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Non-Linear: Random Order
Dear Students
This course is offered under Syllabus Completion program. It will help the students to revise and summarize your core topics for better preparation for semester exam. The course scheduled for 15 to 20 hours to covers the core topics by the faculty those who are currently teaching this course
SCHEDULE FOR TRANSFORMS AND PARTIAL DIFFERENTIAL EQUATIONS
Faculty : Dr. T. NAGALAKSHMI
Live teaching from 1st June 2020 to 12th June 2020
Registration from on 9th May 2020 to 2nd June 2020
Topics Focused
Lagrange’s linear equation
Linear partial differential equations of second and higher order with constant coefficients of homogeneous types
Clairaut’s form
Harmonic analysis.
Complex form of Fourier series
Half Range series-Sine, Cosine
One dimensional wave equation-Type -I
One dimensional wave equation-Type -I contd..
One dimensional wave equation-Type -2
Convolution theorem – Parseval’s identity of Fourier Transform
Fourier Cosine Transform
Fourier Sine Transform
Inverse Z - transform (using partial fraction)
Inverse Z - transform (using Convolution)
Solution of difference equations by z-transform
Features
Online live Teaching
Limited Participants Only
Taught by Experts those who are teaching the syllabus Currently
Selected and core Topics will be handled
Lecture Notes will be provided
Question Banks will be provided
For Further Details
Dr.A.Clementking
Director
INTEGRATED INTELLIGENT RESEARCH (IIR)
No 29 E, Sarojammal Complex 1st Floor,Keelkattalai, Chennai - 600117,
Mobile : +91 -9884568399 ;+91 9791163515. Email : iirindia2020@gmail.com
Web : www.iirgroups.org
.
Lagrange’s linear equation on 1.6.20 Mon 5 PM – 6 PM
Linear partial differential equations of second and higher order with constant coefficients of homogeneous types on 1.6.20 Mon 6 PM – 7 PM
Clairaut’s form on 2.6.20 Tue 7 PM – 8 PM
Harmonic analysis. on 3.6.20 Wed 7 PM – 8 PM
Complex form of Fourier series on 4.6.20 Thu 7 PM – 8 PM
Half Range series-Sine, Cosine on 5.6.20 Fri 7 PM – 8 PM
One dimensional wave equation-Type -I on 6.6.20 Sat 7 PM – 8 PM
One dimensional wave equation-Type -I contd..on 7.6.20 Sun 3 PM – 4 PM
One dimensional wave equation-Type -2 on 7.6.20 Sun 4 PM – 5 PM
Convolution theorem – Parseval’s identity of Fourier Transform on 8.6.20 Mon 5 PM – 6 PM
Fourier Cosine Transform on 8.6.20 Mon 6 PM – 7 PM
Fourier Sine Transform on 9.6.20 Tue 7 PM – 8 PM
Inverse Z - transform (using partial fraction) on 10.6.20 Wed 7 PM – 8 PM
Inverse Z - transform (using Convolution) on 11.6.20 Thu 7 PM – 8 PM
Solution of difference equations by z-transform on 12.6.20 Fri 7 PM – 8 PM
The certificate issued for the Course will have
Only the e-certificate will be made available. No Hard copies. The certificates issued by Integrated Intelligent Research . can be e-verifiable at www.ulektzskills.com/verify.