UBI External Keyboard Technical Manual
|
|
- Nancy Johnston
- 5 years ago
- Views:
Transcription
1 UI Eer eyor ei u EER IORIO ppiio o Ue ouiio e Eer eyor rie uer i R 232 eyor iee or oeio o e re o UI Eyoer prier Eyoer 11 Eyoer 21 II Eyoer 41 Eyoer 1 Eyoer 1 e eyor o e ue or oer UI prier e e up or e orre ype o ouiio e eyor i opie wi e preiou ype o eer eyor rie o 1291 e eyor ue e oowi ouiio preer Iere R 232 u re 9 Priy oe rer e 8 op i 2 e eyor ouiio e i ie wi ee 2 oeor wire oow Pi 1 o ue Pi 2 R i Pi 3 ou Pi 4 o ue Pi i rou Pi 8 1 o ue Pi 1 u e ee y rp i e prier ee eow Pi 12 o ue e oeor i e r eri por ur1 o prier e eri por ur3 o e eri Iere or or R Iere or or Eyoer 21 II Eyoer 1 Eyoer 1 oe e eyor require ro e prier wi u e ee y rp o e PUor or iere or ee e ei u or e prier oe i queio UI Eer eyor ei u Eiio 2 pri 199 rie o Iorio i i u i ue o e wiou prior oie oe o repree oie o e pr o UI Prier opyri UI Prier 199 ri reere Puie i wee Eyoer i rer o Uie roe Iurie UI 1
2 UI Eer eyor ei u EYOR PPI Uie e Eer eyor i r opuer eyor wi ee oere o proue rer ori o UI peiiio ereore oe ey re ie were oer re ere wi iei eiio eow you wi i iurio o e eyor were e ei II rer proue y e riou ey or ey oiio re peiie or iorio o ow o ue e eyor i oeio wi Eyoer II or 1 prier pee reer o e u UI oe oep Operi Iruio u erie e preiou ype o eyor u e ew eyor i or pri purpoe uy opie i ey
3 UI Eer eyor ei u EYOR PPI o ey e ey i ue o proue ir rer i iio o e uie ie rer i oiio wi u ey re ere o e ro ie re wi oe o oer ey e i r or ou e ie iueouy r ey r r e eyor o proue uprie rer i e re eow II 32 ei oe o ee rer re reiy ie o eie ey were oer e proue y prei e r ey i oeio wi oer ey re wi iio o oer oro ey e i or o oequee 3
4 UI Eer eyor ei u EYOR PPI o ey E Pri ree Pue } \ Ier oe Pe Up Q W E R Y U I O P Ö Ä Å ^ ~ eee E Pe ow oe PUp 4 r < r E P I e Eer e ey e e ey re wi i e iurio oe We i ie oe rer o e ee ey wi e uppere I oiio wi i e ee rer owere iio o y oer oro rer e r or o oequee ie ey E Pri ree Pue } \ Ier oe Pe Up Q W E R Y U I O P Ö Ä Å ^ ~ eee E Pe ow oe PUp 4 r < r E P I e Eer rer e ie W prie rer eri ey wi proue epe o e eee rer e i e prier eu Ro 8 You ee oer rer e y e o e ee ee e UI ierpri u e riou rer e re ie o e pe oow Uie 4
5 UI Eer eyor ei u EYOR PPI o Ro 8 rer e 1 } \ O P ] ~ o p } ^ ~ \ 4 < re io rer e 33 2 à é 8 9 è ç µ O P o p è ^ ~ ç ù é 4 < ù pi io rer e ç Ñ O P ~ o p ç ^ ~ Ñ ñ 4 < ñ
6 UI Eer eyor ei u EYOR PPI o Ii io rer e 39 2 à 8 9 é è ç ù O P é Ì o p è ^ ~ ç ò à 4 < ò Ei U io rer e 44 } \ O P ] o p } ^ ~ \ 4 < wei io rer e 4 2 É 4 ä 8 Ä 9 Å å Ö é O P Å ü o p å Ü ~ Ö ö Ä ä 4 < ö
7 UI Eer eyor ei u EYOR PPI o orwei io rer e 4 æ 8Æ 9 Å å Ø O P Å o p å ^ ~ Ø ø Æ æ 4 < ø er io rer e 49 2 ä 8 Ä 9 Ü ü Ö O P Ü ß o p ü ^ ~ Ö ö Ä ä 4 < ö pee i rer e 81 } O P ] ~ o p } ^ ~ 4 <
8 UI Eer eyor ei u EYOR PPI o Poruuee io rer e 81 2 ã 8 Ã 9 Õ õ Ç O P Õ o p õ ^ ~ Ç ç Ã ã 4 < ç PP rer e 1 } \ O P ] ~ o p } ^ 4 \ 4 < 4 I rer e 2 ø 2! 1 3» } \ O P ] ~ o p } ^ \ 4 < 8
! " # $! % & '! , ) ( + - (. ) ( ) * + / 0 1 2 3 0 / 4 5 / 6 0 ; 8 7 < = 7 > 8 7 8 9 : Œ Š ž P P h ˆ Š ˆ Œ ˆ Š ˆ Ž Ž Ý Ü Ý Ü Ý Ž Ý ê ç è ± ¹ ¼ ¹ ä ± ¹ w ç ¹ è ¼ è Œ ¹ ± ¹ è ¹ è ä ç w ¹ ã ¼ ¹ ä ¹ ¼ ¹ ±
More informationF O R SOCI AL WORK RESE ARCH
7 TH EUROPE AN CONFERENCE F O R SOCI AL WORK RESE ARCH C h a l l e n g e s i n s o c i a l w o r k r e s e a r c h c o n f l i c t s, b a r r i e r s a n d p o s s i b i l i t i e s i n r e l a t i o n
More informationDETAIL MEASURE EVALUATE
