- Paperback: 208 pages
- Publisher: McGraw-Hill Education (1 December 1974)
- Language: English
- ISBN-10: 0070602190
- ISBN-13: 978-0070602199
- Product Dimensions: 21.3 x 1.3 x 27.7 cm
- Average Customer Review: 1 customer review
- Amazon Bestsellers Rank: #85,653 in Books (See Top 100 in Books)
Other Sellers on Amazon
+ FREE Delivery
Schaum's Outline of Fourier Analysis with Applications to Boundary Value Problems (Schaum's Outline Series) Paperback – 1 Dec 1974
Save Extra with 3 offers
- Cashback (2): Get 10% cashback up to Rs. 100 using Visa Signature or Visa Infinite cards. Shop during the Visa Shopping Days starting 20th to end of every month. Applicable on shopping, recharges and bill payments. Cashback within 3 days from shipment. Here's how
- Get 25% back up to Rs.50 using Amazon Pay UPI. For Android App customers only. Valid once during the offer period. Cashback within 10 days. Set up Amazon Pay UPI Here's how
- No Cost EMI: No Cost EMI available on Amazon Pay ICICI credit cards on orders above Rs. 3000 Here's how
- Bank Offer: 5% Instant Discount on ICICI bank Credit and Debit EMI transactions Here's how
Frequently bought together
Customers who bought this item also bought
From the Back Cover
About the Author
The Late MURRAY R. SPIEGEl received the M.S degree in Physics and the Ph.D. in Mathematics from Cornell University. He had positions at Harvard University, Columbia University, Oak Ridge and Rensselaer Polytechnic Insitute, and served as a mathematical consultant at several large Companies. His last Position was professor and Chairman of mathematics at the Rensselaer Polytechnic Institute Hartford Graduate Center. He was interested in most branches of mathematics at the Rensselaer polytechnic Institute, Hartford Graduate Center. He was interested in most branches of mathematics, especially those which involve applications to physics and engineering problems. He was the author of numerous journal articles and 14 books on various topics in mathematics.
Enter your mobile number or email address below and we'll send you a link to download the free Kindle App. Then you can start reading Kindle books on your smartphone, tablet, or computer - no Kindle device required.
To get the free app, enter mobile phone number.
Customers who viewed this item also viewed
Most helpful customer reviews on Amazon.com
Murray Spiegel was and is highly regarded as an author of "teach yourself" mathematics texts. If you are struggling with applied mathematics at the undergraduate level I'd highly encourage taking a look at his other publications:
Schaum Publishing Co:
Theory and Problems of College Algebra (1956)
Theory and Problems of Vector Analysis and An Introduction to Tensor Analysis(1959)
Theory and Problems of Statistics (1961)
Theory and Problems of Advanced Calculus (1963)
Theory and Problems of Complex Variables (1964)
Theory and Problems of Laplace Transforms (1965)
Theory and Problems of Theoretical Mechanics (1967)
Theory and Problems of Mathematical Handbook of Formulas and Tables (1968)
Theory and Problems of Real Variables (1969)
Theory and Problems of Advanced Mathematics for Engineers and Scientists (1971)
Theory and Problems of Finite Differences and Difference Equations (1971)
Theory and Problems of Fourier Analysis with Applications to Boundary-Value Problems (1974)
Theory and Problems of Probability and Statistics (1975)
Nearly all of the above were reprinted at later dates (and a few 2nd and 3rd editions) but excepting Mathematical Handbook of Formulas and Tables which had a few mistakes in the first edition and the obligatory tabulations I'd recommend trying to find the earliest avaliable printing as the quality is typically higher. My particular favorite is Complex Variables.
Applied Differential Equations (1963,1967,1980)
Not much time is spent on cylindrical and spherical coordinate systems; doing so would undermine the effectiveness of using Hilbert space proofs of existence and piecewise continuity of solvable system's solution functions! But given that one can define spherical space theories a la Hilbert spaces mutatis mutandis which have different sets of forbidden pathological functions to the ones forbidden in Hilbert space theory, and therefore different general convergence boundary paradoxes, it behoves one to admit that these topics may be too advanced for physics and engineering students who after all are merely interested in practical matters. Projective geometry differential geometry the calculus of variations and Riemannian manifold theory all offer other approaches that suit a few problems for which one must find another textbook ...
Hilbert spaces overly depend on every function has a rule and y = f(x) two dimensional thinking. But this limitation also is the source of powerful results that are so effective in the physical sciences that many base their faith in the meaningfulness and validity of these applied mathematical results ontologically and scientifically.
Surprisingly it does not cover the fast Fourier transform, now used all over computer science ...
A classic. Recommended.