Posted by **maxxum** at Oct. 27, 2006

79192

**Lakhbir Hayre (Editor), «Salomon Smith Barney Guide to Mortgage-Backed and Asset-Backed Securities»**

Wiley | ISBN 0471385875 | 1 edition (April 23, 2001) | PDF | 7,8 Mb | 888 Pages

Wiley | ISBN 0471385875 | 1 edition (April 23, 2001) | PDF | 7,8 Mb | 888 Pages

Posted by **hill0** at March 1, 2017

English | 2 Feb. 2017 | ISBN: 3319462687 | 264 Pages | PDF | 2.69 MB

This volume contains seventeen papers that were presented at the 2015 Annual Meeting of the Canadian Society for History and Philosophy of Mathematics/La Societe Canadienne d Histoire et de Philosophie des Mathematiques, held in Washington, DC. I

Posted by **readerXXI** at Feb. 28, 2017

English | 2016 | ISBN: 1681232596 | 361 Pages | PDF | 17 MB

This book draws together critical theoretic contributions on mathematics and mathematics education from leading researchers in the field.

Posted by **AvaxGenius** at Feb. 23, 2017

English | EPUB | 2016 | 159 Pages | ISBN : 3319279378 | 2.08 MB

How does mathematics impact everyday events? The purpose of this book is to show a range of examples where mathematics can be seen at work in everyday life.

Posted by **bookwarrior** at Aug. 28, 2016

2014 | 464 Pages | ISBN: 0199998167 | PDF | 11 MB

Posted by **Underaglassmoon** at Jan. 25, 2016

Springer | Mathematics | February 23, 2016 | ISBN-10: 3319279378 | 159 pages | pdf | 2.57 mb

Authors: Haigh, John

Demonstrates the versatility of mathematics by demonstrating how it can be used to give insights into a wide variety of everyday events

Explores real-life examples of how mathematics works

Posted by **Torries** at May 2, 2015

Posted by **serpmolot** at Sept. 3, 2014

PDTV | English | m4v | H264 720x480 | AAC 160 kbps | 25 min | 318 MB

Posted by **tika12** at Nov. 16, 2007

Cambridge University Press; 1 edition (November 12, 2001) | ISBN: 052178171X | 648 pages | PDF | 4,1 Mb

Posted by **hill0** at March 1, 2017

English | 20 Jan. 2017 | ISBN: 3319484567 | 328 Pages | PDF | 3.96 MB

This book presents the theory of waves propagation in a fluid-saturated porous medium (a Biot medium) and its application in Applied Geophysics. In particular, a derivation of absorbing boundary conditions in viscoelastic and poroelastic media is presented, which later is employed in the applications.