Square root of 5 (English Wikipedia)

Analysis of information sources in references of the Wikipedia article "Square root of 5" in English language version.

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4ams.org

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mathscinet.ams.org

Ivrissimtzis, Ioannis P.; Dodgson, Neil A.; Sabin, Malcolm (2005), " ${\sqrt {5}}$ -subdivision", in Dodgson, Neil A.; Floater, Michael S.; Sabin, Malcolm A. (eds.), Advances in multiresolution for geometric modelling: Papers from the workshop (MINGLE 2003) held in Cambridge, September 9–11, 2003, Mathematics and Visualization, Berlin: Springer, pp. 285–299, doi:10.1007/3-540-26808-1_16, ISBN 3-540-21462-3, MR 2112357
LeVeque, William Judson (1956), Topics in number theory, Addison-Wesley Publishing Co., Inc., Reading, Mass., MR 0080682
Chapman, Scott T.; Gotti, Felix; Gotti, Marly (2019), "How do elements really factor in $\mathbb {Z} [{\sqrt {-5}}]$ ?", in Badawi, Ayman; Coykendall, Jim (eds.), Advances in Commutative Algebra: Dedicated to David F. Anderson, Trends in Mathematics, Singapore: Birkhäuser/Springer, pp. 171–195, arXiv:1711.10842, doi:10.1007/978-981-13-7028-1_9, ISBN 978-981-13-7027-4, MR 3991169, S2CID 119142526, Most undergraduate level abstract algebra texts use $\mathbb {Z} [{\sqrt {-5}}]$ as an example of an integral domain which is not a unique factorization domain
Ramanathan, K. G. (1984), "On the Rogers-Ramanujan continued fraction", Proceedings of the Indian Academy of Sciences, Section A, 93 (2): 67–77, doi:10.1007/BF02840651, ISSN 0253-4142, MR 0813071, S2CID 121808904

arxiv.org

Chapman, Scott T.; Gotti, Felix; Gotti, Marly (2019), "How do elements really factor in $\mathbb {Z} [{\sqrt {-5}}]$ ?", in Badawi, Ayman; Coykendall, Jim (eds.), Advances in Commutative Algebra: Dedicated to David F. Anderson, Trends in Mathematics, Singapore: Birkhäuser/Springer, pp. 171–195, arXiv:1711.10842, doi:10.1007/978-981-13-7028-1_9, ISBN 978-981-13-7027-4, MR 3991169, S2CID 119142526, Most undergraduate level abstract algebra texts use $\mathbb {Z} [{\sqrt {-5}}]$ as an example of an integral domain which is not a unique factorization domain

books.google.com

Sutton, David (2002). Platonic & Archimedean Solids. Walker & Company. p. 55. ISBN 0802713866.
Kimberly Elam (2001), Geometry of Design: Studies in Proportion and Composition, New York: Princeton Architectural Press, ISBN 1-56898-249-6
Jay Hambidge (1967), The Elements of Dynamic Symmetry, Courier Dover Publications, ISBN 0-486-21776-0

doi.org

Ivrissimtzis, Ioannis P.; Dodgson, Neil A.; Sabin, Malcolm (2005), " ${\sqrt {5}}$ -subdivision", in Dodgson, Neil A.; Floater, Michael S.; Sabin, Malcolm A. (eds.), Advances in multiresolution for geometric modelling: Papers from the workshop (MINGLE 2003) held in Cambridge, September 9–11, 2003, Mathematics and Visualization, Berlin: Springer, pp. 285–299, doi:10.1007/3-540-26808-1_16, ISBN 3-540-21462-3, MR 2112357
Chapman, Scott T.; Gotti, Felix; Gotti, Marly (2019), "How do elements really factor in $\mathbb {Z} [{\sqrt {-5}}]$ ?", in Badawi, Ayman; Coykendall, Jim (eds.), Advances in Commutative Algebra: Dedicated to David F. Anderson, Trends in Mathematics, Singapore: Birkhäuser/Springer, pp. 171–195, arXiv:1711.10842, doi:10.1007/978-981-13-7028-1_9, ISBN 978-981-13-7027-4, MR 3991169, S2CID 119142526, Most undergraduate level abstract algebra texts use $\mathbb {Z} [{\sqrt {-5}}]$ as an example of an integral domain which is not a unique factorization domain
Ramanathan, K. G. (1984), "On the Rogers-Ramanujan continued fraction", Proceedings of the Indian Academy of Sciences, Section A, 93 (2): 67–77, doi:10.1007/BF02840651, ISSN 0253-4142, MR 0813071, S2CID 121808904

jdawiseman.com

Julian D. A. Wiseman, "Sin and cos in surds"

numberworld.org

Yee, Alexander. "Records Set by y-cruncher".

semanticscholar.org

api.semanticscholar.org

Chapman, Scott T.; Gotti, Felix; Gotti, Marly (2019), "How do elements really factor in $\mathbb {Z} [{\sqrt {-5}}]$ ?", in Badawi, Ayman; Coykendall, Jim (eds.), Advances in Commutative Algebra: Dedicated to David F. Anderson, Trends in Mathematics, Singapore: Birkhäuser/Springer, pp. 171–195, arXiv:1711.10842, doi:10.1007/978-981-13-7028-1_9, ISBN 978-981-13-7027-4, MR 3991169, S2CID 119142526, Most undergraduate level abstract algebra texts use $\mathbb {Z} [{\sqrt {-5}}]$ as an example of an integral domain which is not a unique factorization domain
Ramanathan, K. G. (1984), "On the Rogers-Ramanujan continued fraction", Proceedings of the Indian Academy of Sciences, Section A, 93 (2): 67–77, doi:10.1007/BF02840651, ISSN 0253-4142, MR 0813071, S2CID 121808904

uconn.edu

kconrad.math.uconn.edu

Conrad, Keith. "Pell's Equation II" (PDF). uconn.edu. Retrieved 17 March 2022.

wolfram.com

mathworld.wolfram.com

Eric W. Weisstein, Ramanujan Continued Fractions at MathWorld

worldcat.org

Ramanathan, K. G. (1984), "On the Rogers-Ramanujan continued fraction", Proceedings of the Indian Academy of Sciences, Section A, 93 (2): 67–77, doi:10.1007/BF02840651, ISSN 0253-4142, MR 0813071, S2CID 121808904