An Optimization Model for Empty Container Reposition under Uncertainty
|
|
- Barbara Washington
- 6 years ago
- Views:
Transcription
1 n Omzon Mode o Emy onne Reoson nde neny eodo be n Demen o Mnemen nd enooy QM nd ene de Reee s es nsos Moné nd Mssmo D Fneso Demen o Lnd Enneen nesy o Iy o Zdds Demen o Lnd Enneen nesy o Iy Inodon. onne sn omnes ode seded mme nsoon wod-wde. snn o o e omeeness s e by o emy onnes n os o mee some odes. De o e ob de mbne some os end o me emy onnes esn n nneessy soe oss we oes e soes eose sn omnes o e sk o omeos odn onnes s eesed. s onseene sn omnes ms be ee o mee some needs nd eom e mme eosonn o emy onnes. mo dy n s oeon s e mny soes o neny edn e.. e nmbe o onnes my be eesed n e e e me wen emy onnes beome be nd e esse y o emy onnes. See deemns modes wee oosed e.. oon e. 00 b ey ke no on sne ezon o nen mees. Sos omzon modes wee esened s we e.. en nd en 998. owee ey ee ood knowede o ndom be dsbons o od ow y soons. We esen deson o ene nsoon newok oe w emy onne eosonn s eomed. We en oose n omzon mode o soe s sse o eeoeneos ee o emy onnes kn no on neny o se o eesene senos. we n be ssned o e seno o eze s ee mone. Wes my eesen obbes o oene o sbee mees ssned by mnes odn o e on. Fny e mos snn ess o e sdy e noded nd dsssed. obem deson. Emy onnes n be be n os de o s nenoy ks nd ns n om e ndsde nd esses n om e sesde. ey n be dsed o e ndsde o see eoes oded on esses o e soe os. Emy onnes n be soed n os one ssned o seded esses o ke s no-ye-ssned nenoy. In e s se sn omnes ms dede now o w esses seded os n e me-eods o ssn e n emy onnes. In e seond se sn omnes n soe n emy onnes nd dede e. See onne yes e onsdeed nd e deen szes es n deen zons o e be se. In ode o ke no on e m o en desons on e e se o e sysem we need o ey onsde e me esee. Moeoe some desons ms be mde wen ee s ony knowede o some mees. Fo nsne esses en oe so mme dsnes do no oe se nomon bo e omoson. Indeed we ey e son n en o sn omnes ms dede ow mny onnes w be oded nd noded n e ne one. Fny noe mo soe o neny s eesened by e so-ed nd Rn oy s wen beed esses e deys n
2 e sede somemes emn oeons e onded wo odn emy onnes. Fo nsne de o dese m ondons some os ne e y nd wen ey es e oeons emes e o n me. Fe sows s n eme o me-eended newok mde o os denoed by ees nd wee emy onnes ms be ssned o esses nd o nded by ee B wee ey n be ke nssned. Nmbes om o nde o nes oeed by o deen esses. Fo nsne esse w e n eod o B. s o n od on s esse emy onnes be om e d eod nd nod emes w beome be om e eod. I s wo non sn omnes nno dede now esses o emy onnes be n e s eod os nd bese s deson ws mde beoe e. s eds o B sn omnes ms dede now e zon o onnes e beome be beoe e s eod. 5 B B B B B S DEISIONS OR KNOWN SLY OF EMY ONINERS NERIN SLY OF EMY ONINERS Fe. Sme me-eended newok. DEISIONS O BE MDE NOW ESSEL FRE DEISIONS SER-SINK KNOWN DEMND OF EMY ONINERS NERIN DEMND OF EMY ONINERS Omzon mode. Sn omnes ms dede e nmbe o emy onnes eosoned soed oded noded nd ke on esses. s nded beoe we ke no on wo eoes o desons o emy onnes soed n os deendn on e eemen o be ssned o nssned o seded esses. We onsde m-eod newok nd ssme desons e memened n on ozon son. Redn noon we onsde se o onne yes se o onos me-eods se o esses nd se o senos ssoed w wes w. Le be e se o os n w nssned emy onnes n be soed nd e eesen e se o os n w s oon s no owed. Moeoe we nde by θ e me o w desons ms be e sme o eey seno. Femoe we denoe by e ne o me beween e o emy onnes os o se nd e ben o esses o w s onnes e o be ssned.
3 e noon b 0 0 eesens o o e sy demnd o emy onnes o ye me n seno. E o n s eesened by wo nodes nd. e s node s eed o e sy s o emy onnes o ye be n o me n seno. e node s ssoed w e demnd o emy onnes o ye eesed n o me n seno. oe y onsns e oosed o od son nd eosonn n ndmssbe nmbe o emy onnes. Moeoe sne we e mnn eeoeneos ee o onnes o deen szes we onsde e es onne ye nd eess es n ems o nmbe o be sos be o nde -ye onnes. en e onne ye e be se o - ye onnes n be deemned sn onesons o noded by n e. 99. In e noon doed eee eesens e soe y o o e soe y o o nd e esd y o emy onnes ed by esse k en mon os nd n seno. e soes o neny noed n e sse e b s d nd. e obem s esened s n nee ommn mode wose deson bes e denoed by ee nd oss by ee wee mens oded noded eosoned nd od.. be ndes e nmbe o emy onnes o ye be n o ; d me o be oded on esse n me n seno eesens e eed ny os.. be ndes e nmbe o emy onnes o ye be n o ; me o be oded on esse n me n seno eesens e eed ny os.. be ndes e nmbe o emy onnes o ye o be noded n seno om esse n me o wee ey beome be me ; eesens e eed ny os.. be ndes e nmbe o emy onnes o ye o be noded n seno om esse n me o wee ey beome be me ; eesens e eed ny os. 5. be ndes e nmbe o emy onnes o ye o be eosoned n seno by esse beween os nd w esee ben me nd ; eesens e eed ny os. 6. be ndes e nmbe o no-ye-ssned emy onnes o ye o be soed n o beween mes nd n seno ; eesens e eed ny os. 7. be ndes e nmbe o emy onnes o ye o be soed n o beween mes nd n seno ; eesens e ee os. e esn mem mode n be eessed s oows:
4 w mn sbe o b s d { } θ K 9 { } θ K 0 { } θ K { } θ K { } θ K { } θ K { } θ K 5 wee ± nd ms beon o. deson bes ke ony non-nee nee es. ± ± e obee non mnmzes e os o odn nodn eosonn nd son emy onnes oe mme newok. sn newok noon onsn se eesens
5 ow onseon o emy onnes o eey ye n e node eey me oe e seno. onsn se ees o ssn o esses emy onnes be n e node eey me oe e seno. onsn se moses o ssy e demnd o emy onnes ssoed w e node eey me oe e seno. onsn se 5 eesens ow onseon o -ye onnes o e o e esse k ben me n o. onsn ses 6 nd 7 ense nenoy ee o emy onnes soed does no eeed e eessed n nmbe o onnes o en ye. onsn se 8 nees onnes eosoned beween os does no eeed e se be o emes on esses. onsn ses om 9 o 5 eesen e non-ny ondons. Mn ess nd onsons. We onsde see eoson obems n o 5 onne yes nd 500 senos. o soe nme nsnes e we-known soe e 995 s sed. In o omon ess obems e soed n ess n 50 seonds w s me sbe o e oen needs o e sn ndsy. e esn eoson n w be dsed o os o n n me e nen y o nsne ey ms onze e so-ed osekeen. mo ese esee n s sse onsss o esmn ow mny senos sod be ken no on. Moeoe e mode ebs son eb ses newoks ommodes nd senos n be eoed o deeo sezed esoon enes. Reeenes. en RK nd en Y 998. wo-se Sos Newok Mode nd Soons Meods o e Dynm Emy onne oon obem. nsoon Sene - 6. oon S oe M nd Kno E 00. Emy onne mnemen o nemod nsoon newoks. nsoon Rese E LEX Omzon Inooe 995. sn e LEX be Lby nd LEX Med Inee Lby Inne e Ned. n ende M nd De 99. Dynm nd Sos Modes o e oon o Emy onnes. Oeons Rese 0-6.
_ J.. C C A 551NED. - n R ' ' t i :. t ; . b c c : : I I .., I AS IEC. r '2 5? 9
C C A 55NED n R 5 0 9 b c c \ { s AS EC 2 5? 9 Con 0 \ 0265 o + s ^! 4 y!! {! w Y n < R > s s = ~ C c [ + * c n j R c C / e A / = + j ) d /! Y 6 ] s v * ^ / ) v } > { ± n S = S w c s y c C { ~! > R = n
More informationflbc in Russia. PIWiREE COHORTS ARE NOT PULL- ING TOGETHER. SIGHTS AND SCENES IN ST. PETERSBURG.
# O E O KOE O F Y F O VO V NO 5 OE KEN ONY Y 2 9 OE NO 265 E K N F z 5 7 X ) $2 Q - EO NE? O - 5 OO Y F F 2 - P - F O - FEE > < 5 < P O - 9 #»»» F & & F $ P 57 5 9 E 64 } 5 { O $665 $5 $ 25 E F O 9 5 [
More informationTelecommunications BUILDING INTERCOM CALL BUTTON WITH 3/4"C AND PULL STRING TO ACCESSIBLE CEILING SPACE. MOUNT 48" AFF.
0 NOOY SYMO S N NOOY NOS: NO: his is a standard symbol list and not all items listed may be used. bbreviations () XSN OV NS OO NMW - UNOUN ONU OY ONO UNS ONO NS O ONO UNS OWN NS OX OX U OP SUON UN OO,
More informationHyperbolic Heat Equation as Mathematical Model for Steel Quenching of L-shape and T-shape Samples, Direct and Inverse Problems
SEAS RANSACIONS o HEA MASS RANSER Bos M Be As Bs Hpeo He Eo s Me Moe o See Qe o L-spe -spe Spes De Iese Poes ABIA BOBINSKA o Pss Mes es o L Ze See 8 L R LAIA e@o MARARIA BIKE ANDRIS BIKIS Ise o Mes Cope
More information_...,1 4._.,1 v,_ 4r 1.. _.= _',-.3, _~ .';~f_-w-:2 -»5r- ;.::..'_.;,; ff. -*;, ;1_:\'."\.=.,;. '. -: _'1.,,..'. Q.
= + < < < = < c + = < = $! == = = = # c = = +! j z = = $=! = # % == =! < == = + = = = @ j +% j= = =s = } o } = == = } < =e = < = = z } s = < = s = @ } = =
More informationCaputo Equations in the frame of fractional operators with Mittag-Leffler kernels
nvenon Jounl o Reseh Tehnoloy n nneen & Mnemen JRTM SSN: 455-689 wwwjemom Volume ssue 0 ǁ Ooe 08 ǁ PP 9-45 Cuo uons n he me o onl oeos wh M-ele enels on Qn Chenmn Hou* Ynn Unvesy Jln Ynj 00 ASTRACT: n
More information^ :" j ' ^ ' ' 7 ' . irnoere admh^dn. In tosea his. i^ll ^ A^ik A A 4 A A> t-y 1/ I t/ f ^ . «*^ :" -". n"oat"pt) A T JJi -t-vxa.
GGO GD OREE ( ) O } x Y D { < ( 4 { x % ( O O) N 4 4 ) x 2Q x 2 4 RDY O EEER 4 O ( ) R Ez ( F O
More information_ =- 314 TH / 3 RD 60M AR M NT GROUP C L) _. 5 TH AIR F0 RCE ` Pl R?N ]9. ia UNIT, - _ : --.
