BERNERS TAVERN D R I N K S & C O C K T A I L S
|
|
- Collin Cox
- 6 years ago
- Views:
Transcription
1 BERNERS TAVERN D R I N K S & C O C K T A I L S A d i s c r e t i o n a r y % s e r v i c e c h a r g e w i l l be a d d e d to y o u r b i l l. A l l p r i c e s a r e i n c l u s i v e o f VAT
2 A cocktail done right can really show your guests that you care Danny Meyer
3 B e r ne rs Tavern S IGNATURE c o cktails 14 For allergies or intolerances, please ask one of our team members for assistance. S T R A W S T h e y a r e o n e of t h e b i g g e s t s i n g l e p l a s t i c p o l l u t i o n o f f e n d e r s ; so we h a v e r e m o v e d t h e m f r o m o u r d r i n k s. If y o u v e j u s t a p p l i e d y o u r l i p p y a n d w a n t o n e, f e e l f r e e to a s k.
4 Snapshots of Winter and Fall W h e n t h e t h e r m o s t a t d r o p s a n d we t a k e o u r s e l v e s i n s i d e, s o m e t h i n g q u i t e p e c u l i a r h a p p e n s ; we r e d i s c o v e r c o m f o r t. We s e e k f i r e p l a c e s, c o s y c o t c h e s, h e a r t y m e a l s a n d w a r m i n g d r i n k s. A u t u m n a n d w i n t e r p o s s e s s an i n h e r e n t d e s i r e to be s e n t i m e n t a l, so we c r e a t e d t h i s m e n u to c o n j u r e t h e s e a f f e c t i o n s. E a c h d r i n k is a t i n y s n a p s h o t of t h e m o m e n t s we r e m e m b e r f o n d l y in t h e s e c o l d e r m o n t h s ; h o w e v e r, t o o m a n y m a y m a k e r e m e m b e r i n g t h e n e w o n e s a s t r u g g l e
5 F O R T U N E S C U P B e e f e a t e r 24 K u m q u a t K e e m u n t e a - L e m o n W i t h t h e c o l d s e a s o n a p p r o a c h i n g n o t h i n g is b e t t e r t h a n a h o t c u p of t e a to s o a r y o u r s p i r i t. We t o o k i n s p i r a t i o n f r o m t h e f i r s t t h e f t of t e a in C h i n a by R o b e r t F o r t u n e. He b r o u g h t b a c k g r e e n a n d b l a c k t e a s a l o n g with s o m e k u m q u a t s a n d o t h e r f r u i t s. D e l i c a t e t e a b o t a n i c a l s in t h e gin a r e e n h a n c e d by t h e K e e m u n t e a with c i t r u s y n o t e s of l e m o n a n d k u m q u a t. P O L A R I S C h a s e O a k s m o k e d v o d k a P o l a r C o r d i a l M e n t h e B l a n c h e If y o u f o l l o w t h e n o r t h e r n s t a r y o u w i l l t r a v e l u n t i l y o u r e a c h t h e t u n d r a, w h e r e v e g e t a t i o n g r o w t h is r e d u c e d d ue to t h e c o l d t e m p e r a t u r e s ; k e e p g o i n g, a n d e v e n t u a l l y y o u w i l l r e a c h t h e N o r t h P o l e ; w h o k n o w s, y o u m i g h t e v e n b u m p i n t o S a n t a! C h i l l i n g w h i t e m i n t a nd s m o k y f l a v o u r s, with b l a s t of o a k m o s s a n d s t a r a n i s e a r e t h e m a i n f e a t u r e s of t h i s c o c k t a i l.
