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A Proof of Fouriers theorem
Properties of Fourier series
Applications in the solution of partial differential
1 other sections not shown
best mean square boundary conditions change of variable coefficients of f(x converge deduce denote elastic beam Example EXERCISES ON CHAPTER Find the Fourier finite number follows Fourier coefficients Fourier expansion Fourier polynomial Fourier series Fourier's theorem func function defined function f(x HALF-RANGE COSINE SERIES Iff(x ifi(u integrate with respect interval ISOPERIMETRIC PROBLEM J. A. Green Kronecker delta Laplace's equation last section Ledermann left-hand derivative lemma maxima and minima mean square approximation multiply both sides niru nx dx nx-\-bn sin nx nx+Bn sin nx odd function ORTHONORMAL SETS P. J. Hilton Parseval's Theorem partial differential equation periodic function piecewise-continuous point x=a proof of Fourier's properties of Fourier range remains finite right-hand derivative ROOT-MEAN-SQUARE VALUE satisfies Dirichlet's conditions satisfies the conditions set of functions sides of equation Similarly sinh Sn(x string tion TIttX trigonometrical polynomial trigonometrical series VIBRATIONS OF BEAMS WHOLE-RANGE SERIES