Transcription of Mathematical Tools for Physics
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Mathematical Tools for Physicsby James NearingPhysics DepartmentUniversity of 2003, James NearingPermission to copy forindividual or classroomuse is May, 2010 ContentsIntroductioniiiBibliographyv1 Basic Stuff1 TrigonometryParametric DifferentiationGaussian Integralserf and GammaDifferentiatingIntegralsPolar CoordinatesSketching Graphs2 Infinite Series24 The BasicsDeriving Taylor SeriesConvergenceSeries of SeriesPower series, two variablesStirling s ApproximationUseful TricksDiffractionChecking Results3 Complex Algebra52 Complex NumbersSome FunctionsApplications of Euler s FormulaGeometrySeries of cosinesLogarithmsMapping4 Differential Equations67 Linear Constant-CoefficientForced OscillationsSeries SolutionsSome General MethodsTrigonometry via ODE sGreen s FunctionsSeparation of VariablesCircuitsSimultaneous EquationsSimultaneous ODE sLegendre s EquationAsymptotic Behavior5 Fourier Series100 ExamplesComputing Fourier SeriesChoice of BasisMusical NotesPeriodically Forced ODE sReturn to ParsevalGibbs Phenomenon6 Vector Spaces123 The Underlying IdeaAxiomsExam
Gradient in other Coordinates Maxima, Minima, Saddles Lagrange Multipliers Solid Angle Rainbow 9 Vector Calculus 1 213 Fluid Flow Vector Derivatives Computing the divergence
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Wave Equation in Cylindrical Coordinates, Equation in cylindrical coordinates, CHAPTER 4. COORDINATE GEOMETRY IN THREE, 1 CHAPTER 4. COORDINATE GEOMETRY IN THREE DIMENSIONS, LECTURE 12: Reflector Antennas, Electron and Ion Guns, Beams, and Collectors, Vector Algebra and Calculus, Vector Algebra and Calculus 1