{VERSION 4 0 "IBM INTEL NT" "4.0" }
{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 }
{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 "Times" 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 }}
{SECT 0 {EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 46 "restart;\ninterface(
warnlevel=0);\nwith(linalg):" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 
0 1885 "f:=proc(lambda1,mu1,lambda2,mu2)\nsost:=20;\nGtemp:=matrix(sos
t,sost,[\n0,\0110,\011lambda1,\0110,\011lambda2,\0110,\0110,\0110,\011
0,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\n
mu1,\0110,\0110,\0110,\0110,\011lambda2,\0110,\0110,\0110,\0110,\0110,
\0110,\011lambda1,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\nmu1,\011
0,\0110,\0110,\0110,\0110,\011lambda2,\0110,\0110,\0110,\0110,\0110,
\011lambda1,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\nmu2,\0110,\011
0,\0110,\0110,\0110,\011lambda1,\0110,\0110,\0110,\0110,\011lambda2,
\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\nmu2,\0110,\0110,\011
0,\0110,\011lambda1,\0110,\0110,\0110,\0110,\0110,\011lambda2,\0110,
\0110,\0110,\0110,\0110,\0110,\0110,\0110,\n0,\011mu2,\0110,\0110,\011
mu1,\0110,\0110,\011lambda1,\0110,\0110,\0110,\0110,\0110,\0110,\0110,
\0110,\011lambda2,\0110,\0110,\0110,\n0,\0110,\011mu2,\011mu1,\0110,
\0110,\0110,\0110,\0110,\011lambda1,\0110,\0110,\0110,\0110,\0110,\011
0,\011lambda2,\0110,\0110,\0110,\n0,\0110,\0110,\0110,\0110,\011mu1,
\0110,\0110,\011lambda1,\0110,\0110,\0110,\011mu2,\0110,\0110,\0110,
\0110,\011lambda2,\0110,\0110,\n0,\0110,\0110,\0110,\0110,\0110,\0110,
\011mu1,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\011lamb
da2,\011mu2,\0110,\n0,\0110,\0110,\0110,\0110,\0110,\011mu1,\0110,\011
0,\0110,\011lambda1,\0110,\011mu2,\0110,\0110,\0110,\0110,\011lambda2,
\0110,\0110,\n0,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\011mu
1,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\011lambda2,\011mu2,\0110,
\n0,\0110,\0110,\011mu2,\011mu2,\0110,\0110,\0110,\0110,\0110,\0110,
\0110,\0110,\011lambda2,\0110,\0110,\011lambda1,\0110,\0110,\0110,\n0,
\011mu1,\011mu1,\0110,\0110,\0110,\0110,\011lambda2,\0110,\0110,\0110,
\0110,\0110,\0110,\0110,\0110,\0110,\0110,\011lambda1,\0110,\n0,\0110,
\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0112*mu2,\0110,
\0110,\011lambda1,\011lambda2,\0110,\0110,\0110,\0110,\n0,\0110,\0110,
\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\011
0,\011lambda2,\0112*mu2,\0110,\0110,\0110,\n0,\0110,\0110,\0110,\0110,
\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0112*mu2,\0110,\0110,
\0110,\0110,\0110,\0110,\n0,\0110,\0110,\0110,\0110,\011mu2,\011mu2,
\0110,\0110,\0110,\0110,\0110,\0110,\0110,\011lambda2,\0110,\0110,\011
lambda1,\0110,\0110,\n0, 0,\0110,\0110,\0110,\0110,\0110,\011mu2,\0110
,\011mu2,\0110,\0110,\0110,\0110,\011lambda2,\0110,\0110,\0110,\0110,
\0110,\n0,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\011lambda2,\0110,
\0110,\0110,\0112*mu1,\0110,\0110,\0110,\0110,\0110,\0110,\011lambda1,
\n0,\0110,\0110,\0110,\0110,\0110,\0110,\0110,\011lambda2,\0110,\0110,
\0110,\0110,\0110,\0110,\0110,\0110,\0110,\0112*mu1,\0110\n]);\nres:=m
atrix(sost+1,1,[]):\nfor i from 1 by 1 to sost do\nres[i,1]:=0:\nend d
o:\nres[sost+1,1]:=1:\n\ntempvec:=array(1..sost,[]):\nfor i from 1 by \+
