measurement. Electrocardiography
16 Blood pressure measurement. Electrocardiography
17 Ultrasound
18 Ultrasound
19 Temperature measurement
20 Temperature measurement
21 Audiometry
22 Audiometry
23 Make-up lab, seminar
24 Make-up lab, seminar
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25 Make-up lab, seminar
26 Make-up lab, seminar
27 Make-up lab, seminar
28 Make-up lab, seminar
Seminars
Exam topics/questions
Can be found on the departmental website (http://biofizika.aok.pte.hu)
Participants
Dr. Grama László (GRLHAAO.PTE), Dr. Szabó-Meleg Edina (MEEDAA.T.JPTE), Kapronczai Róbert (KARWAA0.PTE), Pirisi
Katalin Erzsébet (PIKPACT.PTE), Szatmári Dávid (SZDHAAT.PTE), Telek Elek (TEEQAAT.PTE), Ujfalusi Zoltán (UJZDAA.T.JPTE), Ujfalusi-Pozsonyi Kinga (POKAAA.T.JPTE)
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OPO-AI1 HUMAN ANATOMY, HISTOLOGY AND EMBRIOLOGY 1
Course director: DR. ANDREA PETHŐ-LUBICS, associate professor
Department of Anatomy
2 credit ▪ semester exam ▪ Pharmaceutical biology and medical theoretical knowledge module ▪ spring semester ▪ recommended semester: 2
Number of hours/semester: 14 lectures + 0 practices + 14 seminars = total of 28 hours
Course headcount limitations (min.-max.): 1 – 100 Prerequisites: OPO-GL1 completed + OPR-LAT completed
Topic
The subject describes the macroscopic and microscopic structure of the human body. Students will learn in lectures and seminars how
the organs are built up. In the first part of the 2-Semester study the locomotor system (bones, joints, muscles) and the thoracal and
abdominal viscera (cardiovascular, respiratory, digestive and urinary systems) will be represented with the aid of formalin-fixed cadavers, organ preparations and plastic models.
Conditions for acceptance of the semester
The participation in both the lectures and the seminars of the course is obligatory. The semester will be only accepted, if the number of
absences is less than 25% of the total number of classes (less than 7x45 min.)
The grade will be determined by the result of the anatomy end-semester test. The retakes are oral (B, C or D chances).
Mid-term exams
Making up for missed classes
The seminars can be made up with the attendance in the seminar of another pharmacy group of the same week (only twice in a semester
possible)
Reading material
- Obligatory literature
http://an-server.pote.hu
- Literature developed by the Department
http://an-server.pote.hu
- Notes
http://an-server.pote.hu
- Recommended literature
http://an-server.pote.hu
Lectures
1 The skeletal, articular and muscular system.
Dr. Kiss Péter
2 Tissues of the human body. Epithelial tissue. Cell junctions. Connective tissue.
Dr. Tamás Andrea
3 Supportive and muscular tissues.
Dr. Tamás Andrea
4 Histology of the skin.
Dr. Pethőné Dr. Lubics Andrea
5 The circulatory system. Heart.
Dr. Gaszner Balázs
6 The vascular system. Blood circulations. Histology of the vessels.
Dr. Gaszner Balázs
7 Structure of the respiratory system. Upper and lower airways.
Dr. Horváth-Opper Gabriella
8 The lungs. Protective mechanisms of the airways. The pleura. Respiratory movements.
Opper Balázs
9 The gastrointestinal tract 1.: Oral cavity, teeth, Pharynx, esophagus.
Dr. Hollósy Tibor
10 The gastrointestinal tract 2.: Stomach, small and large intestines.
Dr. Kiss Péter
11 The liver and the pancreas. Bile ducts. Circulation of the liver.
Dr. Hollósy Tibor
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12 Structure and function of the urinary system.
