Train Up A Child Paul Marxhausen All Rights Reserved. Dedicated to Stu Tietz for 30 years of Lutheran teaching ministry. Free Praise License


 Bathsheba Gray
 3 years ago
 Views:
Transcription
1 Trn Up A Chld 2000 Pul Mrxhusen All Rghts Reserved Dedcted to Stu Tetz for 30 yers of Luthern techng mnstry Free Prse Lcense Ths lcense does NOT supercede or replce the rghts of the composer(s) under Unted Sttes Copyrght sttutes. The muscl notton nd lyrcs of wors relesed under the terms of the Free Prse Lcense my be freely reproduced or trnsmtted n ny wrtten or dgtl formt for ll purposes of relgous worshp, provded tht: ttrbuton to the composer lwys ccompnes ny reproducton of lyrcs or musc; the lyrcs re not ltered or dded to n ny wy; no fee beyond the cost of med or trnsmsson s chrged for reproducton n ny form. Ths lcense does NOT comprse permsson to publsh the muscl wors for sle, sngly or n songboo or complton n ny formt. The rght to lcense commercl performnces nd/or to me recordngs for commercl sle s retned by the composer nd/or the composer s publsher nd/or the composer s performnce rghts orgnzton.
2 Trn Up A Chld Pul Mrxhusen 4 4 J G =95 l l l l (2) J 4 4 J b 4 4 J Amn7 D/A  Amn7 D/A  Amn7   D/A   Asus A d d d d z d J J 6 J n oz t Wht do we gve our dugh  ters  Wht do we gve our sons Where re the good ex  m  ples Who stnds for the Ho  ly One Lern how to trust com  plete  ly  Tech them the thngs God sd Fm7 G6 Fm7 Emn7 J b J 8 s o n n Wht re we hn  dng down to  our lt  tle ones Where s the tes  t  mo  ny to wht God hs done Clng to the One Who's r  sen up  from the ded Fm7 G6 Fm7 b Copyrght 2000 by Pul Mrxhusen All Rghts Reserved
3 10 o z s oz t We try to be good pro  v  ders  n  swer  ng ll ther needs  Where s the fth  ful shep  herd who leds wth gen  tle stff  Tech them the love of Je  sus And lern how to lve wth oy Fm7 G6   Fm7 C/E b 12 s p s d d but re we pln  tng re we w  ter  ng seeds Who gurds these pre  cous herts on the Lord's be  hlf bult on roc tht tme cn  not  de  stroy Fm7 G6   Asus d b 14 n n o d When you trn up chld n the wy he should go when he s old hs Who wll trn up chld n the wy he should go when he s old hs When you trn up chld n the wy he should go when he s old hs A  Amn   Amn   G   D/F# F   E b e e z d d e e d
4 17 o steps won't de  prt from the rod n tme when our fmsteps won't de  prt from the rod n tme when our cul steps won't de  prt from the rod when  so m  ny herts Amn   G   D/F# F   E d b d e e d 19 d  'les re bleed  ng t's cler tht we're need  ng to now  ture s bur  nng t's tme we were ler  nng to now hve been hr  dened we stll hve ths gr  den to hoe Dmn A/D F/D F G d b p s p s 21 o how to trn up chld n the wy he should go Oh how to trn up chld n the wy he should go Oh where we trn up chld n the wy he should go E Amn   G   D/F# F   E d s o o o b s o n 1. d t z d d e z e d
5 24 n m l l l J b Amn7 D/A  Amn7 D/A  Amn7   D/A   Asus A d d d d z d J J t z d n n n l l go Oh D/F# F   E Amn7 D/A  Amn7 D/A  Amn7   D/A   d b d e d e z d d d d z 32 l oz s I hve pc  ture n my mnd Asus A Fm7  b d s p s s p s s z
6 34 p z of when the S  vor too the tme to ply wth chl  ren on Hs Gsus  G C C2/E s p s b s p s s p s s p s z 36 z oz s wy They lughed nd duced be  hnd Hs nees F9 F Fm7  s p s b s p s z 38 t p t t p s the Kng  dom be  longs to such s these so much we hve to tech them Gsus  E7  Amn  s p s b s p s s p d s s p d s
7 40 m n t o J 3 so much we need to lern we cn F Amn  F G b z z so n J s o n J t o go where we trn up chld n the wy he should b D/F# F   E Amn   G   d d e d e 45 o t d go where we trn up chld n the wy he should go oh D/F# F   E Amn   G   D/F# F   E d e d d b d e z d e z e d
8 48 n n n l l l b Amn7 D/A  Amn7 D/A  Amn7   D/A   Asus A d d d z d d
Gather and Remember. Pope John XXIII Hymn
horl Series Owen Alstt Trumpet Orgn Gr Remember Pope John XXIII Hymn Inspid by Pope John XXIII for Circle of Friends Concert celebrtg 25th nniversry of Ntionl Assocition of Psrl Musicins held Wshgn, D.C.
