Downloaded from sjimu.medilam.ac.ir at 20:10 IRDT on Friday March 22nd /0
|
|
- Clinton Hill
- 5 years ago
- Views:
Transcription
1 $%! "#! ( )*' &' +/0 A!A/9AA!4A) ABACA%! ->(%?(%@!= A$4MA(-!A->AA?!A+,-!A) AG*AHIJ8AFA. ADBAEA AA!AA?PAHQ!A0AHIJP4RP&F!4)!P"NB6(O FU?. GV <)% //9SCT46(; %A0 A/A(A>%AA!A) AAHJ=>A+ 4X4A(AHIJPA.A0 W4A AFU?ZA3 AG!A4-!A)[A</!A0&A)\JA(YA?V A*4V AAV A<) %9 ^AO(_A3F!?.]H4E4PV V <S4"#$%@1[46R(/ UA&O41A %A/4A3%A&4(9(CVSA/ABCA`/ABC4A(A4Aa0- daccvsa?aa(a/2aaa*!y4e/#b.'0c3%0? A4A-!A) A!A/2A4A#A4Ag4Ah /2A!=$0Ffp=e%H fa,e4a(ja5a+?ua6a"#a$auc@4/4p3i4e A-!#AgBA+ %@A1[4A6%A%A?Ffp=e4AklA!P'0 Ffp=e4 H%9R(# CVS?/2!4"@79#$3 A4Am/!A0V A<)%A0 A/AAA!AA?&%. G 4A5A+?XA>g4Ah /2A/(*!"#$%@1[465O(T46; F4dC"#$UC@ '()*!"#$%&. - +, "#$'<:; /:/!089,/!01) #1)23 "#$-., &#
2 443 ' ()'*+,-(!.! /( 010 (2 -AT]!AoAYA/!A0&A)\JA F!!A)[<!)4M!= SA41A)23"#A$-A7"#$-!#gB+ * A6BEF!A?. A]AH4 APV AV < /2ATAC](R4AT46-!9U! AAA/A(*!A4AX4Ag4h "#A$(45+?Sq)/2 FFFF Az 4V A<n A6(-> A /93-!)&'3(% #3 AA0 -TA5qA2GF!A.{4-!)!u naa %A/4A3%A&4(9(->A UAA TA] FUA?. AGSPSS102? %@A1[4A6%AHIJP [4 A6!A]? A?/4 A6A!A4-!A)gBA+ F!!)?.R%@1 34* 2 AHIJ4AA A>TA( AP7AA!A4}l>Z > /97AAHIJ%A0 A? F4AYA/9 (A1T]!Ao%fmeA>A4A "ANB6PA!]? fme>cvs"nb6 Y!O/"NB6X4? F!4 F. -!0# m/a CVS?/#b FfY!Oe!) m/( 40.CVS"NB6? AUC@A fm)!a AAT@A13F AA A0.F4 A#A A7% A&0.!ArA?!AsrAAsF4A As.4AAAsrA0.m 4O2arHdCsm!sr 1!AHA(/2 A?(-> ATI!A %A&07A0 na5a-!a AHO/A A A A70"#A$ o A(A1A)23"#A$ FU'2?!@0) 1 "ANB6(% A64GCVS AA!A!A A(AAAA A70A!A) A W A;"#A$(!AC6 A&9P A& A!A% A"#A$1#A;"#A$%2 A] A5O(%A7SCA"ANB6FFFFFFFA Ffe*=?/4U#3/. AU/9(o-!) G*HIJb (#AUAC]ASq pg ( A(&O4 ATA]/2 A/4 Ar A&#A$ Pt0Ffe'0s/CVS"NB6 CVS"ANB6(AA!A /#*HIJP (!-!#gb+ %@1[46%? % A6 A?(#A!A A-> A4M A A?PA%@A1[4A6gB+!) Ffe!0 ]!u4 PAHP Ah AU@A9 AHAAHIJPA %A0 A/!? vwa4a)a?.ar A04?V A<) -!A.vk!)Z3 /1&90x3 PAt04AAAAJUAUA> F!)%@1[46R(U> ( A4AAHJ=>A+ 4X4A(AHIJPA %A9Y4A?8AA/9%A9AHO *4V AAHIJ4 A A?F!A.PAH A> V A<)% A0 A/ APA(?V A 56789:;<=>?@A@8BCDBE>89=
3 /. U#3 AAYI-*!?m A(#AA/A9 m!a AA!A"ANB6(AO%!A AY AwAA*!AY4AE'2A?F!A4-!A)A AA!AX4A)/2'2? Ffp=Fe4kl /24) -!0#Y!O4J0 klacvs!a'2 A?A AA( U A AH% A9 AR(-4 A Ffp=e j A6% A% A?CVS A? "@ A79X4 A(-!# AgB A+ %@ A1 /!AA?AUC@A!A4A#A$3 P?P1I4? '2?%@1j6 na2x4a(%@a1ja6aa?!a 4AAvAC=%@A1jA6/!A? 7;<=:$%!!% "#$1#; FfY!Oe UC@A4A\JAPAt0FfP=eUA) 4AklACVSA?2A"#$ A%A?"ANB6PA%ARoBTA]4AJ U A) A]/ A9"#A$(w A4 A\JA 4 A\JAA% A?AUC@A fme \JA"A0Afme4/9"#$( PN 3 As4A#AfmeU)]/9%&#$ r AH4sZ A4 AP Ad AC PCAA/#Ab A Ffp=e4 A,A4 A A"#A$PA5A+? PA(#AATA+ 4?UAA rahajasua#acvsa?!a= Ffp=e4a ACEnA6(->A!A6A"NA`->A A%A?AUC@A %@A1j6%%? waa?/2aa!4%@1j6/! AH% A9 AR(4 A- A0CVS( "#! CVS "#$%2] W(4 W; "#$ Ffp=e4 "#$ %"NB6! % UB6 /! UB6 ^O
4 443 ' ()'*+,-(!.! /( 010 (2 7;<=:$%!> "#! 8=56 IG'H(!F 0G 1J 1-1J 1-1J M&OQ&MPM"O#"%& M&ON"#M!3 &MOQ"RN&$OMQM&NO%%P!'1 "RR#$Q"RR"PP"RR"$NIG :SRO&M 7;<=: "#! 8;5 IGTN%6N&6%"6& H) 1J 1-1J 1-1J 1-1J 1-1J M&OQ&MPP#ON""$PROQPN%PO$N""%O#%!3 &MOQ"RNNO%$POQ"RQ"O&N%$QOM&%!'1 "RR#$Q"RR"&N"RR"RN"RR"&Q"RR&$IG :SRORRR" E9F "#! 8D56 HI0+I ^O M&OQ&MPNP#$$NON"#O%"MP"O#&"NPO%"PR!3 &MOQ"RN#""M"#O%#QON"$OM&#RON$%!'1 "RR#$Q"RRQQ"RR"Q"RR"$"RR&#"RR&M%IG -7#A a!)s4-!) GHIJ8 %4M A/ A!A+, A>I %?/9X4)!4 CVS "NB6(O X4 A(-!#AgBA+ A6%A Ffe44;/2P#(!4 :SRORR" M J2 CVS!AA?-!A9UA!bAO4 A%@A1j A6/!A A?mPA 4AApnA6/!APAA?m PA=q A* AHIJ(#A A/2 APA A?AAO4!A6A!AAAR AF!A) A TA56(A1%@A1[4A6AR("#A$UB F!)'2?P5+ 56CU==ED
5 CVSA?'2? ->A4MA(#A?H4%04# UA6!A6A5O(54A6A/4!!A) AklA!APA'0A*1 \JA/4APA3Ah oahij%0?8?(%/2/"#$(4 AG* A==q Ab APAA4 A- A0CVS,/2APADACJA(PAA?. FfeU-!)/46 ->AAg4Ah A%A0 4A(A%A? 4A(A,5+?! A!A(%wA/2A! U6 PA02AP*HIJ!4-0 (-> A A%!AuU A-!A)TA+ oag -!)5+?U6#g4h %04 Ffe! CNO %A9#AA@A;%A]9[AO%A10( References F. %27MgE [46%?CVS?HIJP /2 AP#A(#A$3 A%@A1 ->A2AA7*AHIJA4A4A; FU-!)!u-.P%CEn6("N UAq%~4I41X4nX!C/10a!) PA(-> A AA!A) APRIO/4 A6 + 4V A<*AHUAqA/%~4I41 na6 2 AI*4 A+ _MA!A. AA] naf4a) 24G?%z 4V < CVS"AN B6AA>%AHIJA Az 4V A<nA6n1P(->!4 /#A "ANB6'0AA?mA!A)24AG Ffe! AHIJPAbA%"NB6?R( F4A) A-!0#AA0 *A>&A)2.AA ( A/9(_ A3"#A$ Ah oahij P1AI4 A4 A; A?/2 AP#A!A%j"#$(_3#*HIJ A]A"#A$%2A]"#$nqr1#; dac AA! RFfeU) (A A(!A4 A"#$(!)C"#$ 1.Sheed J.; Computer vision sndrome; F!)## 2.Von Stroh R.; Computer vision sndrome; Occup Health Saf, 1993 Oct; 62(10): Sheed J.;Prio-nin was to reduce the smptoms of computer vision sndrome; 4.Sara kudron;preventing computer vision sndrome; 16cofp/smkconp.html, Hunt.;Visual complaints from computer users;insight 1991 Jun; 6(3): Miller SC.;Communicating about computer and vision; J Am ophtom assoc,1996 Sep; 67(9): 51865VW
Fun and Fascinating Bible Reference for Kids Ages 8 to 12. starts on page 3! starts on page 163!
F a Faa R K 8 12 a a 3! a a 163! 2013 a P, I. ISN 978-1-62416-216-9. N a a a a a, a,. C a a a a P, a 500 a a aa a. W, : F G: K Fa a Q &, a P, I. U. L aa a a a Fa a Q & a. C a 2 (M) Ta H P M (K) Wa P a
More informationParts Manual. EPIC II Critical Care Bed REF 2031
EPIC II Critical Care Bed REF 2031 Parts Manual For parts or technical assistance call: USA: 1-800-327-0770 2013/05 B.0 2031-109-006 REV B www.stryker.com Table of Contents English Product Labels... 4
More informationScripture quotations marked cev are from the Contemporary English Version, Copyright 1991, 1992, 1995 by American Bible Society. Used by permission.
N Ra: E K B Da a a B a a, a-a- a aa, a a. T, a a. 2009 Ba P, I. ISBN 978-1-60260-296-0. N a a a a a, a,. C a a a Ba P, a 500 a a aa a. W, : F K B Da, Ba P, I. U. S a a a a K Ja V B. S a a a a N K Ja V.
More informationpage 1 Total ( )
A B C D E F Costs budget of [Claimant / Defendant] dated [ ] Estimated page 1 Work done / to be done Pre-action Disbs ( ) Time ( ) Disbs ( ) Time ( ) Total ( ) 1 Issue /statements of case 0.00 0.00 CMC
More informationin Trigonometry Name Section 6.1 Law of Sines Important Vocabulary
Name Chapter 6 Additional Topics in Trigonometry Section 6.1 Law of Sines Objective: In this lesson you learned how to use the Law of Sines to solve oblique triangles and how to find the areas of oblique
More informationQuantum Mechanics for Scientists and Engineers. David Miller
Quantum Mechanics for Scientists and Engineers David Miller Background mathematics 5 Sum, factorial and product notations Summation notation If we want to add a set of numbers a 1, a 2, a 3, and a 4, we
More informationFrom our Guest Editor
F Pa Ca a Nw O-D 2008 3 F Caa CORD Da Ra G Ea a a a w. a a a C CD KS a a G E. W w a aa a wa a a aa. W wa w a aa Ra 22 Fa! P DG K F G E Da Ra a G E 3 qa w CORD. CD P aa Pa P- a a a a a a. w a a w a a NGO
More informationNOTES ON MATRICES OF FULL COLUMN (ROW) RANK. Shayle R. Searle ABSTRACT
NOTES ON MATRICES OF FULL COLUMN (ROW) RANK Shayle R. Searle Biometrics Unit, Cornell University, Ithaca, N.Y. 14853 BU-1361-M August 1996 ABSTRACT A useful left (right) inverse of a full column (row)
More informationMTH5102 Spring 2017 HW Assignment 1: Prob. Set; Sec. 1.2, #7, 8, 12, 13, 20, 21 The due date for this assignment is 1/18/17.
MTH5102 Spring 2017 HW Assignment 1: Prob. Set; Sec. 1.2, #7, 8, 12, 13, 20, 21 The due date for this assignment is 1/18/17. 7. Let S = {0, 1} and F = R. In F (S, R), show that f = g and f + g = h, where
More informationLOWELL, MICHIGAN. THURSDAY, FEBRUARY ROBEIIT E. S P H I N G E T T
R R AK AY A x \ ( z A ( U U (? - A > - ( x-x ) \ x A! A A z : A : * K A K A z > x x q - x x 93- A P K A R Az x x 4 U z A R X- A \ A U A URAY RUARY 23 933 U X X X X P P P P P R P P P 4 q AY AA A K [! A
More informationTHE GENERALIZED INVERSE A s OF A MATRIX OVER AN ASSOCIATIVE RING
J. Aust. Math. Soc. 83 (2007), 423-437 THE GENERALIZED INVERSE A s OF A MATRIX OVER AN ASSOCIATIVE RING YAOMEMG YU 3 and GUORONG WANG (Received 6 July 2006; revised 3 January 2007) Communicated by J. Koliha
More informationLanguages. A language is a set of strings. String: A sequence of letters. Examples: cat, dog, house, Defined over an alphabet:
Languages 1 Languages A language is a set of strings String: A sequence of letters Examples: cat, dog, house, Defined over an alphaet: a,, c,, z 2 Alphaets and Strings We will use small alphaets: Strings
More informationUpload Multiple Student File Layout TerraNova CSP Emphasis Highlighted
Checklist before submitting File must contain a header row that includes all the columns in the file layout. Must remove the max length row File must contain the data in the order listed in the file layout.
More informationFULL PRESCRIBING INFORMATION
HIGHLIGHTS OF PRESCRIBING INFORMATION T gg f G f ffv S f pbg f f G G (p p j) INJECTION, GEL f INTRAMUSCULAR SUBCUTANEOUS I US Appv: 192 ---------------------------------------INDICATIONS AND USAGE ---------------------------------------
More informationSolutions of APMO 2016
Solutions of APMO 016 Problem 1. We say that a triangle ABC is great if the following holds: for any point D on the side BC, if P and Q are the feet of the perpendiculars from D to the lines AB and AC,
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 information100Z-1 100Z-1 51 HA 50. Cushion ring Cushion ring. Type. Standard type. Switch Set
0Z-1 0Z-1 51 Type Nominal pressure Maximum allowable pressure Proof test pressure Minimum operating pressure Working speed range Working temperature range (ambient/fluid temperature) Structure of cushioning
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 informationTHE TRANSLATION PLANES OF ORDER 49 AND THEIR AUTOMORPHISM GROUPS
MATHEMATICS OF COMPUTATION Volume 67, Number 223, July 1998, Pages 1207 1224 S 0025-5718(98)00961-2 THE TRANSLATION PLANES OF ORDER 49 AND THEIR AUTOMORPHISM GROUPS C. CHARNES AND U. DEMPWOLFF Abstract.
More informationSECURITIES AND EXCHANGE COMMISSION FORM 10-D. Filing Date: Period of Report: SEC Accession No
SECURITIES AND EXCHANGE COMMISSION FORM 10-D Periodic distribution reports by Asset-Backed issuers pursuant to Rule 13a-17 or 15d-17 Filing Date: 2007-12-06 Period of Report: 2007-11-26 SEC Accession No.
More informationIn this 3D model, facets appear as semi-transparent to reveal overhangs. Report Details Roof Details Report Contents
John Doe Roofing olar Report July 2, 20 3 Main t, Anytown, A 55555 In this 3D model, facets appear as semi-transparent to reveal overhangs. Report Details Roof Details Report Contents Total Area =9094
More information= (, ) V λ (1) λ λ ( + + ) P = [ ( ), (1)] ( ) ( ) = ( ) ( ) ( 0 ) ( 0 ) = ( 0 ) ( 0 ) 0 ( 0 ) ( ( 0 )) ( ( 0 )) = ( ( 0 )) ( ( 0 )) ( + ( 0 )) ( + ( 0 )) = ( + ( 0 )) ( ( 0 )) P V V V V V P V P V V V
More informationSUPPLEMENTARY EXPERIMENTAL PROCEDURES
SUPPLEMENTARY EXPERIMENTAL PROCEDURES Yeast two-hybrid assay The yeast two hybrid assay was performed according to described in Assmann (2006) [01] and was performed with the baits SCOCO (2-82) and SCOCO
More informationPage x2 Choose the expression equivalent to ln ÄÄÄ.
Page 1 1. 9x Choose the expression equivalent to ln ÄÄÄ. y a. ln 9 - ln + ln x - ln y b. ln(9x) - ln(y) c. ln(9x) + ln(y) d. None of these e. ln 9 + ln x ÄÄÄÄ ln + ln y. ÚÄÄÄÄÄÄ xû4x + 1 Find the derivative:
More information/ / MET Day 000 NC1^ INRTL MNVR I E E PRE SLEEP K PRE SLEEP R E
05//0 5:26:04 09/6/0 (259) 6 7 8 9 20 2 22 2 09/7 0 02 0 000/00 0 02 0 04 05 06 07 08 09 0 2 ay 000 ^ 0 X Y / / / / ( %/ ) 2 /0 2 ( ) ^ 4 / Y/ 2 4 5 6 7 8 9 2 X ^ X % 2 // 09/7/0 (260) ay 000 02 05//0
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 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 informationElementary operation matrices: row addition
Elementary operation matrices: row addition For t a, let A (n,t,a) be the n n matrix such that { A (n,t,a) 1 if r = c, or if r = t and c = a r,c = 0 otherwise A (n,t,a) = I + e t e T a Example: A (5,2,4)
More informationOn Monoids over which All Strongly Flat Right S-Acts Are Regular
Æ26 Æ4 ² Vol.26, No.4 2006µ11Â JOURNAL OF MATHEMATICAL RESEARCH AND EXPOSITION Nov., 2006 Article ID: 1000-341X(2006)04-0720-05 Document code: A On Monoids over which All Strongly Flat Right S-Acts Are
More informationNumber Theory Homework.
Number Theory Homewor. 1. The Theorems of Fermat, Euler, and Wilson. 1.1. Fermat s Theorem. The following is a special case of a result we have seen earlier, but as it will come up several times in this
More informationEnglish Made Easy: Foundation Book 1 Notes for parents
a nh Ma ay: Fnan 1 pan h b n hp y ch an ay an by cn n h n n ach h n h aphab. h h achn an ca phnc. h nan, achn an wn ac w nca y ch an h na ach, a w a h n n ach a an hw wn n h pa. y cpn h pa h b, y ch w
More information4.3 Analog Value Representation
4.3 Analog Value Representation Introduction This section describes the analog values for all the measuring ranges and output ranges which you can use with the analog modules. Converting analog values
More informationf;g,7k ;! / C+!< 8R+^1 ;0$ Z\ \ K S;4 i!;g + 5 ;* \ C! 1+M, /A+1+> 0 /A+>! 8 J 4! 9,7 )F C!.4 ;* )F /0 u+\ 30< #4 8 J C!
393/09/0 393//07 :,F! ::!n> b]( a.q 5 O +D5 S ١ ; ;* :'!3Qi C+0;$ < "P 4 ; M V! M V! ; a 4 / ;0$ f;g,7k ;! / C+!< 8R+^ ;0$ Z\ \ K S;4 "* < 8c0 5 *
More information10'" e- a; xt dt = - P (0) + x fo'" e- xt P (t) dt...(3), d =AsR _. A4 T t I ... )
lrfr Bateman, Bol,ltion of (~ system of d~fle1'ential equations, etc. 423 The sol1~tion of (~ system oj el~fle1'entiul equat'ions occw'l'ing in the theory of melio-act'ive tmnsj01 Jncttions. By H. BATEMAN,
More informationStandard Signs Manual
Sadad S Maa NEW, CHANGED, OR DELETED 1/2017 "E" SERIES: GUIDE SIGNS - EXPRESSWAY, FREEWAY G 1 - Da Ica E1-5aP... LEFT (Pa) E1-5bP... LEFT EXIT Nb (Pa) E1-5P... E Nb (Pa) E1-6... FREEWAY ENTRANCE G 3 -
More informationElectrical Resistivity of Transition Metals. I
317 Progress of Theoretical Physics, Vol. 51, No. 2, February 1974 Electrical Resistivity of Transition Metals. Jiro YAMASHTA and Setsuro ASANO nstitute for Solid State Physics, University of Tokyo Roppongi,
More informationPERMIT DRAWING SHEET 28 OF 62
// U- / H AAY H HYAU M A U / AQU MAY A U U UV UVY & HYAU M A H YAK V A MA A UY AA V // :\rojectist\\ - U- orsyth\ lans \U\Hyraulics\M_nvironmental\A\u_hy_prm_wet_pshA_stagn A --= X Y = Y = X : MA : K V
More informationInformation furnished in conformity with the Convention on Registration of Objects Launched into Outer Space
United Nations Secretariat Distr.: General 29 March 2000 Original: English Committee on the Peaceful Uses of Outer Space Information furnished in conformity with the Convention on Registration of Objects
More informationTopic 2 [312 marks] The rectangle ABCD is inscribed in a circle. Sides [AD] and [AB] have lengths
Topic 2 [312 marks] 1 The rectangle ABCD is inscribed in a circle Sides [AD] and [AB] have lengths [12 marks] 3 cm and (\9\) cm respectively E is a point on side [AB] such that AE is 3 cm Side [DE] is
More informationFactorization of weighted EP elements in C -algebras
Factorization of weighted EP elements in C -algebras Dijana Mosić, Dragan S. Djordjević Abstract We present characterizations of weighted EP elements in C -algebras using different kinds of factorizations.
More informationCCE PR Revised & Un-Revised
D CCE PR Revised & Un-Revised 560 00 KARNATAKA SECONDARY EDUCATION EXAMINATION BOARD, MALLESWARAM, BANGALORE 560 00 08 S.S.L.C. EXAMINATION, JUNE, 08 :. 06. 08 ] MODEL ANSWERS : 8-K Date :. 06. 08 ] CODE
More informationAnalysis of Collaborative Learning Behaviors and the Roles of Collaborative Learning Agent
A v L Bhv h v L A Ik L (Sj Uv, S. K, @j..k) J H L (Uv Ih, S. K, jh@h..k) Sh J (S N Uv, S. K, v712@..k) E M S (S N Uv, S. K, 04@..k) K A M (E T h I, S. K, k@..k) H J S (E T h I, S. K, hjh@..k) A: v h h
More information"%&$!"# 3 Power-Transistor
Id\Q IPB37N6N3 G "%&$!"# 3 Power-Transistor Product ummary Features P6? ABH>3 A53 C9693 1C9? > 4A9E5B1>4 43 43,& ), P G3 5 C71C5 3 81A75 GR 9H"[Z# @A? 4D3 C ( & P5AH
More informationSolutionbank M1 Edexcel AS and A Level Modular Mathematics
file://c:\users\buba\kaz\ouba\m_6_a_.html Page of Exercise A, Question A bird flies 5 km due north and then 7 km due east. How far is the bird from its original position, and in what direction? d = \ 5
More informationAK AJ AT AR DETAIL "A" N M L K B AB (6 PLACES) DETAIL "B" TH1 (11) TH2 (10) NTC *ALL PIN DIMENSIONS WITHIN A TOLERANCE OF ±0.5
Powerex, Inc., 73 Pavilion Lane, Youngwood, Pennsylvania 5697 (724) 925-7272 www.pwrx.com Six IGBTMOD + Brake NX-S Series Module AH AN AC AD AE H AK AJ A D E F G AK AJ AP AT AR AQ AS C AX BB BC BD DETAIL
More information`G 12 */" T A5&2/, ]&>b ; A%/=W, 62 S 35&.1?& S + ( A; 2 ]/0 ; 5 ; L) ( >>S.
01(( +,-. ()*) $%&' "#! : : % $& - "#$ :, (!" -&. #0 12 + 34 2567 () *+ '!" #$%& ; 2 "1? + @)&2 A5&2 () 25& 89:2 *2 72, B97I J$K
More informationSECTION 3.3. PROBLEM 22. The null space of a matrix A is: N(A) = {X : AX = 0}. Here are the calculations of AX for X = a,b,c,d, and e. =
SECTION 3.3. PROBLEM. The null space of a matrix A is: N(A) {X : AX }. Here are the calculations of AX for X a,b,c,d, and e. Aa [ ][ ] 3 3 [ ][ ] Ac 3 3 [ ] 3 3 [ ] 4+4 6+6 Ae [ ], Ab [ ][ ] 3 3 3 [ ]
More informationMATH 423 Linear Algebra II Lecture 10: Inverse matrix. Change of coordinates.
MATH 423 Linear Algebra II Lecture 10: Inverse matrix. Change of coordinates. Let V be a vector space and α = [v 1,...,v n ] be an ordered basis for V. Theorem 1 The coordinate mapping C : V F n given
More information,0,",,.,*",,ffi:, *",",,,",*YnJt%ffi& (st& sc oev.sectton, No. 3\ q2tvvlz2or 5. MemoNo 3\q34o1s Date 1a 122o1s COI.IECTOMTE, MALKANGIRI OROER
,0,",,.,*",,ff, CO.CTOMT, MALKANGR (st& sc ov.scton, No. \ q2vvlz2or OROR Publcal on of na eeced/rejeced s o Maron b be ena d n he c s Hosels Dev.Oepl of Makan D Bc. n puuance of adven seffenl No.2o7l1
More informationA LIMITED ARITHMETIC ON SIMPLE CONTINUED FRACTIONS - II 1. INTRODUCTION
A LIMITED ARITHMETIC ON SIMPLE CONTINUED FRACTIONS - II C. T. LONG J. H. JORDAN* Washigto State Uiversity, Pullma, Washigto 1. INTRODUCTION I the first paper [2 ] i this series, we developed certai properties
More information2.25 Advanced Fluid Mechanics
MIT Department of Mechanical Engineering.5 Advanced Fluid Mechanics Problem 6.0a This problem is from Advanced Fluid Mechanics Problems by A.H. Shapiro and A.A. Sonin Consider a steady, fully developed
More informationTowards Healthy Environments for Children Frequently asked questions (FAQ) about breastfeeding in a contaminated environment
Ta a i f i Fu a ui (FQ) abu bafi i a aia i Su b i abu i ia i i? Y; u b i. ia aia a aui a u i; ia aii, bafi u a a aa i a ai f iiai f i ia i i. If ifa b a, a i, u fi i a b bu f iuia i iui ii, PB, u, aa,
More informationBIG TEX GRADE 5 SOCIAL STUDIES CELEBRATING SYMBOLS: BIG TEX & LADY LIBERTY UNITE
GRA 5 SOCIA STUIS CBRATIG SYMBOS: & AY IBRTY UIT TACHR Cb Syb B Tx & y by U Fv G SOCIAIS STU I h w: x h fcc f yb k h Ac Tx bf c. c c h! A w Wh h c, y, Tx b c y w A h, x w y c f h, y cz. C c yb k h cb y.
More informationChapter 1. Matrix Algebra
ST4233, Linear Models, Semester 1 2008-2009 Chapter 1. Matrix Algebra 1 Matrix and vector notation Definition 1.1 A matrix is a rectangular or square array of numbers of variables. We use uppercase boldface
More information8. C is the midpoint of BD. 4. AB < AE
Assumptions and Justifications Use page 7 in your book to help complete the notes below Things You an Assume From a iagram Things You AN T Assume From a iagram I. For each picture list the facts you can
More informationU. S. Highway 412 Corridor, Average Daily Traffic Western Portion Vicinity of Benton and Washington Counties
Bu V Fm R i pi R R bb Fi 8 Bvi Fihip R Bufi h R Vii f v M h hi i B Av Ei Av G A hz Np v im Rbi Av i F-Ex i App uh hmii Av f Av G Av G A R bpp Av R Av V Av i hip Yu G m G Av Qu R P Av Ah Mib u E P Av uh
More informationInner image-kernel (p, q)-inverses in rings
Inner image-kernel (p, q)-inverses in rings Dijana Mosić Dragan S. Djordjević Abstract We define study the inner image-kernel inverse as natural algebraic extension of the inner inverse with prescribed
More informationNumerical Quadrature over a Rectangular Domain in Two or More Dimensions
Numerical Quadrature over a Rectangular Domain in Two or More Dimensions Part 2. Quadrature in several dimensions, using special points By J. C. P. Miller 1. Introduction. In Part 1 [1], several approximate
More informationEvaluation of Different Software Packages in Flow Modeling under Bridge Structures
4*6 $ " $D )>2A " B*C )(=(@$1 )'2/ &35 &/( L!1' 2 (// QR4 /d/d G*) T)!MIKE11 54 /'# 4 G(%?,J # ( A# # /; ( 7;# F K u S E# 5#/ 7#%5. # 5"# " D#P 7"#B4
More information5 H o w t o u s e t h e h o b 1 8
P l a s r a d h i s m a n u a l f i r s. D a r C u s m r, W w u l d l i k y u bb a si n p r hf r m a n cf r m y u r p r d u c h a h a s b n m a n u f a c u r d m d r n f a c i l iu n id s r s r i c q u
More informationSMU Equilibrium Heat Flow Data Contribution
SMU Equilibrium Heat Flow Data Contribution Description Updated July 21, 2014 This document describes the column order and description for data provided by Southern Methodist University (SMU). This data
More informationSOME TAÜBERIAN PROPERTIES OF HOLDER TRANSFORMATIONS AMNON JAKIMOVSKI1
SOME TAÜBERIAN PROPERTIES OF HOLDER TRANSFORMATIONS AMNON JAKIMOVSKI1 1. Introduction. The result which follows was proved by me, recently, in [l],2 Theorem (9.2). If, for some o> 1, the sequence {sn},
More informationSKYLINE COLLEGE STUDENT CHARACTERISTICS Art and Film Online Courses
KYLIN COLLG TUDNT CHARACTRITIC A F O C Up H by T 67 42 46 F 89 72 41 44 pg 76 84 109 42 32 T 160 212 187 131 32 by T 70 42 46 F 91 74 41 44 pg 76 85 111 42 32 T 167 229 194 132 32 Off f Pg, R, I ffv (PRI)
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 informationDEPARTMENT OF MATHEMATIC EDUCATION MATHEMATIC AND NATURAL SCIENCE FACULTY
HANDOUT ABSTRACT ALGEBRA MUSTHOFA DEPARTMENT OF MATHEMATIC EDUCATION MATHEMATIC AND NATURAL SCIENCE FACULTY 2012 BINARY OPERATION We are all familiar with addition and multiplication of two numbers. Both
More informationSKYLINE COLLEGE STUDENT CHARACTERISTICS Biotechnology Courses
KYLIN COLLG TUDNT CHARACTRITIC Bgy C Up H by T 25 42 49 F 14 49 pg 10 52 T 25 56 105 by T 25 42 49 F 14 49 pg 20 67 T 25 76 165 Off f Pg, R, I ffv (PRI) Pg 1 KYLIN COLLG TUDNT CHARACTRITIC Bgy C Up H by
More informationActual Quantity of Input, at Standard Price
Problem 10-13 1. The standard quantity of plates allowed for tests performed during the month would be: Blood tests... 1,800 Smears... 2,400 Total... 4,200 Plates per test... x 2 Standard quantity allowed...
More informationCHAPTER 3. Fuzzy numbers were introduced by Hutton, B [Hu] and. studied by several Mathematicians like Kaleva [Kal], Diamond and
CHAPTER 3 FUZZY NUMBERS* 3.1 Introduction: Fuzzy numbers were introduced by Hutton, B [Hu] and Rodabaugh, S. E. [Rod]. The theory of fuzzy numbers has been studied by several Mathematicians like Kaleva
More informationK E L LY T H O M P S O N
K E L LY T H O M P S O N S E A O LO G Y C R E ATO R, F O U N D E R, A N D PA R T N E R K e l l y T h o m p s o n i s t h e c r e a t o r, f o u n d e r, a n d p a r t n e r o f S e a o l o g y, a n e x
More informationMark scheme Pure Mathematics Year 1 (AS) Unit Test 2: Coordinate geometry in the (x, y) plane
Mark scheme Pure Mathematics Year 1 (AS) Unit Test : Coordinate in the (x, y) plane Q Scheme Marks AOs Pearson 1a Use of the gradient formula to begin attempt to find k. k 1 ( ) or 1 (k 4) ( k 1) (i.e.
More informationClass IX Chapter 8 Quadrilaterals Maths
1 Class IX Chapter 8 Quadrilaterals Maths Exercise 8.1 Question 1: The angles of quadrilateral are in the ratio 3: 5: 9: 13. Find all the angles of the quadrilateral. Let the common ratio between the angles
More informationClass IX Chapter 8 Quadrilaterals Maths
Class IX Chapter 8 Quadrilaterals Maths Exercise 8.1 Question 1: The angles of quadrilateral are in the ratio 3: 5: 9: 13. Find all the angles of the quadrilateral. Answer: Let the common ratio between
More informationSTRAIGHT LINES EXERCISE - 3
STRAIGHT LINES EXERCISE - 3 Q. D C (3,4) E A(, ) Mid point of A, C is B 3 E, Point D rotation of point C(3, 4) by angle 90 o about E. 3 o 3 3 i4 cis90 i 5i 3 i i 5 i 5 D, point E mid point of B & D. So
More informationThe HR Diagram: A Laboratory Exercise
Pisgah Astronomical Research Institute 2009 The HR Diagram: A Laboratory Exercise The HR Diagram Lab gives students the opportunity to construct an HR Diagram based on their own classifications of 119
More informationGeometry 3 SIMILARITY & CONGRUENCY Congruency: When two figures have same shape and size, then they are said to be congruent figure. The phenomena between these two figures is said to be congruency. CONDITIONS
More informationAN IDENTITY IN JORDAN RINGS
AN IDENTITY IN JORDAN RINGS MARSHALL HALL, JR. 1. Introduction. An abstract Jordan ring / is a distributive ring in which multiplication satisfies the two laws (1.1) ba = ab, (1.2) ia2b)a = a2iba). We
More informationTRANSPOSITIONS IN FINITE SYMMETRIC GROUPS. Lynnette Gilmore Peter Lorimer*
TRANSPOSITIONS IN FINITE SYMMETRIC GROUPS Lynnette Gilmore Peter Lorimer* (received 17 October 1972; revised 10 September 1973) The symmetric group S^ on a set E is the group of all bisections or permutations
More informationParts List, Wiring Diagrams
Parts List, Wiring Diagrams PAE180-300 SERIES PACKAGE AIR CONDITIONER UNITS TABLE OF CONTENTS PARTS LIST----------- 2-11 PARTS DRAWING----- 12-34 WIRING DIAGRAMS--- 35-48 Printed in U.S.A. 7/28/08 KEY
More information2017, Amazon Web Services, Inc. or its Affiliates. All rights reserved.
2 A 12 2 12 0 00 2 0 8 cp mnadi C o a S K MT gew Lb id h, / ), ( 1A71-7 S 8B1FB 1 1 3: 2 7BFB 1FB 1A71. - 7 S 13RW 8B4 1FBB 1 3 3F 2 1AB :4 B AE 3 B 0 /.130 1.0 2 3 4 https://summitregist.smktg.jp/public/application/add/59
More information1 Quick Sort LECTURE 7. OHSU/OGI (Winter 2009) ANALYSIS AND DESIGN OF ALGORITHMS
OHSU/OGI (Winter 2009) CS532 ANALYSIS AND DESIGN OF ALGORITHMS LECTURE 7 1 Quick Sort QuickSort 1 is a classic example of divide and conquer. The hard work is to rearrange the elements of the array A[1..n]
More informationHickman Place General Booth Blvd., Virginia Beach, VA
retail F A Hickman Place 2160-2218 eneral Booth Blvd., Virginia Beach, VA PHA I (XII): UP 2,010 F 2,010 F rennovated retail building (Hickman House) PHA II (U UI): UP 11,781 F APHI st. Population Avg HH
More informationSite-Specific Stochastic Study of
Site-Specific Stochastic Study of Multiple Truck Presence on Highway Bridges Peter Morales Grad. Research Assist Mayrai Gindy Ph.D Principal Investigator 2007 UPRM URI Summer Interchange Program Program
More information2 tel
Us. Timeless, sophisticated wall decor that is classic yet modern. Our style has no limitations; from traditional to contemporar y, with global design inspiration. The attention to detail and hand- craf
More informationJanuary Capricorn. Jan 4, 2011 New Moon. Jan 19, 2011 Full Moon Washington, DC 04:22:28 PM EST 16Ò 56' 02Ò 44' 06' 12Ò 16Ò 54' 28Ò 05' 07Ò 52'
January Capricorn Ò 0' 0' Tra-Tra 0 0 Â 0 0 0 Â Â Æ Â Â Â Â Æ Â Ã Æ Â Æ Â Â Â Â Â Ó Å 0 Â Â Â 0:0: AM EST 0' Â Â Jan, New on 0' ' ' ' 0 Æ Å Å Æ 0 0 Â Å Void 0 Å Â Â Ä Ä ' 0' 0' Ò ' January 0hrs GMT Day
More informationExtensions of pure states
Extensions of pure M. Anoussis 07/ 2016 1 C algebras 2 3 4 5 C -algebras Definition Let A be a Banach algebra. An involution on A is a map a a on A s.t. (a + b) = a + b (λa) = λa, λ C a = a (ab) = b a
More informationLevel of Service Snow and Ice Control operations are intended to provide a reasonably safe traveling surface, not bare or dry pavement.
C f v Sw Ic C P Ju 2017 Iuc I g f C f v v, ffc c-ffcv w c, w v c c ww C f v. T vc v f f bf f C ubc vg w c. T u f Sw Ic C P cb C w v g, g cu v f vc g. u w vb Og w, c / w v qu ff ff ub f c, wc, v w c, w
More informationPLL Algorithms (Permutation of Last Layer) Developed by Feliks Zemdegs and Andy Klise
PLL Algorithms (Permutation of Last Layer) Developed by Feliks Zemdegs and Andy Klise Algorithm Presentation Format Suggested algorithm here Alternative algorithms here PLL Case Name - Probability = 1/x
More informationPYTHAGORAS THEOREM PYTHAGORAS THEOREM IN A RIGHT ANGLED TRIANGLE, THE SQUARE ON HYPOTENUSE IS EQUAL TO SUM OF SQUARES ON OTHER TWO SIDES
PYTHAGORAS THEOREM PYTHAGORAS THEOREM IN A RIGHT ANGLED TRIANGLE, THE SQUARE ON HYPOTENUSE IS EQUAL TO SUM OF SQUARES ON OTHER TWO SIDES EXERCISE 2.1 *THE SIDES OF A RIGHT ANGLED TRIANGLE CONTAINING THE
More informationOn Extensions of Green s Relations in Semi groups
IOSR Journal of Mathematics (IOSRJM) ISSN: 2278-5728 Volume 1, Issue 3 (July-Aug 2012), PP 04-11 On Extensions of Green s Relations in Semi groups 1 D.V.Vijay Kumar and 2 K.V.R.Srinivas Abstract: In this
More information29Ò 59' 41' 15Ò 17' Ñ 00Ò 53' 12 14Ò. Jan 15, 2010 New Moon Eclipse. Washington, DC 02:11:53 AM EST 49' 52' 32' 01' 05Ò D 34' 01' 23' 50' 02' 20Ò 23Ò
January Capricorn ' Â 0 0 0 0 0 0 0 Â Â Æ Ó Æ Â Ô Â Â Â Â Â Â Â Ä Ã Ã Ã Å 0 Â Â Â Â ST 0 0:: Ò' ' ' ' 0' 0 0::0 Ò ' 0 0 0 0 0 0 0 0:0:0 0::00 0:: 0:0: 0:0: 0:0: 0:: ' ' ' 0' Ò ' ' ' Ò Ò 0' ' 0' Ò Ò ' '
More informationEigenvalues, Eigenvectors, and Diagonalization
Math 240 TA: Shuyi Weng Winter 207 February 23, 207 Eigenvalues, Eigenvectors, and Diagonalization The concepts of eigenvalues, eigenvectors, and diagonalization are best studied with examples. We will
More informationBasic equations of motion in fluid mechanics
1 Annex 1 Basic equations of motion in fluid mechanics 1.1 Introduction It is assumed that the reader of this book is familiar with the basic laws of fluid mechanics. Nevertheless some of these laws will
More informationChapter 2. Matrix Arithmetic. Chapter 2
Matrix Arithmetic Matrix Addition and Subtraction Addition and subtraction act element-wise on matrices. In order for the addition/subtraction (A B) to be possible, the two matrices A and B must have the
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 informationSenior: Jamie Miniard
Th Ah Th Ma f Su By: Shby Madad Dma Pay Off By: Shby Madad Su maud by hw muh my yu mak, hw yu hu, wha kd f vh yu dv. Su ha a dp ma. Dma a haa ha vy d p. W a xp amph ay a f w a dmd d. I f a f y ha f h u
More informationDiscovery Guide. Beautiful, mysterious woman pursued by gunmen. Sounds like a spy story...
Dv G W C T Gp, A T Af Hk T 39 Sp. M Mx Hk p j p v, f M P v...(!) Af Hk T 39 Sp, B,,, UNMISSABLE! T - f 4 p v 150 f-p f x v. Bf, k 4 p v 150. H k f f x? D,,,, v? W k, pf p f p? W f f f? W k k p? T p xp
More informationSolutions for April. a = b(tan α + cot 2α) sin α cos 2α. cos α sin 2α. ( 2 sin 2 α sin 2 ) α = b sin 2α. tan B 2 = q v
Solutions for April 6. ABCD is a rectangle for which AB > AD. A rotation with centre A takes B to a point B on CD; it takes C to C and D to D. Let P be the point of intersection of the lines CD and C D.
More information10. a. Copy and complete : No. of Rectangles (r) No. of Matches (m) 17 b. Find a formula for calculating m if you know r.
Simplifying Exercise 1 Simplify the following: 1. 3x (-4x). -5x (+3x) 3. 10x + (-9x) 4. -6x (- 4x) 5. -1y + (-3y) 6. 16p (-1p) 7. -8p + (-1p) 8. 11z (-z) 9. -16r + (-1r) 10. 14c (+1c)11. -8b (-13b) 1.
More informationH U G H T H O M A S, C E O, S K Y H I G H W A Y S
FARE COLLECTION SMARTPHONE APPLICAT ION FOR PUBLIC T R ANSIT U SERS H U G H T H O M A S, C E O, S K Y H I G H W A Y S APTA EXPO CONFERENCE OCTOBER 2011 1 MOBILE SOFTWARE FOR PEOPLE ON THE MOVE S K Y H
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 information