Why the largest number imaginable is still a finite number
- Author
- Jean Paul Van Bendegem
- Organization
Citation
Please use this url to cite or link to this publication: http://hdl.handle.net/1854/LU-152588
- MLA
- Van Bendegem, Jean Paul. “Why the Largest Number Imaginable Is Still a Finite Number.” LOGIQUE ET ANALYSE, vol. 42, no. 2002, 2002, pp. 107–26.
- APA
- Van Bendegem, J. P. (2002). Why the largest number imaginable is still a finite number. LOGIQUE ET ANALYSE, 42(2002), 107–126.
- Chicago author-date
- Van Bendegem, Jean Paul. 2002. “Why the Largest Number Imaginable Is Still a Finite Number.” LOGIQUE ET ANALYSE 42 (2002): 107–26.
- Chicago author-date (all authors)
- Van Bendegem, Jean Paul. 2002. “Why the Largest Number Imaginable Is Still a Finite Number.” LOGIQUE ET ANALYSE 42 (2002): 107–126.
- Vancouver
- 1.Van Bendegem JP. Why the largest number imaginable is still a finite number. LOGIQUE ET ANALYSE. 2002;42(2002):107–26.
- IEEE
- [1]J. P. Van Bendegem, “Why the largest number imaginable is still a finite number,” LOGIQUE ET ANALYSE, vol. 42, no. 2002, pp. 107–126, 2002.
@article{152588,
author = {{Van Bendegem, Jean Paul}},
issn = {{0024-5836}},
journal = {{LOGIQUE ET ANALYSE}},
language = {{eng}},
number = {{2002}},
pages = {{107--126}},
title = {{Why the largest number imaginable is still a finite number}},
volume = {{42}},
year = {{2002}},
}