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{SECT 0 {EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 0 "" }}}{SECT 0 {PARA 3
"" 0 "" {TEXT -1 8 "commands" }}{PARA 0 "" 0 "" {TEXT -1 0 "" }}
{EXCHG {PARA 4 "" 0 "" {TEXT 257 25 "Explanation of notation:\n" }}
{PARA 15 "" 0 "" {TEXT 258 53 "R stands for the periodic payment/inves
tment per term" }}{PARA 15 "" 0 "" {TEXT 259 30 "r is the annual inter
est rate " }}{PARA 15 "" 0 "" {TEXT 260 54 "t is the number of years -
it can be given as decimal." }}{PARA 15 "" 0 "" {TEXT 261 81 "m is th
e number of terms per year or number of times compounding is done per \+
year" }}{PARA 15 "" 0 "" {XPPEDIT 18 0 "i=r/m" "6#/%\"iG*&%\"rG\"\"\"%
\"mG!\"\"" }{TEXT -1 43 " can be called the periodic interest rate"
}}{PARA 15 "" 0 "" {XPPEDIT 18 0 "n=t*m " "6#/%\"nG*&%\"tG\"\"\"%\"mGF
'" }{TEXT -1 38 " number of periods (instead of years)" }}{PARA 15 "
" 0 "" {TEXT -1 73 "P = present value or principal , S = future value,
sum, A = accumulation " }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0
1201 "aval:=(R,i,n)->R*(1+i)^n: ## accumulation from compound interest
\n ##Usage: A:=aval(R,i,n)\nasval:=(P,r,t)->P
*(1+r*t): ## accumulation from simple interest \n \+
##Usage: A:=asval(P,r,t)\nreff:=(r,m)->(1+r/m)^m-1: ## Equivalen
t simple (effective) rate \n ## for m-fold co
mpound at r%\n ## Usage Eff_rate:=reff(r,m)\n
\npaval:=(A,i,n)->A*(1+i)^(-n): ## Finding investment from compound \+
\+
##accumulation.\n ## Us
age R:=paval(A,i,n)\nsval:=(R,i,n)->R*((1+i)^n-1)/i: ## Future value o
f annuity\n ##Usage: S:=sval(R,i,n)\n\n
pval:=(R,i,n)->R*(1-(1+i)^(-n))/i:## Present value of annuity\n \+
##Usage: P:=pval(R,i,n)\n\nrpval:=(P,i,n)->
P*i/(1-(1+i)^(-n)): ## Solving R from pval Mortgage payment \n \+
##Usage: R:=pval(P,i,n)\n\n\nrsval:=(S,i,n
)->S*i/((1+i)^n-1): ## Solving R from expected future value \n \+
## into a sinking fund\n \+
##Usage: R:=rsval(S,i,n)\n\n\n" }}}}{EXCHG {PARA 0 "> " 0
"" {MPLTEXT 1 0 0 "" }}}{SECT 0 {PARA 3 "" 0 "" {TEXT -1 25 "Homework \+
C1 like problems" }}{PARA 0 "" 0 "" {TEXT -1 0 "" }}{EXCHG {PARA 0 ""
0 "" {TEXT 262 4 "Q.1." }}{PARA 0 "" 0 "" {TEXT -1 1 " " }{TEXT 263
141 "If you invest $1,678.89 at 7% simple interest, how much will your
investment be worth in 14 months?\nGiven: P,r,t find A for simple int
erest.\n" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 13 "asval(P,r,t);"
}}{PARA 11 "" 1 "" {XPPMATH 20 "6#*&%\"PG\"\"\",&F%F%*&%\"rGF%%\"tGF%F
%F%" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 27 "asval(1678.89,7/100,
14/12);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+]$**f\"=!\"'" }}}
{EXCHG {PARA 0 "" 0 "" {TEXT -1 5 "Q.2. " }}{PARA 0 "" 0 "" {TEXT -1
1 " " }{TEXT 264 19 "If you invest $300 " }{TEXT 265 9 "per month" }
{TEXT 266 10 " at 4.40% " }{TEXT 267 18 "compounded monthly" }{TEXT
268 75 ", how much will your investment be worth in 25 years?\nGiven: \+
