Difference between revisions of "Pages 53-60"

(Page 54)
(Page 54)
Line 9: Line 9:
  
 
Poisson distribution. (2008, September 11). In Wikipedia, The Free Encyclopedia. Retrieved 16:45, September 22, 2008, from http://en.wikipedia.org/w/index.php?title=Poisson_distribution&oldid=237707448
 
Poisson distribution. (2008, September 11). In Wikipedia, The Free Encyclopedia. Retrieved 16:45, September 22, 2008, from http://en.wikipedia.org/w/index.php?title=Poisson_distribution&oldid=237707448
 +
 +
==Page 54==
 +
 +
'''Whittaker and Watson''' <br />
 +
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 59==
 
==Page 59==

Revision as of 14:17, 19 May 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."

For the purpose of comprehension, all that needs to be understood of this distribution is that, given a mean success rate, one can use the distribution to predict the probability of a number of successes other than the mean (here the rocket strikes), when success is very unlikely, but inevitable given a large number of events. (This concept recurs on pp. 55, 56, 85, 140, 171, 270.)
To learn more, check out the Wikipedia article quoted above: Poisson Distribution at Wikipedia

Poisson distribution. (2008, September 11). In Wikipedia, The Free Encyclopedia. Retrieved 16:45, September 22, 2008, from http://en.wikipedia.org/w/index.php?title=Poisson_distribution&oldid=237707448

Page 54

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 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

Personal tools