Books on the topic 'Numbers'
Create a spot-on reference in APA, MLA, Chicago, Harvard, and other styles
Consult the top 50 books for your research on the topic 'Numbers.'
Next to every source in the list of references, there is an 'Add to bibliography' button. Press on it, and we will generate automatically the bibliographic reference to the chosen work in the citation style you need: APA, MLA, Harvard, Chicago, Vancouver, etc.
You can also download the full text of the academic publication as pdf and read online its abstract whenever available in the metadata.
Browse books on a wide variety of disciplines and organise your bibliography correctly.
Badiou, Alain. Number and numbers. Cambridge: Polity Press, 2008.
Deza, Elena. Figurate numbers. Singapore: World Scientific, 2012.
Henle, Michael. Which numbers are real? Washington, D.C: Mathematical Association of America, 2012.
Koshy, Thomas. Catalan numbers with applications. New York: Oxford University Press, 2008.
Montgomery, Hugh L. Multiplicative number theory I: Classical theory. Cambridge, UK: Cambridge University Press, 2007.
Schleich, Wolfgang. Prime numbers 101: A primer on number theory. Hoboken, N.J: Wiley, 2008.
Todorcevic, Stevo. Walks on ordinals and their characteristics. Basel: Birkhäuser, 2007.
Sabbagh, Karl. Dr. Riemann's zeros: [the search for the $1 million solution to the greatest problem in mathematics]. London: Atlantic, 2002.
Narkiewicz, Władysław. Rational number theory in the 20th century: From PNT to FLT. London: Springer, 2012.
Sabbagh, Karl. Dr. Riemann's zeros: [the search for the $1 million solution to the greatest problem in mathematics]. London: Atlantic Books, 2003.
Sabbagh, Karl. Dr. Riemann's zeroes. London: Atlantic, 2002.
Sterling, Kristin. Ordinal numbers. Minneapolis, MN: LernerClassroom, 2008.
Parshin, A. N. Number Theory IV: Transcendental Numbers. Berlin, Heidelberg: Springer Berlin Heidelberg, 1998.
Dave, Hewitt, Wigley Alan, and Association of Teachers of Mathematics., eds. Developing number: Complements, numbers, tables. Derby: Association of Teachers of Mathematics, 2000.
Law, Felicia. Numbers. Chicago, Illinois: Norwood House Press, 2016.
Glynne-Jones, Tim. The book of numbers. Edison, NJ: Chartwell Books, 2008.
Aboff, Marcie. If you were an odd number. Mankato, MN: Picture Window Books, 2009.
Montgomery, Hugh L. Multiplicative number theory I: Classical theory. Cambridge, UK: Cambridge University Press, 2006.
H, Salzmann, ed. The classical fields: Structural features of the real and rational numbers. Cambridge: Cambridge University Press, 2007.
Ming, Nai-Ta. New theory of real numbers especially regarding "infinite" and "zero". Hamburg: Verlag Dr. Kovač, 1996.
Delessert, Étienne. Golosi di numberi =: Hungry for numbers. Milino: Mottajunior, 2006.
Gonshor, Harry. An introduction to the theory of surreal numbers. Cambridge: Cambridge University Press, 1986.
M, Apostol Tom. Introduction to analytic number theory. 4th ed. New York: Springer, 1995.
M, Apostol Tom. Introduction to analytic number theory. 5th ed. New York: Springer, 1998.
M, Apostol Tom. Introduction to analytic number theory. New York: Springer-Verlag, 1986.
Sabbagh, Karl. The Riemann hypothesis: The greatest unsolved problem in mathematics. New York: Farrar, Straus, and Giroux, 2002.
Helmut, Koch. Number theory: Algebraic numbers and functions. Providence, RI: American Mathematical Society, 2000.
Domeniconi, David. Golden numbers: A California number book. Chelsea, MI: Sleeping Bear Press, 2008.
Shoulders, Michael. Natural numbers: An Arkansas number book. Chelsea, MI: Sleeping Bear Press, 2008.
Shepherd, Rajean Luebs. Husker numbers: A Nebraska number book. Chelsea, MI: Sleeping Bear Press, 2007.
Mcgee, J. Vernon. Numbers: The law numbers. [Place of publication not identified]: Thomas Nelson, 1995.
Little, Jean. Help me learn numbers 0-20. New York: Holiday House, 2011.
Ibstedt, Henry. Mainly natural numbers: A few elementary studies on Smarandache sequences and other number problems. Martinsville, Ind: Bookman Pub., 2003.
B, Borwein Peter, ed. The Riemann hypothesis: A resource for the afficionado and virtuoso alike. New York: Springer, 2008.
Harman, G. Prime-detecting sieves. Princeton: Princeton University Press, 2007.
Ogilvy, C. Stanley. Excursions in number theory. New York: Dover Publications, 1988.
Buchan, Jamie. As easy as Pi: Stuff about numbers that isn't (just) maths. London: Michael O'Mara Books, 2009.
gari, antar. Number Tracing Book: Number Tracing Practise ,numbers 1-50 Workbook,number Tracing Book for Preschhoolers ,numbers Games, Write Numbers, Numbers for Kids ,numbers for Kindergarten,numbers. Independently Published, 2020.
Badiou, Alain. Number and Numbers. Polity Press, 2018.
Poitier, Anton. Numbers. B.E.S. Publishing, 2015.
Brownawell, W. D., Andrei B. Shidlovskii, and Neal Koblitz. Transcendental Numbers. de Gruyter GmbH, Walter, 2011.
The Numbers Behind NUMB3RS. New York: Penguin Group USA, Inc., 2008.
Best, A. Number Theory: Prime Numbers. Open University Worldwide, 2008.
Ellis, Chris. Numbers (The Number Crew). 4Learning, 2000.
Pomerance, Carl, and Richard Crandall. Prime Numbers: A Computational Perspective. Springer, 2005.
Zhang, Wen-Bin, and Harold G. Diamond. Beurling Generalized Numbers. American Mathematical Society, 2016.
Koshy, Thomas. Catalan Numbers with Applications. Oxford University Press, 2009.
Koshy, Thomas. Catalan Numbers with Applications. Oxford University Press, Incorporated, 2009.
Bergum, G. E. Applications of Fibonacci Numbers. Springer Verlag, 2013.
Colson, Rob. Your Number's Up: Digits, Number Lines, Negative and Positive Numbers. Hachette Children's Group, 2018.