GEORGIA INSTITUTE OF TECHNOLOGY, ATLANTA, GEORGIA, TUESDAY AFTERNOON, FEBRUARY 20, Constitution Exams
|
|
- Alexis Perry
- 5 years ago
- Views:
Transcription
1 X- V X X X V GEORGI INSIUE OF ECHNOLOGY LN GEORGI UESDY FERNOON FERURY 0 9 N NROC S S P I C NP E E I q G NROC U C R NROC NROC U I N P x U S N D G NROC U D 90 S F Q D 6 90 q ' ' NROC U NROC : x () NROC P () NROC N S - I - ; C () NROC q NROC C S P N S I - ; R () NROC - C N P j - x R NROC C Z D CPR D E R F R S IS C N C D V C P R C C H R S L C P P J H U ; V MC R H C; C x- U S S C L Z P D C G S 0 ' C M C ' D V P C CPR j S P R M D I J L M U H R J Q U C S C; E H H J O R L H G S C ; H J J P C H P D C S H ' S ; F x- S C ; R H M C C -' D D S J U F S F S C I I M N I I I S I j q j P YMC x M ' C q H G L C Ex q U S G EC EC SS 0 SS 0 SS SS x U S C Ex :00 ' P R 0 08 S H D F 9 H E D D S I M I M U Sq D C q 0 :00 ' YMC M H S q x x H N q I q 08 K F C D H G C G C 6:0 S F J V' L P G M E O' CME R E S O C M D G L H D P U ODK G P C q F q D L D G H U R I j C D L M? H P S R S N C O F I - C R E P K U S' D L ' S 89 D L 88 S P U 90 P U E U H D L D DD LLD M P C S P U D L P 96-8 I 98 U G L P R G I N S O F 9 - G I G YMC S P S C M H P G C M G G M I M J J M C J I 908 G M M x YMC S H G D II M G G I H J 899 J- ' I q C I q N P x R G O M U G U G H - q S (C ) M
2 HE ECHNIQUE F F C P R E R q q I ' - x G G R Y; S C F L P C S C F : P J F; q V-P J; S 9 D; J ; O D F; E D N; H J P ; VJ; H M x J S; S MC; S-- J H MC; M M M; H M C ; S L L P C E C; M C R V- J M G P E P S M H P; O P L H ; P M E P C D; H R x C; L H N S q ; F G C F Nx SS M S; V D L; E S; C S C L R ; R S P R; Q R E E; C L H; SUXEDOS -- Z L; P M R M; M M FORML DRESS SUIS P L; R I S S J IFC P R ; S IFC S G; H M E E; D P R H S NE CY 9866 F I U D I NE FELONS LN GEORGI G (C ) O &M G F U F C M x C H H H G M G S G I E M R C G S G YMC M L S G YMC D G F G D S D j M D S R G S M x ^ j ENH SREE NES NOVELY SHOP H L L M R K & GISON GREEN IG CRDS MGZN IES - OOK DEPRMEN NOVELE IS - LENDN IG L IRRY OUO - F ON NESPPERS 08 PECHREE SREE N E LN GEORGI C P x F 0 9 I S F S M Ex I F C O S Ex 99 I x I S G 90 S 96 - C N UNESCO UNESCO' F - x - D? V x : - E S : 'I - ' x F I U S x G I 989 S F D x S C S U K C P U O F - (C 8) 0-//6 LONG HE IRVES IH O: J C ' I N G : ( J G ) Y ' H '! O-ING G I: S j S ' I O : ( - j) I' C I' I N G : ' Y'! O: Y J O q '! 0 N N I L x x C R P D R Q^ I C S I S C-C I N G : ( C C) Y I P ' C L U D E E :! Ej : NC CS P L R ^' ^-J J^ CMC C x C C - OLED UNDER UHORIY OF HE COC-COL COMPNY Y HE LN COC-COL OLING CO 9 C-C C S D L D S C S C M S C L SPECIL C -ONE SEK-9 P HE FMOUS COON PCH RECUE OYL CIGR CO SEKS - SE FOOD F F P L R ' P C S C F
3 HE F 0 9 ECHNIQUE L N GEORGI G ' IM S R ' F S F E 9 H Ex R ' D I M IM D 9 S C q I x q 9 R q U O S q S C U M D G G S 9 9 I M I M S P 9 J S G G F 8:00 U S F G C I q I E E P S P J N S D j MI D M S S P H L C C ( ) P C (C 8) L' P I I G U S I P O U S I M I x S I M J D R H E E M R L M H N H D E D P N D E' F D E P D E U R- 90 D U S j N Y I V - U M H x E H S C F I S S D E PD Y J 90 S H q J 9 D E F H Ex S S j D YMC j D E' O I G G D E j G F j ' H j F j ECH MEN ENJOY HE ES OL OF CHILI IN ON LSO POCKE ILLIRDS SNOOKER ILLIRDS IN CLU LIKE COMFOR IG ON RECREION ILLIRDS FIVE POINS UPSIRS 0/ EDGEOOD FEMININE GS G S ECHOOD HERE - F 0- HREE SECRES SHDO REURNS IF I H D MY Y COOY ND HE PRIZEFIGHER -F F - S F 90 ' C O S-M F -6 ROCKY MOUNN I / ' CONSENSUS D E Mx US F U S F x D E U S j x S D E N D E (C 8) RRO HIE SHIR S G IM O IM SKE H' S O E N F -0 M S S F :0-:0 RRO SHIRS! E M S- P GORDON UON-DON P R IDESPRED C x F $0 $9 C C L P P CY 90 PRKS-C ESLISHED J8I-I9I P F P FOR RRO UNIVERSIY RROSHIRS & IES J R R O ^ SYLES < UNDERER HNDKERCHIEFS SPORS SHIRS
4 HE ECHNIQUE q S8 L C LN GEORGI F 0 9 V' C D N R j -- U - H C M I P Y I j HE SEERING COMMIEE US j x - ; x j q G U D H M - I x U D q x q I ' x I I x ' q q F x x D M - -- S I F C L U q q I q S ' x x q N C D ' - U q L F x ' I' M L - P - j I ' ' - O C 'C ' ' H? D?? ' J S L P x L I - q? I P D $ C E x j J ' ' M K O I ECHNIQUE PLFORM: P I O q N ' S IC q q q q - -I q M x q N -DMJ M C P 960 x J G P - x J S G I N N x L E E S 06 O 9 9 S $00 q 9 S E M E D J M M E E J N E UI D N E D F E L L F E H O S E P 6 E q E S U q «K J E M I K M D G M L H C M U C M R C M G P C M P R M M S N E S SFF: E L H H R E E D MC C J H E J M SPORS: P G L F O J F F E U R E S : M G J L K R D L C J N J Q DVERISING: C H H J S H S PHOOGRPHER: F H H G CIRCULION: H G C LC H N D S
