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SÜRMENE FACULTY of MARINE SCIENCES / DEPARTMENT of FISHERIES TECHNOLOGY ENGINEERING

Course Catalog
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SÜRMENE FACULTY of MARINE SCIENCES / DEPARTMENT of FISHERIES TECHNOLOGY ENGINEERING /
Katalog Ana Sayfa
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MAT1008Mathematics - II4+0+0ECTS:5
Year / SemesterSpring Semester
Level of CourseFirst Cycle
Status Compulsory
DepartmentDEPARTMENT of FISHERIES TECHNOLOGY ENGINEERING
Prerequisites and co-requisitesNone
Mode of Delivery
Contact Hours14 weeks - 4 hours of lectures per week
LecturerDoç. Dr. Devran YAZIR
Co-LecturerASSOC. PROF. DR. DEVRAN YAZIR, ASSOC. PROF. DR. MELTEM SERTBAŞ
Language of instructionTurkish
Professional practise ( internship ) None
 
The aim of the course:
The aim of the course is to teach the basic mathematical techniques. Analyzing the two and three dimensional problems in engineering sciencies and introducing a number of mathematical skills which can be used for the analysis of problems. The emphasis is on the practical usability of mathematics; this goal is mainly pursued via a large variety of examples and applications from these disciplines.
 
Learning OutcomesCTPOTOA
Upon successful completion of the course, the students will be able to :
LO - 1 : knows the concepts of matrix and determinant and enable to solve system of equations1,21
LO - 2 : knows the concepts of conic sections and express in polar coordinates.1,21
LO - 3 : know vectors in two and three dimensional spaces1,21
LO - 4 : understand functions of two and three variables and their properties1,21
LO - 5 : know the concepts of limit and continuity of functions of two and three variables1,21
LO - 6 : know the concepts of derivative and apply it to engineering problems1,21
LO - 7 : know the concepts of integration and apply it to engineering problems1,21
CTPO : Contribution to programme outcomes, TOA :Type of assessment (1: written exam, 2: Oral exam, 3: Homework assignment, 4: Laboratory exercise/exam, 5: Seminar / presentation, 6: Term paper), LO : Learning Outcome

 
Contents of the Course
Matrix, canonical form of the matrices, eigenvalues and eigenvectors, determinant, inverse matrices, linear system of equations and solutions. Crammer rule. Conic sections and quadratic equations, polar coordinates and plotting graphs, parameterization of curves on plane. Three dimensional space and Cartesian coordinates. Vectors on the plane and space. Dot, cross and scalar triple product. Lines and planes on three dimensional space. Cylinders, conics and sphere. Cylindrical and spherical coordinates. Vector valued functions, and curves on the space, curvature, torsion and TNB frame. Multi variable functions, limit, continuity and partial derivative. Chain rule, directional derivative, gradient, divergence, rotational and tangent planes. Ekstremum values and saddle points, Lagrange multipliers, Taylor and Maclaurin series. Double integration, areas, moment and gravitational center. Double integrals in polar coordinates. Triple integrals in cartesian coordinates. Mass, moment and gravitational center in three dimensional space. Triple integrals in cylindrical and spherical coordinates. Change of variables in multiple integrals. Line integrals, vector fields, work, flux. Green' s theorem on plane. Areas of surface and surface integrals. Stokes theorem, divergence theorem and applications.
 
Course Syllabus
 WeekSubjectRelated Notes / Files
 Week 1Matrices, determinants, eigenvalues and eigenvectors, inverse matrix.
 Week 2Systems of lineer equations and solutions by reduction to echelon form and Crammer rule.
 Week 3Conic sections and quadratic equations, polar coordinates and plotting graphs, parameterization of curves on plane.
 Week 4Three dimensional space and Cartesian coordinates. Vectors on the plane and space. Dot, cross and scalar triple product.
 Week 5Lines and planes on three dimensional space. Cylinders, conics and sphere. Cylindrical and spherical coordinates.
 Week 6Vector valued functions, and curves on the space, curvature, torsion and TNB frame.
 Week 7Multi variable functions, limit, continuity and partial derivative.
 Week 8Chain rule, directional derivative, gradient, divergence, rotational and tangent planes.
 Week 9Mid-term exam
 Week 10Ekstremum values and saddle points, Lagrange multipliers, Taylor and Maclaurin series.
 Week 11Double integration, areas, moment and gravitational center. Double integrals in polar coordinates. Triple integrals in cartesian coordinates.
 Week 12Mass, moment and gravitational center in three dimensional space. Triple integrals in cylindrical and spherical coordinates. Change of variables in multiple integrals.
 Week 13Line integrals, vector fields, work, flux. Green?s theorem on plane.
 Week 14Areas of surface and surface integrals.
 Week 15Stokes theorem, divergence theorem and applications.
 Week 16End-of-term exam
 
Textbook / Material
1Thomas, G.B., Finney, R.L.. (Çev: Korkmaz, R.), 2001. Calculus ve Analitik Geometri, Cilt II, Beta Yayınları, İstanbul.
 
Recommended Reading
1Balcı, M. 2009. Genel Matematik 2, Balcı Yayınları, Ankara
2Kolman, B., Hill, D.L. (Çev Edit: Akın, Ö.) 2002. Uygulamalı lineer cebir. Palme Yayıncılık, Ankara.
 
Method of Assessment
Type of assessmentWeek NoDate

Duration (hours)Weight (%)
Mid-term exam 9 15/04/2024 1 50
End-of-term exam 16 06/06/2024 1 50
 
Student Work Load and its Distribution
Type of workDuration (hours pw)

No of weeks / Number of activity

Hours in total per term
Yüz yüze eğitim 4 14 56
Sınıf dışı çalışma 5 14 70
Arasınav için hazırlık 9 1 9
Arasınav 15 1 15
Dönem sonu sınavı için hazırlık 10 1 10
Dönem sonu sınavı 2 1 2
Total work load162