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Avis et commentaires pour l'étudiant pour Introduction to Ordinary Differential Equations par Korea Advanced Institute of Science and Technology(KAIST)

227 notes
61 avis

À propos du cours

In this introductory course on Ordinary Differential Equations, we first provide basic terminologies on the theory of differential equations and then proceed to methods of solving various types of ordinary differential equations. We handle first order differential equations and then second order linear differential equations. We also discuss some related concrete mathematical modeling problems, which can be handled by the methods introduced in this course. The lecture is self contained. However, if necessary, you may consult any introductory level text on ordinary differential equations. For example, "Elementary Differential Equations and Boundary Value Problems by W. E. Boyce and R. C. DiPrima from John Wiley & Sons" is a good source for further study on the subject. The course is mainly delivered through video lectures. At the end of each module, there will be a quiz consisting of several problems related to the lecture of the week....

Meilleurs avis


Jun 19, 2018

I heartily thankful to Coursera team who helped me lot to complete this course and last but not least I would like to say thanks to Prof. K.H.Kwon.I have learned lot thorough this course .


May 20, 2018

I have enjoyed taking this course. The topics have been divided very well in that they are not too long and hard just the right amount. The lecturer was delightful and easy to understand.

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26 - 50 sur 61 Examens pour Introduction to Ordinary Differential Equations

par Shounak D

Mar 02, 2018

good course for beginners..discusses the fundamentals of solving differential equations analytically.

par Tanmay J

Apr 03, 2018

Thoroughly knowledgeable course.

par Bhisham B

Mar 19, 2018

awesome teaching

par Manuel A V R

Mar 21, 2018

Thank you for the course to all persons that integrate KAIST

par Edward C

May 07, 2018

A very useful lesson for those students wanting to take a step further than AP/ALevel and freshmen that are struggling with math classes.

par Aishwarya T

Nov 04, 2018

I learnt all the basics I wanted to very properly, the course was very helpful.


Nov 06, 2018


par shivang a

Nov 06, 2018

amazing knowledge

par Yuhan Z

Oct 07, 2018

Great course - very clear and practical. I appreciate the professor's teaching as well as the exams.

par Chandra K

Sep 29, 2018

The one of the course of its kind. Very helpful to students and very informative.

par Harish D

Sep 28, 2018

Well structured course. It starts right with the basics and goes all the way to UG level toughness.

par dgq

Oct 01, 2018

excellent classe


Oct 05, 2018

This is a very good course ,It helps me to be an expert in the field of Ordinary differential equation

Thanks a lot to Coursera for to provide this course

par 夏旸

Dec 03, 2018

nice course!


Apr 18, 2019

wonderful course with the best teacher and his teaching, by this i come to know a few topics in mathematics

par Gowtham.B

Jun 27, 2019

Nandri <3


May 31, 2019

I found the course very interesting.

par 王诺实

Jul 14, 2019

I am sincerely thankful to your Generous courses on ordinary differential equation。 As a student from China, I have learned some basic knowledge about it In our advanced math class. However, this class give me a marvelous opportunity to get a deeper insight about it. It helps me to have a comprehensive perspective about it

par Archak D

Sep 07, 2019



Oct 10, 2019

coursera is best online platform to learning. i recommend every college school student to learn from coursera it's far better than your school and college teacher

par 17MIS0424 S D

Nov 07, 2019

very useful extra knowledge.

par Dr. A B

Oct 30, 2019

Excellent learning!!

par Juan C P A

Jan 12, 2019

Buen curso, aunque la metodología debe involucrar didáctica con recursos.

par Atharva B

Mar 12, 2019

Prof not very interactive, there is less motivation for students to discuss among each other but course content is very good!

par Tongsu P

Feb 02, 2018

A better explanation of the theorem (especially going through each step of the proof rather than skipping them) would be a lot more helpful. Also, if possible, give other reference to read and practice.