1 to sost do\ntempvec[i]:=1:\nend do:\n\nfor i from 1 by 1 to sost do
\n  tempsum:=0:\n  for j from 1 by 1 to sost do\n    if (i<>j) then te
mpsum:=tempsum+Gtemp[i,j]: end if\n  end do:\n  Gtemp[i,i]:=-tempsum:
\nend do:\n" }{TEXT -1 0 "" }{MPLTEXT 1 0 2126 "Gmal:=concat(Gtemp,tem
pvec):\n\nG:=transpose(Gmal):\n\np:=subvector(transpose(linsolve(G,res
)),1,1..sost);\npi:=unapply(p[x+1],x):\n\nnagruz_1:=lambda1/mu1;\nnagr
uz_2:=lambda2/mu2;\nnagruz:=nagruz_1+nagruz_2;\n\nzagruz_1_1:=pi(1)+pi
(5)+pi(7)+pi(8)+pi(12)+pi(18)+pi(19);\nzagruz_1_2:=pi(2)+pi(6)+pi(9)+p
i(10)+pi(12)+pi(18)+pi(19);\nzagruz_1:=(zagruz_1_1+zagruz_1_2)/2;\nzag
ruz_2_1:=pi(3)+pi(6)+pi(9)+pi(10)+pi(11)+pi(13)+pi(14)+pi(15)+pi(16)+p
i(17);\nzagruz_2_2:=pi(4)+pi(5)+pi(7)+pi(8)+pi(11)+pi(13)+pi(14)+pi(15
)+pi(16)+pi(17);\nzagruz_2:=(zagruz_2_1+zagruz_2_2)/2;\nzagruz:=zagruz
_1+zagruz_2;\n\nkoefprost_1:=1-zagruz_1;\nkoefprost_2:=1-zagruz_2;\nko
efprost:=koefprost_1+koefprost_2-1;\nkoefprost_check:=1-zagruz;\n\nl_1
:=pi(7)+2*pi(8)+pi(9)+2*pi(10)+pi(14)+pi(16)+2*pi(17)+pi(18)+2*pi(19);
\nl_2:=pi(13)+pi(14)+2*pi(15);\nl:=l_1+l_2;\n\nm_1:=pi(1)+pi(2)+pi(5)+
pi(6)+2*pi(7)+3*pi(8)+2*pi(9)+3*pi(10)+2*pi(12)+pi(14)+pi(16)+2*pi(17)
+3*pi(18)+4*pi(19);\nm_1_forcheck:=l_1+2*zagruz_1;\nm_2:=pi(3)+pi(4)+p
i(5)+pi(6)+pi(7)+pi(8)+pi(9)+pi(10)+2*pi(11)+3*pi(13)+3*pi(14)+4*pi(15
)+2*pi(16)+2*pi(17);\nm_2_forcheck:=l_2+2*zagruz_2;\nm:=m_1+m_2;\nm_fo
rcheck:=l+2*zagruz;\n\nverpoteri_1:=pi(8)+pi(10)+pi(14)+pi(15)+pi(17)+
pi(19);\nverpoteri_2:=pi(15);\nverpoteri:=(lambda1*verpoteri_1+lambda2
*verpoteri_2)/(lambda1+lambda2);\n\nproizv_1:=lambda1*(1-verpoteri_1);
\nproizv_2:=lambda2*(1-verpoteri_2);\nproizv:=proizv_1+proizv_2;\nproi
zv_forcheck:=(lambda1+lambda2)*(1-verpoteri);\n\nintenspoteri_1:=lambd
a1*verpoteri_1;\nintenspoteri_2:=lambda2*verpoteri_2;\nintenspoteri:=i
ntenspoteri_1+intenspoteri_2;\nintenspoteri_forcheck:=(lambda1+lambda2
)*verpoteri;\n\nw_1:=l_1/proizv_1;\nw_2:=l_2/proizv_2;\nw:=(proizv_1*w
_1+proizv_2*w_2)/proizv;\nw_forcheck:=l/proizv;\n\nu_1:=m_1/proizv_1;
\nu_1_forcheck:=w_1+1/mu1;\nu_2:=m_2/proizv_2;\nu_2_forcheck:=w_2+1/mu
2;\nu:=(proizv_1*u_1+proizv_2*u_2)/proizv;\nu_forcheck:=m/proizv;\n\nr
esult:=matrix(10,3,[\nnagruz_1,nagruz_2,nagruz,\nzagruz_1,zagruz_2,zag
ruz,\nkoefprost_1,koefprost_2,koefprost,\nl_1,l_2,l,\nm_1,m_2,m,\nverp
oteri_1,verpoteri_2,verpoteri,\nproizv_1,proizv_2,proizv,\nintenspoter
i_1,intenspoteri_2,intenspoteri,\nw_1,w_2,w,\nu_1,u_2,u\n]):\nresult\n
end proc:" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 36 "resmatrix:=f(l
ambda1,20,lambda2,10);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>%*resmatrix
G%'resultG" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 280 "lambda1:=6.0
:\nlambda2:=1.2:\nfor i from 0 by 1 to 4 do\n  print(\"lambda1=\",lamb
da1,\"lambda2=\",lambda2);\n  for j from 1 by 1 to 10 do\n    print (r
esmatrix[j,1]);\n    print (resmatrix[j,2]);\n    print (resmatrix[j,3
]);\n  end do:\n  lambda1:=lambda1+3:\n  lambda2:=lambda2+0.6:\nend do
:  " }}{PARA 11 "" 1 "" {XPPMATH 20 "6&Q)lambda1=6\"$\"#g!\"\"Q)lambda
2=F$$\"#7F'" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+++++I!#5" }}{PARA 
11 "" 1 "" {XPPMATH 20 "6#$\"+++++7!#5" }}{PARA 11 "" 1 "" {XPPMATH 
