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# L oy t o g s 9 1 l o o o o o o v l o

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Unformatted text preview: v  + where  e j | |  v  x Pj Natural Cubic Splines:  l = ( o o o o l  )3 1. l oy   t"#" o  g    ¢#"# s    9""# 1 l o o  o   o   o    o v l o g o  3 [ 1 g g x g 1] 1 l   9"#" o x for = 1 2 g o   1 l o 9   t""# o o    l ), for = 1 2 +1 ), +1 x o o  + [ o  (2 3 3 o  o x    t"#" x l l o o  g j o l +1 1 (see below), ) + l o o 9 ( 1) o   g     3 + l 1 = +1 + 2( o  ( 1 l o = 1 1 o  o y o " 5) set +1 )2 +  for = 2 3 4) set ( l for +1 and = 1 2 1) set = ( ), for = 1 2 2) set = +1 , for = 1 2 3) using 1 = = 0, solve )+ o ( )= Matrix Formulation ( = 5 example); 3 3) g 4 l ( 2)  g 3 ( g 3 1) 2 g  l g 4) 2 (  g l g l g g 5 l ( 3)  g 4 4 1 3 g 3 ( 3 l   3 2) 3 g        4 = 3 (     4)    + 3   3   2( 3     3 3)...
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## This note was uploaded on 01/16/2014 for the course EGM 3052 taught by Professor Fenton during the Fall '09 term at Dalhousie.

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