5 F 0 9 HE ECHNIQUE L N GEORGI V P P G I F D R H E E F S M E H O F P D S C' E M F N - j P G ' F S F F M Sx x I - S x V S C' L M O-- D ' G C M q F J D S N P j S D' F F F 6 R F L G YMC D j D E' : F ' : J H J S G I G U I J H M D E q : Sx K J? D J R M I C S F? D P P C J? I J U x F? D D M - E J K M S -j j J ' ' J -j J J P 8 x 0 6 x 0 O D E E j L x S D E q j q Mj q : N S F P I ' P L ' D M C U - D E F S P J R ' P I L x E x : L L H D C J U x; D H C M 8 q K H C M H P F M C D R F L C 99 G F R F L C C - q j J D' x :00 P S C' j S P D ' I : ' M L K ; S C' M K; P D ' M S F Q R S' L S R CLEN HOLESOME PLCE FOR ECHSERS O PLY 9 N N (C S S) P R P S Nx N' H IR CONDIIONED 0 - O 0 - REKFS NYIME - O j (D I Y REN CR PNS COMPRE HESE NE VLUES $9 $9 $89 $99 O V R G / R F ( ) F C V G F P C F O RESONLE RES N 69 $ PNS SHOP 88 S N P Dx D I Y S 6 E S N E I 80 RM EHER IS ROUND HE CORNER S C I F C L O S L J GEORGI ECH COLLEGE INN ONED ND OPERED Y GEORGI INSIUE OF ECHNOLOGY
6 6 HE ECHNIQUE LN GEORGI F 0 9 Q' O U S P F O G L O 90 C F G C D x -0 E S M 6 C D q q Y J C L J S D C R R C J E YORK'S RECREION PRLOR G M SNDICHES - LUNCHES - SHOR ORDERS ILLI RDS 89 P S NE L 96 R q C R S E P R D D ' J Q j C D x x 00 S G C D q (C 8) HEM LL! P M ) HUNDREDS OF HOUSNDS OF SMOKERS PHILIP MORRIS IS DEFINIELY LESS IRRIING DEFINIELY MILDER I S E P R P P D G S C C P - P K K S E P L C - S P E - E P SPE' EP' 6- D D U X Y J C P - I ISO S SUDENS S M 9L & D ONLY 60 M P U ECH00D SHEREE 08 D N L 90 O 8 M - 9 P M C PM S R - D C F N I D S U N C 9- N q SU q - M F 6 M H : GOLD LEGUE P D - 9 S C 8 C P P K 6 O 0 HIE LEGUE P K E P K S L C S N 0 6 C 0 ORNDO LEGUE L 0 L L S P E 9 E P 6 D D P K P 0 D S P 0 6 P K S 0 YELLO JCKE LEGUE L X 0 C P - P G D - P K P E P 6 K E 0 6 (C 8) L PHILIP MORRIS J DON' INHLE E '? NO L D x DON' INHLE N? Q PHILIP MORRIS! O P M j P M ' FINES C! NO CIGREE HNGOVER MORE SMOKING PLESURE! FMOUS? K^ ' S S C' IMPERIL HOEL \ -^ L ROER F L D GENE -P- GORY G Z C/ S ILL GRSSICK ORCHESR CLL FOR SHOS 9:0 :00 EY MHUGH NO COVER CHRGE DINNER $
7 F 0 9 HE ECHNIQUE LN GEORGI C D E 9-9; L SS S S S IH O KIMZEY F S E C I V M K C S E C R L K S C SEC 9- R' C I 9 x SEC K C - SEC G G -0 J G SEC I 9- K x LSU C 9 C -x x SEC 99 I K I 9 V C C V 9- I C (8) () ( ) j () () (66) - ( 9) ( ) () J ' N 9 ' C 9 J C I 0-0 K K C C 9-8- M I 9-8 x C J G I - J 0-0 K K J - SEC 98 G L ' C C M' E 9-9 S x-- P S 8 ' - ' J S' K G V P C S M x M P S S D V H M Y J q C M' 0- V Kx - J - J F I H F J 0-6 J K M SU M D R S SEE US FOR YOUR SCLE MODEL SUPPLIES SPORS - MRINE - HOY INC P VE G GI H G G I S x F 6 P F G P C VS SOUHS ES HE NE YELLO JCKE INN I S F H D H C L S- P NORH VE & PLUM SREE PRKING ( C-C C) SPCE O N L Y O N E L O C K F R O M E C H C I ' L M K q SEC C x V 9- Lx F 9- \ C G C F j ' S U P P J M F C N D' S I I M C H - C J P' J x M L MPLE R ' S K V U K O q 8 K M G V G R F UCL U C &L D N C D G K LSU SMU CU F M S S L D P G I O S P I V K S L D O &M NYU N D S R P O E x EFORE F F 9 I j PRIZE HIS EEK: $ PIR OF SLCKS QUICK COUREOUS SERVICE S C S PECHREE ON ND ROD
8 HE 8 ECHNIQUE M E F I H G (C 6) S F G 0 L F 0-00 x ISO LEGUE 6 x F G 00- F Y J - H C 6 6 ' 0 F ROINSON'S ROPICL G R D E N S D D U S GOOD FOOD OUR SPECILY 6 S R G C - - N P N D N C F G C R C-S 6 0 L 6 8 DRILE LEGUE N C 9 SU N F S _ L C 0 0 L 6 S I R (C 6) L S I' ' I C E J G P U K M M M (C ) S-C R N Y; C ( ) N M; M C L K; L P M C H M S P C ( ) E P O L M J 98 L P J 90 F (C ) Q F D E q US USSR US S U US C S US O q D E M C D ' q S C x x -G S x q I x -G F C D L & C MEROPOLIN LIFE INSURNCE CO LN G F R - P 860 F 0 9 GEORGI F LON CORRESPONDENS P C O - L OUNCE LEGUE CHICKEN SEK P F R LN I (C ) U S F S D-G UNESCO M J : I & IRC M F 9 :0 YMC I R C H F- P R MKE HE OCCO GROERS II HLONESS ES III YOURSELRH YES C C ' O j C S C ' MILDNESS NO UNPLESN FER-SE HESERFIELD LEDING SELLER IN MERIC'S COLLEGES C 9 LIGGE & MVERS OCCO CO
A 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 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 informationPARABOLA. moves such that PM. = e (constant > 0) (eccentricity) then locus of P is called a conic. or conic section.
wwwskshieducioncom PARABOLA Le S be given fixed poin (focus) nd le l be given fixed line (Direcrix) Le SP nd PM be he disnce of vrible poin P o he focus nd direcrix respecively nd P SP moves such h PM
More information4.8 Improper Integrals
4.8 Improper Inegrls Well you ve mde i hrough ll he inegrion echniques. Congrs! Unforunely for us, we sill need o cover one more inegrl. They re clled Improper Inegrls. A his poin, we ve only del wih inegrls
More information0 for t < 0 1 for t > 0
8.0 Sep nd del funcions Auhor: Jeremy Orloff The uni Sep Funcion We define he uni sep funcion by u() = 0 for < 0 for > 0 I is clled he uni sep funcion becuse i kes uni sep = 0. I is someimes clled he Heviside
More informationPhysic 231 Lecture 4. Mi it ftd l t. Main points of today s lecture: Example: addition of velocities Trajectories of objects in 2 = =
Mi i fd l Phsic 3 Lecure 4 Min poins of od s lecure: Emple: ddiion of elociies Trjecories of objecs in dimensions: dimensions: g 9.8m/s downwrds ( ) g o g g Emple: A foobll pler runs he pern gien in he
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 informationARC 202L. Not e s : I n s t r u c t o r s : D e J a r n e t t, L i n, O r t e n b e r g, P a n g, P r i t c h a r d - S c h m i t z b e r g e r
ARC 202L C A L I F O R N I A S T A T E P O L Y T E C H N I C U N I V E R S I T Y D E P A R T M E N T O F A R C H I T E C T U R E A R C 2 0 2 L - A R C H I T E C T U R A L S T U D I O W I N T E R Q U A
More information_ 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 informationAgenda Rationale for ETG S eek ing I d eas ETG fram ew ork and res u lts 2
Internal Innovation @ C is c o 2 0 0 6 C i s c o S y s t e m s, I n c. A l l r i g h t s r e s e r v e d. C i s c o C o n f i d e n t i a l 1 Agenda Rationale for ETG S eek ing I d eas ETG fram ew ork
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 informationHQPD - ALGEBRA I TEST Record your answers on the answer sheet.
HQPD - ALGEBRA I TEST Record your nswers on the nswer sheet. Choose the best nswer for ech. 1. If 7(2d ) = 5, then 14d 21 = 5 is justified by which property? A. ssocitive property B. commuttive property
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 informationTheoretical foundations of Gaussian quadrature
Theoreticl foundtions of Gussin qudrture 1 Inner product vector spce Definition 1. A vector spce (or liner spce) is set V = {u, v, w,...} in which the following two opertions re defined: (A) Addition of
More informationBest Approximation. Chapter The General Case
Chpter 4 Best Approximtion 4.1 The Generl Cse In the previous chpter, we hve seen how n interpolting polynomil cn be used s n pproximtion to given function. We now wnt to find the best pproximtion to given
More information( ) ( ) ( ) ( ) ( ) ( y )
8. Lengh of Plne Curve The mos fmous heorem in ll of mhemics is he Pyhgoren Theorem. I s formulion s he disnce formul is used o find he lenghs of line segmens in he coordine plne. In his secion you ll
More informationEastern Progress - 12 May 1923
E P E P 9-9 E Kk U Y 9 E P - M 9 E Kk U E ://k/ 9-/ ESERN VOLUME RCHMOND WO KENUCKY SURDY M Y 9 NO BRUCE WERS WNS DSPPROVE DVSON "MCROBE OF LOVE" EN WEEK ERM SUP GEORGE COLVN RECORD BREKNG DECLMORY CONES
More informationSOME USEFUL MATHEMATICS
SOME USEFU MAHEMAICS SOME USEFU MAHEMAICS I is esy o mesure n preic he behvior of n elecricl circui h conins only c volges n currens. However, mos useful elecricl signls h crry informion vry wih ime. Since
More informationSome Inequalities variations on a common theme Lecture I, UL 2007
Some Inequliies vriions on common heme Lecure I, UL 2007 Finbrr Hollnd, Deprmen of Mhemics, Universiy College Cork, fhollnd@uccie; July 2, 2007 Three Problems Problem Assume i, b i, c i, i =, 2, 3 re rel
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 informationMotion. Part 2: Constant Acceleration. Acceleration. October Lab Physics. Ms. Levine 1. Acceleration. Acceleration. Units for Acceleration.
Moion Accelerion Pr : Consn Accelerion Accelerion Accelerion Accelerion is he re of chnge of velociy. = v - vo = Δv Δ ccelerion = = v - vo chnge of velociy elpsed ime Accelerion is vecor, lhough in one-dimensionl
More informationPredator - Prey Model Trajectories and the nonlinear conservation law
Predaor - Prey Model Trajecories and he nonlinear conservaion law James K. Peerson Deparmen of Biological Sciences and Deparmen of Mahemaical Sciences Clemson Universiy Ocober 28, 213 Ouline Drawing Trajecories
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 informationMath Calculus with Analytic Geometry II
orem of definite Mth 5.0 with Anlytic Geometry II Jnury 4, 0 orem of definite If < b then b f (x) dx = ( under f bove x-xis) ( bove f under x-xis) Exmple 8 0 3 9 x dx = π 3 4 = 9π 4 orem of definite Problem
More informationGRADE 4. Division WORKSHEETS
GRADE Division WORKSHEETS Division division is shring nd grouping Division cn men shring or grouping. There re cndies shred mong kids. How mny re in ech shre? = 3 There re 6 pples nd go into ech bsket.
More informationExisting Conditions. View from Ice Rink Patio. Ice Rink Patio. Beginner Terrain and Lighting. Tubing Hill. Little Tow & Beginner Terrain
Bg T Lghg Tubg Hll Ic k P T f Bg T V f Sc Accss Nh Ll T & Bg T I Ex T Mc Bulg B f Bg T Pkg L & g Wll V f Ic k P MA S TE Bs A & Lghg Z E H E N AN ASSOCIATES, INC. ACHITECTUE PLANNING INTEIOS LANSCAPE ACHITECTUE
More informationPer cent Wor d Pr oblems
Per cent Wor d Pr oblems Ratio and proportion method Her e ar e sever al aids t hat will help you solve wor d pr oblems: 1. Make sur e you under st and t he quest ion t hat is asked 2. Sor t out t he inf
More informationReview Exercises for Chapter 4
_R.qd // : PM Pge CHAPTER Integrtion Review Eercises for Chpter In Eercises nd, use the grph of to sketch grph of f. To print n enlrged cop of the grph, go to the wesite www.mthgrphs.com... In Eercises
More informationPredicate Logic. 1 Predicate Logic Symbolization
1 Predicate Logic Symbolization innovation of predicate logic: analysis of simple statements into two parts: the subject and the predicate. E.g. 1: John is a giant. subject = John predicate =... is a giant
More information3 Motion with constant acceleration: Linear and projectile motion
3 Moion wih consn ccelerion: Liner nd projecile moion cons, In he precedin Lecure we he considered moion wih consn ccelerion lon he is: Noe h,, cn be posiie nd neie h leds o rie of behiors. Clerl similr
More informationDate Lesson Text TOPIC Homework. Solving for Obtuse Angles QUIZ ( ) More Trig Word Problems QUIZ ( )
UNIT 5 TRIGONOMETRI RTIOS Dte Lesson Text TOPI Homework pr. 4 5.1 (48) Trigonometry Review WS 5.1 # 3 5, 9 11, (1, 13)doso pr. 6 5. (49) Relted ngles omplete lesson shell & WS 5. pr. 30 5.3 (50) 5.3 5.4
More informationFollow this and additional works at: https://digitalcommons.georgiasouthern.edu/george-anne Part of the Higher Education Commons
G S U D C@G S G-A S M G-A N, S M, G S U : :///- P H E C R C S M, G S U, " G-A" () G-A :///-/ S M D C@G S I G-A D C@G S, @ HURSDAY, NOVEMBER, GEORGIA SOUHERN UNIVERSIY WWWHEGEORGEANNECOM VOLUME, ISSUE E
More informationHomework Assignment 3 Solution Set
Homework Assignment 3 Solution Set PHYCS 44 6 Ferury, 4 Prolem 1 (Griffiths.5(c The potentil due to ny continuous chrge distriution is the sum of the contriutions from ech infinitesiml chrge in the distriution.
More informationTh e E u r o p e a n M ig r a t io n N e t w o r k ( E M N )
Th e E u r o p e a n M ig r a t io n N e t w o r k ( E M N ) H E.R E T h em at ic W o r k sh o p an d Fin al C o n fer en ce 1 0-1 2 Ju n e, R agu sa, It aly D avid R eisen zein IO M V ien n a Foto: Monika
More information2D Motion WS. A horizontally launched projectile s initial vertical velocity is zero. Solve the following problems with this information.
Nme D Moion WS The equions of moion h rele o projeciles were discussed in he Projecile Moion Anlsis Acii. ou found h projecile moes wih consn eloci in he horizonl direcion nd consn ccelerion in he ericl
More informationContraction Mapping Principle Approach to Differential Equations
epl Journl of Science echnology 0 (009) 49-53 Conrcion pping Principle pproch o Differenil Equions Bishnu P. Dhungn Deprmen of hemics, hendr Rn Cmpus ribhuvn Universiy, Khmu epl bsrc Using n eension of
More information(b) 10 yr. (b) 13 m. 1.6 m s, m s m s (c) 13.1 s. 32. (a) 20.0 s (b) No, the minimum distance to stop = 1.00 km. 1.
Answers o Een Numbered Problems Chper. () 7 m s, 6 m s (b) 8 5 yr 4.. m ih 6. () 5. m s (b).5 m s (c).5 m s (d) 3.33 m s (e) 8. ().3 min (b) 64 mi..3 h. ().3 s (b) 3 m 4..8 mi wes of he flgpole 6. (b)
More informationSimilarity and Congruence
Similrity nd ongruence urriculum Redy MMG: 201, 220, 221, 243, 244 www.mthletics.com SIMILRITY N ONGRUN If two shpes re congruent, it mens thy re equl in every wy ll their corresponding sides nd ngles
More informationMATH STUDENT BOOK. 10th Grade Unit 5
MATH STUDENT BOOK 10th Grde Unit 5 Unit 5 Similr Polygons MATH 1005 Similr Polygons INTRODUCTION 3 1. PRINCIPLES OF ALGEBRA 5 RATIOS AND PROPORTIONS 5 PROPERTIES OF PROPORTIONS 11 SELF TEST 1 16 2. SIMILARITY
More informationObjective: Use the Pythagorean Theorem and its converse to solve right triangle problems. CA Geometry Standard: 12, 14, 15
Geometry CP Lesson 8.2 Pythgoren Theorem nd its Converse Pge 1 of 2 Ojective: Use the Pythgoren Theorem nd its converse to solve right tringle prolems. CA Geometry Stndrd: 12, 14, 15 Historicl Bckground
More informationLecture 21: Order statistics
Lecture : Order sttistics Suppose we hve N mesurements of sclr, x i =, N Tke ll mesurements nd sort them into scending order x x x 3 x N Define the mesured running integrl S N (x) = 0 for x < x = i/n for
More informationLecture 2e Orthogonal Complement (pages )
Lecture 2e Orthogonl Complement (pges -) We hve now seen tht n orthonorml sis is nice wy to descrie suspce, ut knowing tht we wnt n orthonorml sis doesn t mke one fll into our lp. In theory, the process
More informationSection P.1 Notes Page 1 Section P.1 Precalculus and Trigonometry Review
Secion P Noe Pge Secion P Preclculu nd Trigonomer Review ALGEBRA AND PRECALCULUS Eponen Lw: Emple: 8 Emple: Emple: Emple: b b Emple: 9 EXAMPLE: Simplif: nd wrie wi poiive eponen Fir I will flip e frcion
More informationThe Velocity Factor of an Insulated Two-Wire Transmission Line
The Velocity Fctor of n Insulted Two-Wire Trnsmission Line Problem Kirk T. McDonld Joseph Henry Lbortories, Princeton University, Princeton, NJ 08544 Mrch 7, 008 Estimte the velocity fctor F = v/c nd the
More information8.1 Arc Length. What is the length of a curve? How can we approximate it? We could do it following the pattern we ve used before
8.1 Arc Legth Wht is the legth of curve? How c we pproximte it? We could do it followig the ptter we ve used efore Use sequece of icresigly short segmets to pproximte the curve: As the segmets get smller
More informationPROBLEM 11.3 SOLUTION
PROBLEM.3 The verticl motion of mss A is defined by the reltion x= 0 sin t+ 5cost+ 00, where x nd t re expressed in mm nd seconds, respectively. Determine () the position, velocity nd ccelertion of A when
More informationENGR 1990 Engineering Mathematics The Integral of a Function as a Function
ENGR 1990 Engineering Mhemics The Inegrl of Funcion s Funcion Previously, we lerned how o esime he inegrl of funcion f( ) over some inervl y dding he res of finie se of rpezoids h represen he re under
More informationThe Covenant Renewed. Family Journal Page. creation; He tells us in the Bible.)
i ell orie o go ih he picure. L, up ng i gro ve el ur Pren, ho phoo picure; u oher ell ee hey (T l. chi u b o on hi pge y ur ki kn pl. (We ee Hi i H b o b o kn e hem orie.) Compre h o ho creion; He ell
More informationChapter 3. Second Order Linear PDEs
Chapter 3. Second Order Linear PDEs 3.1 Introduction The general class of second order linear PDEs are of the form: ax, y)u xx + bx, y)u xy + cx, y)u yy + dx, y)u x + ex, y)u y + f x, y)u = gx, y). 3.1)
More informationOn the diagram below the displacement is represented by the directed line segment OA.
Vectors Sclrs nd Vectors A vector is quntity tht hs mgnitude nd direction. One exmple of vector is velocity. The velocity of n oject is determined y the mgnitude(speed) nd direction of trvel. Other exmples
More informationF.Y. Diploma : Sem. II [CE/CR/CS] Applied Mathematics
F.Y. Diplom : Sem. II [CE/CR/CS] Applied Mhemics Prelim Quesio Pper Soluio Q. Aemp y FIVE of he followig : [0] Q. () Defie Eve d odd fucios. [] As.: A fucio f() is sid o e eve fucio if f() f() A fucio
More informationThe solution is often represented as a vector: 2xI + 4X2 + 2X3 + 4X4 + 2X5 = 4 2xI + 4X2 + 3X3 + 3X4 + 3X5 = 4. 3xI + 6X2 + 6X3 + 3X4 + 6X5 = 6.
[~ o o :- o o ill] i 1. Mrices, Vecors, nd Guss-Jordn Eliminion 1 x y = = - z= The soluion is ofen represened s vecor: n his exmple, he process of eliminion works very smoohly. We cn elimine ll enries
More informationVoL 7 No. 48 MAjgNE CORPS Am STATION. rerrwwy POINT. H. C 1919 Station Sgt. Major Wheels Watch Saves.Retires On 30 Years $260,000 In Nine Days
HE VL 7 N 48 MAjNE ORPS A SAION Y POIN H 99 S S Mj W W S R O 30 Y $260000 I N D LONG ABEEB SPIED WIH ADVENDHE AND RAVEL NEW SYSO HEAPS LARGE DIVIDENDS IN FIRS FEW OAS B B P O D H q S - M W j! M S W S R
More informationTEXAS LOTTERY COMMISSION Scratch Ticket Game Closing Analysis SUMMARY REPORT Scratch Ticket Information Date Completed 9/20/2017
TES LTTERY CISSI Scch Ticke Ge Clsing nlysis SURY REPRT Scch Ticke Infin Clee 9/2/217 Ge # 183 Cnfie Pcks 5,26 Ge e illy nk Glen Ticke cive Pcks,33 Quniy Pine 9,676,3 ehuse Pcks,233 Pice Pin 1 Reune Pcks
More information8Similarity UNCORRECTED PAGE PROOFS. 8.1 Kick off with CAS 8.2 Similar objects 8.3 Linear scale factors. 8.4 Area and volume scale factors 8.
8.1 Kick off with S 8. Similr ojects 8. Liner scle fctors 8Similrity 8. re nd volume scle fctors 8. Review U N O R R E TE D P G E PR O O FS 8.1 Kick off with S Plese refer to the Resources t in the Prelims
More informationSoftware Process Models there are many process model s in th e li t e ra t u re, s om e a r e prescriptions and some are descriptions you need to mode
Unit 2 : Software Process O b j ec t i ve This unit introduces software systems engineering through a discussion of software processes and their principal characteristics. In order to achieve the desireable
More informationMath 426: Probability Final Exam Practice
Mth 46: Probbility Finl Exm Prctice. Computtionl problems 4. Let T k (n) denote the number of prtitions of the set {,..., n} into k nonempty subsets, where k n. Argue tht T k (n) kt k (n ) + T k (n ) by
More informationSection 11.5 Estimation of difference of two proportions
ection.5 Estimtion of difference of two proportions As seen in estimtion of difference of two mens for nonnorml popultion bsed on lrge smple sizes, one cn use CLT in the pproximtion of the distribution
More informationGeometric Predicates P r og r a m s need t o t es t r ela t ive p os it ions of p oint s b a s ed on t heir coor d ina t es. S im p le exa m p les ( i
Automatic Generation of SS tag ed Geometric PP red icates Aleksandar Nanevski, G u y B lello c h and R o b ert H arp er PSCICO project h ttp: / / w w w. cs. cm u. ed u / ~ ps ci co Geometric Predicates
More informationQuestion Details Int Vocab 1 [ ] Question Details Int Vocab 2 [ ]
/3/5 Assignmen Previewer 3 Bsic: Definie Inegrls (67795) Due: Wed Apr 5 5 9: AM MDT Quesion 3 5 6 7 8 9 3 5 6 7 8 9 3 5 6 Insrucions Red ody's Noes nd Lerning Gols. Quesion Deils In Vocb [37897] The chnge
More information8Similarity ONLINE PAGE PROOFS. 8.1 Kick off with CAS 8.2 Similar objects 8.3 Linear scale factors. 8.4 Area and volume scale factors 8.
8.1 Kick off with S 8. Similr ojects 8. Liner scle fctors 8Similrity 8.4 re nd volume scle fctors 8. Review Plese refer to the Resources t in the Prelims section of your eookplus for comprehensive step-y-step
More informationSolution for Assignment 1 : Intro to Probability and Statistics, PAC learning
Solution for Assignment 1 : Intro to Probbility nd Sttistics, PAC lerning 10-701/15-781: Mchine Lerning (Fll 004) Due: Sept. 30th 004, Thursdy, Strt of clss Question 1. Bsic Probbility ( 18 pts) 1.1 (
More informationRiemann Sums and Riemann Integrals
Riemnn Sums nd Riemnn Integrls Jmes K. Peterson Deprtment of Biologicl Sciences nd Deprtment of Mthemticl Sciences Clemson University August 26, 203 Outline Riemnn Sums Riemnn Integrls Properties Abstrct
More informationON NEW INEQUALITIES OF SIMPSON S TYPE FOR FUNCTIONS WHOSE SECOND DERIVATIVES ABSOLUTE VALUES ARE CONVEX.
ON NEW INEQUALITIES OF SIMPSON S TYPE FOR FUNCTIONS WHOSE SECOND DERIVATIVES ABSOLUTE VALUES ARE CONVEX. MEHMET ZEKI SARIKAYA?, ERHAN. SET, AND M. EMIN OZDEMIR Asrc. In his noe, we oin new some ineuliies
More informationEastern Progress - 3 Mar 1923
922-927 Kk U Y 923-3 923 Kk U //k/ 922-27/7 N VOLU WO X-COON O DUCON OG COND DON COUNY W WOOD LCD DO O NNUL NOC - N CL WNGON DY D Cx W Oz N WN GN O U N N C U D Y C 3 923 CUC OCL W NOD VN W C 9 NO OU UDN
More informationSTRAND B: NUMBER THEORY
Mthemtics SKE, Strnd B UNIT B Indices nd Fctors: Tet STRAND B: NUMBER THEORY B Indices nd Fctors Tet Contents Section B. Squres, Cubes, Squre Roots nd Cube Roots B. Inde Nottion B. Fctors B. Prime Fctors,
More information( dg. ) 2 dt. + dt. dt j + dh. + dt. r(t) dt. Comparing this equation with the one listed above for the length of see that
Arc Length of Curves in Three Dimensionl Spce If the vector function r(t) f(t) i + g(t) j + h(t) k trces out the curve C s t vries, we cn mesure distnces long C using formul nerly identicl to one tht we
More informationWe are looking for ways to compute the integral of a function f(x), f(x)dx.
INTEGRATION TECHNIQUES Introdction We re looking for wys to compte the integrl of fnction f(x), f(x)dx. To pt it simply, wht we need to do is find fnction F (x) sch tht F (x) = f(x). Then if the integrl
More information5.9 Representations of Functions as a Power Series
5.9 Representations of Functions as a Power Series Example 5.58. The following geometric series x n + x + x 2 + x 3 + x 4 +... will converge when < x
More information378 Relations Solutions for Chapter 16. Section 16.1 Exercises. 3. Let A = {0,1,2,3,4,5}. Write out the relation R that expresses on A.
378 Reltions 16.7 Solutions for Chpter 16 Section 16.1 Exercises 1. Let A = {0,1,2,3,4,5}. Write out the reltion R tht expresses > on A. Then illustrte it with digrm. 2 1 R = { (5,4),(5,3),(5,2),(5,1),(5,0),(4,3),(4,2),(4,1),
More informationAverage & instantaneous velocity and acceleration Motion with constant acceleration
Physics 7: Lecure Reminders Discussion nd Lb secions sr meeing ne week Fill ou Pink dd/drop form if you need o swich o differen secion h is FULL. Do i TODAY. Homework Ch. : 5, 7,, 3,, nd 6 Ch.: 6,, 3 Submission
More informationwest (mrw3223) HW 24 lyle (16001) 1
west (mrw3223) HW 24 lyle (16001) 1 This print-out should hve 30 questions. Multiple-choice questions my continue on the next column or pge find ll choices before nswering. Reding ssignment: Hecht, sections
More informationChapter 2. First-Order Differential Equations
Chapter 2 First-Order Differential Equations i Let M(x, y) + N(x, y) = 0 Some equations can be written in the form A(x) + B(y) = 0 DEFINITION 2.2. (Separable Equation) A first-order differential equation
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 informationProf. Anchordoqui. Problems set # 4 Physics 169 March 3, 2015
Prof. Anchordoui Problems set # 4 Physics 169 Mrch 3, 15 1. (i) Eight eul chrges re locted t corners of cube of side s, s shown in Fig. 1. Find electric potentil t one corner, tking zero potentil to be
More informationF l a s h-b a s e d S S D s i n E n t e r p r i s e F l a s h-b a s e d S S D s ( S o-s ltiad t e D r i v e s ) a r e b e c o m i n g a n a t t r a c
L i f e t i m e M a n a g e m e n t o f F l a-b s ah s e d S S D s U s i n g R e c o v e r-a y w a r e D y n a m i c T h r o t t l i n g S u n g j i n L e, e T a e j i n K i m, K y u n g h o, Kainmd J
More informationM344 - ADVANCED ENGINEERING MATHEMATICS
M3 - ADVANCED ENGINEERING MATHEMATICS Lecture 18: Lplce s Eqution, Anltic nd Numericl Solution Our emple of n elliptic prtil differentil eqution is Lplce s eqution, lso clled the Diffusion Eqution. If
More informationEE757 Numerical Techniques in Electromagnetics Lecture 9
EE757 uericl Techiques i Elecroeics Lecure 9 EE757 06 Dr. Mohed Bkr Diereil Equios Vs. Ierl Equios Ierl equios ke severl ors e.. b K d b K d Mos diereil equios c be epressed s ierl equios e.. b F d d /
More informationNumerical quadrature based on interpolating functions: A MATLAB implementation
SEMINAR REPORT Numericl qudrture bsed on interpolting functions: A MATLAB implementtion by Venkt Ayylsomyjul A seminr report submitted in prtil fulfillment for the degree of Mster of Science (M.Sc) in
More informationTHE MIDWAY & GAMES GRADE 6 STEM STEP BY STEP POTENTIAL & KINETIC ENERGY MOVE THE CROWDS
THE MIDWAY & GAMES GRADE 6 STEP BY STEP POTENTIAL & KINETIC ENERGY MOVE THE CROWDS & G S S Pl & K E Mv C I l ll l M T x Tx, F S T NERGY! k E? All x Exl M l l Wl k, v k W, M? j I ll xl l k M D M I l k,
More informationSt ce l. M a p le. Hubertus Rd. Morgan. Beechwood Industrial Ct. Amy Belle Lake Rd. o o. Am Bell. S Ridge. Colgate Rd. Highland Dr.
S l Tu pi Kli 4 Lil L ill ill ilfl L pl hi L E p p ll L hi i E: i O. Q O. SITO UKES Y Bll Sig i 7 ppl 8 Lill 9 Sh 10 Bl 11 ul 12 i 7 13 h 8 10 14 Shh 9 11 41 ill P h u il f uu i P pl 45 Oh P ig O L ill
More informationSOUTH. Bus Map. From 25 October travelsouthyorkshire.com/sbp
SOUT SFFIL u Mp F Ocb 1 N Sff p vb f Tv Su Y If Sff vuc/sp Sff u Pp - v Sff Sff u Pp cu w pv u w: u p bu w b vu c f u-p v Fqu vc ub f u Fw u c bu w w f cc v w cv f? 3 f-p p Sff bu Ipv cu fc b up % 0,000
More informationBipartite Matching. Matching. Bipartite Matching. Maxflow Formulation
Mching Inpu: undireced grph G = (V, E). Biprie Mching Inpu: undireced, biprie grph G = (, E).. Mching Ern Myr, Hrld äcke Biprie Mching Inpu: undireced, biprie grph G = (, E). Mflow Formulion Inpu: undireced,
More informationJEE(MAIN) 2015 TEST PAPER WITH SOLUTION (HELD ON SATURDAY 04 th APRIL, 2015) PART B MATHEMATICS
JEE(MAIN) 05 TEST PAPER WITH SOLUTION (HELD ON SATURDAY 0 th APRIL, 05) PART B MATHEMATICS CODE-D. Let, b nd c be three non-zero vectors such tht no two of them re colliner nd, b c b c. If is the ngle
More informationSUMMER KNOWHOW STUDY AND LEARNING CENTRE
SUMMER KNOWHOW STUDY AND LEARNING CENTRE Indices & Logrithms 2 Contents Indices.2 Frctionl Indices.4 Logrithms 6 Exponentil equtions. Simplifying Surds 13 Opertions on Surds..16 Scientific Nottion..18
More informationi.ea IE !e e sv?f 'il i+x3p \r= v * 5,?: S i- co i, ==:= SOrq) Xgs'iY # oo .9 9 PE * v E=S s->'d =ar4lq 5,n =.9 '{nl a':1 t F #l *r C\ t-e
fl ) 2 ;;:i c.l l) ( # =S >' 5 ^'R 1? l.y i.i.9 9 P * v ,>f { e e v? 'il v * 5,?: S 'V i: :i (g Y 1,Y iv cg G J :< >,c Z^ /^ c..l Cl i l 1 3 11 5 (' \ h 9 J :'i g > _ ^ j, \= f{ '{l #l * C\? 0l = 5,
More informationPHYSICS 1210 Exam 1 University of Wyoming 14 February points
PHYSICS 1210 Em 1 Uniersiy of Wyoming 14 Februry 2013 150 poins This es is open-noe nd closed-book. Clculors re permied bu compuers re no. No collborion, consulion, or communicion wih oher people (oher
More informationIntroduction to Probability and Statistics Slides 4 Chapter 4
Inroducion o Probabiliy and Saisics Slides 4 Chaper 4 Ammar M. Sarhan, asarhan@mahsa.dal.ca Deparmen of Mahemaics and Saisics, Dalhousie Universiy Fall Semeser 8 Dr. Ammar Sarhan Chaper 4 Coninuous Random
More informationAllocation problems 2E
Allocation problems 2E 1 The initial cost matrix is shown below (with the numbers representing minutes): Task C Task D Task E Worker L 37 15 12 Worker M 25 13 16 Worker N 32 41 35 The following linear
More informationQuarter 2 400, , , , , , ,000 50,000
Algebra 2 Quarter 2 Quadratic Functions Introduction to Polynomial Functions Hybrid Electric Vehicles Since 1999, there has been a growing trend in the sales of hybrid electric vehicles. These data show
More informationYears. Marketing without a plan is like navigating a maze; the solution is unclear.
F Q 2018 E Mk l lk z; l l Mk El M C C 1995 O Y O S P R j lk q D C Dl Off P W H S P W Sl M Y Pl Cl El M Cl FIRST QUARTER 2018 E El M & D I C/O Jff P RGD S C D M Sl 57 G S Alx ON K0C 1A0 C Tl: 6134821159
More informationDanger of electrical shock, burns or death.
anger of electrical shock, burns or death. lways remove all power sources before a emp ng any repair, service or diagnos c work. Power can be present from shore power, generator, inverter or ba ery. ll
More informationChapter 2: First Order DE 2.6 Exact DE and Integrating Fa
Chapter 2: First Order DE 2.6 Exact DE and Integrating Factor First Order DE Recall the general form of the First Order DEs (FODE): dy dx = f(x, y) (1) (In this section x is the independent variable; not
More informationo & ~o k M 8 & 6)24 5)40 2 lef-v? ^ ) 6 7)2g 4) 6 C> c> "O 300+ <to ^ = 5CO* 10-i IS "24 -qp Name: Morning Math 7V ) > v
Morning Math A /- Look at the clock below, What will the time be in 3 hours?. What is the number in the hundreds' place? Be sure to write a.m. or p.m. in,-.^ your* unswer. I O p -m. 7 iiorr LL / f 1 Z.O
More informationTopics Covered AP Calculus AB
Topics Covered AP Clculus AB ) Elementry Functions ) Properties of Functions i) A function f is defined s set of ll ordered pirs (, y), such tht for ech element, there corresponds ectly one element y.
More informationo C *$ go ! b», S AT? g (i * ^ fc fa fa U - S 8 += C fl o.2h 2 fl 'fl O ' 0> fl l-h cvo *, &! 5 a o3 a; O g 02 QJ 01 fls g! r«'-fl O fl s- ccco
> p >>>> ft^. 2 Tble f Generl rdnes. t^-t - +«0 -P k*ph? -- i t t i S i-h l -H i-h -d. *- e Stf H2 t s - ^ d - 'Ct? "fi p= + V t r & ^ C d Si d n. M. s - W ^ m» H ft ^.2. S'Sll-pl e Cl h /~v S s, -P s'l
More informationRiemann Sums and Riemann Integrals
Riemnn Sums nd Riemnn Integrls Jmes K. Peterson Deprtment of Biologicl Sciences nd Deprtment of Mthemticl Sciences Clemson University August 26, 2013 Outline 1 Riemnn Sums 2 Riemnn Integrls 3 Properties
More informationLecture 3. In this lecture, we will discuss algorithms for solving systems of linear equations.
Lecture 3 3 Solving liner equtions In this lecture we will discuss lgorithms for solving systems of liner equtions Multiplictive identity Let us restrict ourselves to considering squre mtrices since one
More informationTaking Derivatives. Exam II Review - Worksheet Name: Math 1131 Class #31 Section: 1. Compute the derivative of f(x) = sin(x 2 + x + 1)
Taking Derivatives 1. Compute the derivative of f(x) = sin(x 2 + x + 1) 2. Compute the derivative of f(x) = cos(x 2 ) sin(x 2 ) 3. Compute the derivative of f(x) = sin(x e x ) 4. Compute the derivative
More informationPARABOLA EXERCISE 3(B)
PARABOLA EXERCISE (B). Find eqution of the tngent nd norml to the prbol y = 6x t the positive end of the ltus rectum. Eqution of prbol y = 6x 4 = 6 = / Positive end of the Ltus rectum is(, ) =, Eqution
More information