H OR UN UN4 Q NOV 99 O ^ 0 342g = o 3 RD 60M AR M N GROUP ) = 34 H q 5 H AR F0 RE P R?N ]9 9 B UA DA Q N0U 99 n > o > 4 = H PAGE DEAFED AW E0 2958 R2 R g 8 B B F 0 328 p NOV 99 DA 3 9 9 3 ne o B o O o
More informationSome algorthim for solving system of linear volterra integral equation of second kind by using MATLAB 7 ALAN JALAL ABD ALKADER
. Soe lgoi o solving syse o line vole inegl eqion o second ind by sing MATLAB 7 ALAN JALAL ABD ALKADER College o Edcion / Al- Msnsiiy Univesiy Depen o Meics تقديم البحث :-//7 قبول النشر:- //. Absc ( /
More informationClassification of Equations Characteristics
Clssiiion o Eqions Cheisis Consie n elemen o li moing in wo imensionl spe enoe s poin P elow. The ph o P is inie he line. The posiion ile is s so h n inemenl isne long is s. Le he goening eqions e epesene
More informationA L A BA M A L A W R E V IE W
A L A BA M A L A W R E V IE W Volume 52 Fall 2000 Number 1 B E F O R E D I S A B I L I T Y C I V I L R I G HT S : C I V I L W A R P E N S I O N S A N D TH E P O L I T I C S O F D I S A B I L I T Y I N
More information( ) ( ) ( ) 0. Conservation of Energy & Poynting Theorem. From Maxwell s equations we have. M t. From above it can be shown (HW)
8 Conson o n & Ponn To Fo wll s quons w D B σ σ Fo bo n b sown (W) o s W w bo on o s l us n su su ul ow ns [W/ ] [W] su P su B W W 4 444 s W A A s V A A : W W R o n o so n n: [/s W] W W 4 44 9 W : W F
More informationc- : r - C ' ',. A a \ V
HS PAGE DECLASSFED AW EO 2958 c C \ V A A a HS PAGE DECLASSFED AW EO 2958 HS PAGE DECLASSFED AW EO 2958 = N! [! D!! * J!! [ c 9 c 6 j C v C! ( «! Y y Y ^ L! J ( ) J! J ~ n + ~ L a Y C + J " J 7 = [ " S!
More informationChapter 6 Plane Motion of Rigid Bodies
Chpe 6 Pne oon of Rd ode 6. Equon of oon fo Rd bod. 6., 6., 6.3 Conde d bod ced upon b ee een foce,, 3,. We cn ume h he bod mde of e numbe n of pce of m Δm (,,, n). Conden f he moon of he m cene of he
More informationOn Fractional Operational Calculus pertaining to the product of H- functions
nenonl eh ounl of Enneen n ehnolo RE e-ssn: 2395-56 Volume: 2 ue: 3 une-25 wwwene -SSN: 2395-72 On Fonl Oeonl Clulu enn o he ou of - funon D VBL Chu, C A 2 Demen of hem, Unve of Rhn, u-3255, n E-ml : vl@hooom
More information183 IV-4N. opo !PF. M1 -ri ChV. rrj: M D " ;jj. I o! 7-F J,. 1;", f y S}! f.'# t., owl, DeptE ResSIE. ,re:, 't.,". ± f. so.' f Y"3 7F. ..
M CV T /w ~ g e ± ow DeE ReE M D 8 VN oo P E o ± LL / L C Q M o ^ M > LL / e P L /9 ^ > R ^ V ) o C E w / # C e e M~ T o # % e ~ e K C E > T / / C G P ~ e * PT ^ e / w R E ^ E / C \ z M e / P w V / K 9
More informationTHIS PAGE DECLASSIFIED IAW EO IRIS u blic Record. Key I fo mation. Ma n: AIR MATERIEL COMM ND. Adm ni trative Mar ings.
T H S PA G E D E CLA SSFED AW E O 2958 RS u blc Recod Key fo maon Ma n AR MATEREL COMM ND D cumen Type Call N u b e 03 V 7 Rcvd Rel 98 / 0 ndexe D 38 Eneed Dae RS l umbe 0 0 4 2 3 5 6 C D QC d Dac A cesson
More information0# E % D 0 D - C AB
5-70,- 393 %& 44 03& / / %0& / / 405 4 90//7-90/8/3 ) /7 0% 0 - @AB 5? 07 5 >0< 98 % =< < ; 98 07 &? % B % - G %0A 0@ % F0 % 08 403 08 M3 @ K0 J? F0 4< - G @ I 0 QR 4 @ 8 >5 5 % 08 OF0 80P 0O 0N 0@ 80SP
More informationWhat do you think I fought for at Omaha Beach? 1_1. My name is Phil - lip Spoon- er, and I ... "-- -. "a...,
2 Wht do you thnk ought o t Omh Bech? Fo STB Chous Text tken om testmony beoe Mne Stte Congess by hlp Spoone dgo J=60 Melss Dunphy Sopno MN m= " Good mon ng com mttee Good lto Teno 0 4 " L o" : 4 My nme
More information! -., THIS PAGE DECLASSIFIED IAW EQ t Fr ra _ ce, _., I B T 1CC33ti3HI QI L '14 D? 0. l d! .; ' D. o.. r l y. - - PR Pi B nt 8, HZ5 0 QL
H PAGE DECAFED AW E0 2958 UAF HORCA UD & D m \ Z c PREMNAR D FGHER BOMBER ARC o v N C o m p R C DECEMBER 956 PREPARED B HE UAF HORCA DVO N HRO UGH HE COOPERAON O F HE HORCA DVON HEADQUARER UAREUR DEPARMEN
More informationAPPLICATION OF A Z-TRANSFORMS METHOD FOR INVESTIGATION OF MARKOV G-NETWORKS
Joa of Aed Mahema ad Comaoa Meha 4 3( 6-73 APPLCATON OF A Z-TRANSFORMS METHOD FOR NVESTGATON OF MARKOV G-NETWORKS Mha Maay Vo Nameo e of Mahema Ceohowa Uey of Tehoogy Cęohowa Poad Fay of Mahema ad Come
More informationON THE EXTENSION OF WEAK ARMENDARIZ RINGS RELATIVE TO A MONOID
wwweo/voue/vo9iue/ijas_9 9f ON THE EXTENSION OF WEAK AENDAIZ INGS ELATIVE TO A ONOID Eye A & Ayou Eoy Dee of e Nowe No Uvey Lzou 77 C Dee of e Uvey of Kou Ou Su E-: eye76@o; you975@yooo ABSTACT Fo oo we
More informationT h e C S E T I P r o j e c t
T h e P r o j e c t T H E P R O J E C T T A B L E O F C O N T E N T S A r t i c l e P a g e C o m p r e h e n s i v e A s s es s m e n t o f t h e U F O / E T I P h e n o m e n o n M a y 1 9 9 1 1 E T
More informationISSUES RELATED WITH ARMA (P,Q) PROCESS. Salah H. Abid AL-Mustansirya University - College Of Education Department of Mathematics (IRAQ / BAGHDAD)
Eoen Jonl of Sisics n Poiliy Vol. No..9- Mc Plise y Eoen Cene fo Resec Tinin n Develoen UK www.e-onls.o ISSUES RELATED WITH ARMA PQ PROCESS Sl H. Ai AL-Msnsiy Univesiy - Collee Of Ecion Deen of Meics IRAQ
More informationNECESSARY AND SUFFICIENT CONDITIONS FOR NEAR- OPTIMALITY HARVESTING CONTROL PROBLEM OF STOCHASTIC AGE-DEPENDENT SYSTEM WITH POISSON JUMPS
IJRRS 4 M wwweom/vome/vo4ie/ijrrs_4 NCSSRY N SUFFICIN CONIIONS FOR NR- OPIMLIY RVSING CONROL PROBLM OF SOCSIC G-PNN SYSM WI POISSON JUMPS Xii Li * Qimi Z & Jiwei Si Soo o Memi Come Siee NiXi Uiveiy YiC
More informationû s L u t 0 s a ; i.e., û s 0
Te Hille-Yosida Teorem We ave seen a wen e absrac IVP is uniquely solvable en e soluion operaor defines a semigroup of bounded operaors. We ave no ye discussed e condiions under wic e IVP is uniquely solvable.
