本帖最后由 GJM 于 2009-12-5 21:43 编辑 $ _+ V" S3 c! Z1 l1 {
* x( Q3 t8 C v$ U底下是小弟做AutoMOD里面PDF练习的(Exercise 5.9)逻辑文件但问题是,程序只Run到Machine A和Machine B就没继续下去& g& X0 J% e `! i* S1 i' K \
! p; ~5 T. D* \# ~( @3 O% {* s不知道是哪里出错,另外这题和Exercise7.1的题型类似,请问若要符合Exercise7.1的题意又该如何修改呢?请各位先进指导,谢谢!3 o( N8 c* h- W3 N* S) e7 \, W
# B$ N4 Q* ?0 L, t6 n/ Z--------------------------------------------% s k4 F9 k. F
begin P_something arriving
% Q& p' ~3 [3 V, D: L- ^ move into Q_wait3 t$ \$ t7 W1 r9 U7 v
move into nextof(Q_mA,Q_mB,Q_mC), s2 b% m- s9 F1 p
use nextof(R_mA,R_mB,R_mC) for normal 48, 5 min
6 [; v; S4 G5 F, ? send to nextof(P_mA_down,P_mB_down,P_mC_down,P_mA_clean,P_mB_clean,P_mC_clean)
' k: ], \. l7 Z7 |# B' Z( ` send to die$ H- U$ X- A5 b/ b% v9 }
end
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" O' {' i' x5 u& h- H: T8 S9 _/ S% ~begin P_mA_down arriving- T% I8 Z; q4 N; q: D0 g
while 1=1 do 5 y6 C$ U, S; a! D* H4 ]! r# E
begin e& n; L# q* U. h( c5 Z- g: f2 P% y5 t
wait for e 110 min) |$ b" f7 Y% |( ~, I: e9 d
take down R_mA
4 Y6 x9 n3 a) s wait for e 5 min7 ^* ]( R- G( K$ j( M
bring up R_mA
5 P7 h. ?: B# O2 r end9 X4 _# Z1 i5 U9 v
end' J1 a3 h f% ?
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begin P_mB_down arriving
6 v& ^4 w& r6 G( ^ while 1=1 do
3 p, i; n$ h( W- i% d0 u begin* A: Q7 V) @7 f. b
wait for e 170 min' D/ w/ ^0 x! b \/ Y/ V) p3 N
take down R_mB
5 y) L( g. c9 g& {7 g wait for e 10 min
5 m7 G5 v+ }" b: K a0 B" }% n bring up R_mB
$ n0 R9 o3 |3 [3 T/ Q& A end% N; R* D7 J6 S3 l# v
end; x {7 x; u% C l- N( U
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begin P_mC_down arriving
8 ?; n# u* [9 m, O% g while 1=1 do
0 M2 i& D( a2 D0 f0 o9 w begin0 \$ h* O# W) g2 W
wait for e 230 min( ^" P* R# N6 X& R) [
take down R_mC* J u( v4 P6 x- r5 Z" T
wait for e 10 min
+ u" P0 o9 M- q bring up R_mC
1 X+ X. @3 D0 A3 |/ A z end
! h* |% M3 F. I2 Z; z5 h7 Oend# ?, M: u5 D" P6 i4 w, t
8 J9 I; h* N. I* H4 L _begin P_mA_clean arriving
# D$ |) \. |) s( w1 r' D while 1=1 do; w+ Z, q# |" S" N5 @4 A
begin8 `( c+ @" h4 U0 N# R. r
wait for 90 min! g- ~7 U9 G# _- b3 \7 t7 N
take down R_mA1 O" ~7 i" q E4 W: f9 w
wait for 5 min
$ Y! @& g) C- {* f bring up R_mA
" i' a. h+ a# Y4 W9 _+ v end
( |6 S3 [) k4 y! jend' |! P4 E8 ~1 {; {1 x
' _/ Z9 I; n( N0 Cbegin P_mB_clean arriving/ o' z: q$ x' c
while 1=1 do
o" a0 [) f& l) Z: R begin
! s8 n; |6 w# [0 R wait for 90 min8 [' d0 G8 V8 c, X) e4 \' E
take down R_mB
& O" l1 W( V( a/ Q6 }- u E* j1 w wait for 5 min, e5 z* @3 U6 J8 _' U
bring up R_mB
" R8 c) M5 z, e" C- r end! ?- c8 E# S2 T
end
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/ V$ @& ?: u+ E* |: S4 jbegin P_mC_clean arriving+ k3 E' \- L, |
while 1=1 do
7 v3 w K) N: }/ J6 }: r3 p& R begin
' l+ {# K/ J9 S* w" g, D wait for 90 min
f" G' _! D: \ take down R_mC