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" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+'3i)**f!#6" }}{PARA 11 "" 1 "
" {XPPMATH 20 "6#$\"+ay=%4#!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+
a$)z0&)!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+#z8+S*!#5" }}{PARA 
11 "" 1 "" {XPPMATH 20 "6#$\"+Y@\"e!z!#5" }}{PARA 11 "" 1 "" {XPPMATH 
20 "6#$\"+?9qv=!#6" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+0Hm!H%!#8" }
}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+\\!3'=>!#6" }}{PARA 11 "" 1 "" 
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jU?\"!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+;lB!Q%!#5" }}{PARA 11 
"" 1 "" {XPPMATH 20 "6#$\"+>&R^A$!#7" }}{PARA 11 "" 1 "" {XPPMATH 20 "
6#$\"+5%p&)H#!#9" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+9sW\"p#!#7" }}
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+z:i!=(!\"*" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+6P3N>!#6" }}{PARA 
11 "" 1 "" {XPPMATH 20 "6#$\"+#H$GeF!#9" }}{PARA 11 "" 1 "" {XPPMATH 
20 "6#$\"+%*>%y$>!#6" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+()RGOJ!#7
" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+4YjvN!#8" }}{PARA 11 "" 1 "" 
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*eT5`!#6" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+Ocd.5!#5" }}{PARA 11 "
" 1 "" {XPPMATH 20 "6#$\"+s)z+5'!#6" }}{PARA 11 "" 1 "" {XPPMATH 20 "6
&Q)lambda1=6\"$\"#!*!\"\"Q)lambda2=F$$\"#=F'" }}{PARA 11 "" 1 "" 
{XPPMATH 20 "6#$\"+++++X!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"++++
+=!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+++++j!#5" }}{PARA 11 "" 
1 "" {XPPMATH 20 "6#$\"+_.y:A!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$
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{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+['>Uy(!#5" }}{PARA 11 "" 1 "" 
{XPPMATH 20 "6#$\"+'f)4+\"*!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+
X#=V)o!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+l!*=kd!#6" }}{PARA 
11 "" 1 "" {XPPMATH 20 "6#$\"+0iMO9!#7" }}{PARA 11 "" 1 "" {XPPMATH 
20 "6#$\"+&oBy!f!#6" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+4'zz+&!#5" 
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{XPPMATH 20 "6#$\"+\")e9Ao!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+@
.Ap7!#6" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+#H=b4\"!#8" }}{PARA 11 
"" 1 "" {XPPMATH 20 "6#$\"+l%4&f5!#6" }}{PARA 11 "" 1 "" {XPPMATH 20 "
6#$\"+s,x&)))!\"*" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+2G!)*z\"!\"*
" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+)Hd&o5!\")" }}{PARA 11 "" 1 "
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DH$>(>!#8" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+A-FW6!#5" }}{PARA 11 
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)lambda2=F$$\"#CF'" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+++++g!#5" }}
{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+++++C!#5" }}{PARA 11 "" 1 "" 
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\\5GnL!#7" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+TDHY7!#5" }}{PARA 11 
"" 1 "" {XPPMATH 20 "6#$\"+tfy))p!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "
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{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+KKB9J!#6" }}{PARA 11 "" 1 "" 