More informationthe king's singers And So It Goes the colour of song Words and Vusic by By Joel LEONARD Arranged by Bob Chilcott
085850 SATB div cppell US $25 So Goes Wods nd Vusic by By Joel Anged by Bob Chilco he king's singes L he colou of song A H EXCLUSVELY DSTRBUTED BY LEONARD (Fom The King's Singes 25h Annivesy Jubilee) So
More informationTWO INTERFACIAL COLLINEAR GRIFFITH CRACKS IN THERMO- ELASTIC COMPOSITE MEDIA
WO INERFIL OLLINER GRIFFIH RS IN HERMO- ELSI OMOSIE MEDI h m MISHR S DS * Deme o Mheml See I Ie o eholog BHU V-5 I he oee o he le o he e e o eeg o o olle Gh e he ee o he wo ohoo mel e e e emee el. he olem
More informationMarch2014. We restayingindoors. byrobwanthouse,activitiesvp
Mh2014 ThnWINTER! W yindoo ohpauon bybobmowpubyvp Thmbyodndnowywnod hpoponmnoounnundoop Auon Ahy Auo Body om h ony-hduddofbuy15oh SudyMh1 BuwyouyhSudyoh monhwhnwhououpb hcun DnNohmonh!ThP Auondphbhmonh
More informationInformation Exchange and Competition in Communications Networks
Inomon Ehnge nd Comeon n Communons Newoks Clo Cmbn Poleno d Tono nd Tommso M Vlle Imel College London nd CEPR Ths eson: Jnuy 005 Abs We deelo model o nomon ehnge beween llng es We heze he equlbum when
More informationThe Influence of Diffusion on Generalized Magneto- Thermo-Viscoelastic Problem of a Homogenous. Isotropic Material
dv. Tho.. Mh. Vo. no. 69-9 Th Infn of Dffson on Gnzd Mgno- Tho-Vsos Pob of Hoognos Isoo M F. S. Byons Mhs Dn Fy of Sn U -Q Unvsy P. O. Box 9 Mh Sd b F.S.Byons@ho.o bs Th sn s d sdyng h ffs of vsosy nd
More informationStudy and Control of a Variable Speed Wind Turbine with a Permanent Magnet Synchronous Generator
Inenonl Jounl o Enneen Tend nd Tehnoloy (IJETT) Volume Nume 0- Jun 04 Sudy nd onol o Vle Seed Wnd Tune wh nen Mne Synhonou Geneo YMd # YMokh # NBoul # TRekou #4 # Looy o Indul Tehnoloy nd Inomon, Elel
More informationP a g e 3 6 of R e p o r t P B 4 / 0 9
P a g e 3 6 of R e p o r t P B 4 / 0 9 p r o t e c t h um a n h e a l t h a n d p r o p e r t y fr om t h e d a n g e rs i n h e r e n t i n m i n i n g o p e r a t i o n s s u c h a s a q u a r r y. J
More informationTHIS PAGE DECLASSIFIED IAW E
THS PAGE DECLASSFED AW E0 2958 BL K THS PAGE DECLASSFED AW E0 2958 THS PAGE DECLASSFED AW E0 2958 B L K THS PAGE DECLASSFED AW E0 2958 THS PAGE DECLASSFED AW EO 2958 THS PAGE DECLASSFED AW EO 2958 THS
More information4.1 Schrödinger Equation in Spherical Coordinates
Phs 34 Quu Mehs D 9 9 Mo./ Wed./ Thus /3 F./4 Mo., /7 Tues. / Wed., /9 F., /3 4.. -. Shodge Sphe: Sepo & gu (Q9.) 4..-.3 Shodge Sphe: gu & d(q9.) Copuo: Sphe Shodge s 4. Hdoge o (Q9.) 4.3 gu Moeu 4.4.-.
More informationThe sphere of radius a has the geographical form. r (,)=(acoscos,acossin,asin) T =(p(u)cos v, p(u)sin v,q(u) ) T.
Che 5. Dieeil Geome o Sces 5. Sce i meic om I 3D sce c be eeseed b. Elici om z =. Imlici om z = 3. Veco om = o moe geel =z deedig o wo mees. Emle. he shee o dis hs he geoghicl om =coscoscossisi Emle. he
More informationCLAIM No, HOLE No, FOOTAGE
DIAMND DRILLING ARNLD TWNSHIP! Ad REPRT N; WRK PERFRMED BY: Wm Lk CLAIM N HLE N FTAGE L 63 A82 553 DATE NTE Ag/82 ) NTES! ) #2983 A IN! ~S) L 6/3 A CMA L C /v Pbem Pge The g pge hs dme hd pbem whe sed
More informationMathematical model for sounding rockets, using attitude and rotation angles
ssue Voue 3 9 35 Me oe o sou oes us ue oo es eoo-voe eu * s Bbu bs - e e uose s o ese soe ses e e uus oe e souos o use sou oes use o es s eue se esuees. e uus eooo osss ue suo o sou oe evouo o ee s oos.