) p1 N" E8 X" p! U# _ wait for 10 min& E: T6 k0 G& M. x
bring up R_mC
! _% X! v/ P/ e/ O# d* f end
& w P+ ]4 }; D* ^1 @# p6 i1 eend
; m) Z9 W+ ?" k: {+ j/ Q, K- d2 D----------------------------------------; X3 @7 e: n2 U6 z
& y* z( }6 B i
Exercise 5.9. Q7 C9 E5 C5 s- y2 h$ o
5 \% R# |( z- K5 z$ `8 j
) k: x# |/ ]( j2 B1 b5 @Create a new model to simulate the following system:
. C; D" y! A& [8 ]6 \! }. mLoads are created with an interarrival time that is exponentially 5 ~1 Q1 x& G2 [
distributed with a mean of 20 minutes. Loads wait in an infinite-% Z. j* R4 D8 ?, \. Z
capacity queue to be processed by one of three single-capacity, 5 V$ i1 {6 i% R1 L! M' E
arrayed machines. Each machine has its own single-capacity queue ( O( x0 P. d1 A( W7 ]7 I! P+ T
where loads are processed. Waiting loads move into one of the three $ o# h$ L) p2 |/ k4 a+ v
queues in round-robin order. Each machine has a normally
3 r! V- P3 l( z2 d5 Cdistributed processing time with a mean of 48 minutes and a standard & \% b, T! I. a8 X5 E9 Z
deviation of 5 minutes.
8 I" O0 }" {, mThe three machines were purchased at different times and have
) P1 s$ M$ u6 |! L: D* N ^7 Gdifferent failure rates. The failure and repair times are exponentially / r5 l- n7 a- [$ L, R
distributed with means as shown in the following table: . A% Z/ D3 I7 c6 i
Note The solution for this assignment is required to complete 3 j# A7 X* V; g, |% e5 g3 S' Y6 J
exercise 7.1 (see “Exercise 7.1” on page263); be sure to save a copy of 2 h1 V/ Z( L8 G, |& Q3 w
your model.
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: L5 O( S m7 I& n' kMachineMean time to failMean time to repair( n5 @- H; u9 u* J
A110 minutes 5 minutes
* d% ~- c7 B/ U$ y/ @B 170 minutes 10 minutes8 o O$ X' ^* @5 w/ R( n" y
C230 minutes 10 minutes
) o. x1 i# G1 r2 C8 J* \$ x
% F$ H) r) f$ r! |( K1 j1 fThe machines also must be cleaned according to the following
3 L! i+ y8 V, q- ]3 Xschedule. All times are constant:
- P" v+ Y0 E" {! P8 o& k! P$ s& N, w- ~
MachineTime between cleanings Time to clean/ t; N. o, K1 [, V$ l
A90 minutes 5 minutes" y) M! |7 u* _3 u
B 90 minutes 5 minutes
/ g$ y! j+ S0 _- l: T- ~7 q x6 pC90 minutes 10 minutes N. s* |, ]8 T, y( m6 l, M1 c, b
7 ]/ N0 }* [+ s* h) }8 z- i
Place the graphics for the queues and the resources. . w- [# y$ {* h1 a
Run the simulation for 100 days.* q( a& D$ \' f% M8 y, I# y
Define all failure and cleaning times using logic (rather than resource
" d- x5 o* h; q$ L7 Q( ^cycles). Answer the following questions:, D# [7 E* P9 e5 D, e
a.What was the average number of loads in the waiting queue?7 d8 ^7 C" X) V+ w- J( G
b.What were the current and average number of loads in Space?
3 G+ j/ Z4 s y* w6 M5 |$ Q. [How do you explain these values?
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