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i+E!#6" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+,#HE;\"!\")" }}{PARA 11 
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{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+(z\"y?y!#8" }}{PARA 11 "" 1 "" 
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{XPPMATH 20 "6#$\"+83>6g!#6" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+4\\
.95!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+6)Gvr'!#6" }}{PARA 11 "
" 1 "" {XPPMATH 20 "6&Q)lambda1=6\"$\"$]\"!\"\"Q)lambda2=F$$\"#IF'" }}
{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+++++v!#5" }}{PARA 11 "" 1 "" 
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]5!\"*" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+D44&[$!#5" }}{PARA 11 "
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\\_i?!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+Jis'['!#7" }}{PARA 11 
"" 1 "" {XPPMATH 20 "6#$\"+hARF@!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6
#$\"+\\oqK!*!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+`=iiI!#5" }}
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{XPPMATH 20 "6#$\"+YFM**e!#6" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+>T
o%[(!#8" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+GMfG\\!#6" }}{PARA 11 "
" 1 "" {XPPMATH 20 "6#$\"+f)4:T\"!\")" }}{PARA 11 "" 1 "" {XPPMATH 20 
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{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+>T,\\))!#5" }}{PARA 11 "" 1 "" 
{XPPMATH 20 "6#$\"+O_SXA!#7" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+r\"
o9())!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+\")*=7Y\"!#6" }}{PARA 
11 "" 1 "" {XPPMATH 20 "6#$\"+f;'Q;#!#7" }}{PARA 11 "" 1 "" {XPPMATH 
20 "6#$\"+FY:V7!#6" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+NDK*R'!#6" }
}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+:'Q;-\"!#5" }}{PARA 11 "" 1 "" 
{XPPMATH 20 "6#$\"+0!zz1(!#6" }}{PARA 11 "" 1 "" {XPPMATH 20 "6&Q)lamb
da1=6\"$\"$!=!\"\"Q)lambda2=F$$\"#OF'" }}{PARA 11 "" 1 "" {XPPMATH 20 
"6#$\"+++++!*!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+++++O!#5" }}
{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"++++g7!\"*" }}{PARA 11 "" 1 "" 
{XPPMATH 20 "6#$\"+5$e$))R!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+
\")HP(z\"!#5" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+\"HJdy&!#5" }}
{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+!pT;,'!#5" }}{PARA 11 "" 1 "" 
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{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+hf,0P!#5" }}{PARA 11 "" 1 "" 
{XPPMATH 20 "6#$\"+6gMu9!\"*" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+[/
<*\\*!#6" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+))eXf9!#7" }}{PARA 11 
"" 1 "" {XPPMATH 20 "6#$\"+R'*HSz!#6" }}{PARA 11 "" 1 "" {XPPMATH 20 "
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{XPPMATH 20 "6#$\"+\"o])4<!\"*" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+
)>TSD&!#7" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+AZ5:<!\"*" }}{PARA 
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20 "6#$\"+&\\Kv1$!#7" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+,%z^f\"!#6
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