Geometric Design of Linkages
J. Michael McCarthy
2006. g. apr. · Interdisciplinary Applied Mathematics 11. grāmata · Springer Science & Business Media
E-grāmata
320
Lappuses
reportAtsauksmes un vērtējumi nav pārbaudīti. Uzzināt vairāk
Par šo e-grāmatu
to introduce these techniques and additional background is provided in appendices. The ?rst chapter presents an overview of the articulated systems that we will be considering in this book. The generic mobility of a linkage is de?ned, and we separate them into the primary classes of planar, spherical, and spatial chains. The second chapter presents the analysis of planar chains and details their movement and classi?cation. Chapter three develops the graphical design theory for planar linkages and introduces many of the geometric principlesthatappearintheremainderofthebook.Inparticular,geometric derivations of the pole triangle and the center-point theorem anticipate analytical results for the spherical and spatial cases. Chapter four presents the theory of planar displacements, and Chapter ?ve presents the algebraic design theory. The bilinear structure of the - sign equations provides a solution strategy that emphasizes the geometry underlying linear algebra. The ?ve-position solution includes an elimi- tion step that is probably new to most students, though it is understood and well-received in the classroom. Chapters six and seven introduce the properties of spherical linkages and detail the geometric theory of spatial rotations. Chapter eight presents the design theory for these linkages, which is analogous to the planar theory. This material exercises the student’s use of vector methods to represent geometry in three dimensions. Perpendicular bisectors in the planar design theory become perpendicular bisecting planes that intersect to de?ne axes. The analogue provides students with a geometric perspective of the linear equations that they are solving.
Novērtējiet šo e-grāmatu
Izsakiet savu viedokli!
Informācija lasīšanai
Viedtālruņi un planšetdatori
Instalējiet lietotni Google Play grāmatas Android ierīcēm un iPad planšetdatoriem/iPhone tālruņiem. Lietotne tiks automātiski sinhronizēta ar jūsu kontu un ļaus lasīt saturu tiešsaistē vai bezsaistē neatkarīgi no jūsu atrašanās vietas.
Klēpjdatori un galddatori
Varat klausīties pakalpojumā Google Play iegādātās audiogrāmatas, izmantojot datora tīmekļa pārlūkprogrammu.
E-lasītāji un citas ierīces
Lai lasītu grāmatas tādās elektroniskās tintes ierīcēs kā Kobo e-lasītāji, nepieciešams lejupielādēt failu un pārsūtīt to uz savu ierīci. Izpildiet palīdzības centrā sniegtos detalizētos norādījumus, lai pārsūtītu failus uz atbalstītiem e-lasītājiem.
