Skip to main content
TR EN

Course Catalog

MATH 101 Calculus I 3 Credits
Basic functions; their properties and applications to modeling. Rate of change, limit, derivative and linear approximation. Computational techniques. Local and global extrema. Applications to optimization problems. The definite integral. Antiderivatives and the Fundamental Theorem of Calculus. Integration techniques. Improper integrals. Applications.
Last Offered Terms Course Name SU Credit
Spring 2023-2024 Calculus I 3
Fall 2023-2024 Calculus I 3
Summer 2022-2023 Calculus I 3
Spring 2022-2023 Calculus I 3
Fall 2022-2023 Calculus I 3
Summer 2021-2022 Calculus I 3
Spring 2021-2022 Calculus I 3
Fall 2021-2022 Calculus I 3
Summer 2020-2021 Calculus I 3
Spring 2020-2021 Calculus I 3
Fall 2020-2021 Calculus I 3
Summer 2019-2020 Calculus I 3
Spring 2019-2020 Calculus I 3
Fall 2019-2020 Calculus I 3
Summer 2018-2019 Calculus I 3
Spring 2018-2019 Calculus I 3
Fall 2018-2019 Calculus I 3
Summer 2017-2018 Calculus I 3
Spring 2017-2018 Calculus I 3
Fall 2017-2018 Calculus I 3
Summer 2016-2017 Calculus I 3
Spring 2016-2017 Calculus I 3
Fall 2016-2017 Calculus I 3
Summer 2015-2016 Calculus I 3
Spring 2015-2016 Calculus I 3
Fall 2015-2016 Calculus I 3
Summer 2014-2015 Calculus I 3
Spring 2014-2015 Calculus I 3
Fall 2014-2015 Calculus I 3
Summer 2013-2014 Calculus I 3
Spring 2013-2014 Calculus I 3
Fall 2013-2014 Calculus I 3
Spring 2012-2013 Calculus I 3
Fall 2012-2013 Calculus I 3
Spring 2011-2012 Calculus I 3
Fall 2011-2012 Calculus I 3
Spring 2010-2011 Calculus I 3
Fall 2010-2011 Calculus I 3
Spring 2009-2010 Calculus I 3
Fall 2009-2010 Calculus I 3
Spring 2008-2009 Calculus I 3
Fall 2008-2009 Calculus I 3
Spring 2007-2008 Calculus I 3
Fall 2007-2008 Calculus I 3
Spring 2006-2007 Functions:Discrete and Continuous I 3
Fall 2006-2007 Functions:Discrete and Continuous I 3
Summer 2005-2006 Functions:Discrete and Continuous I 3
Fall 2005-2006 Functions:Discrete and Continuous I 3
Summer 2004-2005 Functions:Discrete and Continuous I 3
Fall 2004-2005 Functions:Discrete and Continuous I 3
Summer 2003-2004 Functions:Discrete and Continuous I 3
Fall 2003-2004 Functions:Discrete and Continuous I 3
Fall 2002-2003 Functions:Discrete and Continuous I 3
Fall 2001-2002 Functions:Discrete and Continuous I 3
Fall 2000-2001 Functions:Discrete and Continuous I 3
Fall 1999-2000 Functions:Discrete and Continuous I 3
Prerequisite: __
Corequisite: MATH 101R
ECTS Credit: 6 ECTS (5 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 101R Calculus I - Recitation 0 Credit
Last Offered Terms Course Name SU Credit
Spring 2023-2024 Calculus I - Recitation 0
Fall 2023-2024 Calculus I - Recitation 0
Summer 2022-2023 Calculus I - Recitation 0
Spring 2022-2023 Calculus I - Recitation 0
Fall 2022-2023 Calculus I - Recitation 0
Summer 2021-2022 Calculus I - Recitation 0
Spring 2021-2022 Calculus I - Recitation 0
Fall 2021-2022 Calculus I - Recitation 0
Summer 2020-2021 Calculus I - Recitation 0
Spring 2020-2021 Calculus I - Recitation 0
Fall 2020-2021 Calculus I - Recitation 0
Summer 2019-2020 Calculus I - Recitation 0
Spring 2019-2020 Calculus I - Recitation 0
Fall 2019-2020 Calculus I - Recitation 0
Summer 2018-2019 Calculus I - Recitation 0
Spring 2018-2019 Calculus I - Recitation 0
Fall 2018-2019 Calculus I - Recitation 0
Summer 2017-2018 Calculus I - Recitation 0
Spring 2017-2018 Calculus I - Recitation 0
Fall 2017-2018 Calculus I - Recitation 0
Summer 2016-2017 Calculus I - Recitation 0
Spring 2016-2017 Calculus I - Recitation 0
Fall 2016-2017 Calculus I - Recitation 0
Summer 2015-2016 Calculus I - Recitation 0
Spring 2015-2016 Calculus I - Recitation 0
Fall 2015-2016 Calculus I - Recitation 0
Summer 2014-2015 Calculus I - Recitation 0
Spring 2014-2015 Calculus I - Recitation 0
Fall 2014-2015 Calculus I - Recitation 0
Summer 2013-2014 Calculus I - Recitation 0
Spring 2013-2014 Calculus I - Recitation 0
Fall 2013-2014 Calculus I - Recitation 0
Spring 2012-2013 Calculus I - Recitation 0
Fall 2012-2013 Calculus I - Recitation 0
Spring 2011-2012 Calculus I - Recitation 0
Fall 2011-2012 Calculus I - Recitation 0
Spring 2010-2011 Calculus I - Recitation 0
Fall 2010-2011 Calculus I - Recitation 0
Spring 2009-2010 Calculus I - Recitation 0
Fall 2009-2010 Calculus I - Recitation 0
Spring 2008-2009 Calculus I - Recitation 0
Fall 2008-2009 Calculus I - Recitation 0
Spring 2007-2008 Calculus I - Recitation 0
Fall 2007-2008 Calculus I - Recitation 0
Spring 2006-2007 Functions: Discrete and Continuous I - Recitation 0
Fall 2006-2007 Functions: Discrete and Continuous I - Recitation 0
Summer 2005-2006 Functions: Discrete and Continuous I - Recitation 0
Fall 2005-2006 Functions: Discrete and Continuous I - Recitation 0
Summer 2004-2005 Functions: Discrete and Continuous I - Recitation 0
Fall 2004-2005 Functions: Discrete and Continuous I - Recitation 0
Summer 2003-2004 Functions: Discrete and Continuous I - Recitation 0
Fall 2003-2004 Functions: Discrete and Continuous I - Recitation 0
Fall 2002-2003 Functions: Discrete and Continuous I - Recitation 0
Fall 2001-2002 Functions: Discrete and Continuous I - Recitation 0
Fall 2000-2001 Functions: Discrete and Continuous I - Recitation 0
Fall 1999-2000 Functions: Discrete and Continuous I - Recitation 0
Prerequisite: __
Corequisite: MATH 101
ECTS Credit: NONE ECTS (NONE ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 102 Calculus II 3 Credits
Sequences and series. Power series. Taylor polynomials, Taylor series and approximation. Visualizing functions of several variables; graphs and contour diagrams. Vectors. Differentation in several variables; partial and directional derivatives. Linear and quadratic approxiamtion. Classification of local extrema. Optimization, Lagrange Multipliers. Integration in several variables. Iterated integrals. Change of variables; polar, cylindrical and spherical coordinates.
