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5!\"\"$F*F*F`]l-%+AXESLABELSG6$Q\"x6\"Q!Fe]l-%%VIEWG6$;F(Fe\\l%(DEFAUL
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}}}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 80 "fsolve(Determinant(G),x=
-60..-40);  #this does agree with what we expect to find" }}{PARA 11 "
" 1 "" {XPPMATH 20 "6#$!+-.++`!\")" }}}{EXCHG {PARA 0 "> " 0 "" 
{MPLTEXT 1 0 21 "H:=RandomMatrix(4,1);" }}{PARA 11 "" 1 "" {XPPMATH 
20 "6#>%\"HG-%'RTABLEG6%\")G8wS-%'MATRIXG6#7&7#\"#U7#!#&*7#\"#H7#\"#x%
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{PARA 11 "" 1 "" {XPPMATH 20 "6#-%'RTABLEG6%\")7vFL-%'MATRIXG6#7&7#$!3
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}{PARA 11 "" 1 "" {XPPMATH 20 "6#>%&EigenG-%'RTABLEG6%\")%Q[)R-%'MATRI
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92 "Test[3,1]/Eigen[3,1]; #test this for all four coordinates -- this \+
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!z!\")" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 63 "Test[1,1]/Eigen[1
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{XPPMATH 20 "6#$\"+$Gt$)*y!\")" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+
3?o+z!\")" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+Dim/z!\")" }}}{EXCHG 
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{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 36 "fsolve(Determinant(B),x=-200
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{MPLTEXT 1 0 21 "F:=RandomMatrix(4,1);" }}{PARA 11 "" 1 "" {XPPMATH 
20 "6#>%\"FG-%'RTABLEG6%\")cbmR-%'MATRIXG6#7&7#\"#p7#!#f7#!#H7#\"#o%'M
atrixG" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 12 "G:=(E^20).F;" }}
{PARA 11 "" 1 "" {XPPMATH 20 "6#>%\"GG-%'RTABLEG6%\")G&>^$-%'MATRIXG6#
7&7#$!39S@NQYDr\")\"\"&7#$!3]q*ezD?pB'F07#$\"3CN3!o'e8&f\"\"\"'7#$\"3o
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igen:=G/G[1,1];" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>%&EigenG-%'RTABLEG
6%\")7!Q0%-%'MATRIXG6#7&7#$\"2;9x'**********!#<7#$\"3KM*4#)=dFj(!#=7#$
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{MPLTEXT 1 0 14 "Test:=A.Eigen;" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>%%
TestG-%'RTABLEG6%\")/\\ZM-%'MATRIXG6#7&7#$!37U]Hky;*f\"!#:7#$!3\"*RY<,
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0 "> " 0 "" {MPLTEXT 1 0 84 "Test[1,1]/Eigen[1,1];Test[2,1]/Eigen[2,1]
;Test[3,1]/Eigen[3,1];Test[4,1]/Eigen[4,1];" }}{PARA 11 "" 1 "" 
{XPPMATH 20 "6#$!+ky;*f\"!\"(" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$!+ky
;*f\"!\"(" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$!+ky;*f\"!\"(" }}{PARA 
11 "" 1 "" {XPPMATH 20 "6#$!+ky;*f\"!\"(" }}}{EXCHG {PARA 0 "> " 0 "" 
{MPLTEXT 1 0 162 "#this is quite accurate!  Notice that it is much mor
e accurate than our example above --this is probably because the eigen
value of our matrix C ~ E is very large." }}}{EXCHG {PARA 0 "> " 0 "" 
{MPLTEXT 1 0 0 "" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 21 "A:=Rand
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1.000000 45.000000 45.000000 0 0 "Curve 1" }}}}{EXCHG {PARA 0 "> " 0 "
" {MPLTEXT 1 0 77 "#looks as if we have two real eigenvalues.   One sh
ould be able to repeat the" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 
38 "#procedure above to find eigenvectors." }}}{EXCHG {PARA 0 "> " 0 "
" {MPLTEXT 1 0 0 "" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 78 "#Assi
gnment (much shorter than the previous one):  set up a random matrix w
ith" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 82 "#the functions I've \+
used and find approximations to its eigenvalues using graphing" }}}
{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 101 "#and to eigenvectors using \+
5.8 methods.  For the adventurous:  if you can figure out a way to hom
e in" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 85 "#on a complex eigen
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