Difference between revisions of "MAT3613"

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(Fixed Topics Column)
(Fixed Topics Column)
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* nan
 
* nan
 
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* Explain the basic notions related to differential equations: the order of a differential equation, solutions, basic concepts of initial values, existence and uniqueness.
+
* Differential equations: what they are and why they are important; order of a differential equation; solutions; initial value problems.
* Determine separable differential equations of the first order. Apply direct methods to evaluate exact solutions of separable differential equations of the first order.
+
* Theory of first order differential equations; Cauchy problem; existence and uniqueness.
* nan
+
* The method of separation of variables; examples of separable differential equations.
* nan
 
* nan
 
 
* nan
 
* nan
 +
* HOMEWORK # 1 – First
 +
* Order ODEs: Due at the beginning of Week IV
 
||
 
||
 
* Integration techniques.
 
* Integration techniques.
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* and 3
 
* and 3
 
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* Determine homogeneous and linear differential equations of the first order. Apply direct methods to evaluate exact solutions of homogeneous and 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
+
* Homogeneous differential equations.
* problems.
+
* Linear differential equations of first order; integrating factors.
 
* nan
 
* nan
 
||
 
||
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* nan
 
* nan
 
||
 
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* Determine Bernoulli and exact differential equations of the first order. Apply direct methods to evaluate exact solutions of Bernoulli and exact differential equations of the first order. Use the integrating factor technique for
+
* Bernoulli equations.
* exact equations.
+
* Exact differential equations. The integrating factor for exact equations.
 
* nan
 
* nan
 
||
 
||
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* Chaps. 1-3
 
* Chaps. 1-3
 
||
 
||
* Determine the type of different classes of differential equations of the first order: separable, linear, homogeneous, Bernoulli, exact.
+
* Collect HOMEWORK # 1 Firs-order ODEs not solved for the first derivative: Clairaut equations, Lagrange equations.
* Use direct methods to solve first order differential equations solved and not solved for the first derivative.
+
* Overview of the solutions methods discussed so far (Chapters 1-3).
 
||
 
||
 
* Integration techniques. Partial derivatives. Integrating factor methods.
 
* Integration techniques. Partial derivatives. Integrating factor methods.
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* nan
 
* nan
 
||
 
||
* Linear dependence and independence of functions. Wronskian of two functions. Wronskian of two solutions of linear second-order ODEs.
+
* MDTERM EXAM # 1:
* nan
+
* First-order ODEs Linear independence and Wronskian.
 
||
 
||
 
* Linear dependence, independenc e of vectors.
 
* Linear dependence, independenc e of vectors.
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* nan
 
* nan
 
||
 
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* Determine the type of different classes of differential equations of the second and higher order: linear and nonlinear, equations with constant coefficients, homogeneous and non- homogeneous.
+
* Reduction of the order. Linear homogeneous differential equations. Abel’s theorem.
* Determine fundamental solutions.
+
* Fundamental solutions. Linear nonhomogeneous equations; variation of parameters.
* Apply of the variation of parameters technique for second-order ODEs.
 
* nan
 
* nan
 
 
* nan
 
* nan
 +
* HOMEWORK # 2 –
 +
* Second and higher order ODEs: Due at the beginning of Week X
 +
* (extended later)
 
||
 
||
 
* Wronskian. Algebraic equations. Determinant s.
 
* Wronskian. Algebraic equations. Determinant s.
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* nan
 
* nan
 
||
 
||
* Apply variation of parameters and method of undetermined coefficients techniques for second-order ODEs.
+
* Variation of parameters (continued)
* nan
+
* Method of undetermined coefficients
 
||
 
||
 
* Variation of parameters. Method of undetermine d coefficients.
 
* Variation of parameters. Method of undetermine d coefficients.
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* asdfa
 
* asdfa
 
||
 
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* asdfsa
+
* SPRING BRAKE
 
||
 
||
 
* asdfas
 
* asdfas
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* adfaf
 
* adfaf
 
||
 
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* asdfas
+
* Preparation for remote instruction.
 
||
 
||
 
* asdfas
 
* asdfas
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* nan
 
* nan
 
||
 
||
* Apply variation of parameters and method of undetermined coefficients techniques for higher-order ODEs
+
* Higher order ODEs.
 
