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Retour à Calculus: Single Variable Part 2 - Differentiation

Avis et commentaires pour l'étudiant pour Calculus: Single Variable Part 2 - Differentiation par Université de Pennsylvanie

4.8
477 notes
90 avis

À propos du cours

Calculus is one of the grandest achievements of human thought, explaining everything from planetary orbits to the optimal size of a city to the periodicity of a heartbeat. This brisk course covers the core ideas of single-variable Calculus with emphases on conceptual understanding and applications. The course is ideal for students beginning in the engineering, physical, and social sciences. Distinguishing features of the course include: 1) the introduction and use of Taylor series and approximations from the beginning; 2) a novel synthesis of discrete and continuous forms of Calculus; 3) an emphasis on the conceptual over the computational; and 4) a clear, dynamic, unified approach. In this second part--part two of five--we cover derivatives, differentiation rules, linearization, higher derivatives, optimization, differentials, and differentiation operators....

Meilleurs avis

JB

Feb 18, 2018

So much fun, and hits all sorts of things I'd always wanted to know. The homework took me a long time, so I didn't get to watch all the bonus lectures, but the ones I did were really interesting.

WG

Feb 17, 2017

Not a class for someone with no calculus experience. However, if you have some calculus knowledge it will deepen your knowledge more than any other MOOC I have found. Truly a great course.

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1 - 25 sur 87 Examens pour Calculus: Single Variable Part 2 - Differentiation

par Nruparaj S

Jun 30, 2018

It's really a learning experience. Questions have the practical approach. It provides a wider prospective of knowledge and application. Thank you for being a part this group.

par Jack W

Jul 11, 2019

It is a very informative course!

par JORGE E M L V

May 26, 2019

Excelente curso donde aprendí el cálculo de variable real, lo recomiendo mucho ya que se aprende bastante acerca del tema

par 江祖榮

Jul 19, 2019

Good in giving though-invoking concept and visualization of differentiation, chain rule, relative rate of change, as well as Newton's linear approximation.

These corresponding demo example are illustrative and help us understand the main idea and underlying metaphor of differential operator "D" and symbol df/dx.

In addition, the technique of domain change in differentiation by using exponent and logarithm and implicit differentiation is really powerful and useful.

par Daniel M

Jan 08, 2019

A very good course, some themes were new for me

par 胡启阳

Feb 24, 2019

excellent

par li z

Mar 03, 2019

excellent!!!!

par BoWen T

Mar 12, 2019

It's very good for me to start a new way to the math and it opens up my new ideas, thanks to professior G

par Brian N A

Jul 11, 2018

As with part I, a real benefit of this course is its quality practice problems. They require you to work. I usually spent at least 30 minutes per problem (sometimes hours at the extreme), so you end up accumulating a lot of practice, and it certainly pays. I haven't previously put much effort in math, and as a result I would often make errors in my derivations. Not only does this course expose you to a lot of methods and knowledge, but the sheer amount of practice has made me inherently less prone to errors. Which makes math a LOT more fun.

par Wolfe G

Feb 17, 2017

Not a class for someone with no calculus experience. However, if you have some calculus knowledge it will deepen your knowledge more than any other MOOC I have found. Truly a great course.

par Uygun S

Feb 08, 2016

just excellent, please make one on linear algebra, discrete mathematics and multivariate calculus

par Carlos A

Jun 26, 2017

Great, really good. Again great videolectures, great examples, nice bonuses.

I think I mentioned this but again, great videos, the colors, the clarity. Thanks.

par Georgios P

Nov 20, 2017

Great course, everything is explained in a very futuristic way!

par Arne S

Jan 24, 2016

This course has excellent training material. It requires a lot of work from the student though.

par 李婉婷

May 01, 2016

导数概念阐述清晰明了,并且是我明白泰勒展式的应用!

par LIU Y

Mar 02, 2017

Precious, interesting and impressive

par Keng-Hui W

Jul 10, 2016

I still learned a lot even I passed this course with A+ before.

par Utkarsh R

Jan 17, 2016

This module is great. The thing I like most is how professor implements the theory into Physics and other realistic models. Ive also begun liking statistics a little bit. Now, part 3.

par Rohit B

Feb 08, 2017

Best course on calculus ever

par Alejandro C

Oct 25, 2016

This is, by far, the best course I have ever taken. I will take the Multivariable Calculus course when it is open, after finishing the 5 S.V.C. courses.

par Luwei Y

Oct 28, 2016

Organised course and clear presentation.

par 余煊年

Oct 02, 2016

Thanks for the professor.

par Deleted A

Oct 06, 2016

Good, but I don't have much time to learn this

par normanicus

May 11, 2016

A really great course, so clearly elucidated by Prof. Grist.

par EDILSON S S O J

Mar 11, 2016

Spetacular!!!!!!