More informationStephen McManus Composer, Teacher
Stephen McMnus Composer, Techer United Kingdom Aout the rtist Born in 1962 I ive in Northern Irend. For mny yers I hve een freence techer of pino nd theory. My quifictions incude LTCL, Bmus. nd Mphi degrees.
More informationCan't Buy Me Love. (Medley of Hits by the Beatles) ...*.e.s... ..*.6..e.. NHAL LEONARD'
00216056 STB US $2.95 Cn't Buy Me Love (Medley of Hts by the Betles) Here Comes the Sun In My Lfe Cn't Buy Me Love Chorl rrngement by udrey Snyder Instrumentl rrngement by Pul Murth vlble for STB, SB nd
More informationglo ry of God, Final to Verses G/D D ing.
BEHL THE LRY F REFRIN Live, much g ( = c. 80) / / / / Melody Keybord r g! Be g. hold hrt / / Je s Vses / ry, SMPLE / shes Fl Fe / / / g. th Vses Fl Fe / y Str / Text: Roc nor, SJ, b. 1949, 1990, Rort F.
More informationImproper Integrals. MATH 211, Calculus II. J. Robert Buchanan. Spring Department of Mathematics
Improper Integrls MATH 2, Clculus II J. Robert Buchnn Deprtment of Mthemtics Spring 28 Definite Integrls Theorem (Fundmentl Theorem of Clculus (Prt I)) If f is continuous on [, b] then b f (x) dx = [F(x)]
More informationAh, gentle Jesu. su! Ah, gen. Ah, gen. su! that. Who. doth. call? that. that. Who. doth. that. call? I a sin  ner that oft doth fall. Mer. oft.
Verses, if not burden, John Lydgte (d.1451) tle su 6 tle tle s ner tht t doth Who Who fll. is is tht tht tht tht Sherynghm Fyrfx Book (c.1500) BM Add MS 5465 doth doth Mer s ner tht t doth fll. 11 Lord
More informationj œ œ J œ œ œ   œ œ œ œ œ œ œ. œ. œ. œ J u œ œ  veth and
Book o Commo Pryer 159, 12 & 1928 S. A. Me & q = 5 2 2 Slowly d with digiied solemity I m the Buril Seteces (with "Thou kowest Lord" y Hery Purcell).. Re su re ctio d the Lie, sith the Lord: Willim Crot
More informationSAMPLE THE LORD IS MY HOPE. Fm7. Fm7. The. The Lord is the. Fm7. ten der and. song that I. lov ing a. Fm7. shep herd, king. jus tice, a.
TH LORD S MY HOP RFRN With quiet confidence ( = ca. 40) Melody Keyboard ng th shep herd, Lord D sg: is hope glo root ry. SMPL Lord is ten der lov g a jus tice, a kg. Text: as on 2 Samuel 22; M.D. Ridge.
More informationUNIVERSITY OF IOANNINA DEPARTMENT OF ECONOMICS. M.Sc. in Economics MICROECONOMIC THEORY I. Problem Set II
Mcroeconomc Theory I UNIVERSITY OF IOANNINA DEPARTMENT OF ECONOMICS MSc n Economcs MICROECONOMIC THEORY I Techng: A Lptns (Note: The number of ndctes exercse s dffculty level) ()True or flse? If V( y )
More informationRock Around Christmas
Rock round Christmas Performance Score (Grade 6 Standard) by Dave Corbett 1/0101 Published by Musicline Publications P.O. Box 156 Tamworth Staffordshire 7 5BY 0187 81 1 www.musiclinedirect.com No part
More informationLet's start with an example:
Finite Automt Let's strt with n exmple: Here you see leled circles tht re sttes, nd leled rrows tht re trnsitions. One of the sttes is mrked "strt". One of the sttes hs doule circle; this is terminl stte
More information8. INVERSE ZTRANSFORM
8. INVERSE ZTRANSFORM The proce by whch Ztrnform of tme ere, nmely X(), returned to the tme domn clled the nvere Ztrnform. The nvere Ztrnform defned by: Computer tudy Z X Mfle trn.m ued to fnd nvere
More informationWhat do you think I fought for at Omaha Beach? 1_1. My name is Phil  lip Spoon er, and I ... " . "a...,
2 Wht do you thnk ought o t Omh Bech? Fo STB Chous Text tken om testmony beoe Mne Stte Congess by hlp Spoone dgo J=60 Melss Dunphy Sopno MN m= " Good mon ng com mttee Good lto Teno 0 4 " L o" : 4 My nme
More informationTrigonometry. Trigonometry. Solutions. Curriculum Ready ACMMG: 223, 224, 245.
