{VERSION 6 0 "IBM INTEL NT" "6.0" } {USTYLETAB {CSTYLE "Maple Input" -1 0 "Courier" 0 1 255 0 0 1 0 1 0 0 1 0 0 0 0 1 }{CSTYLE "2D Math" -1 2 "Times" 0 1 0 0 0 0 0 0 2 0 0 0 0 0 0 1 }{CSTYLE "2D Output" 2 20 "" 0 1 0 0 255 1 0 0 0 0 0 0 0 0 0 1 } {CSTYLE "" -1 256 "" 1 18 0 0 0 0 0 1 0 0 0 0 0 0 0 1 }{CSTYLE "" -1 257 "" 0 1 0 0 0 0 0 1 0 0 0 0 0 0 0 1 }{CSTYLE "" -1 258 "" 0 1 0 0 0 0 0 1 0 0 0 0 0 0 0 1 }{CSTYLE "" -1 259 "" 0 1 0 0 0 0 0 1 0 0 0 0 0 0 0 1 }{CSTYLE "" -1 260 "" 0 1 0 0 0 0 0 1 0 0 0 0 0 0 0 1 } {CSTYLE "" -1 261 "" 0 1 0 0 0 0 0 1 0 0 0 0 0 0 0 1 }{CSTYLE "" -1 262 "" 0 1 0 0 0 0 0 1 0 0 0 0 0 0 0 1 }{PSTYLE "Normal" -1 0 1 {CSTYLE "" -1 -1 "Times" 1 12 0 0 0 1 2 2 2 2 2 2 1 1 1 1 }1 1 0 0 0 0 1 0 1 0 2 2 0 1 }{PSTYLE "Maple Output" -1 11 1 {CSTYLE "" -1 -1 "Ti mes" 1 12 0 0 0 1 2 2 2 2 2 2 1 1 1 1 }3 3 0 0 0 0 1 0 1 0 2 2 0 1 } {PSTYLE "Maple Plot" -1 13 1 {CSTYLE "" -1 -1 "Times" 1 12 0 0 0 1 2 2 2 2 2 2 1 1 1 1 }3 1 0 0 0 0 1 0 1 0 2 2 0 1 }{PSTYLE "Normal" -1 256 1 {CSTYLE "" -1 -1 "Times" 1 12 0 0 0 1 2 2 2 2 2 2 1 1 1 1 }3 1 0 0 0 0 1 0 1 0 2 2 0 1 }{PSTYLE "Normal" -1 257 1 {CSTYLE "" -1 -1 "T imes" 1 12 0 0 0 1 2 2 2 2 2 2 1 1 1 1 }3 1 0 0 0 0 1 0 1 0 2 2 0 1 } } {SECT 0 {EXCHG {PARA 257 "" 0 "" {TEXT -1 0 "" }}}{EXCHG {PARA 256 "" 0 "" {TEXT 256 65 "Fourier- Analyse einer einfachen Kolbenbolzenbeschl eunigungskurve" }}{PARA 0 "" 0 "" {TEXT -1 0 "" }}}{EXCHG {PARA 256 " " 0 "" {TEXT 257 39 "Dipl.- Ing. Bj\366rnstjerne Zindler, M.Sc." }} {PARA 0 "" 0 "" {TEXT -1 0 "" }}}{EXCHG {PARA 256 "" 0 "" {TEXT -1 56 "Erstellt: 29. April 2015 - Letzte Revision: 28. Mai 2015" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 1 "#" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 8 "restart:" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 1 " #" }}}{EXCHG {PARA 0 "" 0 "" {TEXT 258 88 "Definition der Kolbenbolzen beschleunigungskurve - Fourier II \"vereinfacht - unzentriert\"" }}} {EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 1 "#" }}}{EXCHG {PARA 0 "> " 0 " " {MPLTEXT 1 0 68 "expr_sum:=cos(200*Pi*tau)+1/2*cos(400*Pi*tau)-0.5/2 *sin(200*Pi*tau):" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 1 "#" }}} {EXCHG {PARA 0 "" 0 "" {TEXT 259 58 "Grafische Darstellung der Kolbenb olzenbeschleunigungskurve" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 1 "#" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 55 "plot(expr_sum,tau=-0. 