More informationIntroduction to Finite Element Method
p. o C d Eo E. Iodo o E Mod s H L p. o C d Eo E o o s Ass L. o. H L p://s.s.. p. o C d Eo E. Cos. Iodo. Appoo o os & o Cs. Eqos O so. Mdso os-es 5. szo 6. wo so Es os 7. os ps o Es 8. Io 9. Co C Isop E.
More informationChapter 1 Fundamentals in Elasticity
Fs s . Ioo ssfo of ss Ms 분체역학 G Ms 역학 Ms 열역학 o Ms 유체역학 F Ms o Ms 고체역학 o Ms 구조해석 ss Dfo of Ms o B o w oo of os o of fos s s w o s s. Of fs o o of oo fos os o o o. s s o s of s os s o s o o of fos o. G fos
More informationDividing Algebraic Fractions
Leig Eheme Tem Model Awe: Mlilig d Diidig Algei Fio Mlilig d Diidig Algei Fio d gide ) Yo e he me mehod o mlil lgei io o wold o mlil meil io. To id he meo o he we o mlil he meo o he io i he eio. Simill
More informationLife After Study Abroad
f oe oab o C P p H book F 6 F Y 6 7 P5-URF : P os S yab o C Op p o s I f o m o sb o s soff b y 6 ss b j o g P o ob yd P g o( T5 7 N os ) k Rom I y Lf Af Sy Abo INTRODUCTION Pps yo'v b ookg fow o sy bo
More informationH STO RY OF TH E SA NT
O RY OF E N G L R R VER ritten for the entennial of th e Foundin g of t lair oun t y on ay 8 82 Y EEL N E JEN K RP O N! R ENJ F ] jun E 3 1 92! Ph in t ed b y h e t l a i r R ep u b l i c a n O 4 1922
More informationTechnical Appendix for Inventory Management for an Assembly System with Product or Component Returns, DeCroix and Zipkin, Management Science 2005.
Techc Appedx fo Iveoy geme fo Assemy Sysem wh Poduc o Compoe eus ecox d Zp geme Scece 2005 Lemm µ µ s c Poof If J d µ > µ he ˆ 0 µ µ µ µ µ µ µ µ Sm gumes essh he esu f µ ˆ > µ > µ > µ o K ˆ If J he so
More informationComputer Aided Geometric Design
Copue Aided Geoei Design Geshon Ele, Tehnion sed on ook Cohen, Riesenfeld, & Ele Geshon Ele, Tehnion Definiion 3. The Cile Given poin C in plne nd nue R 0, he ile ih ene C nd dius R is defined s he se
More information15/03/1439. Lecture 4: Linear Time Invariant (LTI) systems
Lecre 4: Liner Time Invrin LTI sysems 2. Liner sysems, Convolion 3 lecres: Implse response, inp signls s coninm of implses. Convolion, discree-ime nd coninos-ime. LTI sysems nd convolion Specific objecives
More informationCANADIAN RAILROAD HISTORICAL ASSOCIATION
NDN RROD HSOR SSOON NOEOED NOEORD MONRE ND MONREND E ::fs S R:: ROH :; OH NO NO 63 - -- --- - ---------- ---- -- -- - 956 G ::6 ; - R HY NO E OF N N :S!;G NG : MGg R M g R H w b H m 92 py - B : p j Dg
More information4. Runge-Kutta Formula For Differential Equations
NCTU Deprme o Elecrcl d Compuer Egeerg 5 Sprg Course by Pro. Yo-Pg Ce. Ruge-Ku Formul For Derel Equos To solve e derel equos umerclly e mos useul ormul s clled Ruge-Ku ormul
More informationT T V e g em D e j ) a S D } a o "m ek j g ed b m "d mq m [ d, )
. ) 6 3 ; 6 ;, G E E W T S W X D ^ L J R Y [ _ ` E ) '" " " -, 7 4-4 4-4 ; ; 7 4 4 4 4 4 ;= : " B C CA BA " ) 3D H E V U T T V e g em D e j ) a S D } a o "m ek j g ed b m "d mq m [ d, ) W X 6 G.. 6 [ X
More informationReconfigurable Takagi Sugeno Fuzzy Logic Control for a Class of Nonlinear System considering Communication Time Delays on Peripheral Elements
Reonfbe Seno Fzzy Lo Conto fo Css of onne System onsden Commnton me Deys on ee Eements enítez-éez H.*, Cádens-Foes F. nd Gí-oett F., bstt odys te stdy of fts nd te onseenes beomes n sse nto y sfety t omte
More informationAppendix. In the absence of default risk, the benefit of the tax shield due to debt financing by the firm is 1 C E C
nx. Dvon o h n wh In h sn o ul sk h n o h x shl u o nnng y h m s s h ol ouon s h num o ssus s h oo nom x s h sonl nom x n s h v x on quy whh s wgh vg o vn n l gns x s. In hs s h o sonl nom xs on h x shl
More information, _ _. = - . _ 314 TH COMPOSITE I G..., 3 RD BOM6ARDMENT GROUP ( L 5 TH AIR FORCE THIS PAGE DECLASSIFIED IAW EO z g ; ' ' Y ' ` ' ; t= `= o
THS PAGE DECLASSFED AW EO 2958 90 TH BOMBARDMENT SQUADRON L UNT HSTORY T c = Y ` ; ; = `= o o Q z ; ; 3 z " ` Y J 3 RD BOM6ARDMENT GROUP ( L 34 TH COMPOSTE G 5 TH AR FORCE THS PAGE DECLASSFED AW EO 2958
More informationThree Dimensional Coordinate Geometry
HKCWCC dvned evel Pure Mhs. / -D Co-Geomer Three Dimensionl Coordine Geomer. Coordine of Poin in Spe Z XOX, YOY nd ZOZ re he oordine-es. P,, is poin on he oordine plne nd is lled ordered riple. P,, X Y
More information{nuy,l^, W%- TEXAS DEPARTMENT OT STATE HEALTH SERVICES
TXAS DARTMT T STAT AT SRVS J RSTDT, M.D. MMSSR.. Bx 149347 Astn, T exs 7 87 4 93 47 18889371 1 TTY: l800732989 www.shs.stte.tx.s R: l nmtn n mps Webstes De Spentenent n Shl Amnsttn, eby 8,201 k 2007, the
More information4/3/2017. PHY 712 Electrodynamics 9-9:50 AM MWF Olin 103
PHY 7 Eleodnais 9-9:50 AM MWF Olin 0 Plan fo Leue 0: Coninue eading Chap Snhoon adiaion adiaion fo eleon snhoon deies adiaion fo asonoial objes in iula obis 0/05/07 PHY 7 Sping 07 -- Leue 0 0/05/07 PHY
