Back to category: Technology Limited version - please login or register to view the entire paper. Taylor Series 3. Taylor Series Exercise 1 As N increases, the number of oscillations in the Taylor series increases. Exercise 2 Just to the right of x=2, the graph for Tn(x) drops down abruptly if N is an even integer and goes up when N is an odd integer. Instead of increasing the number of oscillations, as N increases the Taylor series at x=2 changes from going up to going down. Exercise 4 taylor(log(v), v, 5, 1) ans = v-1-1/2*(v-1)^2+1/3*(v-1)^3-1/4*(v-1)^4 >> pretty(ans) 2 3 2 4 pi k T v pi h v pi h v 8 --------- - 4 ------- + 2/3 -------- ... Posted by: William Katz Limited version - please login or register to view the entire paper. |
|
© 2006 TermPaperAccess.com |