C

(redirected from Set of Complex Numbers)
AcronymDefinition
CCopyright (usually written ©)
C100 (Roman numeral)
CAverage grade
CCell (phone; science)
CTransport (US military aircraft designation for transport aircraft since 1962)
CBattery Size
CCelsius/Centigrade
Csymbol for the speed of light (in a vacuum, 299,792,458 meters per second)
CClick
CCum (Latin: With, often seen with a bar over the c)
CSee
CCompany
CControl
CCenter (football)
CCenter (basketball)
CCombined (US DoD)
CComplete
CCurrent (action code)
CCollege
CCase
CCost
CCategory (abstract algebra)
CColor
CCommander
CClose
CClear
CClub (class airfare)
CChicago
CCommon
CIndividual (IRB)
CSea
CCorrect
CCanadian
CCentury
CC Programming Language
CCorporate
CCentre (Canada Post road designation)
CClubs (playing cards)
CCookie
CCorporation
CCable
CCharacter
CCaught
CCup
CChief
CCommittee
CChapter
CCompliance (Network World)
CChemical
CCharlotte, NC (mint mark on coinage 1837-1861)
CCharlie
CEconomy Class (Air Freight)
CAir Post (philatelic catalog prefix for non-ground stamps)
CCorner (welded joint type)
CConnect (ITU-T)
CCycle
CCastle
CConstant
CPrince Edward Island (Canada Post designation)
CConfidential
CCircuit
CCatholic
CChairman
CCent
CCongress
CCollector (transistor; electronics)
CCarbon
CCandle
CCalm
CCombinations (probability)
CConsumption (economics)
CCliff (Stores 100 code)
CCirca
CConservative
CSpeed of Light
CCommonwealth
CContainer (SDH)
CCloudy
CColon (currency of Costa Rica and El Salvador)
CCork (Irish car registration)
CCairo (Egyptian automobile license plate)
CCubic
CCodex
CCalorie
CCompute(r)
CCough
CCarat
CCatcher (baseball)
CConduit
CCocaine
CCanceled
CCyan
CAffirmative (logging abbreviation)
CClerical (for ACG duties)
CClock Mode (aviation)
CCircumference
CCountess
CCoefficient
CCessna (civilian aircraft)
CCorrelations
CChromosome (as in banding)
CCurie
CClockwise
CConstant of Integration (calculus)
CCarbone (French: Carbon)
CComptroller
CConsonant (speech)
CCitigroup (stock symbol)
CCitiGroup, Inc. (NYSE symbol)
CAscorbic Acid (vitamin)
CCoverage factor
CConseco
CCircling (approach and landing charts)
CC Major (music)
CCapacitance
CExposure Concentration (environment)
CCentimeter
CCranial Nerve
CCysteine (amino acid)
CCedi (currency of Ghana)
CCourt of Chancery (UK)
CSet of Complex Numbers (mathematics)
CCoulomb
CCentavo
CCentime
CConvective
CCeiling Limit (weather reports)
CContralto
CCentum (relating to an Indo-European language pronunciation)
CCool Breeze (rapper)
CCenti (abbreviation of abbreviation for 1/100)
CCentral Standard Time (as used in time groups)
CCytosine
CCenterpartiet (Swedish political party)
CCaesarian
CNicaraguan Cordoba (national currency)
CCessna Aircraft Corporation (manufacturer's symbol)
CCervical Vertebra (prefix, as in C-1, C-2)
CCycloplegic
CCircinella (microbiology)
CCurtis-Wright Corporation (various locations)
CCongius (Latin: Colt)
CCulver Aircrfat Corporation (US Navy aircraft)
CCreeping Line Pattern (US DoD)
CC Programming Language Source Code (file name extension)
CFresnel Cosine Integral
CFederal Reserve Bank of Philadelphia, Pennsylvania (designates original point of circulation of a dollar bill)
CMusical pitch/note
CUndenominated US Stamp (20 cents, introduced 1 Nov 1981)
References in periodicals archive ?
This valid algebraic step allows the simplification to continue until the result is a set of complex numbers. The symbol i is also used to represent [square root of -1].
Let c be the set of complex numbers and [z.sub.1], [z.sub.2] [member of] C.
Throughout this paper, we always make use of the following notations: N denotes the set of natural numbers, [N.sub.0] denotes the set of nonnegative integers, R denotes the set of real numbers, and C denotes the set of complex numbers. In [11], we introduce the q-Euler numbers [E.sub.n,q] and polynomials [E.sub.n,q](x) and investigate their properties.
Then for [a.sub.k], [b.sub.k] [member of] C, the set of complex numbers for all k [member of] N we have
[[GAMMA].sub.[pi]](p, [sigma], q, s) is a linear space over the set of complex numbers.
Therefore, we have to conclude that the only correct solutions of algebraic equations are the solutions on the set of complex numbers [5], [6].
Thus, since all, without any exception, solutions of characteristic algebraic equations on the set of complex numbers correspond to the physically real transitional processes, complex numbers are the only true solutions of any algebraic equations.
Denote M := {[mu], z : z [member of] C},where C denotes the set of complex numbers. We call M the set of generalized Mobius functions of complex order.
The experimental group had one week of teaching and learning on a set of complex numbers and geometry based on the module of complex numbers and interactive geometry (implemented models of ICT-tools).
* the space Of Private Key A is the set of complex numbers z = a + ib, where a and h arc real non-zero numbers.
By S(X) we denote the linear space of all sequences x = ([x.sub.k]) with ([x.sub.k]) [member of] X and the usual coordinatewise operations: ax = ([alpha]x.sub.k]) and x + y = ([x.sub.k] + [y.sub.k]), for each a [member of] C where C denotes the set of complex numbers. If A = ([[lambda].sub.k]) is a scalar sequence and x [member of] S(X) then we shall write [[lambda].sub.x] = ([[lambda].sub.k][x.sub.k]).