Last Offered Terms Course Name SU Credit
Spring 2023-2024 Calculus II 3
Fall 2023-2024 Calculus II 3
Summer 2022-2023 Calculus II 3
Spring 2022-2023 Calculus II 3
Fall 2022-2023 Calculus II 3
Summer 2021-2022 Calculus II 3
Spring 2021-2022 Calculus II 3
Fall 2021-2022 Calculus II 3
Summer 2020-2021 Calculus II 3
Spring 2020-2021 Calculus II 3
Fall 2020-2021 Calculus II 3
Summer 2019-2020 Calculus II 3
Spring 2019-2020 Calculus II 3
Fall 2019-2020 Calculus II 3
Summer 2018-2019 Calculus II 3
Spring 2018-2019 Calculus II 3
Fall 2018-2019 Calculus II 3
Summer 2017-2018 Calculus II 3
Spring 2017-2018 Calculus II 3
Fall 2017-2018 Calculus II 3
Summer 2016-2017 Calculus II 3
Spring 2016-2017 Calculus II 3
Fall 2016-2017 Calculus II 3
Summer 2015-2016 Calculus II 3
Spring 2015-2016 Calculus II 3
Fall 2015-2016 Calculus II 3
Summer 2014-2015 Calculus II 3
Spring 2014-2015 Calculus II 3
Fall 2014-2015 Calculus II 3
Summer 2013-2014 Calculus II 3
Spring 2013-2014 Calculus II 3
Fall 2013-2014 Calculus II 3
Summer 2012-2013 Calculus II 3
Spring 2012-2013 Calculus II 3
Fall 2012-2013 Calculus II 3
Summer 2011-2012 Calculus II 3
Spring 2011-2012 Calculus II 3
Fall 2011-2012 Calculus II 3
Summer 2010-2011 Calculus II 3
Spring 2010-2011 Calculus II 3
Fall 2010-2011 Calculus II 3
Summer 2009-2010 Calculus II 3
Spring 2009-2010 Calculus II 3
Fall 2009-2010 Calculus II 3
Summer 2008-2009 Calculus II 3
Spring 2008-2009 Calculus II 3
Fall 2008-2009 Calculus II 3
Summer 2007-2008 Calculus II 3
Spring 2007-2008 Calculus II 3
Fall 2007-2008 Calculus II 3
Summer 2006-2007 Functions:Discrete and Continuous II 3
Spring 2006-2007 Functions:Discrete and Continuous II 3
Summer 2005-2006 Functions:Discrete and Continuous II 3
Spring 2005-2006 Functions:Discrete and Continuous II 3
Spring 2004-2005 Functions:Discrete and Continuous II 3
Summer 2003-2004 Functions:Discrete and Continuous II 3
Spring 2003-2004 Functions:Discrete and Continuous II 3
Spring 2002-2003 Functions:Discrete and Continuous II 3
Spring 2001-2002 Functions:Discrete and Continuous II 3
Spring 2000-2001 Functions:Discrete and Continuous II 3
Spring 1999-2000 Functions:Discrete and Continuous II 3
Prerequisite: MATH 101 - Undergraduate - Min Grade D
Corequisite: MATH 102R
ECTS Credit: 6 ECTS (5 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 102R Calculus II - Recitation 0 Credit
Last Offered Terms Course Name SU Credit
Spring 2023-2024 Calculus II - Recitation 0
Fall 2023-2024 Calculus II - Recitation 0
Summer 2022-2023 Calculus II - Recitation 0
Spring 2022-2023 Calculus II - Recitation 0
Fall 2022-2023 Calculus II - Recitation 0
Summer 2021-2022 Calculus II - Recitation 0
Spring 2021-2022 Calculus II - Recitation 0
Fall 2021-2022 Calculus II - Recitation 0
Summer 2020-2021 Calculus II - Recitation 0
Spring 2020-2021 Calculus II - Recitation 0
Fall 2020-2021 Calculus II - Recitation 0
Summer 2019-2020 Calculus II - Recitation 0
Spring 2019-2020 Calculus II - Recitation 0
Fall 2019-2020 Calculus II - Recitation 0
Summer 2018-2019 Calculus II - Recitation 0
Spring 2018-2019 Calculus II - Recitation 0
Fall 2018-2019 Calculus II - Recitation 0
Summer 2017-2018 Calculus II - Recitation 0
Spring 2017-2018 Calculus II - Recitation 0
Fall 2017-2018 Calculus II - Recitation 0
Summer 2016-2017 Calculus II - Recitation 0
Spring 2016-2017 Calculus II - Recitation 0
Fall 2016-2017 Calculus II - Recitation 0
Summer 2015-2016 Calculus II - Recitation 0
Spring 2015-2016 Calculus II - Recitation 0
Fall 2015-2016 Calculus II - Recitation 0
Summer 2014-2015 Calculus II - Recitation 0
Spring 2014-2015 Calculus II - Recitation 0
Fall 2014-2015 Calculus II - Recitation 0
Summer 2013-2014 Calculus II - Recitation 0
Spring 2013-2014 Calculus II - Recitation 0
Fall 2013-2014 Calculus II - Recitation 0
Summer 2012-2013 Calculus II - Recitation 0
Spring 2012-2013 Calculus II - Recitation 0
Fall 2012-2013 Calculus II - Recitation 0
Summer 2011-2012 Calculus II - Recitation 0
Spring 2011-2012 Calculus II - Recitation 0
Fall 2011-2012 Calculus II - Recitation 0
Summer 2010-2011 Calculus II - Recitation 0
Spring 2010-2011 Calculus II - Recitation 0
Fall 2010-2011 Calculus II - Recitation 0
Summer 2009-2010 Calculus II - Recitation 0
Spring 2009-2010 Calculus II - Recitation 0
Fall 2009-2010 Calculus II - Recitation 0
Summer 2008-2009 Calculus II - Recitation 0
Spring 2008-2009 Calculus II - Recitation 0
Fall 2008-2009 Calculus II - Recitation 0
Summer 2007-2008 Calculus II - Recitation 0
Spring 2007-2008 Calculus II - Recitation 0
Fall 2007-2008 Calculus II - Recitation 0
Summer 2006-2007 Functions: Discrete and Continuous II - Recitation 0
Spring 2006-2007 Functions: Discrete and Continuous II - Recitation 0
Summer 2005-2006 Functions: Discrete and Continuous II - Recitation 0
Spring 2005-2006 Functions: Discrete and Continuous II - Recitation 0
Spring 2004-2005 Functions: Discrete and Continuous II - Recitation 0
Summer 2003-2004 Functions: Discrete and Continuous II - Recitation 0
Spring 2003-2004 Functions: Discrete and Continuous II - Recitation 0
Spring 2002-2003 Functions: Discrete and Continuous II - Recitation 0
Spring 2001-2002 Functions: Discrete and Continuous II - Recitation 0
Spring 2000-2001 Functions: Discrete and Continuous II - Recitation 0
Spring 1999-2000 Functions: Discrete and Continuous II - Recitation 0
Prerequisite: __
Corequisite: MATH 102
ECTS Credit: NONE ECTS (NONE ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 201 Linear Algebra 3 Credits
Systems of linear equations; Gaussian elimination. Vector spaces, subspaces, linear, independence, dimension, change of basic. Linear transformations. Inner product, orthogonality. Eigenvalues. Diagonalization and canonical forms. Cayley-Hamilton theorem.