Fábián Eszter
13 Blood and haemopoesis.
Dr. Pethőné Dr. Lubics Andrea
14 The lymphatic organs.
Dr. Farkas József
Practices
Seminars
1 Anatomy: bones and joints of the human body
2 Anatomy: muscle groups of the human body
3 Anatomy: circulatory system
4 Anatomy: heart
5 Anatomy: respiratory system.
6 Anatomy: gastrointestinal tract 1. (oral cavity, pharynx, esophagus)
7 Histology: basic histology
8 Histology: skin
9 Histology: respiratory system
10 Histology: gastrointestinal tract
11 Anatomy: abdominal cavity
12 Anatomy: abdominal cavity
13 Histology: liver, pancreas
14 Histology: urinary system
Exam topics/questions
http://an-server.pote.hu
Participants
Dr. Farkas József (FAJHAAO.PTE), Dr. Jüngling Adél (JUARAAO.PTE), Opper Balázs (OPBFAB.T.JPTE)
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OPO-GB2 PHARMACEUTICAL BIOLOGY 2
Course director: DR. KATALIN SIPOS, associate professor
Department of Pharmaceutical Biology
4 credit ▪ final exam ▪ Pharmaceutical biology and medical theoretical knowledge module ▪ spring semester ▪ recommended semester: 2
Number of hours/semester: 28 lectures + 12 practices + 16 seminars = total of 56 hours
Course headcount limitations (min.-max.): 5 – Prerequisites: OPO-Gl1/OPO-GB1 completed
Topic
The 2-semester Biology course provides the essential fundamental molecular biological knowledge for the pharmaceutical students. In
the second semester some of the lectures are about the regulation of cell cycle and molecular biology of cancer. The main part of the
second semester deals with the essential information on pharmaceutical genetics. This knowledge is important for pharmaceutical students to understand the mechanisms of actions of drugs and research on drug discovery and development.
Conditions for acceptance of the semester
Maximum of 25 % absence allowed
Mid-term exams
There are two mid-term exams the results of which is included in the final exam.
Making up for missed classes
According to personal agreement
Reading material
- Obligatory literature
- Literature developed by the Department
The materials of the lectures and seminars will appear on Neptune.
- Notes
- Recommended literature
Cooper GM: The Cell: A Molecular Approach, 2nd edition, PubMed
Elliott WH, Elliott DC: Biochemistry and Molecular Biology, 3rd edition
Thompson & Thompson: Genetics in Medicine
Craig NL: Molecular Biology, Principles of Genome Function, OUP 2010
Young ID: Medical Genetics
Lectures
1 Cell signalling pathways.
Dr. Pandur Edina
2 Intracellular signalling molecules.
Dr. Pandur Edina
3 Membrane receptor molecules.
Dr. Pandur Edina
4 Ca, cGMP.
Dr. Pandur Edina
5 Apoptosis I.
Nagy Laura
6 Apoptosis II.
Dr. Pandur Edina
7 Molecular biology of cancer I.
Poór Viktor Soma
8 Molecular biology of cancer II.
Poór Viktor Soma
9 Ras.
Dr. Pandur Edina
10 PI-3 kinase, Jak-STAT.
Dr. Pandur Edina
11 Basis terms of medical genetics.
Dudás Réka
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12 Organisation of the genome. Genetic disorders.
Dr. Sipos Katalin
13 Chromosomal disorders: in number and structure.
Nagy Laura
14 Chromosomal disorders: mosaicism, imprinting.
Dr. Sipos Katalin
15 Autosomal genetic disorders.
Dr. Pandur Edina
16 Sex chromosome aberrations.
Poór Viktor Soma
17 Mendelian inheritance I.
Poór Viktor Soma
18 Mendelian inheritance II.
Poór Viktor Soma
19 Signal transduction and drugs
Dr. Pandur Edina
20 Mitochondrial genetic disorders.
Dr. Sipos Katalin
21 Multifactorial disorders.
Dudás Réka
22 Population genetics I.
Varga Edit
23 Population genetics II.
Varga Edit
24 Developmental genetics: differentiation.
Poór Viktor Soma
25 Inborn genetic errors.
Dr. Sipos Katalin
26 Possibilities of treatments of genetic defects.
Poór Viktor Soma
27 Consultation.
Dr. Sipos Katalin
28 Preparation for exam.
Dr. Sipos Katalin
Practices
1 Microscopic examinations.
2 Examinations of cells under microscope.
3 Isolation of DNA.
4 DNA concentration measurement, agarose gel electrophoresis.
5 Isolation of RNA.
6 RNA concentration measurement. Synthesis of cDNA.
7 Restriction digestion of DNA.
8 Agarose gel electrophoresis of digested DNA.
9 Electronmicroscope (demonstration).
10 Electronmicroscope (demonstration).
11 Real time PCR (demonstration).
12 Cell culture (demonstration).
Seminars
1 Viruses, prions.
2 Signal transduction: summary.
3 Family histories of genetic disorders.
4 Epigenetics.
5 Genetic screening.
6 Apoptosis: summary.
7 Pharmagenetics and pharmacogenomics I.
8 Pharmagenetics and pharmacogenomics II.
9 Methods in cytogenetics.
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46
10 Genetic diseases in adults.
11 Genetic diseases: Mendelian inheritance.
12 Other inherited diseases.
13 Pharmaceutical research I.
14 Pharmaceutical research II.
15 Electronic databases.
16 Preparation for exam.
Exam topics/questions
There are no given exam questions. The topics of the exam will be the materials of lectures and seminars.