Trgonometry Trgonometry Solutons Currulum Redy CMMG:, 4, 4 www.mthlets.om Trgonometry Solutons Bss Pge questons. Identfy f the followng trngles re rght ngled or not. Trngles,, d, e re rght ngled ndted
More informationMA 15910, Lessons 2a and 2b Introduction to Functions Algebra: Sections 3.5 and 7.4 Calculus: Sections 1.2 and 2.1
MA 15910, Lessons nd Introduction to Functions Alger: Sections 3.5 nd 7.4 Clculus: Sections 1. nd.1 Representing n Intervl Set of Numers Inequlity Symol Numer Line Grph Intervl Nottion ) (, ) ( (, ) ]
More informationWESTOVER HILLS Order of Worship December 2, 2018
WESTOVER HLLS Order of Worship December 2, 2018 Cll Worship Greg Wtts Know Tht My Redeer Lives (28) Will Never Be S Agin The First Noel (999) Mgnifict (Sermon Reding) Sermon Luke Shring Bred Cup Luke Why
More informationJens Siebel (University of Applied Sciences Kaiserslautern) An Interactive Introduction to Complex Numbers
Jens Sebel (Unversty of Appled Scences Kserslutern) An Interctve Introducton to Complex Numbers 1. Introducton We know tht some polynoml equtons do not hve ny solutons on R/. Exmple 1.1: Solve x + 1= for
More informationAP Physics C: Electricity & Magnetism 1999 FreeResponse Questions
AP Physics C: Electricity & Mgnetism 1999 Freeesponse Questions The mterils included in these files re intended for noncommercil use by AP techers for course nd exm preprtion; permission for ny other
More informationPAIR OF LINEAR EQUATIONS IN TWO VARIABLES
PAIR OF LINEAR EQUATIONS IN TWO VARIABLES. Two liner equtions in the sme two vriles re lled pir of liner equtions in two vriles. The most generl form of pir of liner equtions is x + y + 0 x + y + 0 where,,,,,,
More informationName Ima Sample ASU ID
Nme Im Smple ASU ID 2468024680 CSE 355 Test 1, Fll 2016 30 Septemer 2016, 8:359:25.m., LSA 191 Regrding of Midterms If you elieve tht your grde hs not een dded up correctly, return the entire pper to
More informationAP * Calculus Review
AP * Clculus Review The Fundmentl Theorems of Clculus Techer Pcket AP* is trdemrk of the College Entrnce Emintion Bord. The College Entrnce Emintion Bord ws not involved in the production of this mteril.
More informationM/G/1/GD/ / System. ! PollaczekKhinchin (PK) Equation. ! Steadystate probabilities. ! Finding L, W q, W. ! π 0 = 1 ρ
M/G//GD/ / System! PollczeKhnchn (PK) Equton L q 2 2 λ σ s 2( + ρ ρ! Stedystte probbltes! π 0 ρ! Fndng L, q, ) 2 2 M/M/R/GD/K/K System! Drw the trnston dgrm! Derve the stedystte probbltes:! Fnd L,L
More informationNon Right Angled Triangles
Non Right ngled Tringles Non Right ngled Tringles urriulum Redy www.mthletis.om Non Right ngled Tringles NON RIGHT NGLED TRINGLES sin i, os i nd tn i re lso useful in nonright ngled tringles. This unit
More information5.3 The Fundamental Theorem of Calculus
CHAPTER 5. THE DEFINITE INTEGRAL 35 5.3 The Funmentl Theorem of Clculus Emple. Let f(t) t +. () Fin the re of the region below f(t), bove the tis, n between t n t. (You my wnt to look up the re formul
More informationSmart Motorways HADECS 3 and what it means for your drivers
Vehcle Rentl Smrt Motorwys HADECS 3 nd wht t mens for your drvers Vehcle Rentl Smrt Motorwys HADECS 3 nd wht t mens for your drvers You my hve seen some news rtcles bout the ntroducton of Hghwys Englnd
More informationFundamental Theorem of Calculus
Fundmentl Theorem of Clculus Recll tht if f is nonnegtive nd continuous on [, ], then the re under its grph etween nd is the definite integrl A= f() d Now, for in the intervl [, ], let A() e the re under
More informationJim Lambers MAT 169 Fall Semester Lecture 4 Notes
Jim Lmbers MAT 169 Fll Semester 200910 Lecture 4 Notes These notes correspond to Section 8.2 in the text. Series Wht is Series? An infinte series, usully referred to simply s series, is n sum of ll of
More informationGentle Shepherd. Jesús, Pastor Tan Dulce. Assembly, Two part Choir, Organ, Guitar and Solo Instruments I & II
