REFERENCES
- Angot, A. 1952. Compléments de Mathématiques à l’Usage des Ingénieurs de l’Électrotechnique et des Télécommunications, Préface de Louis de Broglie. 2nd edition. Paris, Éditions de la Revue d’Optique.
- Baez, J. C. 2018. Patterns that eventually fail. Azimuth Project . https://johncarlosbaez.wordpress.com/2018/09/20/patterns-that-eventually-fail/
- Bierens De Haan, D. 1867. Nouvelles Tables d’Intégrales Définies. Leiden, P. Engels. (Tables 151 no. 1; 157, no. 1; 157 no. 20, pp. 210, 217, 219)
- Borwein, D. & Borwein, J. M. 2001. Some remarkable properties of sinc and related integrals. The Ramanujan Journal 5: 73–89. doi: 10.1023/A:1011497229317
- Borwein, D., Borwein, J. M. & Straub, A. 2012. A sinc that sank. The American Mathematical Monthly 119 (7): 535–549. doi: 10.4169/amer.math.monthly.119.07.535
- Bromwich, T. J. I’A. 1926. An Introduction to the Theory of Infinite Series. 2nd edition, revised by T. M. MacRobert & H. T. Croft. London, Macmillan.
- Chandrasekhar, S. 1943. Stochastic problems in physics and astronomy. Reviews of Modern Physics 15(1): 1–89. doi: 10.1103/RevModPhys.15.1
- Copson, E. T. 1962. An Introduction to the Theory of Functions of a Complex Variable. Oxford, Clarendon Press.
- Durège, H. & Maurer, L. 1906. Elemente der Theorie der Funktionen Einer Komplexen Veränderlichen Grösse. 5th edition. Leipzig, B. G. Teubner Verlag.
- Erdélyi, A., Magnus, W., Oberhettinger, F. & Tricomi, F. G. 1954. Tables of Integral Transforms, Vol. I. New York, McGraw-Hill. (p. 79, no. 12)
- Gradshteyn, I. S. & Ryzhik, I. M. 1965. Table of Integrals, Series and Products. 4th edition, prepared by Yu. V. Geronimus & M. Yu. Tseytlin, translated by A. Jeffrey. New York, Academic Press. (pp. 405, 414, 422).
- Hahn, B. 1994. C++: A Practical Introduction. Oxford, Blackwell.
- Hey, J. D. 2013. On the representation of tan(nθ) by powers of tanθ. Transactions of the Royal Society of South Africa 68(2): 141–142. doi: 10.1080/0035919X.2013.807887
- Hill, H. M. 2019. Random walkers illuminate a math problem: a family of tricky integrals can now be solved without explicit calculation. Physics Today 72 (9): 18–19. doi: 10.1063/PT.3.4287
- Irving, J. & Mullineux, N. 1959. Mathematics in Physics and Engineering. New York, Academic Press.
- Loney, S. L. 1900. Plane Trigonometry. Cambridge, Cambridge University Press.
- Majumdar, S. N. & Trizac, E. 2019. When random walkers help solving intriguing integrals. Physical Review Letters 123: 020201 (5 pp.) doi: 10.1103/PhysRevLett.123.020201
- Pascal, B. 1665. Traite du Triangle Arithmétique, avec Quelques Autres Petits Traitez sur la Mesme Matière. Par Monsieur Pascal. Paris, Guillaume Desprez.
- Press, W. H., Flannery, B. P., Teukolsky, S. A. & Vetterling, W. T. 1986. Numerical Recipes: The Art of Scientific Computing. Cambridge, Cambridge University Press.
- Schmid, H. 2014. Two curious integrals and a proof. Elemente der Mathematik 69: 11–17. doi: 10.4171/EM/239
- Sto˝rmer, C. 1895. Sur une généralisation de la formule ϕ2=sinϕ1−sin2ϕ2+sin3ϕ3−⋅⋅⋅. Acta Mathematica 19: 341–350. doi: 10.1007/BF02402880
- Whittaker, E. T. & Watson G. N. 1927. A Course of Modern Analysis, Ch. VI. 4th edition. Cambridge, Cambridge University Press.