Biomathematics 1

Data

Official data in SubjectManager for the following academic year: 2022-2023

Course director

Number of hours/semester

lectures: 28 hours

practices: 28 hours

seminars: 0 hours

total of: 56 hours

Subject data

  • Code of subject: OPA-BM1-T
  • 4 kredit
  • Pharmacy
  • Basic modul
  • autumn
Prerequisites:

-

Exam course:

no

Course headcount limitations

min. 1

Topic

Introduction to fundamentals and methods of differential and integral calculus. Applications in the fields of mathematics, physics, chemistry and biology.

Lectures

  • 1. Introduction - Dr. Grama László
  • 2. Introduction - Dr. Grama László
  • 3. The difference quotient - Dr. Bugyi Beáta
  • 4. The difference quotient - Dr. Bugyi Beáta
  • 5. Calculating derivatives. Higher-order derivatives - Dr. Bugyi Beáta
  • 6. Calculating derivatives. Higher-order derivatives - Dr. Bugyi Beáta
  • 7. Applications of derivatives - Dr. Bugyi Beáta
  • 8. Applications of derivatives - Dr. Bugyi Beáta
  • 9. Analysis of functions using derivatives - Dr. Grama László
  • 10. Analysis of functions using derivatives - Dr. Grama László
  • 11. Partial derivatives - Dr. Bugyi Beáta
  • 12. Partial derivatives - Dr. Bugyi Beáta
  • 13. Applications of partial derivatives - Dr. Bugyi Beáta
  • 14. Applications of partial derivatives - Dr. Bugyi Beáta
  • 15. The definite integral. Integration methods - Dr. Grama László
  • 16. The definite integral. Integration methods - Dr. Grama László
  • 17. 1st Midterm Test - Dr. Grama László
  • 18. 1st Midterm Test - Dr. Grama László
  • 19. Applications of integrals - Dr. Grama László
  • 20. Applications of integrals - Dr. Grama László
  • 21. Differential equations and their applications - Dr. Grama László
  • 22. Differential equations and their applications - Dr. Grama László
  • 23. Differential equations for reaction kinetics - Dr. Bugyi Beáta
  • 24. Differential equations for reaction kinetics - Dr. Bugyi Beáta
  • 25. Summary, consultation - Dr. Grama László
  • 26. Summary, consultation - Dr. Grama László
  • 27. 2nd Midterm Test - Dr. Grama László
  • 28. 2nd Midterm Test - Dr. Grama László

Practices

  • 1. Introduction
  • 2. Introduction
  • 3. The difference quotient
  • 4. The difference quotient
  • 5. Calculating derivatives. Higher-order derivatives
  • 6. Calculating derivatives. Higher-order derivatives
  • 7. Applications of derivatives
  • 8. Applications of derivatives
  • 9. Analysis of functions using derivatives
  • 10. Analysis of functions using derivatives
  • 11. Partial derivatives
  • 12. Partial derivatives
  • 13. Applications of partial derivatives
  • 14. Applications of partial derivatives
  • 15. The definite integral. Integration methods
  • 16. The definite integral. Integration methods
  • 17. 1st Midterm Test
  • 18. 1st Midterm Test
  • 19. Applications of integrals
  • 20. Applications of integrals
  • 21. Differential equations and their applications
  • 22. Differential equations and their applications
  • 23. Differential equations for reaction kinetics
  • 24. Differential equations for reaction kinetics
  • 25. 2nd Midterm Test
  • 26. 2nd Midterm Test
  • 27. Summary, consultation
  • 28. Summary, consultation

Seminars

Reading material

Obligatory literature

Literature developed by the Department

Will be published on Teams, Moodle or PotePedia.

Notes

József Belágyi, László Mátyus, Miklós Nyitrai: Mathematics, textbook
Péter Hajdu, László Grama: Selected Problems in Mathematics, problems booklet

Recommended literature

Conditions for acceptance of the semester

Maximum of 25 % absence allowed

Mid-term exams

Midterm tests written during the 8th and 14th weeks from materials of differential calculus and integral calculus, respectively.

Making up for missed classes

None.

Exam topics/questions

Will be published on Teams, Moodle or PotePedia.

Examiners

  • Dr. Bugyi Beáta
  • Dr. Grama László

Instructor / tutor of practices and seminars

  • Kilián Balázsné Raics Katalin
  • Madarász Tamás
  • Tempfliné Pirisi Katalin Erzsébet