Orgn REFRAIN: 1st ti: Cntor; refter: All Melod Hrmon O Melod INTRO: Confidentl ( = c. 82) Je Ped. d lib. Gentle Shepherd Jesús, Pstor Tn Dulce Assembl, Two prt Choir, Orgn, Guitr nd Solo Instrunts I &
More informationYear 2009 VCE Mathematical Methods CAS Solutions Trial Examination 2
Yer 9 VCE Mthemticl Methods CAS Solutions Tril Emintion KILBAHA MULTIMEDIA PUBLISHING PO BOX 7 KEW VIC AUSTRALIA TEL: () 987 57 FAX: () 987 kilbh@gmil.com http://kilbh.googlepges.com KILBAHA PTY LTD 9
More informationLesson 1: Quadratic Equations
Lesson 1: Qudrtic Equtions Qudrtic Eqution: The qudrtic eqution in form is. In this section, we will review 4 methods of qudrtic equtions, nd when it is most to use ech method. 1. 3.. 4. Method 1: Fctoring
More informationProject 6: Minigoals Towards Simplifying and Rewriting Expressions
MAT 51 Wldis Projet 6: Minigols Towrds Simplifying nd Rewriting Expressions The distriutive property nd like terms You hve proly lerned in previous lsses out dding like terms ut one prolem with the wy
More informationEquations and Inequalities
Equtions nd Inequlities Equtions nd Inequlities Curriculum Redy ACMNA: 4, 5, 6, 7, 40 www.mthletics.com Equtions EQUATIONS & Inequlities & INEQUALITIES Sometimes just writing vribles or pronumerls in
More informationAT100  Introductory Algebra. Section 2.7: Inequalities. x a. x a. x < a
Section 2.7: Inequlities In this section, we will Determine if given vlue is solution to n inequlity Solve given inequlity or compound inequlity; give the solution in intervl nottion nd the solution 2.7
More informationRegular Language. Nonregular Languages The Pumping Lemma. The pumping lemma. Regular Language. The pumping lemma. Infinitely long words 3/17/15
Regulr Lnguge Nonregulr Lnguges The Pumping Lemm Models of Comput=on Chpter 10 Recll, tht ny lnguge tht cn e descried y regulr expression is clled regulr lnguge In this lecture we will prove tht not ll
More informationWorksheets are in PDF format, so students can easily print out and work on them right away.
This worksheet hs been creted for teengers ged 10 to 17 yers old with CEFR level rnging from A1 to B1. The exercises were creted by the EF English First cdemic tem to help students prctice their English.
More informationUsing integration tables
Using integrtion tbles Integrtion tbles re inclue in most mth tetbooks, n vilble on the Internet. Using them is nother wy to evlute integrls. Sometimes the use is strightforwr; sometimes it tkes severl
More informationCome to Me, All Who Labor/ Vengan a Mí los Agobiados
12079Z Come Me, All Who L/ J. Cortez SCTB $1.70 USA Vengn Mí, Abi Mtthew 11:28 30; John 14:3 6; John 6:40 Keyd Gm7/C Come Me, All Who L/ Vengn Mí Abi in loving memory of Ry Dubeu (1921 2002) pr Asmble,
More informationRank One Update And the Google Matrix by Al Bernstein Signal Science, LLC
Introducton Rnk One Updte And the Google Mtrx y Al Bernsten Sgnl Scence, LLC www.sgnlscence.net here re two dfferent wys to perform mtrx multplctons. he frst uses dot product formulton nd the second uses
More informationFirst Midterm Examination
2425 Fll Semester First Midterm Exmintion ) Give the stte digrm of DFA tht recognizes the lnguge A over lphet Σ = {, } where A = {w w contins or } 2) The following DFA recognizes the lnguge B over lphet
More information2.4 Linear Inequalities and Interval Notation
.4 Liner Inequlities nd Intervl Nottion We wnt to solve equtions tht hve n inequlity symol insted of n equl sign. There re four inequlity symols tht we will look t: Less thn , Less thn or
More informationHomework Solution  Set 5 Due: Friday 10/03/08
CE 96 Introduction to the Theory of Computtion ll 2008 Homework olution  et 5 Due: ridy 10/0/08 1. Textook, Pge 86, Exercise 1.21. () 1 2 Add new strt stte nd finl stte. Mke originl finl stte nonfinl.