* nan
 
* nan
 
* nan
 
* nan
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* 6, 10
 
* 6, 10
 
||
 
||
* Evaluate the exact solutions of important classes of differential equations such as second order differential equations as well as some higher order differential equations.
+
* Overview of the solutions methods for second and higher order differential equations.
* nan
+
* Collect HOMEWORK # 2 (extended deadline)
 
* nan
 
* nan
 
||
 
||
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* nan
 
* nan
 
||
 
||
* Definition and main properties of the Laplace transform.
+
* MDTERM EXAM # 2:
* nan
+
* Second and higher-order ODEs
* nan
+
* Laplace transform. Definition.
* nan
+
* Main properties.
* nan
+
* HOMEWORK # 3 – L-
* nan
+
* transform. Applications of L-transform for ODES and systems of ODEs: Due at the beginning of Week XV
 
||
 
||
 
* Improper integrals with infinite limits.
 
* Improper integrals with infinite limits.
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* 11
 
* 11
 
||
 
||
* Apply the theorem(s) for inverse L-transform.
+
* Theorem(s) for inverse L- transforms
 
* nan
 
* nan
 
||
 
||
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* 11
 
* 11
 
||
 
||
* Apply the Laplace transform as solution technique.
+
* Applications of L-transform to ODEs.
* nan
+
* Applications of L-transform to systems of ODEs.
 
||
 
||
 
* Properties of the L- transform and inverse L-transform.
 
* Properties of the L- transform and inverse L-transform.
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* nan
 
* nan
 
||
 
||
* Apply the L-transform. Apply all solutions methods discussed.
+
* Applications of L-transform to ODEs and systems of ODEs.
* nan
+
* Overview of the solutions methods discussed.
 
||
 
||
 
* Solutions methods discussed.
 
* Solutions methods discussed.

