Faculty of Science

Model (No 12)

Course Specification : ميكانيكا تحليلية واستاتيكا

2010 - 2011

 
Farabi Quality Management of Education and Learning - 22/12/2024
University :Mansoura University
Faculty :Faculty of Science
Department :Mathematics Department
1- Course data :-
Code: 11203
Course title: ميكانيكا تحليلية واستاتيكا
Year/Level: ثانية رياضه
Program Title:
  • Mathematics
Specialization:
Teaching Hours: Theoretical: 4Tutorial: 4Practical:
2- Course aims :-
  1. On completion of this course, students will be familiar with the fundamental concepts of new topics of statics. • Can understand and interpret some physical phenomena such as hydrostatics. • On completing of this course, students will be familiar with the fundamental concepts of statistical mechanics.
3- Course Learning Outcomes :-
4- Course contents :-
NoTopicsWeek
1Vectors integration(line,surface and volume integrals
2Integral Theorems(Gauss, Stokes Green's), vector identities, conservative field, solid angle.
3Attraction and potentials(and its applications).
4Moment of inertia
5 Introduction to hydrostatics
6Basic concepts of analytical mechanics
7Lagrangian, Hamiltonian and Routhian eqns

5- Teaching and learning methods :-
SMethod
Four hours lecturer weekly with exercise sheets and solution sheets
Weekly 4 hours tutorials in groups
Using Internet facilities

6- Teaching and learning methods of disables :-
  1. -

7- Student assessment :-
A. Timing
NoMethodWeek
1Oral exam13
2Final exam 16
B. Degree
NoMethodDegree
1Mid_term examination0
2Final_term examination90
3Oral examination 10
4Practical examination 0
5Semester work0
6Other types of asessment0
Total100%

8- List of books and references
SItemType
1Yehia H. M. Particle and rigid body dynamics (in Arabic)
2 A.S. Ramsey, Statics, Cambridge University Press (1988).
3Beer, Mechanics for Engineers, Statics, Mc Graw-Hill (1999)

9- Matrix of knowledge and skills of the course
SContentStudy week
Vectors integration(line,surface and volume integrals
Integral Theorems(Gauss, Stokes Green's), vector identities, conservative field, solid angle.
Attraction and potentials(and its applications).
Moment of inertia
Introduction to hydrostatics
Basic concepts of analytical mechanics
Lagrangian, Hamiltonian and Routhian eqns

Course Coordinator(s): -
  1. Montaser Ahmed Taha Saafan
Head of department: -
Ahmed Habeb Mohamed Nageb Elbassiony