More informationCS 311 Homework 3 due 16:30, Thursday, 14 th October 2010
CS 311 Homework 3 due 16:30, Thursdy, 14 th Octoer 2010 Homework must e sumitted on pper, in clss. Question 1. [15 pts.; 5 pts. ech] Drw stte digrms for NFAs recognizing the following lnguges:. L = {w
More informationThe Fundamental Theorem of Calculus
The Fundmentl Theorem of Clculus Professor Richrd Blecksmith richrd@mth.niu.edu Dept. of Mthemticl Sciences Northern Illinois University http://mth.niu.edu/ richrd/mth229. The Definite Integrl We define
More informationImproper Integrals. The First Fundamental Theorem of Calculus, as we ve discussed in class, goes as follows:
Improper Integrls The First Fundmentl Theorem of Clculus, s we ve discussed in clss, goes s follows: If f is continuous on the intervl [, ] nd F is function for which F t = ft, then ftdt = F F. An integrl
More informationMATHEMATICS AND STATISTICS 1.2
MATHEMATICS AND STATISTICS. Apply lgebric procedures in solving problems Eternlly ssessed 4 credits Electronic technology, such s clcultors or computers, re not permitted in the ssessment of this stndr
More informationCS 373, Spring Solutions to Mock midterm 1 (Based on first midterm in CS 273, Fall 2008.)
CS 373, Spring 29. Solutions to Mock midterm (sed on first midterm in CS 273, Fll 28.) Prolem : Short nswer (8 points) The nswers to these prolems should e short nd not complicted. () If n NF M ccepts
More informationJackson 2.26 Homework Problem Solution Dr. Christopher S. Baird University of Massachusetts Lowell
Jckson 2.26 Homework Problem Solution Dr. Christopher S. Bird University of Msschusetts Lowell PROBLEM: The twodimensionl region, ρ, φ β, is bounded by conducting surfces t φ =, ρ =, nd φ = β held t zero
More informationMA 124 January 18, Derivatives are. Integrals are.
MA 124 Jnury 18, 2018 Prof PB s oneminute introduction to clculus Derivtives re. Integrls re. In Clculus 1, we lern limits, derivtives, some pplictions of derivtives, indefinite integrls, definite integrls,
More informationMinnesota State University, Mankato 44 th Annual High School Mathematics Contest April 12, 2017
Minnesot Stte University, Mnkto 44 th Annul High School Mthemtics Contest April, 07. A 5 ft. ldder is plced ginst verticl wll of uilding. The foot of the ldder rests on the floor nd is 7 ft. from the wll.
More informationSon. H orace Gleeson. B o o s e y & (a. N? I IN B" N?2 in Db N 3 in E» N 4 in F. TKe Words and. M usic. 9 East Seventeenth Street.
N? N B" N?2 n Db N 3 n E» N 4 n F 4 3» 3 SUNG BY J ohn McC o c k Son X / 7 TKe Wods nd. M usc by H oce Gleeson ce 6 0 c en ts ( n e t ) B o o s e y & ( 9 Est Seventeenth Steet. New Yok 295 R e g e n t
More informationChapter 6 Techniques of Integration
MA Techniques of Integrtion Asst.Prof.Dr.Suprnee Liswdi Chpter 6 Techniques of Integrtion Recll: Some importnt integrls tht we hve lernt so fr. Tle of Integrls n+ n d = + C n + e d = e + C ( n ) d = ln
More informationTrigonometry Revision Sheet Q5 of Paper 2
Trigonometry Revision Sheet Q of Pper The Bsis  The Trigonometry setion is ll out tringles. We will normlly e given some of the sides or ngles of tringle nd we use formule nd rules to find the others.
More informationScientific notation is a way of expressing really big numbers or really small numbers.
Scientific Nottion (Stndrd form) Scientific nottion is wy of expressing relly big numbers or relly smll numbers. It is most often used in scientific clcultions where the nlysis must be very precise. Scientific
More informationThe ZTransform in DSP Lecture Andreas Spanias
The ZTrsform DSP eture  Adres Ss ss@su.edu 6 Coyrght 6 Adres Ss  Poles d Zeros of I geerl the trsfer futo s rtol; t hs umertor d deomtor olyoml. The roots of the umertor d deomtor olyomls re lled the
More informationLinear Inequalities. Work Sheet 1
Work Sheet 1 Liner Inequlities RentHep, cr rentl compny,chrges $ 15 per week plus $ 0.0 per mile to rent one of their crs. Suppose you re limited y how much money you cn spend for the week : You cn spend
More informationCreative Practicing. By Jimmy Wyble edited by David Oakes
Cretve Prctcng By Jy Wyble edted by Dvd Okes Edtors Note: Ths terl s n excert fro Jy s lecture tht he resented t Muscns Insttute on Arl, 008. Ths s the thrd eek of teneek qurter. In the revous eeks, he
More informationADORO TE DEVOTE (Godhead Here in Hiding) te, stus bat mas, la te. in so non mor Je nunc. la in. tis. ne, su a. tum. tas: tur: tas: or: ni, ne, o:
R TE EVTE (dhd H Hdg) L / Mld Kbrd gú s v l m sl c m qu gs v nns V n P P rs l mul m d lud 7 súb Fí cón ví f f dó, cru gs,, j l f c r s m l qum t pr qud ct, us: ns,,,, cs, cut r l sns m / m fí hó sn sí
More informationFarey Fractions. Rickard Fernström. U.U.D.M. Project Report 2017:24. Department of Mathematics Uppsala University
U.U.D.M. Project Report 07:4 Frey Frctions Rickrd Fernström Exmensrete i mtemtik, 5 hp Hledre: Andres Strömergsson Exmintor: Jörgen Östensson Juni 07 Deprtment of Mthemtics Uppsl University Frey Frctions
More informationThe Bernoulli Numbers John C. Baez, December 23, x k. x e x 1 = n 0. B k n = n 2 (n + 1) 2
The Bernoulli Numbers John C. Bez, December 23, 2003 The numbers re defined by the eqution e 1 n 0 k. They re clled the Bernoulli numbers becuse they were first studied by Johnn Fulhber in book published
More informationACCESS TO SCIENCE, ENGINEERING AND AGRICULTURE: MATHEMATICS 1 MATH00030 SEMESTER /2019
ACCESS TO SCIENCE, ENGINEERING AND AGRICULTURE: MATHEMATICS MATH00030 SEMESTER 208/209 DR. ANTHONY BROWN 7.. Introduction to Integrtion. 7. Integrl Clculus As ws the cse with the chpter on differentil
More informationArea and Perimeter. Area and Perimeter. Solutions. Curriculum Ready.
