Difference between revisions of "Chapter 73: 706-713"

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'''Bourbon Court'''<br>
 
'''Bourbon Court'''<br>
 
The House of Bourbon is an important European royal house, a branch of the Capetian dynasty.  Bourbon kings first ruled Navarre and France in the 16th century.  By the 18th century, members of the Bourbon dynasty also held thrones in Spain, Naples & Sicily, and Parma.  Spain and Luxembourg currently have Bourbon monarchs.  From [http://en.wikipedia.org/wiki/House_of_bourbon WIKI] - Also, see page [http://masondixon.pynchonwiki.com/wiki/index.php?title=Chapter_37:_371-381#Page_377 377].
 
The House of Bourbon is an important European royal house, a branch of the Capetian dynasty.  Bourbon kings first ruled Navarre and France in the 16th century.  By the 18th century, members of the Bourbon dynasty also held thrones in Spain, Naples & Sicily, and Parma.  Spain and Luxembourg currently have Bourbon monarchs.  From [http://en.wikipedia.org/wiki/House_of_bourbon WIKI] - Also, see page [http://masondixon.pynchonwiki.com/wiki/index.php?title=Chapter_37:_371-381#Page_377 377].
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'''''Haute Cuisine'''''<br>
 +
See page [http://masondixon.pynchonwiki.com/wiki/index.php?title=Chapter_38:_382-390#Page_385 385].
  
 
'''When they happen across an Adventurer from Mexico, and the ancient City he has discover'd beneath the Earth..."'''<br>
 
'''When they happen across an Adventurer from Mexico, and the ancient City he has discover'd beneath the Earth..."'''<br>

Revision as of 10:07, 9 November 2009

Page 706

Sir William Johnson
See page 532.

Zeno's Paradox
Zeno of Elea (ca. 490 BC? – ca. 430 BC?) was a pre-Socratic Greek philosopher of southern Italy and a member of the Eleatic School founded by Parmenides. Aristotle called him the inventor of the dialectic. He is best known for his paradoxes, which Betrand Russell has described as "immeasurably subtle and profound"... This seems to be a reference to the paradox of Achilles and the Tortoise: Achilles is in a footrace with the tortoise. Achilles allows the tortoise a head start of 100 metres. If we suppose that each racer starts running at some constant speed (one very fast and one very slow), then after some finite time, Achilles will have run 100 metres, bringing him to the tortoise's starting point. During this time, the tortoise has run a much shorter distance, say, 10 metres. It will then take Achilles some further time to run that distance, by which time the tortoise will have advanced farther; and then more time still to reach this third point, while the tortoise moves ahead. Thus, whenever Achilles reaches somewhere the tortoise has been, he still has farther to go. Therefore, because there are an infinite number of points Achilles must reach where the tortoise has already been, he can never overtake the tortoise. Of course, simple experience tells us that Achilles will be able to overtake the tortoise, which is why this is a paradox. From WIKI

Page 707

inimical
1. Harmful in effect
2. Unfriendly; hostile
From WIKI

Bourbon Court
The House of Bourbon is an important European royal house, a branch of the Capetian dynasty. Bourbon kings first ruled Navarre and France in the 16th century. By the 18th century, members of the Bourbon dynasty also held thrones in Spain, Naples & Sicily, and Parma. Spain and Luxembourg currently have Bourbon monarchs. From WIKI - Also, see page 377.

Haute Cuisine
See page 385.

When they happen across an Adventurer from Mexico, and the ancient City he has discover'd beneath the Earth..."
Yet another reference to Hollow Earth theory. See p.548.

Annotations Index

One:
Latitudes and Departures

1: 5-11, 2: 12-13, 3: 14-29, 4: 30-41, 5: 42-46, 6: 47-57, 7: 58-76, 8: 77-86, 9: 87-93, 10: 94-104, 11: 105-115, 12: 116-124, 13: 125-145, 14: 146-157, 15: 158-166, 16: 167-174, 17: 175-182, 18: 183-189, 19: 190-198, 20: 199-206, 21: 207-214, 22: 215-227, 23: 228-237, 24: 238-245, 25: 245-253


Two:
America

26: 257-265, 27: 266-274, 28: 275-288, 29: 289-295, 30: 296-301, 31: 302-314, 32: 315-326, 33: 327-340, 34: 341-348, 35: 349-361, 36: 362-370, 37: 371-381, 38: 382-390, 39: 391-398, 40: 399-409, 41: 410-421, 42: 422-435, 43: 436-439, 44: 440-447, 45: 448-451, 46: 452-459, 47: 460-465, 48: 466-475, 49: 476-483, 50: 484-490, 51: 491-498, 52: 499-510, 53: 511-524, 54: 525-541, 55: 542-553, 56: 554-561, 57: 562-569, 58: 570-574, 59: 575-584, 60: 585-596, 61: 597-607, 62: 608-617, 63: 618-622, 64: 623-628, 65: 629-632, 66: 633-645, 67: 646-657, 68: 658-664, 69: 665-677, 70: 678-686, 71: 687-693, 72: 694-705, 73: 706-713

Three:
Last Transit

74: 717-732, 75: 733-743, 76: 744-748, 77: 749-757, 78: 758-773

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