R,r,t. Find S." }{TEXT -1 2 "\n\n" }}}{EXCHG {PARA 0 "> " 0 ""
{MPLTEXT 1 0 12 "sval(R,i,n);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#*(%\"
RG\"\"\",&),&F%F%%\"iGF%%\"nGF%F%!\"\"F%F)F+" }}}{EXCHG {PARA 0 "> "
0 "" {MPLTEXT 1 0 25 "sval(300,4.4/1200,25*12);" }}{PARA 11 "" 1 ""
{XPPMATH 20 "6#$\"+EE$[j\"!\"%" }}}{EXCHG {PARA 257 "" 0 "" {TEXT -1
4 "Q.3." }}{PARA 0 "" 0 "" {TEXT 269 328 " A company contributes $190 \+
per month into a retirement fund paying 4.10% compounded monthly and e
mployees are permitted to invest up to $ 2,200 per year into another r
etirement fund which pays 4.10% compounded annually.\n\nHow large can \+
the combined retirement fund be worth in 25 years?\nGiven two annuitie
s with different terms." }{TEXT -1 0 "" }{TEXT 270 0 "" }}}{EXCHG
{PARA 0 "> " 0 "" {MPLTEXT 1 0 31 "ans1:=sval(190,4.1/1200,25*12);" }}
{PARA 11 "" 1 "" {XPPMATH 20 "6#>%%ans1G$\"+j<%4\"**!\"&" }}}{EXCHG
{PARA 0 "> " 0 "" {MPLTEXT 1 0 28 "ans2:=sval(2200,4.1/100,25);" }}
{PARA 11 "" 1 "" {XPPMATH 20 "6#>%%ans2G$\"+W))['G*!\"&" }}}{EXCHG
{PARA 0 "> " 0 "" {MPLTEXT 1 0 10 "ans1+ans2;" }}{PARA 11 "" 1 ""
{XPPMATH 20 "6#$\"+hIu>>!\"%" }}}{EXCHG {PARA 257 "" 0 "" {TEXT -1 4 "
Q.4." }}{PARA 257 "" 0 "" {TEXT -1 25 " How much did you invest " }
{TEXT 271 10 "each month" }{TEXT -1 7 " at 6% " }{TEXT 272 18 "compoun
ded monthly" }{TEXT -1 57 " if 20 years later the investment is worth \+
$184,816.36?\n\n" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 35 "184816.
36 = sval(R,6/1200,20*12.0);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#/$\")O
;[=!\"#,$*&$\"+_*3/i%!\"(\"\"\"%\"RGF,F," }}}{EXCHG {PARA 0 "> " 0 ""
{MPLTEXT 1 0 11 "solve(%,R);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+U+
++S!\"(" }}}{EXCHG {PARA 257 "" 0 "" {TEXT -1 4 "Q.5." }}{PARA 257 ""
0 "" {TEXT -1 68 "If you invest $762.40 and after 17 months it is wort
h $838.00, what " }{TEXT 273 21 "simple interest rate," }{TEXT -1 65 "
expressed as a percentage and rounded to .01, did you receive?\n\n" }
}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 28 "838.00=asval(762.4,r,17/12
);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#/$\"&+Q)!\"#,&$\"%Cw!\"\"\"\"\"*
&$\"+nm1!3\"!\"'F+%\"rGF+F+" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0
17 "solve(%,r);%*100;" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+Ezc**p!#6
" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+Ezc**p!\"*" }}}{EXCHG {PARA
257 "" 0 "" {TEXT -1 4 "Q.6." }}{PARA 257 "" 0 "" {TEXT -1 99 "If you \+
invest $8,000 at 7% compounded monthly, how much will your investment \+
be worth in 7 years?\n\n" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 12
"aval(P,i,n);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#*&%\"PG\"\"\"),&F%F%%
\"iGF%%\"nGF%" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 26 "aval(8000.
