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A pr\303\255mek el oszl\303\241sa, szit\303\241l\303\241s" }}}{SECT 1 {PARA 3 "" 0 "" {TEXT 205 63 "2. Egyszer\305\261 faktoriz\303\241l\303\241si m\303\263 dszerek" }}{PARA 0 "" 0 "" {TEXT 201 0 "" }}}{SECT 1 {PARA 3 "" 0 "" {TEXT 205 64 "3. Egyszer\305\261 pr\303\255mtesztel\303\251si m\303\26 3dszerek" }}{EXCHG {PARA 0 "" 0 "" {XPPEDIT 2 0 "" "%#%?G" }}}}{SECT 1 {PARA 3 "" 0 "" {TEXT 205 18 "4. Lucas-sorozatok" }}{PARA 0 "" 0 "" {TEXT 201 0 "" }}}{SECT 1 {PARA 3 "" 0 "" {TEXT 205 23 "5. Alkalmaz\30 3\241sok " }}{PARA 0 "" 0 "" {TEXT 201 0 "" }}}{SECT 1 {PARA 3 "" 0 "" {TEXT 205 36 "6. Sz\303\241mok \303\251s polinomok" }}{PARA 0 "" 0 "" {TEXT 201 0 "" }}}{SECT 1 {PARA 3 "" 0 "" {TEXT 205 45 "7. Gyors Four ier-transzform\303\241ci\303\263" }}{PARA 0 "" 0 "" {TEXT 201 0 "" }}} {SECT 1 {PARA 3 "" 0 "" {TEXT 205 38 "8. Elliptikus f\303\274ggv\303\2 51nyek" }}{PARA 0 "" 0 "" {TEXT 201 0 "" }}}{SECT 1 {PARA 3 "" 0 "" {TEXT 205 59 "9. Sz\303\241mol\303\241s elliptikus g\303\266rb\303\251 ken" }}{PARA 0 "" 0 "" {TEXT 201 0 "" }}}{SECT 1 {PARA 3 "" 0 "" {TEXT 205 65 "10. Faktoriz\303\241l\303\241s elliptikus g\303\274rb\303\251 kkel" }}{PARA 0 "" 0 "" {TEXT 201 0 "" }}}{SECT 1 {PARA 3 "" 0 "" {TEXT 205 55 "11. Pr\303\255mteszt elliptikus g\303\266rb\303\251kkel" }}}{SECT 1 {PARA 3 "" 0 "" {TEXT 205 37 "12. Polinomfaktoriz\303\241l \303\241s" }}}{SECT 1 {PARA 3 "" 0 "" {TEXT 205 16 "13. Az AKS-teszt" }}}{SECT 1 {PARA 3 "" 0 "" {TEXT 205 36 "14. A szita m\303\263dszerek \+ alapjai" }}}{SECT 1 {PARA 3 "" 0 "" {TEXT 205 25 "15. Sz\303\241mtest \+ szita" }}}{SECT 0 {PARA 3 "" 0 "" {TEXT 205 16 "16. Vegyes probl" } {TEXT 205 8 "\303\251" }{TEXT 205 1 "m" }{TEXT 205 8 "\303\241" }{TEXT 205 1 "k" }}{PARA 0 "" 0 "" {TEXT 201 0 "" }}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 25 "restart; with(numtheory);" }}{PARA 11 "" 1 "" {XPPMATH 20 "7QI&GIgcdG6\"I)bigomegaGF$I&cfracGF$I)cfracpolGF$I+cyclot omicGF$I)divisorsGF$I)factorEQGF$I*factorsetGF$I'fermatGF$I)imagunitGF $I&indexGF$I/integral_basisGF$I)invcfracGF$I'invphiGF$I*issqrfreeGF$I' jacobiGF$I*kroneckerGF$I'lambdaGF$I)legendreGF$I)mcombineGF$I)mersenne GF$I(migcdexGF$I*minkowskiGF$I(mipolysGF$I%mlogGF$I'mobiusGF$I&mrootGF $I&msqrtGF$I)nearestpGF$I*nthconverGF$I)nthdenomGF$I)nthnumerGF$I'nthp owGF$I&orderG%*protectedGI)pdexpandGF$I$phiGF$I#piGF$I*pprimrootGF$I)p rimrootGF$I(quadresGF$I+rootsunityGF$I*safeprimeGF$I&sigmaGF$I*sq2fact orGF$I(sum2sqrGF$I$tauGF$I%thueGF$" }}}{SECT 0 {PARA 4 "" 0 "" {TEXT 206 19 "16.1. Collatz-probl" }{TEXT 206 11 "\303\251ma." }}{PARA 0 "" 0 "" {TEXT 201 0 "" }}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 18 "interf ace(echo=3);" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"\"" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 1 ";" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 3 "#\n" }{MPLTEXT 1 0 32 "# The 3*x+1 problem of Collatz\n" } {MPLTEXT 1 0 3 "#\n" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 13 "L:=[ 2,\{3\}];" }}{PARA 11 "" 1 "" {XPPMATH 20 "7$\"\"#<#\"\"$" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 25 "points:=[[2,nops(L[2])]];" }}{PARA 11 "" 1 "" {XPPMATH 20 "7#7$\"\"#\"\"\"" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 3 "#\n" }{MPLTEXT 1 0 71 "# This tests an odd x wether in n halfing steps became smaller then x\n" }{MPLTEXT 1 0 3 "#\n" } {MPLTEXT 1 0 2 "\n" }{MPLTEXT 1 0 44 "test:=proc(n::posint,x::posint) \+ local m,y;\n" }{MPLTEXT 1 0 7 "y:=x;\n" }{MPLTEXT 1 0 7 "m:=n;\n" } {MPLTEXT 1 0 14 "while m>0 do\n" }{MPLTEXT 1 0 13 " y:=3*y+1;\n" } {MPLTEXT 1 0 52 " while m>0 and type(y,even) do m:=m-1; y:=y/2 od;\n" }{MPLTEXT 1 0 31 " if yF-F*>F,F%?