More informationTHIS PAGE DECLASSIFIED IAW E
THS PAGE DECLASSFED AW E0 2958 BL K THS PAGE DECLASSFED AW E0 2958 THS PAGE DECLASSFED AW E0 2958 B L K THS PAGE DECLASSFED AW E0 2958 THS PAGE DECLASSFED AW E0 2958 BL K THS PAGE DECLASSFED AW E0 2958
More informationP-Convexity Property in Musielak-Orlicz Function Space of Bohner Type
J N Sce & Mh Res Vol 3 No (7) -7 Alble ole h://orlwlsogocd/deh/sr P-Coey Proery Msel-Orlcz Fco Sce o Boher ye Yl Rodsr Mhecs Edco Deree Fcly o Ss d echology Uerss sl Neger Wlsogo Cerl Jdoes Absrcs Corresodg
More informationJackson County 2013 Urban Redevelopment Plan (Future Land Use Comparison): 1. Agribusiness/Valentine Industrial Area
Jacson ounty 2013 Urban edevelopment Plan (Future and Use omparison): 1. Agribusiness/alentine ndustrial Area esidential Public nstitutional PS M O SE ndustrial Transportation/ommunications/Utilities H
More informationInvert and multiply. Fractions express a ratio of two quantities. For example, the fraction
Appendi E: Mnipuling Fions Te ules fo mnipuling fions involve lgei epessions e el e sme s e ules fo mnipuling fions involve numes Te fundmenl ules fo omining nd mnipuling fions e lised elow Te uses of
More informationThose Were the Days. k k k k k k k dk k j n. j d jj. k k k k k k k k. k n
Those Were the Dys Mry Hopins 노래 5 8 G =89 1 절 d n Once u- pon time there ws t - vern 옛날한때술집이있었지 d n n d d d z Where we used to rise gss or two Re - mem- er how we ughed -wy the 술한두잔들던곳이야기억해, 웃으며보낸시 dii
More informationChapter Simpson s 1/3 Rule of Integration. ( x)
Cper 7. Smpso s / Rule o Iegro Aer redg s per, you sould e le o. derve e ormul or Smpso s / rule o egro,. use Smpso s / rule o solve egrls,. develop e ormul or mulple-segme Smpso s / rule o egro,. use
More informationOH BOY! Story. N a r r a t iv e a n d o bj e c t s th ea t e r Fo r a l l a g e s, fr o m th e a ge of 9
OH BOY! O h Boy!, was or igin a lly cr eat ed in F r en ch an d was a m a jor s u cc ess on t h e Fr en ch st a ge f or young au di enc es. It h a s b een s een by ap pr ox i ma t ely 175,000 sp ect at
More information". :'=: "t',.4 :; :::-':7'- --,r. "c:"" --; : I :. \ 1 :;,'I ~,:-._._'.:.:1... ~~ \..,i ... ~.. ~--~ ( L ;...3L-. ' f.':... I. -.1;':'.
= 47 \ \ L 3L f \ / \ L \ \ j \ \ 6! \ j \ / w j / \ \ 4 / N L5 Dm94 O6zq 9 qmn j!!! j 3DLLE N f 3LLE Of ADL!N RALROAD ORAL OR AL AOAON N 5 5 D D 9 94 4 E ROL 2LL RLLAY RL AY 3 ER OLLL 832 876 8 76 L A
More informationA.dr.rwarded to foreiirti count rie will be f 7 SOperann.. rsri--.-j- -.?- .JULY. 12, lsiii).,11,111. yc:tl crst.iif. lit. J. lor Sale... Kb l.
E E b g b E x Y b p p g b 2 x $ p 2 p p 6 p x b b p x p pp 5 b x b p Y Yg g pg 2 Dp g pb? xp p g G 2 p p x D D p 59 E 9pp b b x xp D p p? 8 5 2 pp E x z b x? p p Z 2 p p x p 9 p x p p EE E EY E G E p EQ
More information1 "BUZZ BO B" (GER AN DESIGNATION ZG - 76) V, - 2 ROCKET (GERMAN DESIGNATION A - 4) X 4 AND X, - 7 A TO AIR I SILES HS, -
H S PA G E D E CA SSFED AW E O 2958 Ke o ao S Pb c Recod Ma AR MA E E COMMA D Doc e Rcvd Re 98 2 07 pe C Nmbe 3 V 2 dexe D38 Eeed Dae N be 0 4 2 3 6 D d Da e Acces o Noe REF 0 42350 Od A cesso Nb 2773
More information-HYBRID LAPLACE TRANSFORM AND APPLICATIONS TO MULTIDIMENSIONAL HYBRID SYSTEMS. PART II: DETERMINING THE ORIGINAL
UPB Sc B See A Vo 72 I 3 2 ISSN 223-727 MUTIPE -HYBRID APACE TRANSORM AND APPICATIONS TO MUTIDIMENSIONA HYBRID SYSTEMS PART II: DETERMININ THE ORIINA Ve PREPEIŢĂ Te VASIACHE 2 Ace co copeeă oă - pce he
More informationInstruction Sheet COOL SERIES DUCT COOL LISTED H NK O. PR D C FE - Re ove r fro e c sed rea. I Page 1 Rev A
Instruction Sheet COOL SERIES DUCT COOL C UL R US LISTED H NK O you or urc s g t e D C t oroug y e ore s g / as e OL P ea e rea g product PR D C FE RES - Re ove r fro e c sed rea t m a o se e x o duct
More informationChapter 5. Long Waves
ape 5. Lo Waes Wae e s o compaed ae dep: < < L π Fom ea ae eo o s s ; amos ozoa moo z p s ; dosac pesse Dep-aeaed coseao o mass
More informationMill Ashman Writes Home: rivalry Keeping Him Busy. Septet
SE COLLEGE NEWS FRDY SEEBER 22 96 GE 8 + + O S B Cb S G S B Y C B WEELER B Lb < S F? E G K B b b L 62 R C 62 - b Bb Bb K B 63 W S C S S - b C S b - S W 8 C S C B C DR 62 - S Lb S D C O D S 62 -B b - R
More informationAN ALGEBRAIC APPROACH TO M-BAND WAVELETS CONSTRUCTION
AN ALGEBRAIC APPROACH TO -BAN WAELETS CONSTRUCTION Toy L Qy S Pewe Ho Ntol Lotoy o e Peeto Pe Uety Be 8 P. R. C Att T e eet le o to ott - otool welet e. A yte of ott eto ote fo - otool flte te olto e o
More information4. Runge-Kutta Formula For Differential Equations. A. Euler Formula B. Runge-Kutta Formula C. An Example for Fourth-Order Runge-Kutta Formula
