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Unformatted text preview: f—axis f—axts approximation of EHp£2xJ Figure 1. Taylor polynomials of degrees 1, 2, and 3 approximations to re?"
using 1/2 as the base point. Rpprnxinatinn of ENDEEHG Figure 2. Taylor polynomials of degrees 1, 2, and 3 approximations to e2x
using 0 as the base point. uax 15 Contour of Hinttelblau Figure 3. Contour graph of the Himmelblau function and a second—order
Taylor's series approximation about the point (3, 2). 82 BASICS OF SEFCONSTHAINED AND UNCONSTHAINED OPTIMIZATION {(x) \
NQ‘NWE v
Q” N ##éé‘w‘“ .. 5:22.". . 0 ¢ MHo*~*.\\\\\“\\\\~:=:rv.un 't' n Figure 6.7 Graph of (m); sf  xE. The point 0 satisﬁes the FONC bin not SONC: this
point is not a minimizer . Figure 6.8 Graph of f(2:) = as? + 9:3 Figure 4.6.5. ﬂosenbrock function rotated for a better vlew of
the functions vailey. The rotation parameter settlng are Theta = 70 degrees and Phi equal to 45 degrees. Figure 4.8.6 Rosenbrook function graphed with contour option. Contours are activated by pressing the F2 function key after
basic graph has been completed. ‘ V w ' Way«.9 a
' 1‘ ‘ *'.‘x
4,". . A 9 x
I “f ‘\ I r5 llwﬁﬁv’lﬁ» ~ ¢ $/ '1'
#3“? "M \g
.1 1r ’ i A 4' 47‘?‘ I WW” TKQ //\ ...
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This note was uploaded on 10/26/2011 for the course ISEN 620 taught by Professor Curry during the Fall '10 term at Texas A&M.
 Fall '10
 Curry

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