00,7/1200,7*12);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+V_*RI\"!\"&" }
}}{EXCHG {PARA 257 "" 0 "" {TEXT -1 4 "Q.7." }}{PARA 257 "" 0 ""
{TEXT -1 126 " If you invest $2,111.70 at 9% simple interest, after ho
w many months, rounded to .01, will your investment be worth $2,278?\n
\n" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 13 "asval(P,r,t);" }}
{PARA 11 "" 1 "" {XPPMATH 20 "6#*&%\"PG\"\"\",&F%F%*&%\"rGF%%\"tGF%F%F
%" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 31 "2278=asval(2111.70,9/1
00,t/12);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#/\"%yA,&$\"'q6@!\"#\"\"\"
*&$\"++]x$e\"!\")F)%\"tGF)F)" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1
0 11 "solve(%,t);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+))G-]5!\")" }
}}{EXCHG {PARA 0 "" 0 "" {TEXT -1 4 "Q.8." }}{PARA 257 "" 0 "" {TEXT
-1 310 "Homer won a prize in the lottery of $3,000, payable $1,500 imm
ediately and $1,500 plus 6% simple interest payable in 260 days. Getti
ng impatient, Homer sells the promissory note to Moe for $1,450 cash a
fter 150 days. Using a nominal 360 day year, find the simple interest \+
rate, rounded to .01, earned by Moe.\n\n" }}}{EXCHG {PARA 0 "> " 0 ""
{MPLTEXT 1 0 13 "asval(P,r,t);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#*&%
\"PG\"\"\",&F%F%*&%\"rGF%%\"tGF%F%F%" }}}{EXCHG {PARA 0 "> " 0 ""
{MPLTEXT 1 0 151 "asval(1500,6/100,260/360);##Homer's expected earning
at full term.\n##This is also Moe's final payoff. \n##Moe's investmen
t is 1450 for 260-150=110 days." }}{PARA 11 "" 1 "" {XPPMATH 20 "6#\"%
l:" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 27 "1565=asval(1450,r,110
/360);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#/\"%l:,&\"%]9\"\"\"*(\"%vzF'
\"#=!\"\"%\"rGF'F'" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 19 "solve
(%,r);%*100.0;" }}{PARA 11 "" 1 "" {XPPMATH 20 "6##\"$9%\"%&f\"" }}
{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+&G6cf#!\")" }}}{EXCHG {PARA 257 "
" 0 "" {TEXT -1 4 "Q.9." }}{PARA 0 "" 0 "" {TEXT 274 122 "How much did
you invest at 8% compounded bi-weekly if 15 years later the investmen
t is worth $64,000?\n\nAnswer: \011ok\011dollars" }{TEXT -1 1 "." }}}
{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 12 "aval(P,i,n);" }}{PARA 11 ""
1 "" {XPPMATH 20 "6#*&%\"PG\"\"\"),&F%F%%\"iGF%%\"nGF%" }}}{EXCHG
{PARA 0 "> " 0 "" {MPLTEXT 1 0 29 "64000=aval(P,8.0/2600,15*26);" }}
{PARA 11 "" 1 "" {XPPMATH 20 "6#/\"&+S',$*&$\"+`b+9L!\"*\"\"\"%\"PGF*F
*" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 11 "solve(%,P);" }}{PARA
11 "" 1 "" {XPPMATH 20 "6#$\"+Ix>J>!\"&" }}}{EXCHG {PARA 257 "" 0 ""
{TEXT -1 5 "Q.10." }}{PARA 257 "" 0 "" {TEXT -1 297 "Bank A is offerin
g an interest rate of 6.40% compounded monthly, while bank B is offeri
ng an interest rate of 6.42% compounded bi-weekly.\n\nThe effective ra
te offered by bank A = \011ok\011%,\nwhile the effective rate offered \+
by bank B = \011\011%.\n\nFor the investor, the bettter rate is being \+
offered by bank \011" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 10 "ref
f(r,m);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#,&),&\"\"\"F&*&%\"rGF&%\"mG
!\"\"F&F)F&F&F*" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 30 "rate1:=r
eff(6.4/100,12);100*%;" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>%&rate1G$\"