Last Offered Terms Course Name SU Credit
Spring 2023-2024 Linear Algebra 3
Fall 2023-2024 Linear Algebra 3
Summer 2022-2023 Linear Algebra 3
Spring 2022-2023 Linear Algebra 3
Fall 2022-2023 Linear Algebra 3
Summer 2021-2022 Linear Algebra 3
Spring 2021-2022 Linear Algebra 3
Fall 2021-2022 Linear Algebra 3
Summer 2020-2021 Linear Algebra 3
Spring 2020-2021 Linear Algebra 3
Fall 2020-2021 Linear Algebra 3
Summer 2019-2020 Linear Algebra 3
Spring 2019-2020 Linear Algebra 3
Fall 2019-2020 Linear Algebra 3
Summer 2018-2019 Linear Algebra 3
Spring 2018-2019 Linear Algebra 3
Fall 2018-2019 Linear Algebra 3
Summer 2017-2018 Linear Algebra 3
Spring 2017-2018 Linear Algebra 3
Fall 2017-2018 Linear Algebra 3
Summer 2016-2017 Linear Algebra 3
Spring 2016-2017 Linear Algebra 3
Fall 2016-2017 Linear Algebra 3
Summer 2015-2016 Linear Algebra 3
Spring 2015-2016 Linear Algebra 3
Fall 2015-2016 Linear Algebra 3
Summer 2014-2015 Linear Algebra 3
Fall 2014-2015 Linear Algebra 3
Summer 2013-2014 Linear Algebra 3
Fall 2013-2014 Linear Algebra 3
Summer 2012-2013 Linear Algebra 3
Fall 2012-2013 Linear Algebra 3
Summer 2011-2012 Linear Algebra 3
Fall 2011-2012 Linear Algebra 3
Summer 2010-2011 Linear Algebra 3
Fall 2010-2011 Linear Algebra 3
Summer 2009-2010 Linear Algebra 3
Fall 2009-2010 Linear Algebra 3
Summer 2008-2009 Linear Algebra 3
Fall 2008-2009 Linear Algebra 3
Summer 2007-2008 Linear Algebra 3
Fall 2007-2008 Linear Algebra 3
Summer 2006-2007 Linear Algebra 3
Fall 2006-2007 Linear Algebra 3
Summer 2005-2006 Linear Algebra 3
Fall 2005-2006 Linear Algebra 3
Summer 2004-2005 Linear Algebra 3
Fall 2004-2005 Linear Algebra 3
Summer 2003-2004 Linear Algebra 3
Fall 2003-2004 Linear Algebra 3
Summer 2002-2003 Linear Algebra 3
Fall 2002-2003 Linear Algebra 3
Fall 2001-2002 Linear Algebra 3
Fall 2000-2001 Linear Algebra 3
Prerequisite: __
Corequisite: MATH 201R
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 201R Linear Algebra - Recitation 0 Credit
Last Offered Terms Course Name SU Credit
Spring 2023-2024 Linear Algebra - Recitation 0
Fall 2023-2024 Linear Algebra - Recitation 0
Summer 2022-2023 Linear Algebra - Recitation 0
Spring 2022-2023 Linear Algebra - Recitation 0
Fall 2022-2023 Linear Algebra - Recitation 0
Summer 2021-2022 Linear Algebra - Recitation 0
Spring 2021-2022 Linear Algebra - Recitation 0
Fall 2021-2022 Linear Algebra - Recitation 0
Summer 2020-2021 Linear Algebra - Recitation 0
Spring 2020-2021 Linear Algebra - Recitation 0
Fall 2020-2021 Linear Algebra - Recitation 0
Summer 2019-2020 Linear Algebra - Recitation 0
Spring 2019-2020 Linear Algebra - Recitation 0
Fall 2019-2020 Linear Algebra - Recitation 0
Summer 2018-2019 Linear Algebra - Recitation 0
Spring 2018-2019 Linear Algebra - Recitation 0
Fall 2018-2019 Linear Algebra - Recitation 0
Summer 2017-2018 Linear Algebra - Recitation 0
Spring 2017-2018 Linear Algebra - Recitation 0
Fall 2017-2018 Linear Algebra - Recitation 0
Summer 2016-2017 Linear Algebra - Recitation 0
Spring 2016-2017 Linear Algebra - Recitation 0
Fall 2016-2017 Linear Algebra - Recitation 0
Summer 2015-2016 Linear Algebra - Recitation 0
Spring 2015-2016 Linear Algebra - Recitation 0
Fall 2015-2016 Linear Algebra - Recitation 0
Summer 2014-2015 Linear Algebra - Recitation 0
Fall 2014-2015 Linear Algebra - Recitation 0
Summer 2013-2014 Linear Algebra - Recitation 0
Fall 2013-2014 Linear Algebra - Recitation 0
Summer 2012-2013 Linear Algebra - Recitation 0
Fall 2012-2013 Linear Algebra - Recitation 0
Summer 2011-2012 Linear Algebra - Recitation 0
Fall 2011-2012 Linear Algebra - Recitation 0
Summer 2010-2011 Linear Algebra - Recitation 0
Fall 2010-2011 Linear Algebra - Recitation 0
Summer 2009-2010 Linear Algebra - Recitation 0
Fall 2009-2010 Linear Algebra - Recitation 0
Summer 2008-2009 Linear Algebra - Recitation 0
Fall 2008-2009 Linear Algebra - Recitation 0
Summer 2007-2008 Linear Algebra - Recitation 0
Fall 2007-2008 Linear Algebra - Recitation 0
Summer 2006-2007 Linear Algebra - Recitation 0
Fall 2006-2007 Linear Algebra - Recitation 0
Summer 2005-2006 Linear Algebra - Recitation 0
Fall 2005-2006 Linear Algebra - Recitation 0
Summer 2004-2005 Linear Algebra - Recitation 0
Fall 2004-2005 Linear Algebra - Recitation 0
Summer 2003-2004 Linear Algebra - Recitation 0
Fall 2003-2004 Linear Algebra - Recitation 0
Summer 2002-2003 Linear Algebra - Recitation 0
Fall 2002-2003 Linear Algebra - Recitation 0
Fall 2001-2002 Linear Algebra - Recitation 0
Fall 2000-2001 Linear Algebra - Recitation 0
Prerequisite: __
Corequisite: MATH 201
ECTS Credit: NONE ECTS (NONE ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 202 Differential Equations 3 Credits
First-order differential equations and solution methods. Direction fields, qualitative methods, numerical approximations. Higher-order linear differential equations. Linear ayatems. Nonlinear systems, asymptotic behaviour of solutions. Laplace transform.
Last Offered Terms Course Name SU Credit
Spring 2023-2024 Differential Equations 3
Summer 2022-2023 Differential Equations 3
Spring 2022-2023 Differential Equations 3
Summer 2021-2022 Differential Equations 3
Spring 2021-2022 Differential Equations 3
Summer 2020-2021 Differential Equations 3
Spring 2020-2021 Differential Equations 3
Summer 2019-2020 Differential Equations 3
Spring 2019-2020 Differential Equations 3
Summer 2018-2019 Differential Equations 3
Spring 2018-2019 Differential Equations 3
Summer 2017-2018 Differential Equations 3
Spring 2017-2018 Differential Equations 3
Summer 2016-2017 Differential Equations 3
Spring 2016-2017 Differential Equations 3
Summer 2015-2016 Differential Equations 3
Spring 2015-2016 Differential Equations 3
Spring 2014-2015 Differential Equations 3
Spring 2013-2014 Differential Equations 3
Spring 2012-2013 Differential Equations 3
Spring 2011-2012 Differential Equations 3
Spring 2010-2011 Differential Equations 3
Spring 2009-2010 Differential Equations 3
Spring 2008-2009 Differential Equations 3
Spring 2007-2008 Differential Equations 3
Spring 2006-2007 Differential Equations 3
Spring 2005-2006 Differential Equations 3
Spring 2004-2005 Differential Equations 3
Spring 2003-2004 Differential Equations 3
Spring 2002-2003 Differential Equations 3
Spring 2001-2002 Differential Equations 3
Spring 2000-2001 Differential Equations 3
Prerequisite: MATH 102 - Undergraduate - Min Grade D
Corequisite: MATH 202R
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 202R Differential Equations - Recitation 0 Credit
Last Offered Terms Course Name SU Credit
Spring 2023-2024 Differential Equations - Recitation 0
Summer 2022-2023 Differential Equations - Recitation 0
Spring 2022-2023 Differential Equations - Recitation 0
Summer 2021-2022 Differential Equations - Recitation 0
Spring 2021-2022 Differential Equations - Recitation 0
Summer 2020-2021 Differential Equations - Recitation 0
Spring 2020-2021 Differential Equations - Recitation 0
Summer 2019-2020 Differential Equations - Recitation 0
Spring 2019-2020 Differential Equations - Recitation 0
Summer 2018-2019 Differential Equations - Recitation 0
Spring 2018-2019 Differential Equations - Recitation 0
Summer 2017-2018 Differential Equations - Recitation 0
Spring 2017-2018 Differential Equations - Recitation 0
Summer 2016-2017 Differential Equations - Recitation 0
Spring 2016-2017 Differential Equations - Recitation 0
Summer 2015-2016 Differential Equations - Recitation 0
Spring 2015-2016 Differential Equations - Recitation 0
Spring 2014-2015 Differential Equations - Recitation 0
Spring 2013-2014 Differential Equations - Recitation 0
Spring 2012-2013 Differential Equations - Recitation 0
Spring 2011-2012 Differential Equations - Recitation 0
Spring 2010-2011 Differential Equations - Recitation 0
Spring 2009-2010 Differential Equations - Recitation 0
Spring 2008-2009 Differential Equations - Recitation 0
Spring 2007-2008 Differential Equations - Recitation 0
Spring 2006-2007 Differential Equations - Recitation 0
Spring 2005-2006 Differential Equations - Recitation 0
Spring 2004-2005 Differential Equations - Recitation 0
Spring 2003-2004 Differential Equations - Recitation 0
Spring 2002-2003 Differential Equations - Recitation 0
Spring 2001-2002 Differential Equations - Recitation 0
Spring 2000-2001 Differential Equations - Recitation 0
Prerequisite: __
Corequisite: MATH 202
ECTS Credit: NONE ECTS (NONE ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 203 Introduction to Probability 3 Credits
Counting techniques, combinatorial methods, random experiments, sample spaces, events, probability axioms, some rules of probability, conditional probability, independence, Bayes' theorem, random variables (r.v.'s), probability distributions, discrete and continuous r.v.'s, probability density functions, multivariate distributions, marginal and conditional distributions, expected values, moments, conditional expectation, Chebyshev's theorem, product moments, moments of linear combinations of r.v.'s, special discrete distributions, uniform, Bernoulli, binomial, negative binomial, geometric, hypergeometric and Poisson distributions, special probability densities, uniform, gamma, exponential and normal densities, normal approximation to binomial, distribution of functions of r.v.'s, distribution function and moment-generating law of large numbers, the central limit theorem, function techniques, distribution of the mean, basic methods for statistical estimation and hypothesis testing.
