02296nam 2200385 n 450 99639538240331620200824121157.0(CKB)3810000000013234(EEBO)2240909761(UnM)ocm99889671e(UnM)99889671(EXLCZ)99381000000001323419841105d1681 uy engurbn||||a|bb|A new systeme of the mathematicks[electronic resource] Containing I. Arithmetick, as well natural and decimal, as in species, or the principles of Algebra. II. Practical geometry, together with the first six books of Euclid's Elements, as also the eleventh and twelfth, symbolically demonstrated. III. Trigonometry plain and spherical. IV. Cosmography, or a description of the heavens. V. Navigation, or sailing by a plain or Mercator's Chart; as also by the Arch of a Great Circle, &c. VI. The Doctrine of the sphere, grounded on the motion of the earth, according to the old Pythagorean and Copernican systeme. VII. Astronomical tables, with tables of logarithms, natural and artificial sines and tangents, and versed sines. VIII. A new geography, or a description of the most eminent countries and coasts of the world, with maps of them, and tables of their latitude and longitude. /Composed by Sir Jonas Moore Knight, Late Surveyor General of His Majesty's Ordnance, and Fellow of the Royal Society: and designed for the use of the Royal Foundation of the Mathematical School in Christ-Hospital. By His Majesty's special commandLondon Printed by A. Godbid and J. Playford for Robert Scott, bookseller in Little BritainM. DC. LXXXI. [1681][1+] pA fragment; title page only.Reproduction of original in the British Library.eebo-0018MathematicsEarly works to 1800GeographyEarly works to 1800Title pagesEngland17th cent.MathematicsGeographyMoore JonasSir,1617-1679.1003096Cu-RivESCu-RivESCStRLINCu-RivESBOOK996395382403316A new systeme of the mathematicks2302789UNISA03624nam 2200625 450 991081808110332120231026215538.01-119-22401-21-119-22400-4(CKB)4330000000009393(EBL)4570714(SSID)ssj0001691469(PQKBManifestationID)16539647(PQKBTitleCode)TC0001691469(PQKBWorkID)15064627(PQKB)25079265(Au-PeEL)EBL4570714(CaPaEBR)ebr11231613(CaONFJC)MIL935006(OCoLC)946277643(CaSebORM)9781119223566(MiAaPQ)EBC4570714(PPN)198592809(EXLCZ)99433000000000939320160717h20162016 uy 0engur|n|---|||||txtrdacontentcrdamediacrrdacarrierNetwork reliability measures and evaluation /Sanjay K. ChaturvediFirst editionSalem, Massachusetts :Scrivener Publishing ;Hoboken, New Jersey :John Wiley & Sons, Inc.,2016.©20161 online resource (260 pages)Performability Engineering Series.THEi Wiley ebooks.Description based upon print version of record.1-119-22356-3 Includes bibliographical references and index.In Engineering theory and applications, we think and operate in terms of logics and models with some acceptable and reasonable assumptions. The present text is aimed at providing modelling and analysis techniques for the evaluation of reliability measures (2-terminal, all-terminal, k-terminal reliability) for systems whose structure can be described in the form of a probabilistic graph. Among the several approaches of network reliability evaluation, the multiple-variable-inversion sum-of-disjoint product approach finds a well-deserved niche as it provides the reliability or unreliability expression in a most efficient and compact manner. However, it does require an efficiently enumerated minimal inputs (minimal path, spanning tree, minimal k-trees, minimal cut, minimal global-cut, minimal k-cut) depending on the desired reliability. The present book covers these two aspects in detail through the descriptions of several algorithms devised by the ‘reliability fraternity’ and explained through solved examples to obtain and evaluate 2-terminal, k-terminal and all-terminal network reliability/unreliability measures and could be its USP. The accompanying web-based supplementary information containing modifiable Matlab® source code for the algorithms is another feature of this book. A very concerted effort has been made to keep the book ideally suitable for first course or even for a novice stepping into the area of network reliability. The mathematical treatment is kept as minimal as possible with an assumption on the readers’ side that they have basic knowledge in graph theory, probabilities laws, Boolean laws and set theory.Performability engineering series.Computer networksReliabilityComputer networksMathematical modelsComputer networksReliability.Computer networksMathematical models.004.6Chaturvedi Sanjay K.1593010MiAaPQMiAaPQMiAaPQBOOK9910818081103321Network reliability3912924UNINA