by Prof. Rosenthal
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|1||CleanVideoClassification & solutions of differential equations||--||11/24/10||Free||View In iTunes|
|2||VideoInitial value problems & exact differential equations||--||11/24/10||Free||View In iTunes|
|3||VideoExact DE's (cont.) & separable differential equations||--||12/14/10||Free||View In iTunes|
|4||VideoHomogeneous & linear differential equations||--||12/14/10||Free||View In iTunes|
|5||VideoBernoulli equations & special integrating factors||--||12/14/10||Free||View In iTunes|
|6||VideoProblems in Mechanics & rate problems||--||12/15/10||Free||View In iTunes|
|7||VideoDefinition & basic existence theorem for linear DE's and the homogeneous equation||--||12/15/10||Free||View In iTunes|
|8||VideoThe homogeneous equation (cont.) & reduction of order||--||12/15/10||Free||View In iTunes|
|9||VideoReduction of order, the nonhomogeneous equation & homogeneous linear equation with constant coefficients||--||12/15/10||Free||View In iTunes|
|10||VideoThe homogeneous linear equation with constant coefficients & the method of undetermined coefficients||--||12/15/10||Free||View In iTunes|
|11||VideoThe method of undetermined coefficients & variation of parameters||--||12/15/10||Free||View In iTunes|
|12||VideoVariation of parameters & the Cauchy-Euler equation||--||12/15/10||Free||View In iTunes|
|13||VideoPower series solutions about an ordinary point||--||12/15/10||Free||View In iTunes|
|14||VideoPower series solutions about an ordinary point (cont.) & solutions about singular points||--||12/15/10||Free||View In iTunes|
|15||VideoSolutions about singular points & the method of Frobenius||--||12/15/10||Free||View In iTunes|
|16||VideoThe method of Frobenius (cont.) & Bessel's equation and Bessel functions||--||12/16/10||Free||View In iTunes|
|17||VideoBessel's equation and Bessel functions (cont.) & Definition of the Laplace transform||--||12/16/10||Free||View In iTunes|
|18||VideoBasic properties of the Laplace transform||--||12/16/10||Free||View In iTunes|
|19||VideoBasic properties of the Laplace transform (cont.) & the inverse transform||--||1/6/11||Free||View In iTunes|
|20||VideoThe inverse transform and the convolution||--||12/16/10||Free||View In iTunes|
|21||VideoIntegral equations & Laplace transform solution of linear DE's with constant coefficients||--||12/16/10||Free||View In iTunes|
|22||VideoLaplace transforms of step functions & inverse transforms of functions of the form e^(as)F(s)||--||12/16/10||Free||View In iTunes|
|23||VideoSolutions of DE's with Discontinuous nonhomogeneous terms & Laplace transform solutions of linear systems||--||1/6/11||Free||View In iTunes|
|24||VideoLaplace transform solutions of linear systems (cont.) & the DE of the vibrations of a mass on a spring||--||12/16/10||Free||View In iTunes|
|25||VideoThe DE of the vibrations of a mass on a spring (cont.), free undamped motion & free damped motion||--||12/16/10||Free||View In iTunes|
|26||VideoFree damped motion (cont.) & final exam review||--||12/16/10||Free||View In iTunes|
He may be a tad douchey
Someone said he was a jerk, and while he can be one, this is irrelevant. The quality of his lectures is very good and he explains the concepts very well. Why would someone focus on his personality, when it has no connection to his ability. I actually think he's kind of goofy, but not in a mean way. He expects the students to be on time, bring the book, pay attention actively, and expects that what he says is not lost on deaf ears. What's wrong with that? He goes to great lengths to explain all the material and I found it clear and much better than my current class on the same subject. I therefore understand that sometimes he may get frustrated. I personally am sick of students (and people) who expect constant cuddling and hand holding. This is an advanced class, and like he said, not required to graduate, so he expects students who love math and are pretty advanced. The lectures are great, and I fully recommend them to anyone taking this subject.
Clear, concise, and direct
I needed a simple and clear introductory explanation for dummies of what differential equations are. I have only seen the 1 st lecture, but it is exactly what I was looking for. I like his unassuming lecture style. He explains everything in its most basic terms, and still maintains the integrity of the subject.
As for his personality, I think he is funny. He just tells it like it is.
Anyone that takes offense to his aside comments is way too thin skinned. This isn't group therapy , it's math.
A bit of a jerk.
Prof. Rosenthal is a bit of a jerk and amply demonstrates this in lecture six at 6 minutes into the talk. Frankly, it is an embarrassing moment. He reminds one of all the bad, pedantic profs one has ever had, from Kingsfeild to Sister Diesel Locomotive. There are plenty of other diffeq courses available. Pass on this one. I like the MIT series much better.