Last Offered Terms Course Name SU Credit
Spring 2023-2024 Introduction to Probability 3
Fall 2023-2024 Introduction to Probability 3
Summer 2022-2023 Introduction to Probability 3
Spring 2022-2023 Introduction to Probability 3
Fall 2022-2023 Introduction to Probability 3
Summer 2021-2022 Introduction to Probability 3
Spring 2021-2022 Introduction to Probability 3
Fall 2021-2022 Introduction to Probability 3
Summer 2020-2021 Introduction to Probability 3
Spring 2020-2021 Introduction to Probability 3
Fall 2020-2021 Introduction to Probability 3
Summer 2019-2020 Introduction to Probability 3
Spring 2019-2020 Introduction to Probability 3
Fall 2019-2020 Introduction to Probability 3
Summer 2018-2019 Introduction to Probability 3
Spring 2018-2019 Introduction to Probability 3
Fall 2018-2019 Introduction to Probability 3
Summer 2017-2018 Introduction to Probability 3
Spring 2017-2018 Introduction to Probability 3
Fall 2017-2018 Introduction to Probability 3
Summer 2016-2017 Introduction to Probability 3
Spring 2016-2017 Introduction to Probability 3
Fall 2016-2017 Introduction to Probability 3
Summer 2015-2016 Introduction to Probability 3
Spring 2015-2016 Introduction to Probability 3
Fall 2015-2016 Introduction to Probability 3
Summer 2014-2015 Introduction to Probability 3
Spring 2014-2015 Introduction to Probability 3
Fall 2014-2015 Introduction to Probability 3
Summer 2013-2014 Introduction to Probability 3
Spring 2013-2014 Introduction to Probability 3
Fall 2013-2014 Introduction to Probability 3
Summer 2012-2013 Introduction to Probability 3
Spring 2012-2013 Introduction to Probability 3
Fall 2012-2013 Introduction to Probability 3
Summer 2011-2012 Introduction to Probability 3
Fall 2011-2012 Introduction to Probability 3
Summer 2010-2011 Introduction to Probability 3
Fall 2010-2011 Introduction to Probability 3
Summer 2009-2010 Introduction to Probability 3
Fall 2009-2010 Introduction to Probability 3
Summer 2008-2009 Introduction to Probability and Statistics 3
Fall 2008-2009 Introduction to Probability and Statistics 3
Summer 2007-2008 Introduction to Probability and Statistics 3
Fall 2007-2008 Introduction to Probability and Statistics 3
Summer 2006-2007 Introduction to Probability and Statistics 3
Fall 2006-2007 Introduction to Probability and Statistics 3
Summer 2005-2006 Introduction to Probability and Statistics 3
Fall 2005-2006 Introduction to Probability and Statistics 3
Summer 2004-2005 Introduction to Probability and Statistics 3
Fall 2004-2005 Introduction to Probability and Statistics 3
Summer 2003-2004 Introduction to Probability and Statistics 3
Fall 2003-2004 Introduction to Probability and Statistics 3
Summer 2002-2003 Introduction to Probability and Statistics 3
Fall 2002-2003 Introduction to Probability and Statistics 3
Summer 2001-2002 Introduction to Probability and Statistics 3
Fall 2001-2002 Introduction to Probability and Statistics 3
Fall 2000-2001 Introduction to Probability and Statistics 3
Prerequisite: MATH 102 - Undergraduate - Min Grade D
Corequisite: MATH 203R
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 203R Introduction to Probability - Recitation 0 Credit
Last Offered Terms Course Name SU Credit
Spring 2023-2024 Introduction to Probability - Recitation 0
Fall 2023-2024 Introduction to Probability - Recitation 0
Summer 2022-2023 Introduction to Probability - Recitation 0
Spring 2022-2023 Introduction to Probability - Recitation 0
Fall 2022-2023 Introduction to Probability - Recitation 0
Summer 2021-2022 Introduction to Probability - Recitation 0
Spring 2021-2022 Introduction to Probability - Recitation 0
Fall 2021-2022 Introduction to Probability - Recitation 0
Summer 2020-2021 Introduction to Probability - Recitation 0
Spring 2020-2021 Introduction to Probability - Recitation 0
Fall 2020-2021 Introduction to Probability - Recitation 0
Summer 2019-2020 Introduction to Probability - Recitation 0
Spring 2019-2020 Introduction to Probability - Recitation 0
Fall 2019-2020 Introduction to Probability - Recitation 0
Summer 2018-2019 Introduction to Probability - Recitation 0
Spring 2018-2019 Introduction to Probability - Recitation 0
Fall 2018-2019 Introduction to Probability - Recitation 0
Summer 2017-2018 Introduction to Probability - Recitation 0
Spring 2017-2018 Introduction to Probability - Recitation 0
Fall 2017-2018 Introduction to Probability - Recitation 0
Summer 2016-2017 Introduction to Probability - Recitation 0
Spring 2016-2017 Introduction to Probability - Recitation 0
Fall 2016-2017 Introduction to Probability - Recitation 0
Summer 2015-2016 Introduction to Probability - Recitation 0
Spring 2015-2016 Introduction to Probability - Recitation 0
Fall 2015-2016 Introduction to Probability - Recitation 0
Summer 2014-2015 Introduction to Probability - Recitation 0
Spring 2014-2015 Introduction to Probability - Recitation 0
Fall 2014-2015 Introduction to Probability - Recitation 0
Summer 2013-2014 Introduction to Probability - Recitation 0
Spring 2013-2014 Introduction to Probability - Recitation 0
Fall 2013-2014 Introduction to Probability - Recitation 0
Summer 2012-2013 Introduction to Probability - Recitation 0
Spring 2012-2013 Introduction to Probability - Recitation 0
Fall 2012-2013 Introduction to Probability - Recitation 0
Summer 2011-2012 Introduction to Probability - Recitation 0
Fall 2011-2012 Introduction to Probability - Recitation 0
Summer 2010-2011 Introduction to Probability - Recitation 0
Fall 2010-2011 Introduction to Probability - Recitation 0
Summer 2009-2010 Introduction to Probability - Recitation 0
Fall 2009-2010 Introduction to Probability - Recitation 0
Summer 2008-2009 Introduction to Probability and Statics - Recitation 0
Fall 2008-2009 Introduction to Probability and Statics - Recitation 0
Summer 2007-2008 Introduction to Probability and Statics - Recitation 0
Fall 2007-2008 Introduction to Probability and Statics - Recitation 0
Summer 2006-2007 Introduction to Probability and Statics - Recitation 0
Fall 2006-2007 Introduction to Probability and Statics - Recitation 0
Summer 2005-2006 Introduction to Probability and Statics - Recitation 0
Fall 2005-2006 Introduction to Probability and Statics - Recitation 0
Summer 2004-2005 Introduction to Probability and Statics - Recitation 0
Fall 2004-2005 Introduction to Probability and Statics - Recitation 0
Summer 2003-2004 Introduction to Probability and Statics - Recitation 0
Fall 2003-2004 Introduction to Probability and Statics - Recitation 0
Summer 2002-2003 Introduction to Probability and Statics - Recitation 0
Fall 2002-2003 Introduction to Probability and Statics - Recitation 0
Summer 2001-2002 Introduction to Probability and Statics - Recitation 0
Fall 2001-2002 Introduction to Probability and Statics - Recitation 0
Fall 2000-2001 Introduction to Probability and Statics - Recitation 0
Prerequisite: __
Corequisite: MATH 203
ECTS Credit: NONE ECTS (NONE ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 204 Discrete Mathematics 3 Credits
Introduction to combinatorial problems and techniques. Sets, relations and functions. Graphs, trees, matching, network flows. Counting techniques. Recurrence relations and generating functions. Combinatorial circuits and finite state machines.