Are n Perimeter Are n Perimeter Solutions Curriulum Rey www.mthletis.om How oes it work? Solutions Are n Perimeter Pge questions Are using unit squres Are = whole squres Are = 6 whole squres = units =
More informationDefinition : A shape has a line of symmetry if, when folded over the line. 1 line of symmetry 2 lines of symmetry
Symmetry Lines of Symmetry Definition : A shpe hs line of symmetry if, when folded over the line the hlves of the shpe mtch up exctly. Some shpes hve more thn one line of symmetry : line of symmetry lines
More informationProblem Set 7: Monopoly and Game Theory
ECON 000 Problem Set 7: Monopoly nd Gme Theory. () The monopolist will choose the production level tht mximizes its profits: The FOC of monopolist s problem is: So, the monopolist would set the quntity
More informationand that at t = 0 the object is at position 5. Find the position of the object at t = 2.
7.2 The Fundmentl Theorem of Clculus 49 re mny, mny problems tht pper much different on the surfce but tht turn out to be the sme s these problems, in the sense tht when we try to pproimte solutions we
More informationChapter 4 StateSpace Planning
Leture slides for Automted Plnning: Theory nd Prtie Chpter 4 StteSpe Plnning Dn S. Nu CMSC 722, AI Plnning University of Mrylnd, Spring 2008 1 Motivtion Nerly ll plnning proedures re serh proedures Different
More information( ) 2. ( ) is the Fourier transform of! ( x). ( ) ( ) ( ) = Ae i kx"#t ( ) = 1 2" ( )"( x,t) PC 3101 Quantum Mechanics Section 1
1. 1D Schrödinger Eqution G chpters 34. 1.1 the Free Prticle V 0 "( x,t) i = 2 t 2m x,t = Ae i kxt "( x,t) x 2 where = k 2 2m. Normliztion must hppen: 2 x,t = 1 Here, however: " A 2 dx " " As this integrl
More informationKinematics Quantities. Linear Motion. Coordinate System. Kinematics Quantities. Velocity. Position. Don t Forget Units!
Knemtc Quntte Lner Phyc 11 Eyre Tme Intnt t Fundmentl Tme Interl t Dened Poton Fundmentl Dplcement Dened Aerge g Dened Aerge Accelerton g Dened Knemtc Quntte Scler: Mgntude Tme Intnt, Tme Interl nd Speed
More information, rit. a tempo. Liebeslieder Waltz No. 1. \ and those. < rit. 'I ~ +t r"ol. '\ ~ +t, < a tempo. r  I \.00000' I. '\ ~ l+ I
Liebeslieder Waltz No. 1 p Answer 'd mal en all too love ly did those r eyes_ in_ trust_ so ten der r.00000' Answer maid en all too love ly did those eyes_ in_ trust_ so ten der /0 f lol!' ) ' l+ ' < rit.
