Author: Christine S. VerityPublisher: Brooks/Cole Publishing Company
ISBN: 9781133112341
Category : Mathematics
Languages : en
Pages : 176
Book Description
Additional practice problems to help your students learn the material.
AIM for Success Student Practice Sheets for Aufmann/Lockwood's Mathematics Allied Health Professional
Author: Christine S. VerityPublisher: Brooks/Cole Publishing Company
ISBN: 9781133112341
Category : Mathematics
Languages : en
Pages : 176
Book Description
Additional practice problems to help your students learn the material.
Structure & Function of the Body
Author: Gary A. ThibodeauPublisher:
ISBN: 9789997639318
Category : Human anatomy
Languages : en
Pages : 547
Book Description
There are many wonders in our world, but none is more wondrous than the human body. This is a textbook about that incomparable structure. It deals with two very distinct and yet interrelated sciences: anatomy and physiology. As a science, anatomy is often defined as the study of the structure of an organism and the relationships of its parts. Physiology is the study of the functions of living organisms and their parts. - p. 1.
Experimental Architecture
Author: Peter CookPublisher:
ISBN:
Category : Architecture
Languages : en
Pages : 168
Book Description
Principles of Chemistry
Author: Raymond E. DavisPublisher: Saunders College Pub
ISBN: 9780030604584
Category : Science
Languages : en
Pages : 884
Book Description
Elementary Statistics
Author: Janet T. SpencePublisher:
ISBN: 9780132600439
Category : Mathematics
Languages : en
Pages : 408
Book Description
On the Shoulders of Giants
Author: National Research CouncilPublisher: National Academies Press
ISBN: 0309042348
Category : Education
Languages : en
Pages : 241
Book Description
What mathematics should be learned by today's young people as well as tomorrow's workforce? On the Shoulders of Giants is a vision of richness of mathematics expressed in essays on change, dimension, quantity, shape, and uncertainty, each of which illustrate fundamental strands for school mathematics. These essays expand on the idea of mathematics as the language and science of patterns, allowing us to realize the importance of providing hands-on experience and the development of a curriculum that will enable students to apply their knowledge to diverse numerical problems.
Mathematical Impressions
Author: A. T. FomenkoPublisher: American Mathematical Soc.
ISBN: 9780821801628
Category : Art
Languages : en
Pages : 202
Book Description
Soviet mathematician Fomenko augments his technical books and papers with visual impressions of mathematical concepts, often reminiscent of Escher, and with allusions to Breughel and Durer. Over 80 reproductions, a few in color, are accompanied by the artist's explanation of the mathematical principles being suggested. Annotation copyrighted by Book News, Inc., Portland, OR
Southwest Builder and Contractor
Author: Living with Art
Author: Rita GilbertPublisher: McGraw-Hill Humanities, Social Sciences & World Languages
ISBN: 9780079132123
Category : Art appreciation
Languages : en
Pages : 0
Book Description
This volume is a basic art text for college students and other interested readers. It offers a broad introduction to the nature, vocabulary, media, and history of art, showing examples from many cultures.
Variations on a Theme by Kepler
Author: Victor GuilleminPublisher: American Mathematical Soc.
ISBN: 082184184X
Category : Mathematics
Languages : en
Pages : 98
Book Description
This book is based on the Colloquium Lectures presented by Shlomo Sternberg in 1990. The authors delve into the mysterious role that groups, especially Lie groups, play in revealing the laws of nature by focusing on the familiar example of Kepler motion: the motion of a planet under the attraction of the sun according to Kepler's laws. Newton realized that Kepler's second law--that equal areas are swept out in equal times--has to do with the fact that the force is directed radially to the sun. Kepler's second law is really the assertion of the conservation of angular momentum, reflecting the rotational symmetry of the system about the origin of the force. In today's language, we would say that the group $O(3)$ (the orthogonal group in three dimensions) is responsible for Kepler's second law. By the end of the nineteenth century, the inverse square law of attraction was seen to have $O(4)$ symmetry (where $O(4)$ acts on a portion of the six-dimensional phase space of the planet). Even larger groups have since been found to be involved in Kepler motion. In quantum mechanics, the example of Kepler motion manifests itself as the hydrogen atom. Exploring this circle of ideas, the first part of the book was written with the general mathematical reader in mind. The remainder of the book is aimed at specialists. It begins with a demonstration that the Kepler problem and the hydrogen atom exhibit $O(4)$ symmetry and that the form of this symmetry determines the inverse square law in classical mechanics and the spectrum of the hydrogen atom in quantum mechanics. The space of regularized elliptical motions of the Kepler problem (also known as the Kepler manifold) plays a central role in this book. The last portion of the book studies the various cosmological models in this same conformal class (and having varying isometry groups) from the viewpoint of projective geometry. The computation of the hydrogen spectrum provides an illustration of the principle that enlarging the phase space can simplify the equations of motion in the classical setting and aid in the quantization problem in the quantum setting. The authors provide a short summary of the homological quantization of constraints and a list of recent applications to many interesting finite-dimensional settings. The book closes with an outline of Kostant's theory, in which a unitary representation is associated to the minimal nilpotent orbit of $SO(4,4)$ and in which electromagnetism and gravitation are unified in a Kaluza-Klein-type theory in six dimensions.