(F&\"\" \"F2F&2\"\"!F,C%>F-,&*&\"\"$F2F-F2F2F2F2?(F&F2F2F&3F3-I%typeGF(6$F-I%e venGF(C$>F,,&F,F2F2!\"\">F-,$*&#F2\"\"#F2F-F2F2@$2F-F*-I'RETURNGF(6#I% trueGF(I&falseGF(F&F&F&" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 31 " reduce:=proc(n,S) local x,SS;\n" }{MPLTEXT 1 0 11 "SS:=\{\};\n" } {MPLTEXT 1 0 63 "for x in S do if not test(n,x) then SS:=SS union \{x \} fi od;\n" }{MPLTEXT 1 0 7 "SS end;" }}{PARA 11 "" 1 "" {XPPMATH 20 "f*6$I\"nG6\"I\"SGF%6$I\"xGF%I#SSGF%F%F%C%>F)<\"?&F(F&I%trueG%*protect edG@$4-I%testGF%6$F$F(>F)-I&unionGF/6$F)<#F(F)F%F%F%" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 31 "nextL:=proc(L) local n,S,x,y;\n" } {MPLTEXT 1 0 60 "n:=L[1]; S:=L[2]; S:=S union map(proc(x,y) x+2^y end, S,n);\n" }{MPLTEXT 1 0 24 "[n+1,reduce(n+1,S)] end;" }}{PARA 11 "" 1 " " {XPPMATH 20 "f*6#I\"LG6\"6&I\"nGF%I\"SGF%I\"xGF%I\"yGF%F%F%C&>F'&F$6 #\"\"\">F(&F$6#\"\"#>F(-I&unionG%*protectedG6$F(-I$mapGF76%f*6$F)F*F%F %F%,&F)F/)F3F*F/F%F%F%F(F'7$,&F'F/F/F/-I'reduceGF%6$FAF(F%F%F%" }}} {EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 40 "cycle:=proc(n::posint) local L,points;\n" }{MPLTEXT 1 0 15 "L:=[2,\{3\}];\n" }{MPLTEXT 1 0 27 "poi nts:=[[2,nops(L[2])]];\n" }{MPLTEXT 1 0 17 "while L[1]F*7$\"\"#<#\"\"$>F+7#7$F/-I%nopsGF(6#&F*6#F/?(F&\"\"\"F;F&2&F*6 #F;F%C$>F*-I&nextLGF&6#F*>F+7$-I#opGF(6#F+7$F=F5F&F&F&" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 68 "logpoints:=map(`x`->[x[1],evalf(ln( x[2]))],points); plot(logpoints);" }}{PARA 11 "" 1 "" {XPPMATH 20 "7#7 $\"\"#$\"\"!F&" }}{PARA 13 "" 1 "" {TEXT 207 0 "" }{GLPLOT2D 400 400 400 {PLOTDATA 2 "6%-%+AXESLABELSG6$Q!6\"F&-%'CURVESG6$7#7$$\"\"#\"\"!$ F/F/-%&COLORG6&%$RGBG$\"#5!\"\"$F/F7F8-%%VIEWG6$;$!\")!\"#$\"$3%F?;$!$ /\"F?$\"$/\"F?" 1 2 2 1 10 1 2 6 1 4 2 1.0 45.0 45.0 1 0 "Curve 1" }} {TEXT 207 0 "" }}}}{SECT 0 {PARA 4 "" 0 "" {TEXT 206 39 "16.2. Iterati on of the lambda function." }}{PARA 0 "" 0 "" {TEXT 201 0 "" }}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 3 "#\n" }{MPLTEXT 1 0 37 "# Definition \+ of the lambda function\n" }{MPLTEXT 1 0 3 "#\n" }{MPLTEXT 1 0 2 "\n" } {MPLTEXT 1 0 28 "la:= proc(x) sigma(x)-x end;" }}{PARA 11 "" 1 "" {XPPMATH 20 "f*6#I\"xG6\"F%F%F%,&-_I*numtheoryG6$%*protectedGI(_syslib GF%I&sigmaGF%F#\"\"\"F$!\"\"F%F%F%" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 37 "lacycle:=proc(x::posint) local y,z;\n" }{MPLTEXT 1 0 27 "z:=x; y:=la(x); print(y);\n" }{MPLTEXT 1 0 18 "while not y=z do\n" }{MPLTEXT 1 0 23 " y:=la(y); print(y);\n" }{MPLTEXT 1 0 23 " y:=la( y); print(y);\n" }{MPLTEXT 1 0 17 " z:=la(z); od;\n" }{MPLTEXT 1 0 4 "end;" }}{PARA 11 "" 1 "" {XPPMATH 20 "f*6#'I\"xG6\"I'posintG%*protect edG6$I\"yGF&I\"zGF&F&F&C&>F+F%>F*-I#laGF&6#F%-I&printGF(6#F*?(F&\"\"\" F6F&4/F*F+C'>F*-F0F4F2F:F2>F+-F06#F+F&F&F&" }}}{EXCHG {PARA 0 "> " 0 " " {MPLTEXT 1 0 18 "lacycle(16777778);" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"(%\\C*)" 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"" {XPPMATH 20 "\"(?D!H" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"(![&o$" }}{PARA 11 "" 1 " " {XPPMATH 20 "\"(?lm%" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"(SK$e" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"(?xS*" }}{PARA 11 "" 1 "" {XPPMATH 20 "\")!G%y9" }}{PARA 11 "" 1 "" {XPPMATH 20 "\")?00E" }}{PARA 11 "" 1 "" {XPPMATH 20 "\")!GIj$" }}{PARA 11 "" 1 "" {XPPMATH 20 "\")?