Participants
Dr. Pandur Edina (PAEFAA.T.JPTE), Dr. Sipos Katalin (SIKMAAO.PTE), Dudás Réka (DURGAAT.PTE), Nagy Laura
(NALPACT.PTE), Poór Viktor Soma (POVFAB.T.JPTE), Varga Edit (VAEQABT.PTE)
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ATT1-2-3-4 PHYSICAL EDUCATION 1-2-3-4
Course director: TAMÁS TÉCZELY, physical education teacher
Physical Education and Sports Center
0 credit ▪ signature ▪ Criterion requirement module ▪ both semesters semester ▪ recommended semester: 1 -2-3-4
Number of hours/semester: 0 lectures + 28 practices + 0 seminars = total of 28 hours
Course headcount limitations (min.-max.): 2 – 50 Prerequisites: none / ATT1 / ATT2 / ATT3
Topics
The main goal of the university’s physical education is the development of our students' health. To prevent injuries, in the introductory
part of the sessions warming up of different muscle groups. We are improving the fitness stamina and strength of our students through
the sport movements and by using modern training methods. The practice of sport by becoming familiar with the rules of the game. Our task is to incorporate regular physical activity into the lifestyle of the students.
Course type:
Criteria requirement
During the general medical education until the end of the 10th semester, for dentists and pharmacists until the end of the 8 semester the
implementation of four semester regular physical activity is obligatory. They have to participate in 28 lessons of physical education on
weekly basis. (Two lessons weekly.) Due to fulfilling the requirements they can not enrol for the next semester. The organization, the
direction and the control are done by the teachers in charge of the workshops or by persons delegated by the dean of the Medical School We record the presence of the students. We verify the completion of the semester by confirmation of the registration plate in ETR system.
Conditions for acceptance of the semester:
The minimum requirement for acceptance of the semester is to attend on a ten week session training. During semester 4x45 minutes
absence is allowed. Accepting additional 4x45 minutes absence is the competence of the supervisor.
Possible absence:
We provide 6x45 minutes as a catching up time, which should be approved by the teacher. The catch up sessions have to be fulfilled during the last three weeks of semester.
Practices
The selection of the sport movements depends on the chosen game.
Exam questions
The acceptance of the semester is not connected to exam.
PE teachers
Farkas György (FAGMAAO.PTE), Finak Gáborné Gombosi Eszter (FIGMAAT.PTE) Lipcsik Zoltán (LIZIAAT.PTE), Németh Attila
(NEAGAET.PTE), Dr. Rugási Endre (RUEMAAP.PTE), Téczely Tamás (PETLAAT.PTE)
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Sport Day From To Place Min. Max. Teacher Supervisor
Aerobics Monday 18:00 19:00 SPO-SOR Sörház (Xavér str 19)
2 8 Dr. Szilárdné Kordély Erika
Aerobics Tuesday 19:00 20:00 SZEA-EDZ Main Building training room
2 8 Kerekes Kamilla
Aerobics Wednesday 18:00 19:00 SPO-SOR Sörház (Xavér str 19)
2 8 Dr. Szilárdné Kordély Erika
Aerobics Wednesday 19:00 20:00 SPO-SOR Sörház (Xavér str 19)
2 8 Kerekes kamilla
Aerobics Thursday 18:00 19:00 SPO-GYM Professor Gym (Megyeri str. 4)
2 10 Dr. Szilárdné Kordély Erika
Aerobics (pompom) Tuesday 19:00 20:30 SPO-SZT Gymnastics hall (Ifjúság út 6.)
2 6 Rill Leila
Athletics Monday 17.00 18.30 SPO-ATP PTE Athletics field (Ifjúság rd. 6.)
1 8 Hajduné Dr. László Zita
Athletics Friday 16.00 17.30 SPO-ATP PTE Athletics field (Ifjúság rd. 6.)
1 8 Hajduné Dr. László Zita
Badminton (Student Sports Club)
Thursday 16:30 17:45 SPO-TCS Sportshall - Jakabhegyi út 6.