NCTU Deprme o Elecrcl d Compuer Egeerg Seor Course By Pro. Yo-Pg Ce. Ruge-Ku Formul For Derel Equos A. Euler Formul B. Ruge-Ku Formul C. A Emple or Four-Order Ruge-Ku Formul
More informationand ALiTO SOLO LOWELL, MICHIGAN, THURSDAY, AUGUST 9, 1928 First Results of the 1928 Nationwide Presidential Poll
E E XXX E Y! D 22 5 Q G Y G Y D G G q - YEE 24-? G Y E x - E Q- E 7// < D D D G E G D - 2 ; - j E ; (z ; 4 2 z 5 q z: G $7 z: $5 z: $3 E G DY G 9 928 54 Y! 8! GEG : : ; j: D - DY DY G z D zz!!!-! G E DDED
More informationExecutive Committee and Officers ( )
Gifted and Talented International V o l u m e 2 4, N u m b e r 2, D e c e m b e r, 2 0 0 9. G i f t e d a n d T a l e n t e d I n t e r n a t i o n a2 l 4 ( 2), D e c e m b e r, 2 0 0 9. 1 T h e W o r
More informationPDF hosted at the Radboud Repository of the Radboud University Nijmegen
DF hoed he Rdbod Reoo o he Rdbod e Nege The oog ex bhe eo Fo ddo oo bo h bo k h k hhdhdee266238 ee be ded h h oo geeed o 226 d be be o hge Oxd hohk ee ee d e) e He h e He odge Reheek" Kh ee e Roe Cho Rohe
More informationw x a f f s t p q 4 r u v 5 i l h m o k j d g DT Competition, 1.8/1.6 Stainless, Black S, M, L, XL Matte Raw/Yellow
HELION CARBON TEAM S, M, L, XL M R/Y COR XC Py, FOC U Cn F, 110 T Innn Dn 27. AOS Snn Sy /F Ln, P, 1 1/8"-1 1/2" In H T, n 12 12 M D F 32 FLOAT 27. CTD FIT /A K, 110 T, 1QR, / FIT D, L & Rn A, T Ay S DEVICE
More informationP a g e 5 1 of R e p o r t P B 4 / 0 9
P a g e 5 1 of R e p o r t P B 4 / 0 9 J A R T a l s o c o n c l u d e d t h a t a l t h o u g h t h e i n t e n t o f N e l s o n s r e h a b i l i t a t i o n p l a n i s t o e n h a n c e c o n n e
More informationComparison between the Discrete and Continuous Time Models
Comparison beween e Discree and Coninuous Time Models D. Sulsky June 21, 2012 1 Discree o Coninuous Recall e discree ime model Î = AIS Ŝ = S Î. Tese equaions ell us ow e populaion canges from one day o
More informationObservations on the transcendental Equation
IOSR Jourl o Mecs IOSR-JM e-issn: 78-78-ISSN: 9-7 Volue 7 Issue Jul. - u. -7 www.osrjourls.or Oservos o e rscedel Euo M..Gol S.Vds T.R.Us R Dere o Mecs Sr Idr Gd Collee Trucrll- src: Te rscedel euo w ve
More informationMonday, July First, And continues until further notice.
4 E N % q * - z P q ««- V * 5 Z V E V 3 7 2 4 8 9 E KN YNG P E K G zz -E P * - PEZZ 23-48 G z : P P 78 N P K - - Q P - 8 N! - P - P 8 8 E E-*«- - 3 4 : G P - G N K P P Q* N N 23 E 2 *8342 P 23 2552 2K
More informationAn action with positive kinetic energy term for general relativity. T. Mei
An ton wt post nt ny t fo n tty T (Dptnt of Jon Cnt Cn o Unsty Wn H PRO Pop s Rp of Cn E-: to@nn tow@pwn ) Astt: At fst w stt so sts n X: 7769 n tn sn post nt ny oont onton n y X: 7769 w psnt n ton wt
More informationUC Berkeley Department of Electrical Engineering and Computer Science. EE 126: Probablity and Random Processes. Problem Set 8 Fall 2007
UC Berkeley Department of Electrical Engineering and Computer Science EE 6: Probablity and Random Processes Problem Set 8 Fall 007 Issued: Thursday, October 5, 007 Due: Friday, November, 007 Reading: Bertsekas
More informationBeechwood Music Department Staff
Beechwood Music Department Staff MRS SARAH KERSHAW - HEAD OF MUSIC S a ra h K e rs h a w t r a i n e d a t t h e R oy a l We ls h C o l le g e of M u s i c a n d D ra m a w h e re s h e ob t a i n e d
More information6.041/6.431 Fall 2010 Quiz 2 Solutions
6.04/6.43: Probabilistic Systems Analysis (Fall 200) 6.04/6.43 Fall 200 Quiz 2 Solutions Problem. (80 points) In this problem: (i) X is a (continuous) uniform random variable on [0, 4]. (ii) Y is an exponential
More informationCSE590B Lecture 4 More about P 1
SE590 Lece 4 Moe abo P 1 Tansfoming Tansfomaions James. linn Jimlinn.om h://coses.cs.washingon.ed/coses/cse590b/13a/ Peviosly On SE590b Tansfomaions M M w w w w w The ncion w w w w w w 0 w w 0 w 0 w The
More informationFOR MORE PAPERS LOGON TO
IT430 - E-Commerce Quesion No: 1 ( Marks: 1 )- Please choose one MAC sand for M d a A ss Conro a M d a A ss Consor M r of As an Co n on of s Quesion No: 2 ( Marks: 1 )- Please choose one C oos orr HTML
More informationTemperature Controller E5CB (48 48 mm)
C ECB ( ) B f f b w v f y f y qk by f b y (,) ww z y v f fw Sy f S y w f y B y ' q PD f Sfy P / F ECB D Dy Dy S P y : ±% f PV P : ±% f PV S P C y V (f v SS) Nb S Nb L ECB@@@ C : y : VC, Q: V (f v SS):
More informationModelling of A Helicopter System
Modn of A Ho m nn u of nnn n Unv o London London W 6B, U -m: nn@uu Ab ond modn nd muon ud of o m UH-6 B H o Mm mod of n mn oo o nd n o onvnn of non, fo nd momn on of vou o omonn vn n o bd n mod o mod of
More informationieski. a n d H. A. Lange.