More informationEffects of polarization on the reflected wave
Lecture Notes. L Ros PPLIED OPTICS Effects of polrzton on the reflected wve Ref: The Feynmn Lectures on Physcs, VolI, Secton 336 Plne of ncdence Z Plne of nterfce Fg. 1 Y Y r 1 Glss r 1 Glss Fg. Reflecton
More informationAQA Further Pure 1. Complex Numbers. Section 1: Introduction to Complex Numbers. The number system
Complex Numbers Section 1: Introduction to Complex Numbers Notes nd Exmples These notes contin subsections on The number system Adding nd subtrcting complex numbers Multiplying complex numbers Complex
More informationImproper Integrals. Type I Improper Integrals How do we evaluate an integral such as
Improper Integrls Two different types of integrls cn qulify s improper. The first type of improper integrl (which we will refer to s Type I) involves evluting n integrl over n infinite region. In the grph
More informationfor Assembly, Children s Chorus, Cantor, Descant, Keyboard, and Guitar œ œ œ œ œ œ œ œ œ œ œ œ œ œ REFRAIN: Children s Chorus (Tempo I) Descant % F
SMPL for ssembly, Children s Chorus, Canr, escant, Keyboard, and Guitar Verses based on Lk 2:8 12 Keyboard? INTRO: Lightly, not o fast ( q = ca. 96 ) 4 3? 4 3. J * escant Melody Harmony Bob ufford, SJ
More informationFinite Automatacont d
Automt Theory nd Forml Lnguges Professor Leslie Lnder Lecture # 6 Finite Automtcont d The Pumping Lemm WEB SITE: http://ingwe.inghmton.edu/ ~lnder/cs573.html Septemer 18, 2000 Exmple 1 Consider L = {ww
More informationProof that if Voting is Perfect in One Dimension, then the First. Eigenvector Extracted from the DoubleCentered Transformed
Proof tht f Votng s Perfect n One Dmenson, then the Frst Egenvector Extrcted from the DouleCentered Trnsformed Agreement Score Mtrx hs the Sme Rn Orderng s the True Dt Keth T Poole Unversty of Houston
More informationThe area under the graph of f and above the xaxis between a and b is denoted by. f(x) dx. π O
1 Section 5. The Definite Integrl Suppose tht function f is continuous nd positive over n intervl [, ]. y = f(x) x The re under the grph of f nd ove the xxis etween nd is denoted y f(x) dx nd clled the
More informationThat reminds me must download the test prep HW. adapted from (nz118.jpg)
Tht reminds me must downlod the test prep HW. dpted from http://www.neringzero.net (nz118.jpg) Em 1: Tuesdy, Feb 14, 5:006:00 PM Test rooms: Instructor Sections Room Dr. Hle F, H 104 Physics Dr. Kurter
More informationBy Ken Standfield, Director Research & Development, KNOWCORP
1 THE NORMAL DISTRIBUTION METHOD ARTICLE NO.: 10080 By Ken Stndfield, Director Reserch & Development, KNOWCORP http://www.knowcorp.com Emil: ks@knowcorp.com INTRODUCTION The following methods hve been
More informationState Minimization for DFAs
Stte Minimiztion for DFAs Red K & S 2.7 Do Homework 10. Consider: Stte Minimiztion 4 5 Is this miniml mchine? Step (1): Get rid of unrechle sttes. Stte Minimiztion 6, Stte is unrechle. Step (2): Get rid
More informationPARTIAL FRACTION DECOMPOSITION
PARTIAL FRACTION DECOMPOSITION LARRY SUSANKA 1. Fcts bout Polynomils nd Nottion We must ssemble some tools nd nottion to prove the existence of the stndrd prtil frction decomposition, used s n integrtion
More informationThe Number of Rows which Equal Certain Row
Interntonl Journl of Algebr, Vol 5, 011, no 30, 14811488 he Number of Rows whch Equl Certn Row Ahmd Hbl Deprtment of mthemtcs Fcult of Scences Dmscus unverst Dmscus, Sr hblhmd1@gmlcom Abstrct Let be X
More information3 x x x 1 3 x a a a 2 7 a Ba 1 NOW TRY EXERCISES 89 AND a 2/ Evaluate each expression.