Last Offered Terms Course Name SU Credit
Spring 2023-2024 Discrete Mathematics 3
Fall 2023-2024 Discrete Mathematics 3
Summer 2022-2023 Discrete Mathematics 3
Spring 2022-2023 Discrete Mathematics 3
Fall 2022-2023 Discrete Mathematics 3
Summer 2021-2022 Discrete Mathematics 3
Spring 2021-2022 Discrete Mathematics 3
Fall 2021-2022 Discrete Mathematics 3
Summer 2020-2021 Discrete Mathematics 3
Spring 2020-2021 Discrete Mathematics 3
Fall 2020-2021 Discrete Mathematics 3
Summer 2019-2020 Discrete Mathematics 3
Spring 2019-2020 Discrete Mathematics 3
Fall 2019-2020 Discrete Mathematics 3
Summer 2018-2019 Discrete Mathematics 3
Spring 2018-2019 Discrete Mathematics 3
Summer 2017-2018 Discrete Mathematics 3
Spring 2017-2018 Discrete Mathematics 3
Summer 2016-2017 Discrete Mathematics 3
Spring 2016-2017 Discrete Mathematics 3
Summer 2015-2016 Discrete Mathematics 3
Spring 2015-2016 Discrete Mathematics 3
Summer 2014-2015 Discrete Mathematics 3
Spring 2014-2015 Discrete Mathematics 3
Summer 2013-2014 Discrete Mathematics 3
Spring 2013-2014 Discrete Mathematics 3
Summer 2012-2013 Discrete Mathematics 3
Spring 2012-2013 Discrete Mathematics 3
Summer 2011-2012 Discrete Mathematics 3
Spring 2011-2012 Discrete Mathematics 3
Summer 2010-2011 Discrete Mathematics 3
Spring 2010-2011 Discrete Mathematics 3
Spring 2009-2010 Discrete Mathematics 3
Spring 2008-2009 Discrete Mathematics 3
Spring 2007-2008 Discrete Mathematics 3
Spring 2006-2007 Discrete Mathematics 3
Spring 2005-2006 Discrete Mathematics 3
Spring 2004-2005 Discrete Mathematics 3
Spring 2003-2004 Discrete Mathematics 3
Spring 2002-2003 Discrete Mathematics 3
Spring 2001-2002 Discrete Mathematics 3
Spring 2000-2001 Discrete Mathematics 3
Prerequisite: __
Corequisite: MATH 204R
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 204R Discrete Mathematics - Recitation 0 Credit
Last Offered Terms Course Name SU Credit
Spring 2023-2024 Discrete Mathematics - Recitation 0
Fall 2023-2024 Discrete Mathematics - Recitation 0
Summer 2022-2023 Discrete Mathematics - Recitation 0
Spring 2022-2023 Discrete Mathematics - Recitation 0
Fall 2022-2023 Discrete Mathematics - Recitation 0
Summer 2021-2022 Discrete Mathematics - Recitation 0
Spring 2021-2022 Discrete Mathematics - Recitation 0
Fall 2021-2022 Discrete Mathematics - Recitation 0
Summer 2020-2021 Discrete Mathematics - Recitation 0
Spring 2020-2021 Discrete Mathematics - Recitation 0
Fall 2020-2021 Discrete Mathematics - Recitation 0
Summer 2019-2020 Discrete Mathematics - Recitation 0
Spring 2019-2020 Discrete Mathematics - Recitation 0
Fall 2019-2020 Discrete Mathematics - Recitation 0
Summer 2018-2019 Discrete Mathematics - Recitation 0
Spring 2018-2019 Discrete Mathematics - Recitation 0
Summer 2017-2018 Discrete Mathematics - Recitation 0
Spring 2017-2018 Discrete Mathematics - Recitation 0
Summer 2016-2017 Discrete Mathematics - Recitation 0
Spring 2016-2017 Discrete Mathematics - Recitation 0
Summer 2015-2016 Discrete Mathematics - Recitation 0
Spring 2015-2016 Discrete Mathematics - Recitation 0
Summer 2014-2015 Discrete Mathematics - Recitation 0
Spring 2014-2015 Discrete Mathematics - Recitation 0
Summer 2013-2014 Discrete Mathematics - Recitation 0
Spring 2013-2014 Discrete Mathematics - Recitation 0
Summer 2012-2013 Discrete Mathematics - Recitation 0
Spring 2012-2013 Discrete Mathematics - Recitation 0
Summer 2011-2012 Discrete Mathematics - Recitation 0
Spring 2011-2012 Discrete Mathematics - Recitation 0
Summer 2010-2011 Discrete Mathematics - Recitation 0
Spring 2010-2011 Discrete Mathematics - Recitation 0
Spring 2009-2010 Discrete Mathematics - Recitation 0
Spring 2008-2009 Discrete Mathematics - Recitation 0
Spring 2007-2008 Discrete Mathematics - Recitation 0
Spring 2006-2007 Discrete Mathematics - Recitation 0
Spring 2005-2006 Discrete Mathematics - Recitation 0
Spring 2004-2005 Discrete Mathematics - Recitation 0
Spring 2003-2004 Discrete Mathematics - Recitation 0
Spring 2002-2003 Discrete Mathematics - Recitation 0
Spring 2001-2002 Discrete Mathematics - Recitation 0
Spring 2000-2001 Discrete Mathematics - Recitation 0
Prerequisite: __
Corequisite: MATH 204
ECTS Credit: NONE ECTS (NONE ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 206 Vector Calculus 3 Credits
Multiple integrals. Change of variables formula. Curvilinear coordinates. Inverse and implicit function theorems. Parameterization: Curves, vector fields, surfaces. Line integrals. Gradient fields. Green's theorem. Surface integrals. Calculus of vector fields: Curl, divergence.Stokes' and Gauss' theorems. Applications.
Last Offered Terms Course Name SU Credit
Spring 2021-2022 Vector Calculus 3
Fall 2018-2019 Vector Calculus 3
Fall 2012-2013 Vector Calculus 3
Spring 2011-2012 Vector Calculus 3
Spring 2004-2005 Vector Calculus 3
Prerequisite: MATH 102 - Undergraduate - Min Grade D
Corequisite: __
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 221 History of Mathematics 3 Credits
The course includes introduction of the number system, Pythagorean mathematics, Euclid’s axioms, Archimedes, Diophantus and the Arithmetica, solving cubic and quartics, Cartesian geometry, invention of Calculus, Fermat’s last theorem, Euler, Gauss, non-Euclidean geometry, counting the infinite, 20th century developments in Mathematics.
