Posted by **ParRus** at Sept. 28, 2014

4xDVDRip | English | AVI | 640 x 480 | XviD ~851 kbps | 29.970 fps

MP3 | 112 Kbps | 44.1 KHz | 2 channels | 14 hours | 5.5 GB

MP3 | 112 Kbps | 44.1 KHz | 2 channels | 14 hours | 5.5 GB

Calculus 2 is considered by most to be the hardest Universtiy Calculus course in the sequence, even most challenging for most students than Calculus 3. This is because you will learn about many different topics, most of which have nothing to do with another. For many, it feels like you are learning about a hodgepodge of integration techniques, sequences and series convergence rules and techniques, with new concepts such as parametric equations and polar integrals throw in for good measure. The "Advanced Calculus 2 Tutor" is a 14 Hour Course that teaches you these concepts and more with step-by-step example problems.

Posted by **ParRus** at Jan. 19, 2017

36xWEBRip | English | AVI | 640 x 480 | AVC ~745 kbps | 29.970 fps

MP3 | 128 kbps | 48.0 KHz | 2 channels | 18:32:26 | 6.85 GB

MP3 | 128 kbps | 48.0 KHz | 2 channels | 18:32:26 | 6.85 GB

Calculus is the greatest mathematical breakthrough since the pioneering discoveries of the ancient Greeks. Without it, we wouldn't have spaceflight, skyscrapers, jet planes, economic modeling, accurate weather forecasting, modern medical technologies, or any of the countless other achievements we take for granted in today's world.

Posted by **tanas.olesya** at Jan. 24, 2017

Instructor' solutions manual, multivariable for Thomas' calculus

Instructors solution manual, Single Variable by Maurice D. Weir

English | 2 Sept. 2009 | ISBN: 0321587995 | 1180 Pages | PDF | 381 MB

Posted by **nebulae** at Jan. 16, 2017

English | 2010-09-20 | ISBN: 048667343X | 528 pages | EPUB | 42.9 MB

Posted by **tanas.olesya** at Jan. 13, 2017

English | Jan. 2000 | ISBN: 0534359574 | 595 Pages | PDF | 26 MB

Stewart's Student Manual

Posted by **Underaglassmoon** at Jan. 9, 2017

Wiley | English | February 2017 | ISBN-10: 1119965829 | 856 pages | PDF | 7.69 mb

By Eric Chin, Dian Nel, Sverrir Ólafsson

Posted by **libr** at Jan. 9, 2017

English | 2008 | ISBN: 0691131317 | 264 pages | PDF | 2,5 MB

Posted by **lengen** at Jan. 5, 2017

English | Oct. 10, 2008 | ISBN: 3764321857 | 140 Pages | PDF | 9 MB

0.1 Introduction These lecture notes describe a new development in the calculus of variations which is called Aubry-Mather-Theory. The starting point for the theoretical physicist Aubry was a model for the descrip tion of the motion of electrons in a two-dimensional crystal. Aubry investigated a related discrete variational problem and the corresponding minimal solutions. On the other hand, Mather started with a specific class of area-preserving annulus mappings, the so-called monotone twist maps. These maps appear in mechanics as Poincare maps. Such maps were studied by Birkhoff during the 1920s in several papers. In 1982, Mather succeeded to make essential progress in this field and to prove the existence of a class of closed invariant subsets which are now called Mather sets. His existence theorem is based again on a variational principle.

Posted by **interes** at Dec. 19, 2016

English | 2014 | ISBN: 1466582502 | 274 pages | PDF | 11 MB

Posted by **interes** at Dec. 18, 2016

English | 2014 | ISBN: 9814551074 | 500 pages | PDF | 15 MB