01..0.01,axes=boxed,thickness=2); " }}{PARA 13 "" 1 "" {GLPLOT2D 944 944 944 {PLOTDATA 2 "6'-%'CURVESG6$7^y7$$!0+++++++\"!#;$\"0++++++]\"!# 97$$!0\\(\\**y%[*)*!#<$\"0\"*>/BapZ\"F-7$$!0[&4>cN.)*F1$\"0MEF1yjW\"F- 7$$!0_/4)HY+(*F1$\"0rS)zIc+9F-7$$!0f*F1$\"0-OW\"G!3-\"F-7$$!0'Gd96#\\4*F1$\" 07o`$*>)z\"*!#:7$$!04,-\"*yF1$!0yzI!G:,WFfn7$$!0'>Ryck(y(F1$!0'fgs!p'Q` Ffn7$$!0yc8n:Fp(F1$!0jSAOyy7'Ffn7$$!0'3h *Ffn7$$!03:I?_1)oF1$!0q>#Q#Qwm*Ffn7$$!0jE`Et=$oF1$!0S^>?0vp*Ffn7$$!0>Q wK%4$y'F1$!08K)[$e)3(*Ffn7$$!0+++S75t'F1$!07DdOx7q*Ffn7$$!0\"=Os/$*ymF 1$!0!p\"[\"Q=u'*Ffn7$$!08D]]Oaj)Ffn7$$!0 uZ&4plzgF1$!0g?YjUEH)Ffn7$$!0E^-&ogzfF1$!0J$4\\'>=%zFfn7$$!0NqS@\"HxeF 1$!09gT_o5d(Ffn7$$!03:I!G#ex&F1$!0G1e3j+?(Ffn7$$!0yc8(Qe#o&F1$!0KE1b&G joFfn7$$!0MoO`@dd&F1$!0R4HOG+\\'Ffn7$$!0iC\\eU,[&F1$!0c(=%RUS<'Ffn7$$! 0E_/\\N#y`F1$!0Fin'3sheFfn7$$!0&**)zR(p!G&F1$!0x#RMVN\"f&Ffn7$$!0/29)Q Rs^F1$!0w\\y()H&G`Ffn7$$!0&)pR*4hy]F1$!0Zf1_7c8&Ffn7$$!0X*)ydm@(\\F1$! 0\\@Q^5y&\\Ffn7$$!0@T#[S:v[F1$!0#y$3q\\Z$[Ffn7$$!0nMpeP!pZF1$!0'*3.t$[ UZFfn7$$!0oNr-xun%F1$!0oE)RGG(p%Ffn7$$!0$f=P-?tXF1$!0VHMCKAo%Ffn7$$!0: Ig+uCZ%F1$!0QWcrE6q%Ffn7$$!0U%)od8=P%F1$!0lpWdN%[ZFfn7$$!0['HfM_rUF1$! 0i&>?*['=[Ffn7$$!0LmK0w^<%F1$!0JI&evH-\\Ffn7$$!0*)yd&>-rSF1$!0I()pptP+ &Ffn7$$!0sV([bvrRF1$!0zX3D*4/^Ffn7$$!0C['HBGnQF1$!0x71d;a?&Ffn7$$!0rU& 3*3Fx$F1$!0\"4(p53iG&Ffn7$$!0NpQd(=oOF1$!0X65az_N&Ffn7$$!0sV([V2oNF1$! 0C3&\\!*o$R&Ffn7$$!0)oPv&R\"=NF1$!0'[Z#[4.S&Ffn7$$!005?![?oMF1$!0H6(zW P(R&Ffn7$$!0W)oPx/;MF1$!0\"\\h\\z:$Q&Ffn7$$!0$oOt1*QO$F1$!0gl#4**fc`Ff n7$$!0#Qw_N\"yE$F1$!0a5!z!>BF&Ffn7$$!0)f>RuTpJF1$!0Ah8zNQ8&Ffn7$$!0'4> QkxgIF1$!0!R;&[[O\"\\Ffn7$$!0w_0\"4TiHF1$!0pr(*)4$)[YFfn7$$!0MoOt8='GF 1$!0Ny8Vo,J%Ffn7$$!0!*zf**3&fFF1$!0kNq:oH*QFfn7$$!0&3$f?F1$\"0H7ce-o&))F*7$$!0:Ig+zD'>F1$\"0fH_k p#p0E \"F1$\"00=')z\"\\P()Ffn7$$!0MoO$*=W:\"F1$\"0lR#*36.u*Ffn7$$!0CZ%*[yY0 \"F1$\"0\\cVF_O1\"F-7$$!0Gd9H9!f&*!