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Course Information

Course Name
 Turkish Matematik III
English Calculus III
Course Code
 MAT 213E Credit Lecture
(hour/week) 		Recitation
(hour/week) 		Laboratory
(hour/week)
Semester 3
 4 3 2 -
Course Language English
Course Coordinator Ayşe Peker
Course Objectives 1. To provide the applications of limit, continuity, partial differentiation and multiple integrals.
2. To give an ability to apply knowledge of mathematics on engineering problems
Course Description Functions of several variables, limit, continuity, partial derivative, chain rules, directional
derivative, gradient vector, the equation of tangent plane and normal line, linearization and
differentaiability, extrama of multivariable functions, Lagrange multipliers method, Taylor formula,
double and triple integrals, substitutions in multiple integrals, applications of multiple integrals,
line integrals, vector fields, path independence, potential functions, the fundamental theorem of
line integrals, Green’s theorem in the plane, surface area and surface integral, Stokes’ theorem,
Divergence theorem
Course Outcomes Students completing this course will be able to :
I. Understand the multivariable functions, analyze limits, determine continuity, and compute
partial derivatives of them; find tangent planes, directional derivatives, gradients; apply
the second partials test, and Lagrange multipliers to approximate and solve optimization
problems.
II. Compute multiple integrals over rectangular regions, non-rectangular regions, and in other
coordinate systems ; apply multiple integrals in problem situations involving area, volume,
surface area etc.
III. Compute line integrals and surface integrals and apply Green’s theorem, Stoke’s Theorem
and the Divergence Theorem; find potential functions.
Pre-requisite(s) MAT112 MIN DD / MAT112E MIN DD
Required Facilities
Other
Textbook Weir, M.D., J. Hass and F.R. Giardona, Thomas’ Calculus, 11th Edition, Pearson, Addison-
Wesley, Boston, 2005 (Bölümler: 8,10,11,12,13).
Other References Thomas, Jr. G.B. and RiL. Finney, Calculus and Analytic Geometry 9th edition, Addision-
Wesley, 1998 (Bölümler: 0, 1, 2, 3, 4, 5, 6)
W.R. Parzynski and P.W. Zipse, Introduction to Mathematical Analysis, McGraw-Hill
International Edition, 1987, (Bölüm: 9.4)
 
 
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