SECTION. Eponents nd Rdicls 7 B 7 7 7 7 7 7 7 NOW TRY EXERCISES 89 AND 9 7. EXERCISES CONCEPTS. () Using eponentil nottion, we cn write the product s. In the epression 3 4,the numer 3 is clled the, nd
More informationFor the percentage of full time students at RCC the symbols would be:
Mth 17/171 Chpter 7 ypothesis Testing with One Smple This chpter is s simple s the previous one, except it is more interesting In this chpter we will test clims concerning the sme prmeters tht we worked
More informationMath 1431 Section M TH 4:00 PM 6:00 PM Susan Wheeler Office Hours: Wed 6:00 7:00 PM Online ***NOTE LABS ARE MON AND WED
Mth 43 Section 4839 M TH 4: PM 6: PM Susn Wheeler swheeler@mth.uh.edu Office Hours: Wed 6: 7: PM Online ***NOTE LABS ARE MON AND WED t :3 PM to 3: pm ONLINE Approimting the re under curve given the type
More informationProblems for HW X. C. Gwinn. November 30, 2009
Problems for HW X C. Gwinn November 30, 2009 These problems will not be grded. 1 HWX Problem 1 Suppose thn n object is composed of liner dielectric mteril, with constnt reltive permittivity ɛ r. The object
More informationCoalgebra, Lecture 15: Equations for Deterministic Automata
Colger, Lecture 15: Equtions for Deterministic Automt Julin Slmnc (nd Jurrin Rot) Decemer 19, 2016 In this lecture, we will study the concept of equtions for deterministic utomt. The notes re self contined
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 informationMath Fall 2006 Sample problems for the final exam: Solutions
Mth 425 Fll 26 Smple problems for the finl exm: Solutions Any problem my be ltered or replced by different one! Some possibly useful informtion Prsevl s equlity for the complex form of the Fourier series
More informationSpring 2017 Exam 1 MARK BOX HAND IN PART PIN: 17
Spring 07 Exm problem MARK BOX points HAND IN PART 0 555=x5 0 NAME: Solutions 3 0 0 PIN: 7 % 00 INSTRUCTIONS This exm comes in two prts. () HAND IN PART. Hnd in only this prt. () STATEMENT OF MULTIPLE
More informationSTRAND J: TRANSFORMATIONS, VECTORS and MATRICES
Mthemtics SKE: STRN J STRN J: TRNSFORMTIONS, VETORS nd MTRIES J3 Vectors Text ontents Section J3.1 Vectors nd Sclrs * J3. Vectors nd Geometry Mthemtics SKE: STRN J J3 Vectors J3.1 Vectors nd Sclrs Vectors
More informationConvert the NFA into DFA
Convert the NF into F For ech NF we cn find F ccepting the sme lnguge. The numer of sttes of the F could e exponentil in the numer of sttes of the NF, ut in prctice this worst cse occurs rrely. lgorithm:
More informationPhysics 2135 Exam 1 February 14, 2017
Exm Totl / 200 Physics 215 Exm 1 Ferury 14, 2017 Printed Nme: Rec. Sec. Letter: Five multiple choice questions, 8 points ech. Choose the est or most nerly correct nswer. 1. Two chrges 1 nd 2 re seprted
More informationChapter Unary Matrix Operations
Chpter 04.04 Ury trx Opertos After redg ths chpter, you should be ble to:. kow wht ury opertos mes,. fd the trspose of squre mtrx d t s reltoshp to symmetrc mtrces,. fd the trce of mtrx, d 4. fd the ermt
More informationThe Passion of Our Lord Jesus Christ According to Mark
A T T T T T Pssion Our Lord Jesus Chrt Accordg Mrk Ps Ps Ps Ps Chront Je + Chrtus Chront At sion sion sion sion our our our our tht time: sus sid Lord Je sus Chrt Lord Je sus Chrt Lord Je sus Chrt Lord
More informationMath Lecture 23
Mth 8  Lecture 3 Dyln Zwick Fll 3 In our lst lecture we delt with solutions to the system: x = Ax where A is n n n mtrix with n distinct eigenvlues. As promised, tody we will del with the question of
More informationAbhilasha Classes Class XII Date: SOLUTION (Chap  9,10,12) MM 50 Mob no
hlsh Clsses Clss XII Dte: 0  SOLUTION Chp  9,0, MM 50 Mo no996 If nd re poston vets of nd B respetvel, fnd the poston vet of pont C n B produed suh tht C B vet r C B = where = hs length nd dreton
More informationCSC 473 Automata, Grammars & Languages 11/9/10
CSC 473 utomt, Grmmrs & Lnguges 11/9/10 utomt, Grmmrs nd Lnguges Discourse 06 Decidbility nd Undecidbility Decidble Problems for Regulr Lnguges Theorem 4.1: (embership/cceptnce Prob. for DFs) = {, w is
More informationOperations with Polynomials
38 Chpter P Prerequisites P.4 Opertions with Polynomils Wht you should lern: How to identify the leding coefficients nd degrees of polynomils How to dd nd subtrct polynomils How to multiply polynomils
More information13.4. Integration by Parts. Introduction. Prerequisites. Learning Outcomes
Integrtion by Prts 13.4 Introduction Integrtion by Prts is technique for integrting products of functions. In this Section you will lern to recognise when it is pproprite to use the technique nd hve the
More informationTuring Machines Part One
Turing Mchines Prt One Hello Hello Condensed Condensed Slide Slide Reders! Reders! Tody s Tody s lecture lecture consists consists lmost lmost exclusively exclusively of of nimtions nimtions of of Turing
More information5.2 Exponent Properties Involving Quotients
5. Eponent Properties Involving Quotients Lerning Objectives Use the quotient of powers property. Use the power of quotient property. Simplify epressions involving quotient properties of eponents. Use
More information