#=$\"0rII$p)o9\"F-7$$!0vZ&4zXq&)Fhi l$\"08c)Q)zOA\"F-7$$!0Ou[(H>ivFhil$\"09>r::VH\"F-7$$!0)e59F-7$$!0mJjE&>YXFhil$\"0 rUiwD0X\"F-7$$!0\\'Hfe97NFhil$\"0H:h0gD[\"F-7$$!0%oOtmC'*HFhil$\"02iK$ Q4%\\\"F-7$$!0>Pu[Z.[#Fhil$\"0EGE#Gf-:F-7$$!0He;L(H$\"0ZA=7>$3:F-7$$!07V'Gd9sX Fj]m$\"0aS9EVf]\"F-7$$\"0@,3;K%eQc=Q&*Fhil$\"0%*>xTCam)Ffn7$$\"0OrUlKe0\"F1$\"0j 1;\"*eua(Ffn7$$\"09Faom2;\"F1$\"0U)*Qlp(\\jFfn7$$\"0$f=PE>`7F1$\"0j&o \"o*\\l_Ffn7$$\"0?RyOUsN\"F1$\"0BB#z*[V-%Ffn7$$\"0U$oO$>ZpFFfn7$$\"0Qw_D-Cc\"F1$\"0yU1\\uZc\"Ffn7$$\"0xa4*>$Ql\"F1$\"0nV3hI# \\[F*7$$\"0v\\**y]Dw\"F1$!0e%e<%GDp(F*7$$\"0$oOt)\\Y&=F1$!0[\"G8Kg'z\" Ffn7$$\"005?+$yh>F1$!0v%G9;6SHFfn7$$\"0NpQ(Rhc?F1$!0R$)3Y#R(*QFfn7$$\" 0]**)z&e1;#F1$!0gT-R0'z[Ffn7$$\"0BY#\\OtfAF1$!0ihPT\"[TdFfn7$$\"0E_/43 JO#F1$!0EO)oJ!zb'Ffn7$$\"0W([(4Q!eCF1$!05E6^d&GsFfn7$$\"0PtY$HVgDF1$!0 MBa!pSjyFfn7$$\"0#['HR#zmEF1$!0k;70GHU)Ffn7$$\"0NqShy$fFF1$!0)*z1yNh#) )Ffn7$$\"0tY$pUPfGF1$!0L,k&o:u\"*Ffn7$$\"09HeczE'HF1$!0*yEM^%)R%*Ffn7$ $\"08D]g6K,$F1$!0jf)3V*e`*Ffn7$$\"06@UkVP1$F1$!0IMTV_-h*Ffn7$$\"0E_/*f j7JF1$!04*[_d/i'*Ffn7$$\"0U$oO$G:;$F1$!0F'[B;c%p*Ffn7$$\"0&)pRkr')=$F1 $!0W*3nt]/(*Ffn7$$\"0Gc7&\\\"e@$F1$!02#>jA!)3(*Ffn7$$\"0rU&e#eHC$F1$!0 3LY(*fvq*Ffn7$$\"0:Hec,,F$F1$!00x7$*)*3q*Ffn7$$\"0fMF1$!0HUA!Qks&*Ffn7$ $\"0T#['HB=Z$F1$!0#f5!H1W\\*Ffn7$$\"0yb6B6ic$F1$!0ey`,`MJ*Ffn7$$\"0Pu[ <-%pOF1$!0mJo&*)fk!*Ffn7$$\"0Gb5\"o\\mPF1$!0,uG#Ro*y)Ffn7$$\"017Co))z' QF1$!0t>%GIso%)Ffn7$$\"0W)oPb@nRF1$!0#f6=VFI\")Ffn7$$\"0['Hfo4rSF1$!0f O=&H0fxFfn7$$\"0'Hf=p9rTF1$!0Q'G&4cQR(Ffn7$$\"0(QxaDYtUF1$!0HA!y79@qFf n7$$\"0:He'4$\\P%F1$!067\"34@gmFfn7$$\"0W([(*)p\"oWF1$!0?DI!\\ZUjFfn7$ $\"0)eR=61n%F1$!0ieh7kDs&Ffn7$$\"0'>Ry #=Dx%F1$!0X&*euWqX&Ffn7$$\"0Fa3Pc+([F1$!0O_l8*3P_Ffn7$$\"0>Pu))f$y\\F1 $!0m)\\Qa\"\\.&Ffn7$$\"0Pu[xU@2&F1$!0qkjJyp*[Ffn7$$\"0xa4>(ey^F1$!03CP pdDy%Ffn7$$\"0,.1s*fv_F1$!0^kL)yc;ZFfn7$$\"0b4>=;>S*ydF1$!0z/ZSZ3'[Ffn7$$\"0uZ&4.BzeF1 $!0P,JLQV&\\Ffn7$$\"0*yd:xdvfF1$!03m[3!)30&Ffn7$$\"0LlI\"=tzgF1$!0?XY \"z4b^Ffn7$$\"0]+,A)**yhF1$!0?(p*p$oY_Ffn7$$\"0)f>R9Z$G'F1$!0[?P%**\\E `Ffn7$$\"0^,.'[/yjF1$!0TAguloP&Ffn7$$\"0([(\\>mD['F1$!05,omO.S&Ffn7$$ \"0pPv!GiKlF1$!0!oXT.C(R&Ffn7$$\"0]+,UzEe'F1$!0C&>vzk$Q&Ffn7$$\"0MnM>9 Ej'F1$!0\"\\h!