Revision as of 09:29, 30 June 2020

Topics List

Date Sections Topics Prerequisite Skills Student Learning Outcomes
Week I
  • Ahmad and Ambrosetti 2014,
  • Chaps. 1,
  • 2, 3
  • nan
  • nan
  • nan
  • Differential equations: what they are and why they are important; order of a differential equation; solutions; initial value problems.
  • Theory of first order differential equations; Cauchy problem; existence and uniqueness.
  • The method of separation of variables; examples of separable differential equations.
  • nan
  • HOMEWORK # 1 – First
  • Order ODEs: Due at the beginning of Week IV
  • Integration techniques.
  • nan
  • nan
  • nan
  • nan
  • nan
  • Explain the basic notions related to differential equations: the order of a differential equation, solutions, basic concepts of initial values, existence and uniqueness.
  • Determine separable differential equations of the first order. Apply direct methods to evaluate exact solutions of separable differential equations of the first order.
  • nan
  • nan
  • nan
  • nan
Week II
  • Ahmad and Ambrosetti 2014,
  • Chaps. 1
  • and 3
  • Homogeneous differential equations.
  • Linear differential equations of first order; integrating factors.
  • nan
  • Integration techniques.
  • nan
  • nan
  • Determine homogeneous and linear differential equations of the first order. Apply direct methods to evaluate exact solutions of homogeneous and 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.
  • nan
Week III
  • Ahmad and Ambrosetti 2014, Ch.
  • 3
  • nan
  • Bernoulli equations.
  • Exact differential equations. The integrating factor for exact equations.
  • nan
  • Integration techniques. Partial derivatives. Linear first- order differential equations.
  • nan
  • nan
  • Determine Bernoulli and exact differential equations of the first order. Apply direct methods to evaluate exact solutions of Bernoulli and exact differential equations of the first order. Use the integrating factor technique for
  • exact equations.
  • nan
Week IV
  • Ahmad and Ambrosetti 2014,
  • Chaps. 1-3
  • Collect HOMEWORK # 1 Firs-order ODEs not solved for the first derivative: Clairaut equations, Lagrange equations.
  • Overview of the solutions methods discussed so far (Chapters 1-3).
  • Integration techniques. Partial derivatives. Integrating factor methods.
  • First-order differential equations.
  • 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
  • nan
  • MDTERM EXAM # 1:
  • First-order ODEs Linear independence and Wronskian.
  • Linear dependence, independenc e of vectors.
  • Determinant s.
  • Linear dependence and independence of functions. Wronskian of two functions. Wronskian of two solutions of linear second-order ODEs.
  • nan
Week VI
  • Ahmad and Ambrosetti 2014, Ch. 5
  • nan
  • nan
  • nan
  • nan
  • nan
  • Reduction of the order. Linear homogeneous differential equations. Abel’s theorem.
  • Fundamental solutions. Linear nonhomogeneous equations; variation of parameters.
  • nan
  • HOMEWORK # 2 –
  • Second and higher order ODEs: Due at the beginning of Week X
  • (extended later)
  • Wronskian. Algebraic equations. Determinant s.
  • nan
  • nan
  • nan
  • nan
  • nan
  • Determine the type of different classes of differential equations of the second and higher order: linear and nonlinear, equations with constant coefficients, homogeneous and non- homogeneous.
  • Determine fundamental solutions.
  • Apply of the variation of parameters technique for second-order ODEs.
  • nan
  • nan
  • nan
Week VII
  • Ahmad and Ambrosetti 2014, Ch. 5
  • nan
  • Variation of parameters (continued)
  • Method of undetermined coefficients
  • Variation of parameters. Method of undetermine d coefficients.
  • nan
  • Apply variation of parameters and method of undetermined coefficients techniques for second-order ODEs.
  • nan
Week VIII
  • asdfa
  • SPRING BRAKE
  • asdfas
  • asdfsa
Week IX
  • adfaf
  • Preparation for remote instruction.
  • asdfas
  • asdfas
Week X
  • Ahmad and Ambrosetti 2014, Ch. 5
  • nan
  • nan
  • Higher order ODEs.
  • nan
  • nan
  • Methods for higher-order ODEs.
  • Variation of parameters. Method of undetermine d coefficients.
  • nan
  • Apply variation of parameters and method of undetermined coefficients techniques for higher-order ODEs
  • nan
  • nan
Week XI
  • Ahmad and Ambrosetti 2014,
  • Chaps. 5,
  • 6, 10
  • Overview of the solutions methods for second and higher order differential equations.
  • Collect HOMEWORK # 2 (extended deadline)
  • nan
  • Direct methods for second and higher-order ODEs.
  • nan
  • nan
  • Evaluate the exact solutions of important classes of differential equations such as second order differential equations as well as some higher order differential equations.
  • nan
  • nan
Week XII
  • Ahmad and Ambrosetti 2014, Ch.
  • 11
  • nan
  • nan
  • nan
  • nan
  • MDTERM EXAM # 2:
  • Second and higher-order ODEs
  • Laplace transform. Definition.
  • Main properties.
  • HOMEWORK # 3 – L-
  • transform. Applications of L-transform for ODES and systems of ODEs: Due at the beginning of Week XV
  • Improper integrals with infinite limits.
  • nan
  • nan
  • nan
  • nan
  • nan
  • Definition and main properties of the Laplace transform.
  • nan
  • nan
  • nan
  • nan
  • nan
Week XIII
  • Ahmad and Ambrosetti 2014, Ch.
  • 11
  • Theorem(s) for inverse L- transforms
  • nan
  • Derivatives of functions of complex variables.
  • nan
  • Apply the theorem(s) for inverse L-transform.
  • nan
Week XIV
  • Ahmad and Ambrosetti 2014, Ch.
  • 11
  • Applications of L-transform to ODEs.
  • Applications of L-transform to systems of ODEs.
  • Properties of the L- transform and inverse L-transform.
  • nan
  • Apply the Laplace transform as solution technique.
  • nan
Week XV
  • Ahmad and Ambrosetti 2014
  • nan
  • Applications of L-transform to ODEs and systems of ODEs.
  • Overview of the solutions methods discussed.
  • Solutions methods discussed.
  • nan
  • Apply the L-transform. Apply all solutions methods discussed.
  • nan
Week XVI
  • Ahmad and Ambrosetti 2014
  • nan
  • Collect HOMEWORK # 3 Overview of the solutions methods discussed.
  • nan
  • Solutions methods discussed.
  • nan
  • Apply all solutions methods discussed.
  • nan
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