Last Offered Terms Course Name SU Credit
Prerequisite: MATH 102 - Undergraduate - Min Grade D
Corequisite: __
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 301 Introduction to Mathematical Analysis 3 Credits
The least upper bound property in R, equivalents and consequences. Metric spaces. Completeness, compactness, connectedness. Functions,continuity. Sequences and series of functions. Contraction mapping theorem and applications to calculus: Inverse and implicit function theorems.
Last Offered Terms Course Name SU Credit
Fall 2023-2024 Introduction to Mathematical Analysis 3
Fall 2022-2023 Introduction to Mathematical Analysis 3
Fall 2021-2022 Introduction to Mathematical Analysis 3
Fall 2020-2021 Introduction to Mathematical Analysis 3
Fall 2019-2020 Introduction to Mathematical Analysis 3
Fall 2018-2019 Introduction to Mathematical Analysis 3
Fall 2017-2018 Introduction to Mathematical Analysis 3
Fall 2016-2017 Introduction to Mathematical Analysis 3
Fall 2015-2016 Introduction to Mathematical Analysis 3
Fall 2014-2015 Introduction to Mathematical Analysis 3
Fall 2013-2014 Introduction to Mathematical Analysis 3
Fall 2012-2013 Introduction to Mathematical Analysis 3
Fall 2011-2012 Introduction to Mathematical Analysis 3
Fall 2010-2011 Introduction to Mathematical Analysis 3
Fall 2009-2010 Introduction to Mathematical Analysis 3
Fall 2008-2009 Introduction to Mathematical Analysis 3
Fall 2007-2008 Introduction to Mathematical Analysis 3
Fall 2006-2007 Introduction to Mathematical Analysis 3
Fall 2005-2006 Introduction to Mathematical Analysis 3
Fall 2004-2005 Introduction to Mathematical Analysis 3
Fall 2003-2004 Introduction to Mathematical Analysis 3
Fall 2002-2003 Introduction to Mathematical Analysis 3
Fall 2001-2002 Introduction to Mathematical Analysis 3
Fall 2023-2024   (MATH571) 3
Fall 2022-2023   (MATH571) 3
Fall 2021-2022   (MATH571) 3
Fall 2020-2021   (MATH571) 3
Fall 2019-2020   (MATH571) 3
Fall 2017-2018   (MATH571) 3
Fall 2016-2017   (MATH571) 3
Fall 2015-2016   (MATH571) 3
Fall 2014-2015   (MATH571) 3
Fall 2013-2014   (MATH571) 3
Fall 2012-2013   (MATH571) 3
Fall 2011-2012   (MATH571) 3
Fall 2010-2011   (MATH571) 3
Fall 2009-2010   (MATH571) 3
Fall 2008-2009   (MATH571) 3
Fall 2007-2008   (MATH571) 3
Fall 2006-2007   (MATH571) 3
Fall 2005-2006   (MATH571) 3
Prerequisite: __
Corequisite: MATH 301R
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 301R Introduction to Mathematical Analysis Recitation 0 Credit
Last Offered Terms Course Name SU Credit
Fall 2023-2024 Introduction to Mathematical Analysis Recitation 0
Fall 2022-2023 Introduction to Mathematical Analysis Recitation 0
Fall 2021-2022 Introduction to Mathematical Analysis Recitation 0
Fall 2020-2021 Introduction to Mathematical Analysis Recitation 0
Fall 2019-2020 Introduction to Mathematical Analysis Recitation 0
Fall 2018-2019 Introduction to Mathematical Analysis Recitation 0
Fall 2017-2018 Introduction to Mathematical Analysis Recitation 0
Fall 2015-2016 Introduction to Mathematical Analysis Recitation 0
Fall 2014-2015 Introduction to Mathematical Analysis Recitation 0
Fall 2013-2014 Introduction to Mathematical Analysis Recitation 0
Fall 2012-2013 Introduction to Mathematical Analysis Recitation 0
Fall 2011-2012 Introduction to Mathematical Analysis Recitation 0
Fall 2010-2011 Introduction to Mathematical Analysis Recitation 0
Fall 2009-2010 Introduction to Mathematical Analysis Recitation 0
Fall 2007-2008 Introduction to Mathematical Analysis Recitation 0
Fall 2006-2007 Introduction to Mathematical Analysis Recitation 0
Fall 2005-2006 Introduction to Mathematical Analysis Recitation 0
Prerequisite: __
Corequisite: MATH 301
ECTS Credit: NONE ECTS (NONE ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 302 Integration 3 Credits
The Riemann integral. The Riemann-Stieltjes integral, functions of bounded variation. Lebesgue integral and convergence theorems.
Last Offered Terms Course Name SU Credit
Spring 2013-2014 Integration 3
Spring 2011-2012 Integration 3
Spring 2008-2009 Integration 3
Spring 2007-2008 Integration 3
Spring 2004-2005 Integration 3
Spring 2002-2003 Integration 3
Prerequisite: __
Corequisite: MATH 302R
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 302R Integration Recitation 0 Credit
Last Offered Terms Course Name SU Credit
Spring 2011-2012 Integration Recitation 0
Prerequisite: __
Corequisite: MATH 302
ECTS Credit: NONE ECTS (NONE ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 305 Complex Calculus 3 Credits
This course covers the field of complex numbers, functions of one complex variable; analytic functions, the Cauchy- Riemann equations, harmonic functions integration in the complex plane, Cauchy integral formula, power series, Laurent series and isolated singularities, theory of residues and applications, conformal mappings.
Last Offered Terms Course Name SU Credit
Spring 2023-2024 Complex Calculus 3
Spring 2022-2023 Complex Calculus 3
Fall 2021-2022 Complex Calculus 3
Spring 2019-2020 Complex Calculus 3
Spring 2017-2018 Complex Calculus 3
Spring 2016-2017 Complex Calculus 3
Spring 2014-2015 Complex Calculus 3
Fall 2013-2014 Complex Calculus 3
Fall 2012-2013 Complex Calculus 3
Fall 2011-2012 Complex Calculus 3
Fall 2010-2011 Complex Calculus 3
Fall 2006-2007 Complex Calculus 3
Fall 2005-2006 Complex Calculus 3
Fall 2004-2005 Complex Calculus 3
Fall 2002-2003 Complex Calculus 3
Prerequisite: MATH 102 - Undergraduate - Min Grade D
Corequisite: MATH 305R
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 305R Complex Calculus - Recitation 0 Credit
Last Offered Terms Course Name SU Credit
Fall 2021-2022 Complex Calculus - Recitation 0
Spring 2019-2020 Complex Calculus - Recitation 0
Fall 2013-2014 Complex Calculus - Recitation 0
Fall 2012-2013 Complex Calculus - Recitation 0
Fall 2010-2011 Complex Calculus - Recitation 0
Fall 2006-2007 Complex Calculus - Recitation 0
Fall 2005-2006 Complex Calculus - Recitation 0
Prerequisite: __
Corequisite: MATH 305
ECTS Credit: NONE ECTS (NONE ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 306 Statistical Modelling 3 Credits
Statistical inference; estimation, confidence intervals, hypothesis testing; analysis of variance; goodness of fit tests; regression and correlation analysis; Bayesian methods; introduction to design of experiments; use of statistical software.