2 7 Lipcsik Zoltán Farkas György
Basketball (men) Thursday 22:00 23:30 SPO-TCS Sportshall - Jakabhegyi út 6.
4 20 Németh Attila Miklós
Basketball (women) (Student Sports Club)
Wednesday 18:00 19:30 SPO-TCS Sportshall - Jakabhegyi út 6.
2 6 Németh Attila Miklós
Farkas György
Box Thursday 18:00 19:00 SPO-SRC Slyven Ring and Caffe (Mezőszél u. 1.)
1 3 Alvics Gyula
Cardio Yoga Friday 15:00 16:30 SZEA-EDZ Main Building training room
2 10 Ragács Renáta
Climbing Thursday 17:30 19:00 SPO-PSM "Pécsi Sasok" Sportscenter (Búza tér 6/b.)
2 6 Téczely Tamás
Cross training Tuesday 21.00 22.30 SPO-CRF Cross Factory, Professor Gym court Megyeri út 4.)
1 6 Téczely Tamás
Dancing University Project - Ballroom Dancing
Thursday 20:30 22:00 SPO-I6T Dance Room (Ifjúság Street 6.)
1 4 Dr. Papp Judit Bánkyné Perjés Beatrix
Dancing University Project - Ballroom Latin Dances
Tuesday 20:30 22:00 SPO-I6T Dance Room (Ifjúság Street 6.)
1 4 Józsa János Bánkyné Perjés Beatrix
Dancing University Project - Belly Dance
Thursday 17:30 19:00 SPO-I6T Dance Room (Ifjúság Street 6.)
1 4 Indzsi Deniz Bánkyné Perjés Beatrix
Dancing University Project - Body Shaping Dance Aerobics
Tuesday 16:00 17:30 SPO-I6T Dance Room (Ifjúság Street 6.)
1 4 Szuhán-Glass Beáta
Bánkyné Perjés Beatrix
Dancing University Project - Boogie-Woogie, Rock 'n' Roll, Swing
Monday 15:30 17:00 SPO-I6T Dance Room (Ifjúság Street 6.)
1 4 Szauer Zoltán Bánkyné Perjés Beatrix
Dancing University Project - Croatian, Serbian and Macedonian Dances
Tuesday 17:30 19:00 SPO-I6T Dance Room (Ifjúság Street 6.)
1 4 Vélin Veszna Bánkyné Perjés Beatrix
Dancing University Project - Cuban Salsa
Wednesday 17:30 19:00 SPO-I6T Dance Room (Ifjúság Street 6.)
1 4 Vágási Barbara, Kutni Balázs
Bánkyné Perjés Beatrix
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Sport Day From To Place Min. Max. Teacher Supervisor
Dancing University Project - Hip-hop
Monday 18:30 20:00 SPO-I6T Dance Room (Ifjúság Street 6.)
1 4 Horváth Tamás Bánkyné Perjés Beatrix
Dancing University Project - Hungarian Folk Dance beginner
Thursday 19:00 20:30 SPO-I6T Dance Room (Ifjúság Street 6.)
1 4 Tandiné Mosgai Andrea, Tandi Tibor
Bánkyné Perjés Beatrix
Dancing University Project - Latin Freestyle Aerobics
Monday 17:00 18:30 SPO-I6T Dance Room (Ifjúság Street 6.)
1 4 Szabó Adrienn Bánkyné Perjés Beatrix
Dancing University Project - Show/Musical Dance
Tuesday 19:00 20:30 SPO-I6T Dance Room (Ifjúság Street 6.)
1 4 Dr. Papp Judit Bánkyné Perjés Beatrix
Dancing University Project - Yoga
Wednesday 15:00 16:30 SPO-I6T Dance Room (Ifjúság Street 6.)
1 4 Gyenis Boglárka Bánkyné Perjés Beatrix
Football Friday 13:30 15:00 SPO-TCS Sportshall - Jakabhegyi út 6.
6 15 Téczely Tamás
Football Friday 15:00 16:30 SPO-TCS Sportshall - Jakabhegyi út 6.
6 15 Téczely Tamás
Handball (men) (Student Sports Club)
Wednesday 19:30 21:00 SPO-TCS Sportshall - Jakabhegyi út 6.
2 7 Lipcsik Zoltán Farkas György
Handball (women) (Student Sports Club)
Monday 17:30 19:00 SPO-TCS Sportshall - Jakabhegyi út 6.