)36\"f'!\"*" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"++36\"f'!\"*" }}}
{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 31 "rate2:=reff(6.42/100,26);100
*%;" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>%&rate2G$\")p7Am!\"*" }}{PARA
11 "" 1 "" {XPPMATH 20 "6#$\"++p7Am!\"*" }}}{EXCHG {PARA 257 "" 0 ""
{TEXT -1 5 "Q.11." }}{PARA 0 "" 0 "" {TEXT 275 425 " If you finance $5
0,000 of the purchase of your new home at 4.20% compounded monthly for
30 years, the monthly payment will be $244.51. If instead your had a \+
rate of 5.10% compounded monthly for 15 years, the monthly payment wil
l be $398.01. How much do you pay in total for the $50,000 mortgage if
you finance it for 30 years?\n\nTotal payment = \nHow much do you sa
ve (in total payments) if you finance for 15 years instead?\n" }{TEXT
-1 1 "\n" }{TEXT 276 86 "No special formulas are involved. You are jus
t computing total payments (or payouts). " }}}{EXCHG {PARA 0 "> " 0 "
" {MPLTEXT 1 0 22 "scheme1:=244.51*12*30;" }}{PARA 11 "" 1 ""
{XPPMATH 20 "6#>%(scheme1G$\"(gB!))!\"#" }}}{EXCHG {PARA 0 "> " 0 ""
{MPLTEXT 1 0 22 "scheme2:=398.01*12*15;" }}{PARA 11 "" 1 "" {XPPMATH
20 "6#>%(scheme2G$\"(!=kr!\"#" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1
0 24 "saving:=scheme1-scheme2;" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#>%'s
avingG$\"(!=Q;!\"#" }}}{EXCHG {PARA 257 "" 0 "" {TEXT -1 4 "Q.12" }}
{PARA 0 "" 0 "" {TEXT 277 97 "How much did you invest at 5% simple int
erest if 13 months later the investment is worth $2,594?\n" }}}{EXCHG
{PARA 0 "> " 0 "" {MPLTEXT 1 0 13 "asval(P,r,t);" }}{PARA 11 "" 1 ""
{XPPMATH 20 "6#*&%\"PG\"\"\",&F%F%*&%\"rGF%%\"tGF%F%F%" }}}{EXCHG
{PARA 0 "> " 0 "" {MPLTEXT 1 0 28 "2594.0=asval(P,5/100,13/12);" }}
{PARA 11 "" 1 "" {XPPMATH 20 "6#/$\"&Sf#!\"\",$*(\"$`#\"\"\"\"$S#F&%\"
PGF*F*" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 11 "solve(%,P);" }}
{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+i9rgC!\"'" }}}{EXCHG {PARA 257 ""
0 "" {TEXT -1 5 "Q.13." }}{PARA 257 "" 0 "" {TEXT -1 131 "If you inves
t $10,000 at 8% compounded bi-weekly, after how many years, rounded to
.01, will your investment be worth $24,858.13?\n\n" }}}{EXCHG {PARA
0 "> " 0 "" {MPLTEXT 1 0 12 "aval(P,i,n);" }}{PARA 11 "" 1 ""
{XPPMATH 20 "6#*&%\"PG\"\"\"),&F%F%%\"iGF%%\"nGF%" }}}{EXCHG {PARA 0 "
> " 0 "" {MPLTEXT 1 0 33 "24858.13=aval(10000,8/2600,26*t);" }}{PARA
11 "" 1 "" {XPPMATH 20 "6#/$\"(8e[#!\"#,$*&\"&++\"\"\"\")#\"$E$\"$D$,$
*&\"#EF*%\"tGF*F*F*F*" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 11 "so
lve(%,t);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+o****R6!\")" }}}
{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 0 "" }}}}{EXCHG {PARA 0 "> " 0 "
" {MPLTEXT 1 0 0 "" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 0 "" }}}
{SECT 0 {PARA 3 "" 0 "" {TEXT -1 25 "Homework C2 like problems" }}
{PARA 0 "" 0 "" {TEXT -1 0 "" }}{EXCHG {PARA 257 "" 0 "" {TEXT -1 4 "Q
.1." }}{PARA 0 "" 0 "" {TEXT 278 225 "You plan on buying equipment wor
th 16,000 dollars in 3 years. Since you firmly believe in not borrowin
g, you plan on making monthly payments into an account that pays 5.40%
compounded monthly . How much must your payment be?\n" }}{PARA 0 ""
0 "" {TEXT 279 49 "Use the future value formula for annuity.\n \n
" }{TEXT -1 1 "\n" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 12 "sval(R
