Advanced Mathematics for Science: A Sequel to Mathematics for Science |
Contents
Engineers and Scientists English Universities Press 1961 | 1 |
Oxford 1956 Chapters 17 18 | 103 |
CONVERGENCE FOURIER SERIES ORTHOGONAL | 181 |
Copyright | |
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Common terms and phrases
a₁ algebra arbitrary constants axes b₁ called Chapter Clarendon Press coefficients converges coordinates cosines d2x dx defined denote diagonal differential equation dt d2x dt2 dt dx dx dx dx dy dx/dt dy dx dy dy eigen-values elements ellipse equation dy example formula Fourier series Fourier sine series function f(x given gives graph ground plane Hence Hermite polynomials integral Laplace transforms latent roots latent vectors linearly independent m-equation mathematical maxima and minima method multiplying non-singular notation nx dx odd function ordinary point orthogonal orthogonal matrix particular solution perpendicular polynomial positive number power series problem proof Prove quadratic form reciprocal satisfy scalar sequence Show simultaneous equations single-column matrix singular point solution in series solve square matrix surface Theorem theory values variables W. L. Ferrar write zero π π