MEASURE EVALUATE B I M E q u i t y BIM Workflow Guide MEASURE EVALUATE Introduction We o e to ook 2 i t e BIM Workflow Guide i uide wi tr i you i re ti ore det i ed ode d do u e t tio u i r i d riou dd
More informationClicks, concurrency and Khoisan
Poooy 31 (2014). Sueey ei Cic, cocuecy Koi Jui Bie Uiveiy o Eiu Sueey ei Aeix: Tciio Ti Aeix y ou e coex ei ioy o oio ue o e ou o!xóõ i e iy ouce. 1 Iii o-cic Te o-cic iii e oy ii o oe ue, o ee i ie couio
More informationETIKA V PROFESII PSYCHOLÓGA
P r a ž s k á v y s o k á š k o l a p s y c h o s o c i á l n í c h s t u d i í ETIKA V PROFESII PSYCHOLÓGA N a t á l i a S l o b o d n í k o v á v e d ú c i p r á c e : P h D r. M a r t i n S t r o u
More informationAn Example file... log.txt
# ' ' Start of fie & %$ " 1 - : 5? ;., B - ( * * B - ( * * F I / 0. )- +, * ( ) 8 8 7 /. 6 )- +, 5 5 3 2( 7 7 +, 6 6 9( 3 5( ) 7-0 +, => - +< ( ) )- +, 7 / +, 5 9 (. 6 )- 0 * D>. C )- +, (A :, C 0 )- +,
More informationUNIQUE FJORDS AND THE ROYAL CAPITALS UNIQUE FJORDS & THE NORTH CAPE & UNIQUE NORTHERN CAPITALS
Q J j,. Y j, q.. Q J & j,. & x x. Q x q. ø. 2019 :. q - j Q J & 11 Y j,.. j,, q j q. : 10 x. 3 x - 1..,,. 1-10 ( ). / 2-10. : 02-06.19-12.06.19 23.06.19-03.07.19 30.06.19-10.07.19 07.07.19-17.07.19 14.07.19-24.07.19
More informationT i t l e o f t h e w o r k : L a M a r e a Y o k o h a m a. A r t i s t : M a r i a n o P e n s o t t i ( P l a y w r i g h t, D i r e c t o r )
v e r. E N G O u t l i n e T i t l e o f t h e w o r k : L a M a r e a Y o k o h a m a A r t i s t : M a r i a n o P e n s o t t i ( P l a y w r i g h t, D i r e c t o r ) C o n t e n t s : T h i s w o
More informationMEEWASIN VALLEY AUTHORITY CHIEF WHITECAP PARK
IR HILIK EE R K H OO HE HE I H E E LOO PLI PRKI LO (40 LL) O PRK RIL EII RIL O E UPRE IY O KOO EE - O PRK EEI R RIL EEI VLLEY UHORIY HIE HIEP PRK LI O RI O PRK (80 acres) RE-VEEE REQUIRE (URLIZE ) EII
More informationFramework for functional tree simulation applied to 'golden delicious' apple trees
Purdue University Purdue e-pubs Open Access Theses Theses and Dissertations Spring 2015 Framework for functional tree simulation applied to 'golden delicious' apple trees Marek Fiser Purdue University
More informationOC330C. Wiring Diagram. Recommended PKH- P35 / P50 GALH PKA- RP35 / RP50. Remarks (Drawing No.) No. Parts No. Parts Name Specifications
G G " # $ % & " ' ( ) $ * " # $ % & " ( + ) $ * " # C % " ' ( ) $ * C " # C % " ( + ) $ * C D ; E @ F @ 9 = H I J ; @ = : @ A > B ; : K 9 L 9 M N O D K P D N O Q P D R S > T ; U V > = : W X Y J > E ; Z
More informationTELEMATICS LINK LEADS
EEAICS I EADS UI CD PHOE VOICE AV PREIU I EADS REQ E E A + A + I A + I E B + E + I B + E + I B + E + H B + I D + UI CD PHOE VOICE AV PREIU I EADS REQ D + D + D + I C + C + C + C + I G G + I G + I G + H
More informationSwords/Airport Ú City Centre Route Maps
/p Ú p lb p b l v b f p Ú lb EWOW O l b l l E l E l pl E Þ lf IO bl W p E lb EIWY V WO p E IIE W O p EUE UE O O IEE l l l l v V b l l b vl pp p l W l E v Y W IE l bb IOW O b OE E l l ' l bl E OU f l W
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 informationB œ c " " ã B œ c 8 8. such that substituting these values for the B 3 's will make all the equations true
System of Linear Equations variables Ð unknowns Ñ B" ß B# ß ÞÞÞ ß B8 Æ Æ Æ + B + B ÞÞÞ + B œ, "" " "# # "8 8 " + B + B ÞÞÞ + B œ, #" " ## # #8 8 # ã + B + B ÞÞÞ + B œ, 3" " 3# # 38 8 3 ã + 7" B" + 7# B#
More informationTHE LOWELL LEDGER, INDEPENDENT NOT NEUTRAL.
E OE EDGER DEEDE O EUR FO X O 2 E RUO OE G DY OVEER 0 90 O E E GE ER E ( - & q \ G 6 Y R OY F EEER F YOU q --- Y D OVER D Y? V F F E F O V F D EYR DE OED UDER EDOOR OUE RER (E EYEV G G R R R :; - 90 R
More informationJuan Juan Salon. EH National Bank. Sandwich Shop Nail Design. OSKA Beverly. Chase Bank. Marina Rinaldi. Orogold. Mariposa.
( ) X é X é Q Ó / 8 ( ) Q / ( ) ( ) : ( ) : 44-3-8999 433 4 z 78-19 941, #115 Z 385-194 77-51 76-51 74-7777, 75-5 47-55 74-8141 74-5115 78-3344 73-3 14 81-4 86-784 78-33 551-888 j 48-4 61-35 z/ zz / 138
More information. ffflffluary 7, 1855.
x B B - Y 8 B > ) - ( vv B ( v v v (B/ x< / Y 8 8 > [ x v 6 ) > ( - ) - x ( < v x { > v v q < 8 - - - 4 B ( v - / v x [ - - B v B --------- v v ( v < v v v q B v B B v?8 Y X $ v x B ( B B B B ) ( - v -
More informationI118 Graphs and Automata
I8 Graphs and Automata Takako Nemoto http://www.jaist.ac.jp/ t-nemoto/teaching/203--.html April 23 0. Û. Û ÒÈÓ 2. Ø ÈÌ (a) ÏÛ Í (b) Ø Ó Ë (c) ÒÑ ÈÌ (d) ÒÌ (e) É Ö ÈÌ 3. ÈÌ (a) Î ÎÖ Í (b) ÒÌ . Û Ñ ÐÒ f
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 informationThis document has been prepared by Sunder Kidambi with the blessings of
Ö À Ö Ñ Ø Ò Ñ ÒØ Ñ Ý Ò Ñ À Ö Ñ Ò Ú º Ò Ì ÝÊ À Å Ú Ø Å Ê ý Ú ÒØ º ÝÊ Ú Ý Ê Ñ º Å º ² ºÅ ý ý ý ý Ö Ð º Ñ ÒÜ Æ Å Ò Ñ Ú «Ä À ý ý This document has been prepared by Sunder Kidambi with the blessings of Ö º
More informationLA PRISE DE CALAIS. çoys, çoys, har - dis. çoys, dis. tons, mantz, tons, Gas. c est. à ce. C est à ce. coup, c est à ce
> ƒ? @ Z [ \ _ ' µ `. l 1 2 3 z Æ Ñ 6 = Ð l sl (~131 1606) rn % & +, l r s s, r 7 nr ss r r s s s, r s, r! " # $ s s ( ) r * s, / 0 s, r 4 r r 9;: < 10 r mnz, rz, r ns, 1 s ; j;k ns, q r s { } ~ l r mnz,
More informationAn Introduction to Optimal Control Applied to Disease Models
An Introduction to Optimal Control Applied to Disease Models Suzanne Lenhart University of Tennessee, Knoxville Departments of Mathematics Lecture1 p.1/37 Example Number of cancer cells at time (exponential
More informationâ, Đ (Very Long Baseline Interferometry, VLBI)
½ 55 ½ 5 Í Vol.55 No.5 2014 9 ACTA ASTRONOMICA SINICA Sep., 2014» Á Çý è 1,2 1,2 å 1,2 Ü ô 1,2 ï 1,2 ï 1,2 à 1,3 Æ Ö 3 ý (1 Á Í 200030) (2 Á Í û À 210008) (3 541004) ÇÅè 1.5 GHz Á è, î Í, û ÓÆ Å ò ½Ò ¼ï.
More informationKlour Q» m i o r L l V I* , tr a d itim i rvpf tr.j UiC lin» tv'ilit* m in 's *** O.hi nf Iiir i * ii, B.lly Q t " '
/ # g < ) / h h #
More informationFebruary 17, 2015 REQUEST FOR PROPOSALS. For Columbus Metropolitan Library. Issued by: Purchasing Division 96 S. Grant Ave. Columbus, OH 43215
F 7, 05 RQU FOR PROPOL P/B & O RFP L 5-006 F L : P D 96 G, OH 435 D : 3, 05 N :00 N (, O L ) W D, P P D, F D : (64) 849-034; F: (64) 849-34 @ RQU FOR PROPOL NRUON L ( L L ) R P ( RFP ) P B P N L 5-006
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 informatione*s EU[8tr r'glt il IIM IITTT D Cl : L25119AP1984PLiC XL719 New GIN: L27029APl 984PLC Bikrafi Keshari Prusty An ISO 9001 Company
[8 i M D S 91 Cpy C : 2119198iC X719 ew : 27029 98C71 9 2 /, M C RD 12, BR HS, HDRBD(x0,D h6 : +91 0 260661 x : +91 0 260660 : hi iid. webib : w.iiih. /SC/ 1 807 0 7h uy, 2018 M. ii bue Vie eide i Seuiie
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 informationPlanning for Reactive Behaviors in Hide and Seek
University of Pennsylvania ScholarlyCommons Center for Human Modeling and Simulation Department of Computer & Information Science May 1995 Planning for Reactive Behaviors in Hide and Seek Michael B. Moore
More information700 STATEMENT OF ECONOMIC
R RM EME EM ERE H E H E HE E HE Y ERK HE Y P PRE MM 8 PUB UME ER PE Pee e k. ek, ME ER ( ) R) e -. ffe, ge, u ge e ( ue ) -- - k, B, e e,, f be Yu P eu RE) / k U -. f fg f ue, be he. ( ue ) ge: P:. Ju
More informationMagic Letterland. Welcome agic. the. Letterland!
Mi Leernd Weme i Leernd! e 5 Mi Leernd / 2. ire nd wrie e eers. s e z e u m mpuer 3. Jin e ds nd ur e piure. 18 17 19 20 21 22 23 24 16 11 25 26 14 15 13 10 12 6 9 1 8 2 3 30 7 4 29 5 28 27 2. ire nd wrie
More information" #$ P UTS W U X [ZY \ Z _ `a \ dfe ih j mlk n p q sr t u s q e ps s t x q s y i_z { U U z W } y ~ y x t i e l US T { d ƒ ƒ ƒ j s q e uˆ ps i ˆ p q y
" #$ +. 0. + 4 6 4 : + 4 ; 6 4 < = =@ = = =@ = =@ " #$ P UTS W U X [ZY \ Z _ `a \ dfe ih j mlk n p q sr t u s q e ps s t x q s y i_z { U U z W } y ~ y x t i e l US T { d ƒ ƒ ƒ j s q e uˆ ps i ˆ p q y h
More informationAutomatic Control III (Reglerteknik III) fall Nonlinear systems, Part 3
Automatic Control III (Reglerteknik III) fall 20 4. Nonlinear systems, Part 3 (Chapter 4) Hans Norlander Systems and Control Department of Information Technology Uppsala University OSCILLATIONS AND DESCRIBING
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 informationMIS For the Month of October,2017
MS r he Mh ber,201 M (/ehi),, ery & Meeri hk wer iibi py iie ) RK/ er ;R r rr K WR SRB MY M e # 4, R # 1 erprie he ee he epe' Repbi Beh) Me.8. 14.0 1.00.00.0 00.201. 19 ie he M (/ ehi). ery & Meeri h hk1212.
More informationjfljjffijffgy^^^ ^--"/.' -'V^^^V'^NcxN^*-'..( -"->"'-;':'-'}^l 7-'- -:-' ""''-' :-- '-''. '-'"- ^ " -.-V-'.'," V'*-irV^'^^amS.
x } < 5 RY REOR RY OOBER 0 930 EER ORE PBE EEEY RY ERE Z R E 840 EG PGE O XXER O 28 R 05 OOG E ERE OOR GQE EOEE Y O RO Y OY E OEY PRE )Q» OY OG OORRO EROO OORRO G 4 B E B E?& O E O EE OY R z B 4 Y R PY
More informationEd S MArket. NarROW } ] T O P [ { U S E R S G U I D E. urrrrrrrrrrrv
Ed S MArket NarROW Q urrrrrrrrrrrv } ] T O P [ { U S E R S G U I D E QUALITY U op e nt y p e fa q: For information on how to access the swashes and alternates, visit LauraWorthingtonType.com/faqs All operating
More informationAdver-isemen- suliber, 8 nries) PLAIN AND FANCT. forrip Sailora. starts, gtorlling5,'tv.to 'gtl. Waikiihalulu Water Lots! LARGE AND COMMODI- -,
E E ERER RER p p p p x p $ p 0 p xp p p p p p p E p q 0 $ p 8 p $ 0 $ E EEER Y R ER 8 E 8 8 p EERE p p p REEREE q 8 Y p p p REEREE x E p Eq R p RE ER ER p x q EE p E E GR G p p 0 0 0 0 p x x p x p q EER
More informationÄ is a basis for V Ä W. Say xi
Groups Fields Vector paces Homework #3 (2014-2015 Answers Q1: Tensor products: concrete examples Let V W be two-dimensional vector spaces with bases { 1 2} v v { } w w o { vi wj} 1 2 Ä is a basis for V
More informationCHAPTER 3 Describing Relationships
CHAPTER 3 Describing Relationships 3.1 Scatterplots and Correlation The Practice of Statistics, 5th Edition Starnes, Tabor, Yates, Moore Bedford Freeman Worth Publishers Scatterplots and Correlation Learning
More informationSCOTT PLUMMER ASHTON ANTONETTI
2742 A E E E, UE, AAAMA 3802 231 EE AEA 38,000-cre dversfed federl cmus 41,000 emloyees wth 72+ dfferent gences UE roosed 80-cre mster-lnned develoment 20 home stes 3,000F of vllgestyle retl 100,000 E
More informationCARTHAGE STADIUM COMPLEX
6 7 0 6 7 R "" R "" R "" R "" YP O: O OOR - R "" RY Y. OPROR RIR I ROO /. PRIR PIPI ROU UP I P Y VOR. OORI WI PUI OROR. 7 6 P6 P P P P P P 7 6 P P P 0 OR ROO 0 OR/ URY 0 0 O' OI 0 O' V P P6 0 RROO P6 P
More informationBooks. Book Collection Editor. Editor. Name Name Company. Title "SA" A tree pattern. A database instance
"! # #%$ $ $ & & & # ( # ) $ + $, -. 0 1 1 1 2430 5 6 78 9 =?
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 informationUCT RPE INTERIOR BUILDOUT 100 % CD SET UTHSCH - UT
U P IIO UIOU U - U 07O 00 annin I P I OUIIO OU P I W I & I O U WII 00 % 07O 0.0 opyright 07 W rchitects, Inc. ouisiana th loor ouston, 70 7 whrarchitects.com U P IIO UIOU 00 % 0.0 VIIO I/PUI YO ( YO OW
More informationS u p e r v i s o r y C o m m i t t e e : T i n a G u r u c h a r r i, C h a i r M a r i a n n e S c h m i n k, M e m b e r
T i e r r a D e s p i e r t a : A S o c i a l a n d P h y s i c a l S t u d y o f t h e A g r i c u l t u r e L a n d i n S a n t a C r u z, G a l a p a g o s, E c u a d o r A F i e l d P r a c t i c u
More informationFinding small factors of integers. Speed of the number-field sieve. D. J. Bernstein University of Illinois at Chicago
The number-field sieve Finding small factors of integers Speed of the number-field sieve D. J. Bernstein University of Illinois at Chicago Prelude: finding denominators 87366 22322444 in R. Easily compute
More informationPeriodic monopoles and difference modules
Periodic monopoles and difference modules Takuro Mochizuki RIMS, Kyoto University 2018 February Introduction In complex geometry it is interesting to obtain a correspondence between objects in differential
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 informationUNIT TEST - I Name :...
UNIT TEST - I Name :... Rank Class :... Section :... Roll No. :... Marks Time : 30 min. Subject : HINDI H.E.P. - 3 Marks : 25 I. Write the letters that come before. 2 x 1 = 2 v) Ù w) II. Write the letters
More informationh : sh +i F J a n W i m +i F D eh, 1 ; 5 i A cl m i n i sh» si N «q a : 1? ek ser P t r \. e a & im a n alaa p ( M Scanned by CamScanner
m m i s t r * j i ega>x I Bi 5 n ì r s w «s m I L nk r n A F o n n l 5 o 5 i n l D eh 1 ; 5 i A cl m i n i sh» si N «q a : 1? { D v i H R o s c q \ l o o m ( t 9 8 6) im a n alaa p ( M n h k Em l A ma
More information$%! & (, -3 / 0 4, 5 6/ 6 +7, 6 8 9/ 5 :/ 5 A BDC EF G H I EJ KL N G H I. ] ^ _ ` _ ^ a b=c o e f p a q i h f i a j k e i l _ ^ m=c n ^
! #" $%! & ' ( ) ) (, -. / ( 0 1#2 ' ( ) ) (, -3 / 0 4, 5 6/ 6 7, 6 8 9/ 5 :/ 5 ;=? @ A BDC EF G H I EJ KL M @C N G H I OPQ ;=R F L EI E G H A S T U S V@C N G H IDW G Q G XYU Z A [ H R C \ G ] ^ _ `
More informationDifferentiating Functions & Expressions - Edexcel Past Exam Questions
- Edecel Past Eam Questions. (a) Differentiate with respect to (i) sin + sec, (ii) { + ln ()}. 5-0 + 9 Given that y =, ¹, ( -) 8 (b) show that = ( -). (6) June 05 Q. f() = e ln, > 0. (a) Differentiate
More informationE0.1 Copyright 2016 CMH Architects, Inc.
IESED PROFESSIO IO HY. O O K E U Project # 8-15-417 Proj. o. 8-15-417 labama uilding ommission o.: / H rchitects, Inc. irmingham, 35243 (205)969-2696 - E (205)969-3930 - FX opyright 2016 H rchitects, Inc.
More informationStrongly r-clean Rings
International Journal of Mathematics and Computer Science, 13(2018), no. 2, 207 214 M CS Strongly r-clean Rings Garima Sharma 1, Amit B. Singh 2 1 Department of Applied Sciences Al-Falah University Faridabad,
More informationI M P O R T A N T S A F E T Y I N S T R U C T I O N S W h e n u s i n g t h i s e l e c t r o n i c d e v i c e, b a s i c p r e c a u t i o n s s h o
I M P O R T A N T S A F E T Y I N S T R U C T I O N S W h e n u s i n g t h i s e l e c t r o n i c d e v i c e, b a s i c p r e c a u t i o n s s h o u l d a l w a y s b e t a k e n, i n c l u d f o l
More information15 hij 60 _ip = 45 = m 4. 2 _ip 1 huo 9 `a = 36m `a/_ip. v 41
Name KEY Math 2 Final Review Unit 7 Trigonometric Functions. A water wheel has a radius of 8 feet. The wheel is rotating at 5 revolutions per minutes. Find the linear speed, in feet per second, of the
More informationVectors. Teaching Learning Point. Ç, where OP. l m n
Vectors 9 Teaching Learning Point l A quantity that has magnitude as well as direction is called is called a vector. l A directed line segment represents a vector and is denoted y AB Å or a Æ. l Position
More informationExamination paper for TFY4240 Electromagnetic theory
Department of Physics Examination paper for TFY4240 Electromagnetic theory Academic contact during examination: Associate Professor John Ove Fjærestad Phone: 97 94 00 36 Examination date: 16 December 2015
More informationMatrices and Determinants
Matrices and Determinants Teaching-Learning Points A matri is an ordered rectanguar arra (arrangement) of numbers and encosed b capita bracket [ ]. These numbers are caed eements of the matri. Matri is
More informationAPPH 4200 Physics of Fluids
APPH 42 Physcs of Fuds Inerna Gravy Waves (Ch 7) 1!! Revew of Surface Gravy Waves 2! Lnear gravy waves whn a connuousy srafed fud (Buoyancy!) 1 Rppes 2 Wave Equaon 4 E ' ' : () f? + ) ; 'j ( ' N '( I v
More informationPART IV LIVESTOCK, POULTRY AND FISH PRODUCTION
! " $#%(' ) PART IV LIVSTOCK, POULTRY AND FISH PRODUCTION Table (93) MAIN GROUPS OF ANIMAL PRODUCTS Production 1000 M.T Numbers 1000 Head Type 2012 Numbers Cattle 54164.5 53434.6 Buffaloes 4304.51 4292.51
More informationName:... Batch:... TOPIC: II (C) 1 sec 3 2x - 3 sec 2x. 6 é ë. logtan x (A) log (tan x) (B) cot (log x) (C) log log (tan x) (D) tan (log x) cos x (C)
Nm:... Bch:... TOPIC: II. ( + ) d cos ( ) co( ) n( ) ( ) n (D) non of hs. n sc d sc + sc é ësc sc ù û sc sc é ë ù û (D) non of hs. sc cosc d logn log (n ) co (log ) log log (n ) (D) n (log ). cos log(
More informationS T A T E B U D G E T : T A X A M E N D M E N T S
i T A X I N F O R M ATION N. 1 J a n u a r y 2 0 1 3 2 0 1 3 S T A T E B U D G E T : T A X A M E N D M E N T S I. I N T R O D U C T I O N................................... 2 I I. P E R S O N A L I N C
More informationMax. Input Power (W) Input Current (Arms) Dimming. Enclosure
Product Overview XI025100V036NM1M Input Voltage (Vac) Output Power (W) Output Voltage Range (V) Output urrent (A) Efficiency@ Max Load and 70 ase Max ase Temp. ( ) Input urrent (Arms) Max. Input Power
More informationTrigonometry (Addition,Double Angle & R Formulae) - Edexcel Past Exam Questions. cos 2A º 1 2 sin 2 A. (2)
Trigonometry (Addition,Double Angle & R Formulae) - Edexcel Past Exam Questions. (a) Using the identity cos (A + B) º cos A cos B sin A sin B, rove that cos A º sin A. () (b) Show that sin q 3 cos q 3
More informationPose Determination from a Single Image of a Single Parallelogram
Ê 32 Ê 5 ¾ Vol.32, No.5 2006 9 ACTA AUTOMATICA SINICA September, 2006 Û Ê 1) 1, 2 2 1 ( ÔÅ Æ 100041) 2 (Ñ Ò º 100037 ) (E-mail: fmsun@163.com) ¼ÈÙ Æ Ü Äµ ÕÑ ÅÆ ¼ÈÙ ÆÄ Ä Äº ¼ÈÙ ÆÄ Ü ÜÓ µ É» Ì É»²ÂÄÎ ¼ÐÅÄÕ
More informationApplication of ICA and PCA to extracting structure from stock return
2014 3 Å 28 1 Ð Mar. 2014 Communication on Applied Mathematics and Computation Vol.28 No.1 DOI 10.3969/j.issn.1006-6330.2014.01.012 Ç ÖÇ Ú ¾Ä Î Þ Ý ( 200433) Ç È ß ³ Õº º ÅÂÞÐÆÈÛ CAC40 Õ Û ËÛ ¾ ÆÄ (ICA)
More informationThe University of Bath School of Management is one of the oldest established management schools in Britain. It enjoys an international reputation for
The University of Bath School of Management is one of the oldest established management schools in Britain. It enjoys an international reputation for the quality of its teaching and research. Its mission
More informationQ Scheme Marks AOs. Notes. Ignore any extra columns with 0 probability. Otherwise 1 for each. If 4, 5 or 6 missing B0B0.
1a k(16 9) + k(25 9) + k(36 9) (or 7k + 16k + 27k). M1 2.1 4th = 1 M1 Þ k = 1 50 (answer given). * Model simple random variables as probability (3) 1b x 4 5 6 P(X = x) 7 50 16 50 27 50 Note: decimal values
More informationR'sorucróN E*ENTA. *"jn4?l? / 31'12'17
SR& LQ ALSYA RÉ D LS RíS DPT, SDiR RÉRSS iss Y AiRS SDPT, D RÉRS ARS VS/H RM/B M 2 APRBA PRSPST VT AÑ 23 DL SRV DÉ 5ALD VALDVA, SÚ LTY "2.41. R'u TA. "4?? / 31'12'17 VALDVA, VSTS: i ' iu D Ly \23175 i
More informationDERIVING THE DEMAND CURVE ASSUMING THAT THE MARGINAL UTILITY FUNCTIONS ARE LINEAR
Bllei UASVM, Horilre 65(/008 pissn 1843-554; eissn 1843-5394 DERIVING THE DEMAND CURVE ASSUMING THAT THE MARGINAL UTILITY FUNCTIONS ARE LINEAR Crii C. MERCE Uiveriy of Agrilrl iee d Veeriry Mediie Clj-Npo,
More informationOptimal Control of PDEs
Optimal Control of PDEs Suzanne Lenhart University of Tennessee, Knoville Department of Mathematics Lecture1 p.1/36 Outline 1. Idea of diffusion PDE 2. Motivating Eample 3. Big picture of optimal control
More informationGeneral Neoclassical Closure Theory: Diagonalizing the Drift Kinetic Operator
General Neoclassical Closure Theory: Diagonalizing the Drift Kinetic Operator E. D. Held eheld@cc.usu.edu Utah State University General Neoclassical Closure Theory:Diagonalizing the Drift Kinetic Operator
More informationt r ès s r â 2s ré t s r té s s s s r é é ér t s 2 ï s t 1 s à r
P P r t r t tr t r ès s rs té P rr t r r t t é t q s q é s Prés té t s t r r â 2s ré t s r té s s s s r é é ér t s 2 ï s t 1 s à r ès r é r r t ît P rt ré ré t à r P r s q rt s t t r r2 s rtí 3 Pr ss r
More informationMATH140 Exam 2 - Sample Test 1 Detailed Solutions
www.liontutors.com 1. D. reate a first derivative number line MATH140 Eam - Sample Test 1 Detailed Solutions cos -1 0 cos -1 cos 1 cos 1/ p + æp ö p æp ö ç è 4 ø ç è ø.. reate a second derivative number
More informationPulse Shaping and ISI (Proakis: chapter 10.1, 10.3) EEE3012 Spring 2018
Pulse Shaping and ISI (Proakis: chapter 10.1, 10.3) EEE3012 Spring 2018 Digital Communication System Introduction Bandlimited channels distort signals the result is smeared pulses intersymol interference
More informationTHE LOWELL LEDGER. X
* : V : ~ E E EGER X Y X 22 E Y BK E G U P B - ; * -K R B BY K E BE YU YU RE EE «> BE B F F P B * q UR V BB«56 x YU 88»* 00 E PU P B P B P V F P EPEE EUR E G URY VEBER
More informationRadiative Electroweak Symmetry Breaking with Neutrino Effects in Supersymmetric SO(10) Unifications
KEKPH06 p.1/17 Radiative Electroweak Symmetry Breaking with Neutrino Effects in Supersymmetric SO(10) Unifications Kentaro Kojima Based on the work with Kenzo Inoue and Koichi Yoshioka (Department of Physics,
More informationMATH 174: Numerical Analysis I. Math Division, IMSP, UPLB 1 st Sem AY
MATH 74: Numerical Analysis I Math Division, IMSP, UPLB st Sem AY 0809 Eample : Prepare a table or the unction e or in [0,]. The dierence between adjacent abscissas is h step size. What should be the step
More informationfestival of spanish theatre of london J U N E ENGLISH SURTITLES JOHN LYON'S THEATRE COVENT GARDEN LONDON
festival of IN SPANISH WITH ENGLISH SURTITLES spanish theatre of london 1 1-2 4 J U N E 2 0 1 8 JOHN LYON'S THEATRE COVENT GARDEN LONDON w w w. f e s t i v a l s p a n i s h t h e a t r e. c o. u k about
More information4.3 Laplace Transform in Linear System Analysis
4.3 Laplace Transform in Linear System Analysis The main goal in analysis of any dynamic system is to find its response to a given input. The system response in general has two components: zero-state response
More informationA 1 Bent Sub could have been used and /or small jets at this stage, but that would have called for one extra round trip.
DRLLNG ERVCE D R E C T N A L FR WELL 3/2-3. D R L L N Dee rppr hrer L&U DK. ENTER Kk- re 500. 4 3/4" h] 455. 5. KDE Reurere eer bruk B.H.A.., 4 3/4" BT, 9 /2" Nv Dr, /2 Be ub, re ub, 2x9 /2" NMDC, X..,
More informationCHAPTER 6 : LITERATURE REVIEW
CHAPTER 6 : LITERATURE REVIEW Chapter : LITERATURE REVIEW 77 M E A S U R I N G T H E E F F I C I E N C Y O F D E C I S I O N M A K I N G U N I T S A B S T R A C T A n o n l i n e a r ( n o n c o n v e
More informationP E R E N C O - C H R I S T M A S P A R T Y
L E T T I C E L E T T I C E I S A F A M I L Y R U N C O M P A N Y S P A N N I N G T W O G E N E R A T I O N S A N D T H R E E D E C A D E S. B A S E D I N L O N D O N, W E H A V E T H E P E R F E C T R
More informationCHAPTER 3 Describing Relationships
CHAPTER 3 Describing Relationships 3.1 Scatterplots and Correlation The Practice of Statistics, 5th Edition Starnes, Tabor, Yates, Moore Bedford Freeman Worth Publishers Scatterplots and Correlation Learning
More informationPrincipal Secretary to Government Haryana, Town & Country Planning Department, Haryana, Chandigarh.
1 From To Principal Secretary to Government Haryana, Town & Country Planning Department, Haryana, Chandigarh. The Director General, Town & Country Planning Department, Haryana, Chandigarh. Memo No. Misc-2339
More informationLower Austria. The Big Travel Map. Big Travel Map of Lower Austria.
v v v :,000, v v v v, v j, Z ö V v! ö +4/4/000 000 @ : / : v v V, V,,000 v v v v v v 08 V, v j?, v V v v v v v v,000, V v V, v V V vv /Z, v / v,, v v V, v x 6,000 v v 00,000 v, x v U v ( ) j v, x q J J
More informationLimits and Continuity. 2 lim. x x x 3. lim x. lim. sinq. 5. Find the horizontal asymptote (s) of. Summer Packet AP Calculus BC Page 4
Limits and Continuity t+ 1. lim t - t + 4. lim x x x x + - 9-18 x-. lim x 0 4-x- x 4. sinq lim - q q 5. Find the horizontal asymptote (s) of 7x-18 f ( x) = x+ 8 Summer Packet AP Calculus BC Page 4 6. x
More informationEmphases of Calculus Infinite Sequences and Series Page 1. , then {a n } converges. lim a n = L. form í8 v «à L Hôpital Rule JjZ lim
Emhases o Calculus Ininite Sequences an Series Page 1 Sequences (b) lim = L eists rovie that or any given ε > 0, there eists N N such that L < ε or all n > N ¹, YgM L íï böüÿªjöü, Éb n D bygíí I an { }
More informationAPPH 4200 Physics of Fluids
APPH 42 Physics of Fluids Problem Solving and Vorticity (Ch. 5) 1.!! Quick Review 2.! Vorticity 3.! Kelvin s Theorem 4.! Examples 1 How to solve fluid problems? (Like those in textbook) Ç"Tt=l I $T1P#(
More informationo Alphabet Recitation
Letter-Sound Inventory (Record Sheet #1) 5-11 o Alphabet Recitation o Alphabet Recitation a b c d e f 9 h a b c d e f 9 h j k m n 0 p q k m n 0 p q r s t u v w x y z r s t u v w x y z 0 Upper Case Letter
More information3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 REDCLIFF MUNICIPAL PLANNING COMMISSION FOR COMMENT/DISCUSSION DATE: TOPIC: April 27 th, 2018 Bylaw 1860/2018, proposed amendments to the Land Use Bylaw regarding cannabis
More informationNew method for solving nonlinear sum of ratios problem based on simplicial bisection
V Ù â ð f 33 3 Vol33, No3 2013 3 Systems Engineering Theory & Practice Mar, 2013 : 1000-6788(2013)03-0742-06 : O2112!"#$%&')(*)+),-))/0)1)23)45 : A 687:9 1, ;:= 2 (1?@ACBEDCFHCFEIJKLCFFM, NCO 453007;
More informationIE 400 Principles of Engineering Management. Graphical Solution of 2-variable LP Problems
IE 400 Principles of Engineering Management Graphical Solution of 2-variable LP Problems Graphical Solution of 2-variable LP Problems Ex 1.a) max x 1 + 3 x 2 s.t. x 1 + x 2 6 - x 1 + 2x 2 8 x 1, x 2 0,
More informationOverview in Images. 5 nm
Overview in Images 5 nm K.S. Min et al. PhD Thesis K.V. Vahala et al, Phys. Rev. Lett, 85, p.74 (000) J. D. Joannopoulos, et al, Nature, vol.386, p.143-9 (1997) S. Lin et al, Nature, vol. 394, p. 51-3,
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 informationSm1ther AGENDA 1. CALL TO ORDER 3. ADJOURNMENT. Town of o
Sm1ther Twn COMMTTEE OF THE WHOLE COUNCL CHAMBERS, 1027 ALDOUS STREET TUESDAY, MARCH 10, 2009, AT 6:15 P.M. AGENDA 1. CALL TO ORDER 2 DELE ONS Bard Ventures Ltd. Mr. Rihard Bek, Gelgist, r Bard Ventures
More informationApplications of Discrete Mathematics to the Analysis of Algorithms
Applications of Discrete Mathematics to the Analysis of Algorithms Conrado Martínez Univ. Politècnica de Catalunya, Spain May 2007 Goal Given some algorithm taking inputs from some set Á, we would like
More information