>%ye`Ffn7$$\"0=K&Ffn7$$\"0Rxa4joy'F1$ !0gc%=v@-_Ffn7$$\"0S!3;-%H)oF1$!0!ya\"Q')o.&Ffn7$$\"0C['HjL\")pF1$!0)p HZ\\63[Ffn7$$\"0E`1Lx**3(F1$!0\"=oM*)>\"[%Ffn7$$\"0Y\"HeGM)=(F1$!0s<1U 4\\6%Ffn7$$\"0)eFfn7$$\" 0PtY`-]o(F1$!0))fMVqDA\"Ffn7$$\"0$pQxMT\"z(F1$!0T>o]7Z*QF*7$$\"06BY_;` )yF1$\"0\"p1lS$H*RF*7$$\"0pQx9hO*zF1$\"0Ja8>*fk8Ffn7$$\"0V&3'yZ,\" F-7$$\"0)e*F1$\"0sjPBn5E\"F-7$$\"0X*)y(zq$H*F1$\"0$4[248E8F-7$$\"0 yc8ZMXR*F1$\"0Y:yfgMQ\"F-7$$\"0jE`')39]*F1$\"0Ghhh,MV\"F-7$$\"0[&4>AS* f*F1$\"0)*RNPD(o9F-7$$\"016ACMhp*F1$\"0-ms\\fK\\\"F-7$$\"0#Gc7n$yu*F1$ \"0#\\Txa--:F-7$$\"0d9H=R&*z*F1$\"0Q`d)Hq2:F-7$$\"016A9M`#)*F1$\"0Yce^ p$4:F-7$$\"0a2:5H6&)*F1$\"0c1W/b-^\"F-7$$\"0-/31Cp()*F1$\"0b`1wc.^\"F- 7$$\"0]+,->F!**F1$\"0LTkYs'4:F-7$$\"0D]+^f8&**F1$\"0 " 0 "" {MPLTEXT 1 0 1 "#" }}}{EXCHG {PARA 0 "" 0 "" {TEXT 260 56 "Beginn der Fourieranalyse. Festlegen der Periodenl\344ngen." }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 1 "#" }} }{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 27 "x:=+0.01;y:=-0.01;L:=x-y; \+ " }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>%\"xG$\"\"\"!\"#" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>%\"yG$!\"\"!\"#" }}{PARA 11 "" 1 "" {XPPMATH 20 " 6#>%\"LG$\"\"#!\"#" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 1 "#" }}} {EXCHG {PARA 0 "" 0 "" {TEXT 261 107 "Berechnung der ersten zehn Koeff izienten \"a\" und \"b\". Berechnung der ersten zehn Amplituden- Koeff izienten." }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 1 "#" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 1486 "a[0]:=evalf(2/L*int(expr_sum,tau= x..y));a[1]:=evalf(2/L*int(expr_sum*cos(2*1*Pi*tau/L),tau=x..y));a[2]: =evalf(2/L*int(expr_sum*cos(2*2*Pi*tau/L),tau=x..y));a[3]:=evalf(2/L*i nt(expr_sum*cos(2*3*Pi*tau/L),tau=x..y));a[4]:=evalf(2/L*int(expr_sum* cos(2*4*Pi*tau/L),tau=x..y));a[5]:=evalf(2/L*int(expr_sum*cos(2*5*Pi*t au/L),tau=x..y));a[6]:=evalf(2/L*int(expr_sum*cos(2*6*Pi*tau/L),tau=x. .y));a[7]:=evalf(2/L*int(expr_sum*cos(2*7*Pi*tau/L),tau=x..y));a[8]:=e valf(2/L*int(expr_sum*cos(2*8*Pi*tau/L),tau=x..y));a[9]:=evalf(2/L*int (expr_sum*cos(2*9*Pi*tau/L),tau=x..y));a[10]:=evalf(2/L*int(expr_sum*c