Last Offered Terms Course Name SU Credit
Spring 2023-2024 Statistical Modelling 3
Fall 2023-2024 Statistical Modelling 3
Summer 2022-2023 Statistical Modelling 3
Spring 2022-2023 Statistical Modelling 3
Fall 2022-2023 Statistical Modelling 3
Summer 2021-2022 Statistical Modelling 3
Spring 2021-2022 Statistical Modelling 3
Fall 2021-2022 Statistical Modelling 3
Summer 2020-2021 Statistical Modelling 3
Spring 2020-2021 Statistical Modelling 3
Fall 2020-2021 Statistical Modelling 3
Summer 2019-2020 Statistical Modelling 3
Spring 2019-2020 Statistical Modelling 3
Fall 2019-2020 Statistical Modelling 3
Summer 2018-2019 Statistical Modelling 3
Spring 2018-2019 Statistical Modelling 3
Fall 2018-2019 Statistical Modelling 3
Summer 2017-2018 Statistical Modelling 3
Spring 2017-2018 Statistical Modelling 3
Fall 2017-2018 Statistical Modelling 3
Spring 2016-2017 Statistical Modelling 3
Fall 2016-2017 Statistical Modelling 3
Summer 2015-2016 Statistical Modelling 3
Spring 2015-2016 Statistical Modelling 3
Fall 2015-2016 Statistical Modelling 3
Summer 2014-2015 Statistical Modelling 3
Spring 2014-2015 Statistical Modelling 3
Fall 2014-2015 Statistical Modelling 3
Summer 2013-2014 Statistical Modelling 3
Spring 2013-2014 Statistical Modelling 3
Fall 2013-2014 Statistical Modelling 3
Spring 2012-2013 Statistical Modelling 3
Fall 2012-2013 Statistical Modelling 3
Spring 2011-2012 Statistical Modelling 3
Fall 2011-2012 Statistical Modelling 3
Spring 2010-2011 Statistical Modelling 3
Fall 2010-2011 Statistical Modelling 3
Spring 2009-2010 Statistical Modelling 3
Fall 2009-2010 Statistical Modelling 3
Spring 2008-2009 Statistical Modelling 3
Fall 2008-2009 Statistical Modelling 3
Spring 2007-2008 Statistical Modelling 3
Spring 2006-2007 Statistical Modelling 3
Spring 2005-2006 Statistical Modelling 3
Spring 2004-2005 Statistical Modelling 3
Spring 2003-2004 Statistical Modelling 3
Spring 2002-2003 Statistical Modelling 3
Spring 2001-2002 Statistical Modelling 3
Spring 2000-2001 Statistical Modelling 3
Prerequisite: MATH 203 - Undergraduate - Min Grade D
Corequisite: MATH 306R
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 306R Statistical Modelling - Recitation 0 Credit
Last Offered Terms Course Name SU Credit
Spring 2023-2024 Statistical Modelling - Recitation 0
Fall 2023-2024 Statistical Modelling - Recitation 0
Summer 2022-2023 Statistical Modelling - Recitation 0
Spring 2022-2023 Statistical Modelling - Recitation 0
Fall 2022-2023 Statistical Modelling - Recitation 0
Summer 2021-2022 Statistical Modelling - Recitation 0
Spring 2021-2022 Statistical Modelling - Recitation 0
Fall 2021-2022 Statistical Modelling - Recitation 0
Summer 2020-2021 Statistical Modelling - Recitation 0
Spring 2020-2021 Statistical Modelling - Recitation 0
Fall 2020-2021 Statistical Modelling - Recitation 0
Summer 2019-2020 Statistical Modelling - Recitation 0
Spring 2019-2020 Statistical Modelling - Recitation 0
Fall 2019-2020 Statistical Modelling - Recitation 0
Summer 2018-2019 Statistical Modelling - Recitation 0
Spring 2018-2019 Statistical Modelling - Recitation 0
Fall 2018-2019 Statistical Modelling - Recitation 0
Summer 2017-2018 Statistical Modelling - Recitation 0
Spring 2017-2018 Statistical Modelling - Recitation 0
Fall 2017-2018 Statistical Modelling - Recitation 0
Spring 2016-2017 Statistical Modelling - Recitation 0
Fall 2016-2017 Statistical Modelling - Recitation 0
Summer 2015-2016 Statistical Modelling - Recitation 0
Spring 2015-2016 Statistical Modelling - Recitation 0
Fall 2015-2016 Statistical Modelling - Recitation 0
Summer 2014-2015 Statistical Modelling - Recitation 0
Spring 2014-2015 Statistical Modelling - Recitation 0
Fall 2014-2015 Statistical Modelling - Recitation 0
Summer 2013-2014 Statistical Modelling - Recitation 0
Spring 2013-2014 Statistical Modelling - Recitation 0
Fall 2013-2014 Statistical Modelling - Recitation 0
Spring 2012-2013 Statistical Modelling - Recitation 0
Fall 2012-2013 Statistical Modelling - Recitation 0
Spring 2011-2012 Statistical Modelling - Recitation 0
Fall 2011-2012 Statistical Modelling - Recitation 0
Spring 2010-2011 Statistical Modelling - Recitation 0
Fall 2010-2011 Statistical Modelling - Recitation 0
Spring 2009-2010 Statistical Modelling - Recitation 0
Fall 2009-2010 Statistical Modelling - Recitation 0
Spring 2008-2009 Statistical Modelling - Recitation 0
Fall 2008-2009 Statistical Modelling - Recitation 0
Spring 2007-2008 Statistical Modelling - Recitation 0
Spring 2006-2007 Statistical Modelling - Recitation 0
Spring 2005-2006 Statistical Modelling - Recitation 0
Spring 2004-2005 Statistical Modelling - Recitation 0
Spring 2003-2004 Statistical Modelling - Recitation 0
Spring 2002-2003 Statistical Modelling - Recitation 0
Spring 2001-2002 Statistical Modelling - Recitation 0
Spring 2000-2001 Statistical Modelling - Recitation 0
Prerequisite: __
Corequisite: MATH 306
ECTS Credit: NONE ECTS (NONE ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 307 Dynamical Systems 3 Credits
Qualitative theory of ordinary differential equations (ODEs). Existence and uniqueness, geometrical representation of ODEs. Construction of phase portraits. Nonlinear systems, local and global behavior, the linearization theorem. Periodic orbits and limit sets, Poincare-Bendixson theory. The stable manifold theorem, homoclinic and heteroclinic points. Bifurcation diagrams. State reconstruction from data, embedding.
Last Offered Terms Course Name SU Credit
Fall 2022-2023 Dynamical Systems 3
Fall 2013-2014 Dynamical Systems 3
Spring 2010-2011 Dynamical Systems 3
Prerequisite: __
Corequisite: __
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 311 Introduction to Algebra 3 Credits
Basic theory of groups, rings and fields is covered. Fundamental concepts of Galois Theory are also given.
Last Offered Terms Course Name SU Credit
Spring 2023-2024 Introduction to Algebra 3
Spring 2022-2023 Introduction to Algebra 3
Spring 2021-2022 Introduction to Algebra 3
Spring 2020-2021 Introduction to Algebra 3
Spring 2019-2020 Introduction to Algebra 3
Spring 2018-2019 Introduction to Algebra 3
Spring 2017-2018 Introduction to Algebra 3
Fall 2017-2018 Introduction to Algebra 3
Spring 2016-2017 Introduction to Algebra 3
Spring 2015-2016 Introduction to Algebra 3
Spring 2014-2015 Introduction to Algebra 3
Spring 2013-2014 Introduction to Algebra 3
Spring 2012-2013 Introduction to Algebra 3
Spring 2011-2012 Introduction to Algebra 3
Spring 2010-2011 Introduction to Algebra 3
Spring 2009-2010 Introduction to Algebra 3
Spring 2008-2009 Introduction to Algebra 3
Spring 2007-2008 Introduction to Algebra 3
Spring 2006-2007 Introduction to Algebra 3
Spring 2005-2006 Introduction to Algebra 3
Spring 2004-2005 Introduction to Algebra 3
Spring 2003-2004 Introduction to Algebra 3
Spring 2002-2003 Introduction to Algebra 3
Spring 2001-2002 Introduction to Algebra 3
Prerequisite: __
Corequisite:
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 317 Elementary Number Theory 3 Credits
Divisibility, prime numbers, congruences, quadratic residues, arithmetic functions, the Riemann Zeta function.