2 7 Lipcsik Zoltán Farkas György
Hiking (weekends, Mecsek)
hétvégente Mecsek 2 10 Farkas György
Horse Riding Thursday 17:00 18:30 SPO-PEA former PEAC Sportshall and sports field - Sport u. 1.
1 2 Bohár Áron Téczely Tamás
Jalagati + Wednesday 19:00 20:30 SPO-RSG RG Terem Ifjúság út 6.
1 2 Dr. Dudás Anna
Karate advanced (Student Sports Club)
Thursday 20:00 21:30 SZEA-EDZ Main Building training room
2 7 József Kristóf Farkas György
Karate beginner (Student Sports Club)
Tuesday 20:00 21:30 SZEA-EDZ Main Building training room
2 7 József Kristóf Farkas György
Kick-box Friday 19:00 20:30 SZEA-EDZ Main Building training room
2 12 Horváth László
Lacross Friday 19:00 20:30 SPO-V13 PTE Sports sites (Verseny u. 13.)
2 10 Dr. Rugási Endre
Nordic Walking Friday 16.00 17.30 SPO-ATP PTE Athletics field (Ifjúság út 6.)
1 8 Hajduné Dr. László Zita
Operational Medicine Training Program
Tuesday 16.15 17.30 SZEA-EDZ Main Building training room
1 6 Lipcsik Zoltán
Operational Medicine Training Program
Thursday 19.00 17.30 SZEA-EDZ Main Building training room
1 6 Dr. Karsai István
Other sportclubs from Pécs (with permission)
2 20 Téczely Tamás
PTE- PEAC (Sport Club) (with permission)
2 20 Téczely Tamás
Shaolin Kung Fu Monday 19:00 20:30 SPO-EP8 Elementary School in 8 Építők Str.
1 4 Bornemissza Gergely
Squash Friday 16:30 18:00 SPO-SOR Sörház (Xavér str 19)
2 4 Téczely Tamás
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Sport Day From To Place Min. Max. Teacher Supervisor
Swimming Tuesday 12:00 13:30 SZEA-USZ Main Building swimming pool
1 4 Dr. Karsai István
Swimming Friday 13:30 15:00 SZEA-USZ Main Building swimming pool
3 15 Farkas György
Swimming Friday 15:00 16:00 SZEA-USZ Main Building swimming pool
3 15 Finak Gáborné Gombosi Eszter Gyöngyi
Table Tennis Thursday 13:30 15:00 SZEA-EDZ Main Building training room
4 16 Finak Gáborné Gombosi Eszter Gyöngyi
Table Tennis Thursday 15:00 16:15 SZEA-EDZ Main Building training room
4 16 Farkas György
Table Tennis Friday 13:30 15:00 SZEA-EDZ Main Building training room
4 8 Finak Gáborné Gombosi Eszter Gyöngyi
Tennis Thursday 18:00 19:00 SPO-MAT Makár Tanya Sports Center (Középmakár dűlő 4.)
2 6 Daróczi Balázs
Track and Field training
Tuesday 17:00 18:30 SPO-JSK Jakabhegy street outdoor handball field
1 5 Dr. Karsai István
Track and Field training
Friday 17:00 18:30 SPO-JSK Jakabhegy street outdoor handball field
1 5 Dr. Karsai István
Training in the Gym Wednesday 12:00 13:30 SPO-GYM Professor Gym (Megyeri str. 4)
2 10 Lipcsik Zoltán
Training in the Gym Friday 12:00 13:30 SPO-GYM Professor Gym (Megyeri str. 4)
4 20 Lipcsik Zoltán
Training in the Gym Friday 13:30 15:00 SPO-GYM Professor Gym (Megyeri str. 4)
4 20 Németh Attila Miklós
Volleyball (men) (Student Sports Club)
Wednesday 16:30 18:00 SPO-TCS Sportshall - Jakabhegyi út 6.
2 7 Storcz Tamás Farkas György
Volleyball (women) (Student Sports Club)
Tuesday 16:30 18:00 SPO-TCS Sportshall - Jakabhegyi út 6.
2 7 Demeter András Farkas György
XCO Training Monday 19:00 20:00 SPO-MFK Mecsek Fitness Center (Ybl Miklós str. 10.)
2 7 Szőke Zita
Yoga Sunday 18:00 20:00 SPO-SOR Sörház (Xavér str 19)
2 10 Briest Charlotte
Zumba (fee payment necessary)
Wednesday 18:00 19:00 SPO-FOR Fordan Dance Center - Batthyány u. 9/a.
2 10 Varga Zsuzsanna