<-i" }} {PARA 11 "" 1 "" {XPPMATH 20 "\")![@Q)" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"*?\"G^5" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"*+]\"p8" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"*+[#y=" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"*YWqq#" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"*9RFQ\"" }}{PARA 11 "" 1 "" {XPPMATH 20 "\")Y\"*Gw" }}{PARA 11 "" 1 "" {XPPMATH 20 "\")a`>Q" }} {PARA 11 "" 1 "" {XPPMATH 20 "\")%>&\\?" }}{PARA 11 "" 1 "" {XPPMATH 20 "\")%>v-\"" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"(QWh&" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"(]M<$" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"(UJd$" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"(eW1#" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"(1#\\8" }}{PARA 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"\"&S%=" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"&SJ#" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"&!yH " }}{PARA 11 "" 1 "" {XPPMATH 20 "\"&+G$" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"&E#\\" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"&eb#" }}{PARA 11 "" 1 " " {XPPMATH 20 "\"&qd\"" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"&qW\"" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"&%f6" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"%U\"*" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"%al" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"%1P" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"%MA" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"%?6" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"%/>" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"%gD" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"%yN" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"%#z\"" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"%'H#" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"%WF" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"%cK" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"%%e$" } }{PARA 11 "" 1 "" {XPPMATH 20 "\"%+Y" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"%gl" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"%;$*" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"%s!)" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"%yq" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"%UN" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"%qL" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"%9F" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"%1;" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"%e5" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"$,'" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"\"" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }} {PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 " \"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}{PARA 11 "" 1 "" {XPPMATH 20 "\"\"!" }}}}{SECT 0 {PARA 4 "" 0 "" {TEXT 206 19 "16.3. 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