MAT3613

From Department of Mathematics at UTSA
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Topics List

Date Sections Topics Prerequisite Skills Student Learning Outcomes
Week I
  • Ahmad and Ambrosetti 2014, Chaps. 1, 2, 3
  • Integration techniques.
  • Explain the basic notion of the order of a differential equation.
Week I
  • Ahmad and Ambrosetti 2014, Chaps. 1, 2, 3
  • Integration techniques.
  • Explain the basic notion of solutions of differential equations.
Week I
  • Ahmad and Ambrosetti 2014, Chaps. 1, 2, 3
  • Integration techniques.
  • Explain the basic notion of the initial values problem.
Week I
  • Ahmad and Ambrosetti 2014, Chaps. 1, 2, 3
  • Integration techniques.
  • Explain the Cauchy Problem
  • Explain the basic notion of existence and uniqueness of a solution to the Cauchy Problem.
Week I
  • Ahmad and Ambrosetti 2014, Chaps. 1, 2, 3
  • Integration techniques.
  • Determine separable differential equations of the first order.
  • Apply direct methods to evaluate exact solutions of separable differential equations of the first order.
Week II
  • Ahmad and Ambrosetti 2014, Chaps. 1 and 3
  • Integration techniques.
  • Determine homogeneous differential equations of the first order.
  • Apply direct methods to evaluate exact solutions of homogeneous differential equations of the first order (substitutions).
  • Use some differential equations as mathematical models in biology, population dynamics, mechanics and electrical circuit theory problems.
Week II
  • Ahmad and Ambrosetti 2014, Chaps. 1 and 3
  • Integration techniques.
  • Determine linear differential equations of the first order.
  • Apply direct methods to evaluate exact solutions of linear differential equations of the first order (substitutions, integrating factor method).
  • Use some differential equations as mathematical models in biology, population dynamics, mechanics and electrical circuit theory problems.
Week III
  • Ahmad and Ambrosetti 2014, Ch. 3
  • Integration techniques:
- Partial Derivatives
- Linear Differential Equations (1st Order)
  • Determine Bernoulli of the first order.
  • Apply direct methods to evaluate exact solutions of Bernoulli of the first order.
Week III
  • Ahmad and Ambrosetti 2014, Ch. 3
  • The integrating factor for exact equations.
  • Integration techniques:
- Partial Derivatives
- Linear Differential Equations (1st Order)
  • Determine Exact Differential Equations of the first order.
  • Apply direct methods to evaluate exact solutions of Exact Differential Equations of the first order.
  • Use the integrating factor technique for exact equations.
Week IV
  • Ahmad and Ambrosetti 2014, Chaps. 1-3
  • Overview of the solutions methods discussed so far (Chapters 1-3).
  • Integration techniques:
- Partial Derivatives
  • First-order differential equations:
- Separation of Variables (1st Order)
- Homogeneous Differential Equations (1st Order)
- Linear Differential Equations (1st Order)
- Bernoulli Equations (1st Order)
- Exact Differential Equations (1st Order)
  • Determine the type of different classes of differential equations of the first order: separable, linear, homogeneous, Bernoulli, exact.
  • Use direct methods to solve first order differential equations solved and not solved for the first derivative.
Week V
  • Ahmad and Ambrosetti 2014, Ch. 5
  • Linear Algebra
- Linear Independence.
- Determinant.
  • Linear dependence and independence of functions.
  • Showing linear independence of two functions using the Wronskian.
  • Showing linear independence of two solutions of Linear Second-Order ODEs using the Wronskian.
Week VI
  • Ahmad and Ambrosetti 2014, Ch. 5
  • Apply of the reduction of the order technique for second-order ODEs with a given solution.
Week VI
  • Ahmad and Ambrosetti 2014, Ch. 5
  • Determine linear classes of differential equations of the second and higher order
  • Determine non-linear classes of differential equations of the second and higher order
Week VI
  • Ahmad and Ambrosetti 2014, Ch. 5
  • Abel’s Theorem
  • Determine Wronskian for a second-order ODE with 2 given solutions.
Week VI
  • Ahmad and Ambrosetti 2014, Ch. 5
  • Determine fundamental solutions.
Week VI
  • Ahmad and Ambrosetti 2014, Ch. 5
  • Determine homogeneous classes of differential equations of the second and higher order.
  • Determine non-homogeneous classes of differential equations of the second and higher order.
Week VI
  • Ahmad and Ambrosetti 2014, Ch. 5
  • Apply of the variation of parameters technique for second-order ODEs.
Week VII
  • Ahmad and Ambrosetti 2014, Ch. 5
  • Apply variation of parameters technique for second-order ODEs.
Week VII
  • Ahmad and Ambrosetti 2014, Ch. 5
  • Apply method of undetermined coefficients technique for second-order ODEs.
Week VIII
  • SPRING BREAK
Week IX
  • Preparation for remote instruction.
Week X
  • Ahmad and Ambrosetti 2014, Ch. 5
  • Apply variation of parameters technique for higher-order ODEs
Week X
  • Ahmad and Ambrosetti 2014, Ch. 5
  • Apply method of undetermined coefficients technique for higher-order ODEs
Week XI
  • Ahmad and Ambrosetti 2014, Chaps. 5, 6, 10
  • Overview of the solutions methods for second and higher order differential equations.
  • Direct methods for second and higher-order ODEs.
  • Evaluate the exact solutions of important classes of differential equations such as second order differential equations as well as some higher order differential equations.
Week XII
  • Ahmad and Ambrosetti 2014, Ch. 11
  • Definition and main properties of the L-transform.
Week XIII
  • Ahmad and Ambrosetti 2014, Ch. 11
  • Apply the theorem(s) for inverse L-transform.
Week XIV
  • Ahmad and Ambrosetti 2014, Ch. 11
  • Apply the Laplace transform as solution technique.
Week XIV
  • Ahmad and Ambrosetti 2014, Ch. 11
  • Apply the Laplace transform as solution technique.
Week XV
  • Ahmad and Ambrosetti 2014
  • Solutions methods discussed.
  • Apply the L-transform.
Week XV
  • Ahmad and Ambrosetti 2014
  • Overview of the solutions methods discussed.
  • Solutions methods discussed.
  • Apply all solutions methods discussed.
Week XVI
  • Ahmad and Ambrosetti 2014
  • Overview of the solutions methods discussed.
  • Solutions methods discussed.
  • Apply all solutions methods discussed.