Last Offered Terms Course Name SU Credit
Spring 2023-2024 Elementary Number Theory 3
Fall 2022-2023 Elementary Number Theory 3
Fall 2021-2022 Elementary Number Theory 3
Fall 2020-2021 Elementary Number Theory 3
Fall 2019-2020 Elementary Number Theory 3
Fall 2018-2019 Elementary Number Theory 3
Fall 2017-2018 Elementary Number Theory 3
Fall 2016-2017 Elementary Number Theory 3
Fall 2015-2016 Elementary Number Theory 3
Fall 2014-2015 Elementary Number Theory 3
Fall 2013-2014 Elementary Number Theory 3
Fall 2012-2013 Elementary Number Theory 3
Fall 2011-2012 Elementary Number Theory 3
Spring 2010-2011 Elementary Number Theory 3
Fall 2009-2010 Elementary Number Theory 3
Fall 2008-2009 Elementary Number Theory 3
Spring 2007-2008 Elementary Number Theory 3
Spring 2006-2007 Elementary Number Theory 3
Spring 2005-2006 Elementary Number Theory 3
Spring 2004-2005 Elementary Number Theory 3
Spring 2003-2004 Elementary Number Theory 3
Spring 2002-2003 Elementary Number Theory 3
Prerequisite: MATH 102 - Undergraduate - Min Grade D
and MATH 201 - Undergraduate - Min Grade D
Corequisite:
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 318 Introduction to Combinatorics 3 Credits
Basics of counting, recurrences, special numbers, bijections and sieve methods, permutations, integer partitions, generating functions, identities, graphs.
Last Offered Terms Course Name SU Credit
Spring 2022-2023 Introduction to Combinatorics 3
Spring 2020-2021 Introduction to Combinatorics 3
Spring 2018-2019 Introduction to Combinatorics 3
Spring 2017-2018 Introduction to Combinatorics 3
Spring 2015-2016 Introduction to Combinatorics 3
Spring 2013-2014 Introduction to Combinatorics 3
Spring 2012-2013 Introduction to Combinatorics 3
Spring 2011-2012 Introduction to Combinatorics 3
Prerequisite: MATH 201 - Undergraduate - Min Grade D
Corequisite: __
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 322 Partial Differential Equations 3 Credits
Classification, the concept of a well-posed problem. Initial and boundary value problems. Fourier series. The heat equation, the wave equation and the Laplace equation.
Last Offered Terms Course Name SU Credit
Fall 2023-2024 Partial Differential Equations 3
Spring 2021-2022 Partial Differential Equations 3
Fall 2020-2021 Partial Differential Equations 3
Spring 2018-2019 Partial Differential Equations 3
Spring 2011-2012 Partial Differential Equations 3
Spring 2009-2010 Partial Differential Equations 3
Spring 2007-2008 Partial Differential Equations 3
Spring 2005-2006 Partial Differential Equations 3
Spring 2003-2004 Partial Differential Equations 3
Prerequisite: MATH 202 - Undergraduate - Min Grade D
Corequisite: __
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 401 Introduction to Functional Analysis 3 Credits
Uniform convergence. Stone Weierstrass approximation theorem. Arzela -Ascoli theorem. Baire's theorem. Vector spaces and linear operators. Normed spaces . Completion .Duality and Hahn-Banach extension theorem. Bounded linear operators. Banach-Steinhaus theorem. Open mapping and closed graph theorems.Hilbert spaces. Introduction to Banach algebras.
Last Offered Terms Course Name SU Credit
Fall 2015-2016 Introduction to Functional Analysis 3
Spring 2011-2012 Introduction to Functional Analysis 3
Fall 2007-2008 Introduction to Functional Analysis 3
Prerequisite: MATH 301 - Undergraduate - Min Grade D
Corequisite: __
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 402 Hilbert Space Techniques 3 Credits
Inner product, Hilbert space, examples, orthogonal expansions. Classical Fourier series; The Fejer kernel, Fejer's theorem, Parseval's formula, Weierstrass approximation theorem. Dual space, the Riesz-Frechet theorem. Linear operators, multiplication operators and infinite operator matrices, compact Hermitian and Hibert-Schmidt operators and the spectral theorem. Applications.
Last Offered Terms Course Name SU Credit
Spring 2020-2021 Hilbert Space Techniques 3
Fall 2019-2020 Hilbert Space Techniques 3
Spring 2012-2013 Hilbert Space Techniques 3
Spring 2010-2011 Hilbert Space Techniques 3
Spring 2009-2010 Hilbert Space Techniques 3
Fall 2004-2005 Hilbert Space Techniques 3
Spring 2003-2004 Hilbert Space Techniques 3
Prerequisite: __
Corequisite: __
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 409 Proofs from the Notebook 3 Credits
The aim of this course is to introduce a selection of proofs of some important theorems. These proofs require moderate background but high ingenuity. Among the topics are: Division algorithm, prime factorization theorem, some primitive results on the distribution of primes. Greatest common divisor. Euler's totient function. Phytagorean triples. A short survey of metric spaces; continuity, compactness, connectedness. Stone- Weierstrass approximation theorem. Geometry of the sphere. Brouwer fixed point theorem. Borsuk's antipodal mapping theorem.
Last Offered Terms Course Name SU Credit
Fall 2023-2024 Proofs from the Notebook 3
Fall 2020-2021 Proofs from the Notebook 3
Fall 2014-2015 Proofs from the Notebook 3
Fall 2013-2014 Proofs from the Notebook 3
Fall 2010-2011 Proofs from the Notebook 3
Fall 2009-2010 Proofs from the Notebook 3
Prerequisite: MATH 201 - Undergraduate - Min Grade D
and MATH 301 - Undergraduate - Min Grade D
Corequisite: __
ECTS Credit: 6 ECTS (10 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 410 Introduction to Stochastic Calculus 3 Credits
Basic concepts of stochastic processes, Brownian motion, Gaussian white noise. Conditional expectations and their properties, martingale processes. Stochastic integrals, motivations for the Ito stochastic integral. Ito stochastic integral for simple processes and the general case. Ito Lemma and its different versions. Introduction to stochastic differential equations (s.d.e.) . Solving the Ito s.d.e. by the Ito Lemma and the Stratonovich integration. Homogeneous equations with multiplicative noise. The general s.d.e. with additive noise. A short excursion into finance. Option pricing problem, the Black and Scholes formula.
Last Offered Terms Course Name SU Credit
Spring 2010-2011 Introduction to Stochastic Calculus 3
Spring 2009-2010 Introduction to Stochastic Calculus 3
Spring 2008-2009 Introduction to Stochastic Calculus 3
Spring 2007-2008 Introduction to Stochastic Calculus 3
Spring 2006-2007 Introduction to Stochastic Calculus 3
Spring 2005-2006 Introduction to Stochastic Calculus 3
Prerequisite: MATH 203 - Undergraduate - Min Grade D
Corequisite: __
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements:
 
MATH 414 Finite Fields and Applications 3 Credits
Characterization of finite fields, roots of irreducible polynomials, traces, norms, and bases, representation of elements of finite fields. Order of polynomials, irreducible polynomials and their construction. Factorization of polynomials. Linear recurring sequences. Introduction to applications of finite fields; algebraic coding theory and cryptology.
Last Offered Terms Course Name SU Credit
Fall 2011-2012 Finite Fields and Applications 3
Fall 2010-2011 Finite Fields and Applications 3
Fall 2009-2010 Finite Fields and Applications 3
Fall 2008-2009 Finite Fields and Applications 3
Fall 2007-2008 Finite Fields and Applications 3
Spring 2004-2005 Finite Fields and Applications 3
Fall 2002-2003 Finite Fields and Applications 3
Prerequisite: MATH 311 - Undergraduate - Min Grade D
Corequisite: __
ECTS Credit: 6 ECTS (6 ECTS for students admitted before 2013-14 Academic Year)
General Requirements: