| Книга | Страницы для поиска |
| Ito K. — Encyclopedic Dictionary of Mathematics. Vol. 2 | 93.H |
| Brieskorn E., Knorrer H. — Plane Algebraic Curves | I 29 |
| Kline M. — Mathematical Thought from Ancient to Modern Times, Vol. 1 | See lsochrone |
| Greiner W. — Classical mechanics. Point particles and relativity | 237 |
| Planck M. — General mechanics, being volume I of Introduction to theoretical physics | 114 |
| Kline M. — Mathematical Thought from Ancient to Modern Times, Vol. 3 | see Isochrone |
| Ito K. — Encyclopedic Dictionary of Mathematics | 93.H |
| National Council of Teachers of Mathematics — Historical Topics for the Mathematics Classroom Thirty-First Yearbook | 228 |
| Sokolnikoff I.S. — Mathematics of Physics and Modern Engineering | 767 |
| Kline M. — Mathematical Thought from Ancient to Modern Times, Vol. 2 | see Isochrone |
| Tricomi F.G. — Integral equations | 39 |
| Betten J. — Creep Mechanics | 309 |
| Oprea J. — Differential Geometry and Its Applications | 9, 61 |
| Hellman H. — Great Feuds in Mathematics: Ten of the Liveliest Disputes Ever | 75, 83—84 |
| Bell E.T. — The Development of Mathematics | 166, 402, 524—525 |
| Korner T.W. — Exercises in Fourier Analysis | 281—283 |
| Churchill R.V. — Operational mathematics | 100—102 |
| Flügge S. (ed.) — Encyclopedia of Physics (Volume 3/1 Principles of Classical Mechanics and Field Theory) | 48 |
| Lee A. — Mathematics Applied to Continuum Mechanics | 475 |
| Yates R.C. — Curves and Their Properties | 67, 85 |
| Stillwell J. — Mathematics and its history | 173 |
| Nahin P.J. — When Least Is Best: How Mathematicians Discovered Many Clever Ways to Make Things as Small (or as Large) as Possible | 220, 223—226, see also "Cycloid" |
| Oldham K., Spanier J. — The fractional Calculus: Theory and applications of differentiation and integration to arbitrary order | 2, 4, 5, 183 |
| Moiseiwitsch B.L. — Integral Equations | 2, 37 |
| Kline M. — Mathematical thought from ancient to modern times | see "Isochrone" |
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