Module designation | Multivariable Calculus (MAA203) | ||||||||||||||
Semester(s) in which the module is taught | 4th | ||||||||||||||
Person responsible for the module | Dr. Eridani | ||||||||||||||
Language | Indonesian | ||||||||||||||
Relation to curriculum | Compulsory / elective / specialisation | ||||||||||||||
Teaching methods | Lecture and lesson. | ||||||||||||||
Workload (incl. contact hours, self-study hours) | 4×170 minutes (4×50 minutes lecture and lesson, 4×60 minutes structural activities, 4×60 minutes self-study) per week for 16 weeks | ||||||||||||||
Credit points | 4 CP (6,4 ECTS) | ||||||||||||||
Required and recommended prerequisites for joining the module | Analytical Geometry | ||||||||||||||
Module objectives/intended learning outcomes | General Competence (Knowledge): Capable of using the concept of multivariable calculus to solve physical problems. Specific Competence: student capable of 1. Explaining Vectors and Geometry in R2 and R3. 2. Explaining Vector Valued Functions. 3. Explaining the function of two or more variables. 4. Explaining Double and Triple Integrals. 5. Explaining the generalization of vector valued functions. | ||||||||||||||
Content | Vectors, vector-valued functions, functions of two or more variables, fold integrals, line integrals, Green’s theorem and surface integrals. | ||||||||||||||
Examination forms | Essay | ||||||||||||||
Study and examination requirements | Students are considered to pass if they at least have got a final score 40 (D). Final score is calculated as follows: 10% softskill+30% assignment + 20% Quiz + 20% midterm + 20% final exam.
Final index is defined as follow:
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