,i,n);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#*(%\"RG\"\"\",&),&F%F%%\"iGF
%%\"nGF%F%!\"\"F%F)F+" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 28 "16
000=sval(R,5.4/1200,3*12);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#/\"&+g\"
,$*&$\"+*36&)*Q!\")\"\"\"%\"RGF*F*" }}}{EXCHG {PARA 0 "> " 0 ""
{MPLTEXT 1 0 11 "solve(%,R);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+X4
8/T!\"(" }}}{EXCHG {PARA 0 "" 0 "" {TEXT 280 197 "Q.2. If you finance \+
$94,000 of the purchase of your new home at 4.40% compounded monthly f
or 14 years, how much would the monthly payment be?\n\nYou have an ann
uity with given present value. Find R.\n" }{TEXT -1 2 "\n " }}}{EXCHG
{PARA 0 "> " 0 "" {MPLTEXT 1 0 12 "pval(R,i,n);" }}{PARA 11 "" 1 ""
{XPPMATH 20 "6#*(%\"RG\"\"\",&F%F%),&F%F%%\"iGF%,$%\"nG!\"\"F,F%F)F,"
}}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 29 "94000=pval(R,4.4/1200,14*
12);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#/\"&+S*,$*&$\"+*)4h_7!\"(\"\"
\"%\"RGF*F*" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 11 "solve(%,R);
" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+K]K/v!\"(" }}}{EXCHG {PARA 0 "
> " 0 "" {MPLTEXT 1 0 0 "" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 0
"" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 0 "" }}}{EXCHG {PARA 0 ""
0 "" {TEXT 281 167 "Q.3. If you can afford a monthly payment of $1050 \+
for 33 years and if the available\ninterest rate is 6.00%, what is the
maximum amount that you can afford to borrow?\n\n" }{TEXT -1 0 "" }
{TEXT 282 50 "You are looking for the present value given R,r,t." }}}
{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 12 "pval(R,i,n);" }}{PARA 11 ""
1 "" {XPPMATH 20 "6#*(%\"RG\"\"\",&F%F%),&F%F%%\"iGF%,$%\"nG!\"\"F,F%F
)F," }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 26 "pval(1050,6.0/1200,3
3*12);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$\"+/1i3=!\"%" }}}{EXCHG
{PARA 257 "" 0 "" {TEXT -1 4 "Q.5." }}{PARA 257 "" 0 "" {TEXT -1 309 "
You plan on taking a 4 year hiatus to relax. If you plan on making mo
nthly withdrawals of $1,900 from a money market account that pays 4.20
% compounded monthly to finance your inactivity, how much must you inv
est at the outset to be able to afford this?\n\n Again we need the pre
sent value of a 4 year annuity." }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT
1 0 25 "pval(1900,4.2/1200,4*12);" }}{PARA 11 "" 1 "" {XPPMATH 20 "6#$
\"+B^h\"Q)!\"&" }}}{EXCHG {PARA 0 "" 0 "" {TEXT 283 128 "Just for comp
arison, calculate how much total money you will actually withdraw. The
answer is 1900*12*4=91200.\nThus you collect " }{XPPEDIT 18 0 "7383.8
5;" "6#-%&FloatG6$\"'&QQ(!\"#" }{TEXT 284 66 "$ more than what you inv
est, because of the accumulated interest.\n" }}}{EXCHG {PARA 0 "> " 0
"" {MPLTEXT 1 0 0 "" }}{PARA 11 "" 1 "" {TEXT -1 0 "" }}}{EXCHG {PARA
0 "> " 0 "" {MPLTEXT 1 0 0 "" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1
0 0 "" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 0 "" }}}{EXCHG {PARA
0 "> " 0 "" {MPLTEXT 1 0 0 "" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1
0 0 "" }}}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 0 "" }}}{EXCHG {PARA
0 "> " 0 "" {MPLTEXT 1 0 0 "" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1
0 0 "" }}}{EXCHG {PARA 0 "> " 0 "" {MPLTEXT 1 0 0 "" }}}{EXCHG {PARA
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