Difference between revisions of "Pages 53-60"
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54.25 '''Poisson Distribution/Equation''' <br /> | 54.25 '''Poisson Distribution/Equation''' <br /> | ||
− | "In probability theory and statistics, the Poisson distribution is a discrete probability distribution that expresses the probability of a number of events occurring in a fixed period of time if these events occur with a known average rate and independently of the time since the last event." | + | "In probability theory and statistics, the Poisson distribution is a discrete probability distribution that expresses the probability of a number of events occurring in a fixed period of time if these events occur with a known average rate and independently of the time since the last event. The Poisson distribution can also be used for the number of events in other specified intervals such as distance, area or volume."<ref>[http://en.wikipedia.org/w/index.php?title=Poisson_distribution&oldid=327409885 Wikipedia, The Free Encyclopedia]. Retrieved 16:45, November 23, 2009</ref> |
− | For | + | For instance, if on average London received 1 rocket strike per square kilometer per day, the Poison equation could be used to predict the probability of a random 1km<sup>2</sup> area of London receiving 0, 1, 10 or any other number of rocket strikes on a given day. Of relevance to the novel, an necessary assumption of the Poison distribution is that events are independent: even if a given square kilometer of London has already received 100 rocket strikes today, it is still just as likely to be hit as any other square kilometer of London. |
− | + | This concept recurs on pp. 55, 56, 85, 140, 171, 270. | |
==Page 55== | ==Page 55== |
Revision as of 07:43, 23 November 2009
This page-by-page annotation is organized by sections, as delineated by the seven squares (sprockets) which separate each section. The page numbers for this page-by-page annotation are for the original Viking edition (760 pages). Editions by other publishers vary in pagination — the newer Penguin editions are 776 pages; the Bantam edition is 886 pages.
Contributors: Please use a 760-page edition (either the original Viking edition with the orange cover or the Penguin USA edition with the blue cover and rocket diagram — there are plenty on Ebay for around $10) or search the Google edition for the correct page number. Readers: To calculate the Bantam edition use this formula: Bantam page # x 1.165. Before p.50 it's about a page earlier; as you get later in the book, add a page.
Finally, profound thanks to Prof. Don Larsson for providing the foundation for this page-by-page annotation.
Page 54
54.25 Poisson Distribution/Equation
"In probability theory and statistics, the Poisson distribution is a discrete probability distribution that expresses the probability of a number of events occurring in a fixed period of time if these events occur with a known average rate and independently of the time since the last event. The Poisson distribution can also be used for the number of events in other specified intervals such as distance, area or volume."^{[1]}
For instance, if on average London received 1 rocket strike per square kilometer per day, the Poison equation could be used to predict the probability of a random 1km^{2} area of London receiving 0, 1, 10 or any other number of rocket strikes on a given day. Of relevance to the novel, an necessary assumption of the Poison distribution is that events are independent: even if a given square kilometer of London has already received 100 rocket strikes today, it is still just as likely to be hit as any other square kilometer of London.
This concept recurs on pp. 55, 56, 85, 140, 171, 270.
Page 55
Whittaker and Watson
Whittaker and Watson is the informal name of a book formally entitled A Course of Modern Analysis.
Read the whole thing if you want!: http://books.google.com/books?id=_hoPAAAAIAAJ
Page 57
...she gives him her Fay Wray look...
Fay Wray played the heroine, Ann Darrow, in the 1933 film King Kong. So the look Jess gives Roger must've been something like this.
Page 59
59.01-02 Frank Bridge Variations
The "Frank Bridge Variations" is a composition ("Variations on a Theme by Frank Bridge," Opus 10, 1937) by Benjamin Britten, named after one of his teachers. It was one of Britten's first works to win international notice.
1 Beyond the Zero |
3-7, 7-16, 17-19, 20-29, 29-37, 37-42, 42-47, 47-53, 53-60, 60-71, 71-72, 72-83, 83-92, 92-113, 114-120, 120-136, 136-144, 145-154, 154-167, 167-174, 174-177 |
---|---|
2 Un Perm' au Casino Herman Goering |
181-189, 189-205, 205-226, 226-236, 236-244, 244-249, 249-269, 269-278 |
3 In the Zone |
279-295, 295-314, 314-329, 329-336, 336-359, 359-371, 371-383, 383-390, 390-392, 392-397, 397-433, 433-447, 448-456, 457-468, 468-472, 473-482, 482-488, 488-491, 492-505, 505-518, 518-525, 525-532, 532-536, 537-548, 549-557, 557-563, 563-566, 567-577, 577-580, 580-591, 591-610, 610-616 |
4 The Counterforce |
617-626, 626-640, 640-655, 656-663, 663-673, 674-700, 700-706, 706-717, 717-724, 724-733, 733-735, 735-760 |
- ↑ Wikipedia, The Free Encyclopedia. Retrieved 16:45, November 23, 2009