MATH120 CALCULUS OF FUNCTIONS OF SEVERAL VARIABLES

Course Code:2360120
METU Credit (Theoretical-Laboratory hours/week):5 (4.00 - 2.00)
ECTS Credit:7.5
Department:Mathematics
Language of Instruction:English
Level of Study:Undergraduate
Course Coordinator:Assist.Prof.Dr DİLBER KOÇAK BENLİ
Offered Semester:Spring Semesters.

Course Objectives

  • Use various tests to determine series convergence, perform standard operations with convergent power series, find Taylor and Maclaurin representations.
  • Handle vectors fluently in solving problems involving the geometry of lines, curves, planes, and surfaces in space.
  • Examine functions of several variables, define and compute limits of functions at points and define and determine continuity
  • Define and compute partial derivatives, directional derivatives and differentials of multivariable functions and examine conditions of differentiability; find the equation of the tangent plane to a surface at a point.
  • Find local extreme values of functions of several variables, test for saddle points, examine the conditions for the existence of absolute extreme values, solve constraint problems using Lagrange multipliers, and solve related application problems.
  • Use Rectangular, Cylindrical and Spherical Coordinates Systems to define space curves and surfaces in Cartesian and Parametric forms

  • Integrate functions of several variables

  • Examine vector fields and define and evaluate line integrals using the Fundamental Theorem of line integrals and Green’s Theorem; compute arc length

  • Define and compute the Curl and Divergence of vector fields and apply Green’s Theorem to evaluate line integrals, surface integrals and flux integrals


Course Content

Sequences and infinite series. Power series. Taylor series. Vectors and analytic geometry in 3-space. Functions of several variables: limits, continuity, partial derivatives. Chain rule. Directional derivatives. Tangent planes and linear approximations. Extreme values. Lagrange multipliers. Double integrals. Double integrals in polar coordinates. General change of variables in double integrals. Surface parametrization and surface area in double integrals. Triple integrals in Cartesian, cylindrical and spherical coordinates. Parametrization of space curves. Line integrals. Path independence. Green s theorem in the plane.


Course Learning Outcomes

  • Effectively write mathematical solutions in a clear and concise manner.
  • Graphically and analytically synthesize and apply multivariable and vector-valued functions and their derivatives, using correct notation and mathematical precision.
  • Use double, triple and line integrals in applications, including Green's Theorem.
  • Synthesize the key concepts of differential, integral and multivariate calculus.
     

Program Outcomes Matrix

Level of Contribution
#Program Outcomes0123
1Acquires mathematical thinking skills (problem solving, generating ways of thinking, forming correspondence, generalizing etc.) and can use them in related fields.
2Can produce innovative thoughts and products.
3Can design mathematics related problems, devise solution methods and apply them when appropriate.
4Has a comprehension of mathematical symbols, concepts together with the interactions among them and can express his/her solutions similarly.
5Has a command of Turkish and English languages so that he/she can actively communicate (read, write, listen and speak).
6Contributes to solving global, environmental and social problems either individually or as being part of a social group.
7Respects ethical values and rules; applies them in professional and social issues.
8Can work cooperatively in a team and also individually.
9Is responsive to life-long learning, improving his/her skills and abilities
10Comprehends necessity of knowledge, can define it and acquires it; uses knowledge effectively and shares it with others

0: No Contribution 1: Little Contribution 2: Partial Contribution 3: Full Contribution