6 L A S T C O L O U R S D i p l o m a t i c o R u m B e c h e r o v k a P e d r o X i m e n e z L e m o n D e s p i t e t h e w e a t h e r is g e t t i n g c o l d e r t h e r e is s t i l l s o m e t h i n g b r i n g i n g s o m e w a r m t h to o u r c i t i e s : t h e b e a u t i f u l c o l o u r s of t h e a u t u m n l e a v e s. We t o o k i n s p i r a t i o n f r o m t h e s e to c h o o s e t h e i n g r e d i e n t s f o r t h i s c o c k t a i l. S w e e t D i p l o m a t i c o r u m b l e n d with s p i c es of B e c h e r o v k a a n d n u t s of P e d r o X i m e n e z s h e r r y in t h i s s o u r s t y l e c o c k t a i l. RUM C R U M B L E H a v a n a M a e s t r o r u m A p p l e s h e r b e t B i s c u i t F o a m G i n g e r b r e a d B i t t e r C h r i s t m a s w o u l d not be t h e s a m e w i t h o u t t h e p u d d i n g s a n d e v e r y c o u n t r y, r e g i o n a n d e v e n c i t y h a s i t s o w n p u d d i n g r e c i p e. We b l e n d e d t o g e t h e r f l a v o u r s f r o m t h e d i f f e r e n t t r a d i t i o n s, l i k e a p p l e, c i n n a m o n, g i n g e r a n d m a n y m o r e, to c r e a t e a u n i q u e d r i n k to c a p t u r e C h r i s t m a s s p i r i t a n d p u t it in a g l a s s.
7 A U T U M N F O R E S T C h i v a s 12 s c o t c h - B i r c h l e a v e s S u z e R o s e h i p C o r d i a l W a l k i n g t h r o u g h t h e w o o d s in a u t u m n is a m u l t i s e n s o r i a l e x p e r i e n c e. T h e s m e l l of t h e d a m p g r a s s, t h e l e a v e s c r e e k i n g u n d e r y o u r f e e t, t h e m i s t r a i s i n g b e t w e e n t h e t r e e s. We r e c r e a t e d t h o s e s e n s a t i o n s in t h i s c o c k t a i l. A r o m a s of b i r c h l e a v e s a n d h e r b s a n d g e n t l e s w e e t n e s s of r o s e h i p b u d s, with a s m o o t h a n d s l i g h t l y p e a t y f i n i s h. L O G G E R S C A M P B a c o n f a t w a s h e d C r o w n R o y a l w h i s k e y - B l u e b e r r y S h r u b - G r a p e M u s t V e r j u i c e - C r a n b e r r y L u m b e r j a c k s in C a n a d a h a d a v e r y t o u g h l i f e at t h e b e g i n n i n g of t h e XX c e n t u r y. W ood w a s n e c e s s a r y not o n l y to w a r m t h e h o u s e s b u t a l s o to b u i l d t h e m a n d a l o t of e f f o r t w a s p u t in c u t t i n g it d o w n. L u m b e r j a c k s d i e t h a d to be r i c h of c a l o r i e s s o, w i t h l i m i t e d f o o d o f f e r, t h e y w o u l d r o u n d up at t h e i r c a m p s to c o n s u m e t h e i r m e a l s of b e r r i e s f r o m t he w o o d s a n d m e a t. B a c o n i n f u s e d w h i s k e y, g r a p e m u s t v e r j u i ce a n d m a p l e a n d r e f r e s h i n g c r a n b e r r i e s w i l l g i v e y o u a t a s t e of t h e l u m b e r j a c k ' s b r e a k f a s t.
8 W A X E D A P P L E N i k k a f r o m t h e B a r r e l - F e r m e n t e d F u j i A p p l e - B e e s w a x T h i s d r i n k is i n s p i r e d by t h e f a m o u s a p p l e j u i c e p r o d u c e r s of n o r t h e r n J a p a n a n d t h e e f f o r t to m a k e t h e f r u i t a v a i l a b l e t h r o u g h o u t t h e w i n t e r w h i c h c u l m i n a t e d with t h e c r e a t i o n F u j i A p p l e, t h a n c a n r e s i s t up to one y e a r w h e n k e p t r e f r i g e r a t e d. S u b t l e p e a t f l a v o u r of t h e N i k k a f r o m t h e b a r r e l with a s m o o t h a p p l e f i n i s h. H E A R T S T O N E H e n n e s s y F i n - L a g a v u l i n - C h e r r y - M a p l e - W a l n u t T h e f i r e p l a c e w a s s e t in t h e h e a r t of t h e h o u s e to k e e p it w a r m. F a m i l y a n d f r i e n d s w o u l d g a t h e r a r o u n d, to t a l k, e a t, r e s t, c e l e b r a t e a n d in c e r t a i n c u l t s e v e n w o r s h i p. T h e H e a r t s t o n e is t h e c e n t r a l h e a t i n g p o i n t a r o u n d w h i c h we g a t h e r f o r w a r m t h a n d c o m f o r t. S m o k e y a r o m a s of c h e r r y b a r k s, a s m o o t h a n d e l e g a n t d r i n k with a s w e e t e n d i n g of c h e r r i e s a n d m a p l e.
