Education (mathematics), Peter MOSON

Information for the 2nd semester of academic year 2023-2024

 

Office hour: In person. Wednesday 10:30-11:30 a.m. in H. building 41.

 

 

Mathematics Global Exam. BMETE90AX23.

Please DO NOT FORGET TO REGISTER for the subject in NEPTUN.

Short presentation of the structure of Global exam.

Planned dates for exams: March 25, 2024, May 28, 2024, June 25, 2024.

Examples of some earlier Global exams:

In Classroom. 18-12-11. Written exam with solutions. 18-12-18. Written exam with solutions. 19-01-08. Written exam. 19-01-15. Written exam with solutions.

In TEAMS. June 9, 2020. Written with solutions. June 16, 2020.  Written exam with solutions.  

Oral exam (the questions are the same as earlier).

 

 

Mathematics EP2 (BMETE90AX34).

Requirements. Please read it carefully. Course datasheet (mostly in Hungarian).

Short summary of the course. It will be uploaded continuously.

Sample tests. In person. Test 1 (with solutions). Test 2 (with solutions). Online (in TEAMS). Test 1. March 25, 2020. Test 1 with solutions. Test 2. May 6, 2020. Test 2 with solutions.

Literature: Thomas’ Calculus by Thomas, G.B. et al. Addison-Wesley, (ISBN0321185587) 2005 + several later editions. Hungarian translation is available (registration is necessary, price: 0 HUF): http://www.interkonyv.hu/konyvek/Thomas_kalkulus_3

 

 

Mathematics G3 for Mechanical Engineers (BMETE93BG03). Mathematics A3 (BMETE90AX18, BMETE90AX07).

Requirements. Please read it carefully. It contains all important information related to the course.

Students of the Faculty of Mechanical Engineering, please DO NOT FORGET TO REGISTER for the subject BMETE90AX23 (Global, Comprehensive exam) in NEPTUN.

Literature. Thomas’ Calculus. In Hungarian it can be downloaded free:

http://www.interkonyv.hu/konyvek/Thomas_kalkulus_2 

Short summary of the course. It will be uploaded continuously.

Sample tests (tests of the academic year 2019/2020).

Test 1. Tests with solutions (A, B). Retake 1. Test with solutions.

Test 2. Test with solutions. Retake 2. Test with solutions.

 

 

Differential Equations 1, (BME TE93AM15).

Requirements. Please read it carefully. It contains all important information related to the course.

Oral exam.

Short summary of the course. It will be uploaded continuously.

Sample tests, exam (Academic year 2018).

Test 1. Tests with solutions. Test 2. with solutions. Exam with solutions.

 

 

 

Return to the start of the home page 

http://tutor.nok.bme.hu/sandwich/general/moson.htm