G 34 D 0 D 90 : 5S D Vz S D NEWS W Vz z F D < - ;»( S S C S W C - z z! L D F F V Q4 R U O G P O N G-34 q O G
More informationFIRST PART OF BOXER NAME FIRST PART OF BOXER NAME FIRST PART OF BOXER NAME FIRST PART OF BOXER NAME. Find the initial of your first name!
M L L O P B O V D 1 0 1 4 1 8 W K # 4 O N H O H O D Y C N M 9 1 5/1 0 4 5 P P L D O N 1 5M N B nb /N m /N N m n o/ h p o n w h ou d ndp p hm f o hd P V C Wh Y oundb nb WHY ODO b n odu n ou f ndw om n d
More informationBEACH PLACE APARTMENTS 29th STREET AND ARCTIC AVENUE VIRGINIA BEACH, VIRGINIA
S WNS N NO US, OP, O POU, N WO O P O NN W SO V WOU PSSON O NU SN SSOS NN NO O US O U ONSUON OON P P PNS th S N VNU VN, VN VNY P UON O UN YPS OO (UN ) Sheet ist 0.0 S 0. U VONS, SYOS, N NOS 0. O NOON 0.
More information176 5 t h Fl oo r. 337 P o ly me r Ma te ri al s
A g la di ou s F. L. 462 E l ec tr on ic D ev el op me nt A i ng er A.W.S. 371 C. A. M. A l ex an de r 236 A d mi ni st ra ti on R. H. (M rs ) A n dr ew s P. V. 326 O p ti ca l Tr an sm is si on A p ps
More informationSSSf. 2 Were Killed' RepresentnUvesrl
5 5 5 $ FORONWO R F W F R R R x & $ % F 5) = 96 W D D F W 2 W R x W R W W Nx z W 50 YNO OF N O ) ORD OF FRODR 000 [ N Y R F D N 2 9 W & O N Y R R 50 O 0 R D 5& x8 R [ W R D 49 9 q O D R Q F R 500000 &
More information- l ost found upr i ght, dr i f t i n= i - Stand i ng i s boa t, star t i ng eng i nes and
. pesena i on of 1975 and 1977 Raoo ed 3oe i n faa l i i es pevenab l e 1 a l l Sw i ch- MARCH 1979 1. UCUCR0m The ques i on of k i l l av i chea, dead man ho l es, and e he asss of sopp i ng unway boa
More informationME 141. Engineering Mechanics
ME 141 Engineeing Mechnics Lecue 13: Kinemics of igid bodies hmd Shhedi Shkil Lecue, ep. of Mechnicl Engg, UET E-mil: sshkil@me.bue.c.bd, shkil6791@gmil.com Websie: eche.bue.c.bd/sshkil Couesy: Veco Mechnics
More informationCh. 22: Classical Theory of Harmonic Crystal
C. : Clssl Toy o mo Cysl gl o ml moo o o os l s ld o ls o pl ollowg:. Eqlbm Pops p o ls d Islos Eqlbm sy d Cos Egs Tml Epso d lg. Tspo Pops T pd o lo Tm Fl o Wdm-Fz Lw pody Tml Cody o Islos Tsmsso o od.
More informationSB4223E00 Nov Schematic. Lift Trucks Electric System D110S-5, D130S-5, D160S-5
E00 Nov.00 chematic ift Trucks Electric ystem D0, D0, D0 ETIEE for Engine tart & harging ystem / IITION WIT / 0 / / / / Warning amp GE / 0 FUE OX / X ED D D D D EP EP EP F N INTEOK EY 0 a / / D X D D IUIT
More informationAPPLICATION INSTRUC TIONS FOR THE
APPLICATION INSTRUC TIONS FOR THE DAISY HOPSCOTCH Pro duc t Numb e r: 12-2W-03 SIZE: a p p ro xima te ly 14 fe e t hig h x 4 fe e t wid e. ESTIMATED PAINT TIME: a p p ro xima te ly 1 2 p e o p le fo r
More informationChapter 1 Fundamentals in Elasticity
Fs s ν . Ioo ssfo of ss Ms 분체역학 G Ms 역학 Ms 열역학 o Ms 유체역학 F Ms o Ms 고체역학 o Ms 구조해석 ss Dfo of Ms o o w oo of os o of fos s s w o s s. Of fs o o of oo fos os o o o. s s o s of s os s o s o o of fos o. G fos
More informationA simple 2-D interpolation model for analysis of nonlinear data
Vol No - p://oog//n Nl Sn A mpl -D npolon mol o nl o nonln M Zmn Dpmn o Cvl Engnng Fl o nolog n Engnng Yo Unv Yo In; m@ml Rv M ; v Apl ; p M ABSRAC o mnon volm n wg o nonnom o n o po vlon o mnng n o ng
More informationRequired: Solution: 1.4)
CHAER.) ) 000 000 000 00 k b) 000, 000W 000,000 W 000,000 W 00, 000 W W ) d) k 8.... s 4... s.) 8 r nn n s 9 s p p p.) Gen:.4) n 9 r re r re / dy / r re n n / s dy ) 8 b) nn dy 4 0 0se nds dy 8400s r re
More information