Ce diaporama a bien été signalé.
Nous utilisons votre profil LinkedIn et vos données d’activité pour vous proposer des publicités personnalisées et pertinentes. Vous pouvez changer vos préférences de publicités à tout moment.

Math01_ogashin

629 vues

Publié le

第1回数式ニヤニヤ勉強会発表資料
2010.05.25

Publié dans : Technologie, Formation
  • Soyez le premier à commenter

Math01_ogashin

  1. 1. n P(x) = % $ j "k (x # x j ) f (x k ) k =0$ j "k (x k # x j ) !
  2. 2. y = ax + b
  3. 3. 2 y = ax + bx + c y = ax + b
  4. 4. 5 y = ax + b 2 ! y = ax + bx + c y = ax 4 + bx 3 + cx 3 + dx1 + e !
  5. 5. a b c d e y = ax 4 + bx 3 + cx 3 + dx1 + e f (x1 ) = ax14 + bx13 + cx12 + dx1 + e ! f (x 2 ) = ax 2 4 + bx 2 3 + cx 2 2 + dx 2 + e 4 3 2 f (x 3 ) = ax 3 + bx 3 + cx 3 + dx 3 + e 4 3 2 f (x 4 ) = ax 4 + bx 4 + cx 4 + dx 4 + e f (x 5 ) = ax 5 4 + bx 5 3 + cx 5 2 + dx 5 + e
  6. 6. f (x) = a1 + a2 (x " x1 ) + a3 (x " x1 )(x " x 2 ) +L +an +1 (x " x1 )(x " x 2 )(L)(x " x n ) a1 n+1
  7. 7. f (x) = a1 +a2 (x " x1 ) +a3 (x " x1 )(x " x 2 ) ! +a4 (x " x1 )(x " x 2 )(x " x 3 ) +a5 (x " x1 )(x " x 2 )(x " x 3 )(x " x 4 ) !
  8. 8. x=x f (x) = a1 +a2 (x " x1 ) 0 3 f (xx1 ) = a1 +a (x " x )(x " ) 1 2 0 +a4 (x " x1 )(x " x 2 )(x " x 3 ) 0 +a5 (x " x1 )(x " x 2 )(x " x 3 )(x " x 4 ) 0 ! !
  9. 9. x=x2 f (x) = a1 +a2 (x " x1 ) f (x ) = a + a2 (x 2 " x1 ) 2 1 +a3 (x " x1 )(x " x 2 ) 0 a1 a2 +a4 (x " x1 )(x " x 2 )(x " x 3 ) 0 +a5 (x " x1 )(x " x 2 )(x " x 3 )(x " x 4 ) 0 !
  10. 10. x=x3 f (x) = a1 +a2 (x " x1 ) f (x ) = a + a (x " x ) + a3 (x 3 " x1)(x 3 " x 2 ) 3+a (x " x 2)(x3" x 1 1 3 1 2) a1 a2 a3 +a4 (x " x1 )(x " x 2 )(x " x 3 ) 0 +a5 (x " x1 )(x " x 2 )(x " x 3 )(x " x 4 ) 0 !
  11. 11. a1 n+1 f (x) = a1 + a2 (x " x1 ) + a3 (x " x1 )(x " x 2 ) +L +an +1 (x " x1 )(x " x 2 )(L)(x " x n ) f (x1 ) = a1 ! f (x 2 ) = a1 + a2 (x 2 " x1 ) f (x 3 ) = a1 + a2 (x 3 " x1 ) + a3 (x 3 " x1 )(x 3 " x 2 ) M f (x n +1 ) = a1 + a2 (x n +1 " x1 ) + a3 (x n +1 " x1 )(x n +1 " x 2 ) +L +an +1 (x n +1 " x1 )(x n +1 " x 2 )(L)(x n +1 " x n )
  12. 12. n f (x) = % $ j "k (x # x j ) f (x k ) k =0 $ j "k (x k # x j ) !