os(2*10*Pi*tau/L),tau=x..y));b[1]:=evalf(2/L*int(expr_sum*sin(2*1*Pi*t au/L),tau=x..y));b[2]:=evalf(2/L*int(expr_sum*sin(2*2*Pi*tau/L),tau=x. .y));b[3]:=evalf(2/L*int(expr_sum*sin(2*3*Pi*tau/L),tau=x..y));b[4]:=e valf(2/L*int(expr_sum*sin(2*4*Pi*tau/L),tau=x..y));b[5]:=evalf(2/L*int (expr_sum*sin(2*5*Pi*tau/L),tau=x..y));b[6]:=evalf(2/L*int(expr_sum*si n(2*6*Pi*tau/L),tau=x..y));b[7]:=evalf(2/L*int(expr_sum*sin(2*7*Pi*tau /L),tau=x..y));b[8]:=evalf(2/L*int(expr_sum*sin(2*8*Pi*tau/L),tau=x..y ));b[9]:=evalf(2/L*int(expr_sum*sin(2*9*Pi*tau/L),tau=x..y));b[10]:=ev alf(2/L*int(expr_sum*sin(2*10*Pi*tau/L),tau=x..y));A[0]:=sqrt(a[0]^2); A[1]:=sqrt(a[1]^2+b[1]^2);A[2]:=sqrt(a[2]^2+b[2]^2);A[3]:=sqrt(a[3]^2+ b[3]^2);A[4]:=sqrt(a[4]^2+b[4]^2);A[5]:=sqrt(a[5]^2+b[5]^2);A[6]:=sqrt (a[6]^2+b[6]^2);A[7]:=sqrt(a[7]^2+b[7]^2);A[8]:=sqrt(a[8]^2+b[8]^2);A[ 9]:=sqrt(a[9]^2+b[9]^2);A[10]:=sqrt(a[10]^2+b[10]^2);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"aG6#\"\"!$!+CGY49!#D" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"aG6#\"\"\"$\"+!yW_Q#!#D" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"aG6#\"\"#$!+++++5!\"*" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"aG6#\"\"$$\"+!p3oL%!#C" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"aG6#\"\"%$!+++++]!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"aG6#\"\"&$\"+GnN[$)!#C" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#> &%\"aG6#\"\"'$\"+6w&HS\"!#B" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"aG 6#\"\"($!+Q2^_))!#C" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"aG6#\"\")$ \"+%Q_*zh!#C" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"aG6#\"\"*$!+9;')) H%!#C" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"aG6#\"#5$\"+;lg_K!#C" }} {PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"bG6#\"\"\"$\"+;lg_K!#E" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"bG6#\"\"#$\"+++++D!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"bG6#\"\"$$!+!p3oL%!#E" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"bG6#\"\"%$\"+'3M3/\"!#C" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"bG6#\"\"&$\"\"!F)" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"bG6#\"\"'$!