  13. 13. n f (x) = % $ j "k (x # x j ) f (x k ) k =0$ j "k (x k # x j ) (x " x1 )(x " x 2 )(x " x 3 )L(x " x n ) = f (x 0 ) (x 0 " x1 )(x 0 " x 2 )(x 0 " x 3 )L(x 0 " x n ) (x " x 0 )(x " x 2 )(x " x 3 )L(x " x n ) + f (x1 ) (x1 " x 0 )(x1 " x 2 )(x1 " x 3 )L(x1 " x n ) +LLLLLLLLLLLLLLLLLL (x " x 0 )(x " x1 )(x " x 2 )L(x " x n "1 ) + f (x n ) (x n " x 0 )(x n " x1 )(x n " x 2 )L(x n " x n "1 )
  14. 14. (x " x1 )(x " x 2 )(x " x 3 )(x " x 4 )(x " x 5 ) f (x) = f (x 0 ) (x 0 " x1 )(x 0 " x 2 )(x 0 " x 3 )(x 0 " x 4 )(x 0 " x 5 ) (x " x 0 )(x " x 2 )(x " x 3 )(x " x 4 )(x " x 5 ) + f (x1 ) (x1 " x 0 )(x1 " x 2 )(x1 " x 3 )(x1 " x 4 )(x1 " x 5 ) (x " x 0 )(x " x1 )(x " x 3 )(x " x 4 )(x " x 5 ) f (x 2 ) + x (x 2 " x 0 )(x 2 " x1 )(x 2 " x 3 )(x 2 " x 4 )(x 2 " x 5 ) (x " x 0 )(x " x1 )(x " x 2 )(x " x 4 )(x " x 5 ) + f (x 3 ) (x 3 " x 0 )(x 3 " x1 )(x 3 " x 2 )(x 3 " x 4 )(x 3 " x 5 ) (x " x 0 )(x " x1 )(x " x 2 )(x " x 3 )(x " x 5 ) + f (x 4 ) (x 4 " x 0 )(x 4 " x1 )(x 4 " x 2 )(x 4 " x 3 )(x 4 " x 5 ) (x " x 0 )(x " x1 )(x " x 2 )(x " x 3 )(x " x 4 ) + f (x 5 ) (x 5 " x 0 )(x 5 " x1 )(x 5 " x 2 )(x 5 " x 3 )(x 5 " x 4 )
  15. 15. (x " x1 )(x " x 2 )(x " x 3 )(x " x 4 )(x " x 5 ) f (x) = f (x 0 ) f(x0) (x 0 " x1 )(x 0 " x 2 )(x 0 " x 3 )(x 0 " x 4 )(x 0 " x 5 ) (x " x 0 )(x " x 2 )(x " x 3 )(x " x 4 )(x " x 5 ) + f (x1 ) (x1 " x 0 )(x1 " x 2 )(x1 " x 3 )(x1 " x 4 )(x1 " x 5 ) + f (x) = f (x ) (x " x 0 )(x " x1 )(x " x 3 )(x " x 4 )(x " x 5 ) 0 (x 2 " x 0 )(x 2 " x1 )(x 2 " x 3 )(x 2 " x 4 )(x 2 " x 5 ) f (x 2 ) (x " x 0 )(x " x1 )(x " x 2 )(x " x 4 )(x " x 5 ) + f (x 3 ) (x 3 " x 0 )(x 3 " x1 )(x 3 " x 2 )(x 3 " x 4 )(x 3 " x 5 ) (x " x 0 )(x " x1 )(x " x 2 )(x " x 3 )(x " x 5 ) + f (x 4 ) (x 4 " x 0 )(x 4 " x1 )(x 4 " x 2 )(x 4 " x 3 )(x 4 " x 5 ) (x " x 0 )(x " x1 )(x " x 2 )(x " x 3 )(x " x 4 ) + f (x 5 ) (x 5 " x 0 )(x 5 " x1 )(x 5 " x 2 )(x 5 " x 3 )(x 5 " x 4 ) !
  16. 16. (x " x1 )(x " x 2 )(x " x 3 )(x " x 4 )(x " x 5 ) f (x) = f (x 0 ) 0 (x 0 " x1 )(x 0 " x 2 )(x 0 " x 3 )(x 0 " x 4 )(x 0 " x 5 ) (x " x 0 )(x " x 2 )(x " x 3 )(x " x 4 )(x " x 5 ) + f (x1 ) f(x1) (x1 " x 0 )(x1 " x 2 )(x1 " x 3 )(x1 " x 4 )(x1 " x 5 ) + f (x) = f (x ) (x " x 0 )(x " x1 )(x " x 3 )(x " x 4 )(x " x 5 ) (x 2 " x 0 )(x 2 " x1 )(x 2 " x 3 )(x 2 " x 4 )(x 2 " x 51) f (x 2 ) (x " x 0 )(x " x1 )(x " x 2 )(x " x 4 )(x " x 5 ) + f (x 3 ) (x 3 " x 0 )(x 3 " x1 )(x 3 " x 2 )(x 3 " x 4 )(x 3 " x 5 ) (x " x 0 )(x " x1 )(x " x 2 )(x " x 3 )(x " x 5 ) + f (x 4 ) (x 4 " x 0 )(x 4 " x1 )(x 4 " x 2 )(x 4 " x 3 )(x 4 " x 5 ) (x " x 0 )(x " x1 )(x " x 2 )(x " x 3 )(x " x 4 ) + f (x 5 ) (x 5 " x 0 )(x 5 " x1 )(x 5 " x 2 )(x 5 " x 3 )(x 5 " x 4 ) !
  17. 17. (x " x1 )(x " x 2 )(x " x 3 )(x " x 4 )(x " x 5 ) f (x) = f (x 0 ) 0 (x 0 " x1 )(x 0 " x 2 )(x 0 " x 3 )(x 0 " x 4 )(x 0 " x 5 ) (x " x 0 )(x " x 2 )(x " x 3 )(x " x 4 )(x " x 5 ) + f (x1 ) 0 (x1 " x 0 )(x1 " x 2 )(x1 " x 3 )(x1 " x 4 )(x1 " x 5 ) + f (x) = f (x ) (x " x 0 )(x " x1 )(x " x 3 )(x " x 4 )(x " x 5 ) (x 2 " x 0 )(x 2 " x1 )(x 2 " x 3 )(x 2 " x 4 )(x 2 " x 52) f (x 2 ) f(x2) (x " x 0 )(x " x1 )(x " x 2 )(x " x 4 )(x " x 5 ) + f (x 3 ) (x 3 " x 0 )(x 3 " x1 )(x 3 " x 2 )(x 3 " x 4 )(x 3 " x 5 ) (x " x 0 )(x " x1 )(x " x 2 )(x " x 3 )(x " x 5 ) + f (x 4 ) (x 4 " x 0 )(x 4 " x1 )(x 4 " x 2 )(x 4 " x 3 )(x 4 " x 5 ) (x " x 0 )(x " x1 )(x " x 2 )(x " x 3 )(x " x 4 ) + f (x 5 ) (x 5 " x 0 )(x 5 " x1 )(x 5 " x 2 )(x 5 " x 3 )(x 5 " x 4 ) !
  18. 18. f (x) = f (x 0 ) f (x) = f (x1 ) f (x) = f (x 2 ) f (x) = f (x 3 ) ! f (x) = f (x 4 ) ! f (x) = f (x 5 ) !
  19. 19. P(x) = a1 + a2 (x " x1 ) + a3 (x " x1 )(x " x 2 ) +L +an +1 (x " x1 )(x " x 2 )(L)(x " x n ) (x " x1 )(x " x 2 )(x " x 3 )L(x " x n ) P(x) = f (x 0 ) (x 0 " x1 )(x 0 " x 2 )(x 0 " x 3 )L(x 0 " x n ) ! (x " x 0 )(x " x 2 )(x " x 3 )L(x " x n ) + f (x1 ) (x1 " x 0 )(x1 " x 2 )(x1 " x 3 )L(x1 " x n ) +LLLLLLLLLLLLLLLLLL (x " x 0 )(x " x1 )(x " x 2 )L(x " x n "1 ) + f (x n ) (x n " x 0 )(x n " x1 )(x n " x 2 )L(x n " x n "1 )
  20. 20. f (x) = ax + b f (x 2 ) " f (x1 ) a " x1 a= x 2 " x1 b = f (x1 ) " a # x1 ! f (x) = ax + f (x1 ) " a # x1 = a(x " x1 ) + f (x1 ) f (x 2 ) " f (x1 ) = (x " x1 ) + f (x1 ) x 2 " x1
  21. 21. f (x 2 ) " f (x1 ) f (x) = (x " x1 ) + f (x1 ) x 2 " x1 x " x1 x " x1 = f (x 2 ) " f (x1 ) + f (x1 ) x 2 " x1 x 2 " x1 x " x1 # x " x1 & = f (x 2 ) + f (x1 )$1 " ' x 2 " x1 % x 2 " x1 ( x " x1 # (x 2 " x1 ) " (x " x1 ) & = f (x 2 ) + f (x1 )$ ' x 2 " x1 % x 2 " x1 ( x2 " x x " x1 = f (x1 ) + f (x 2 ) x 2 " x1 x 2 " x1 !

×