+s%)QGU!#D" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\" bG6#\"\"($\"+;FDb8!#D" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"bG6#\"\" )$!+]J4s:!#D" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"bG6#\"\"*$\"+_&>y v*!#E" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"bG6#\"#5$\"++/@gc!#E" }} {PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"AG6#\"\"!$\"+CGY49!#D" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"AG6#\"\"\"$\"+&\\>tS#!#D" }}{PARA 11 " " 1 "" {XPPMATH 20 "6#>&%\"AG6#\"\"#$\"+1kxI5!\"*" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"AG6#\"\"$$\"+Cb-PV!#C" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"AG6#\"\"%$\"+++++]!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"AG6#\"\"&$\"+GnN[$)!#C" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"AG6#\"\"'$\"+lYf.9!#B" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"AG6#\"\"($\"+s![N&))!#C" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"AG6#\"\")$\"+`;&>='!#C" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"AG6#\"\"*$\"+;*o**H%!#C" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>&%\"AG6#\"#5$\"+w*)4`K!#C" }}}{EXCHG {PARA 0 "> " 0 " " {MPLTEXT 1 0 1 "#" }}}{EXCHG {PARA 0 "" 0 "" {TEXT 262 77 "Erstellen des Amplitudenganges als plotf\344hige Liste und Darstellung derselbe n" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 1 "#" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 68 "P:=seq([H,A[H]],H=0..10):plot([P],color=red,a xes=boxed,thickness=2);" }}{PARA 13 "" 1 "" {GLPLOT2D 944 944 944 {PLOTDATA 2 "6(-%'CURVESG6#7-7$$\"\"!F)F(7$$\"\"\"F)F(7$$\"\"#F)$\"+1k xI5!\"*7$$\"\"$F)F(7$$\"\"%F)$\"+++++]!#57$$\"\"&F)F(7$$\"\"'F)F(7$$\" \"(F)F(7$$\"\")F)F(7$$\"\"*F)F(7$$\"#5F)F(-%*THICKNESSG6#F/-%'COLOURG6 &%$RGBG$\"*++++\"!\")F(F(-%+AXESLABELSG6$Q!6\"Fen-%*AXESSTYLEG6#%$BOXG -%%VIEWG6$%(DEFAULTGF^o" 1 2 0 1 10 2 2 6 1 2 2 1.000000 45.000000 45.000000 0 0 "Curve 1" }}}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 1 "# " }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 0 "" }}}}{MARK "27 0 0" 0 } {VIEWOPTS 1 1 0 1 1 1803 1 1 1 1 }{PAGENUMBERS 0 1 2 33 1 1 }