9 M o n t h l y S p e c i a l S a n d s C o c k t a i l P l y m o u t h G i n M a r a s c h i n o - G r a p e f r u i t S u m m e r is o v e r a n d c o l d w e a t h e r is a l r e a d y h e r e, s o o n we w i l l t a k e o u r s c a r f s a n d c o a t s o u t of t h e w a r d r o b e a n d t h e d a y s in t h e s u n w i l l be a m e m o r y. T h a t is w a y, f o r a l l of t h o s e t h a t w o u l d l i k e to c u d d l e in t h e s u m m e r m e m o r i e s we o f f e r y o u t h e S a n d s c o c k t a i l s, a l a s t s i p of S u m m e r. G i n b l e n d e d with M a r a s c h i n o l i q u e u r a n d f r e s h g r a p e f r u i t j u i c e, b i t t e r s w e e t a p e r i t i f to g e t y o u r e a d y f o r t h e w i n t e r f e a s t s. 1 4 BT W i n t e r C u p H e n d r i c k s O r b i u m B l u e b e r r y R o s e m a r y S h r u b H o n e y T h y m e L e m o n C y n a r E x q u i s i t e W i n t e r c u p i d e a l to sha r e, b l e n d ed with b l u e b l o s s o m, w i n t e r s p i c e & w o r m w o o d. S i n g l e S e r v e 1 4 To S h a r e 4 0
10 B E R N E R S C L A S S I C S 1 4 T h i s s e c t i o n c o n t a i n s a f e w old B e r n e r s f a v o u r i t e s f r o m p r e v i o u s m e n u s D I L L OR NO D I L L P l y m o u t h G i n E l d e r f l o w e r L e m o n - D i l l R O O M W I T H A V I E W Q u i n c e L e m o n S h e r b e t - A p p l e - P r o s e c c o L A T E B R I T I S H S H A K E O F F P l y m o u t h G i n G i n s e n g E l d e r f l o w e r - R a s p b e r r y A G E I N G H I P S T E R T i n C u p B o u r b o n R u m V e r m o u t h - B i t t e r s A U R O R A S P R I T Z S u z e S w e e t V e r m o u t h G i n g e r - P r o s e c c o
11 A P E R I T I F C O C K T A I L S 1 4 S a l v a g e d f r o m t h e p a g e s of h i s t o r y ; t h e s e c o c k t a i l s a r e t h e m o s t p e r f e c t of p r e - d i n n e r r i t u a l s. E a c h is d e s i g n e d to w h e t t h e a p p e t i t e a n d s t i m u l a t e t h e p a l a t e. LA L O U I S I A N E N e w O r l e a n s D r i n k s & H o w to M i x E m W o o d f o r d R y e B e n e d i c t i n e S w e e t V e r m o u t h M A R T I N E Z O. H B y r o n s T h e M o d e r n B a r t e n d e r J e n s e n s O l d T o m G i n S w e e t V e r m o u t h - M a r a s c h i n o HANKY P A N K Y A d a C o l e m a n P l y m o u t h G i n S w e e t V e r m o u t h F e r n e t B r a n c a S E L F S T A R T E R H a r r y C r a d d o c k s S a v o y B o o k P l y m o u t h G i n L i l l e t B l a n c A p r i c o t - A b s i n t h e B O B B Y B U R N S H a r r y C r a d d o c k s S a v o y B o o k C h i v a s 12 S w e e t V e r m o u t h - D. O. M. B e n e d e c t i n e B I J O U H a r r y J o h n s o n s N e w a n d i m p r o v e d B a r t e n d e r s M a n u a l P l y m o u t h G i n S w e e t V e r m o u t h G r e e n C h a r t r e u
1.5 First Order PDEs and Method of Characteristics
1.5. FIRST ORDER PDES AND METHOD OF CHARACTERISTICS 35 1.5 First Order PDEs and Method of Characteristics We finish this introductory chapter by discussing the solutions of some first order PDEs, more
More information6.0 INTRODUCTION TO DIFFERENTIAL EQUATIONS
6.0 Introduction to Differential Equations Contemporary Calculus 1 6.0 INTRODUCTION TO DIFFERENTIAL EQUATIONS This chapter is an introduction to differential equations, a major field in applied and theoretical
More informationWorksheet Week 1 Review of Chapter 5, from Definition of integral to Substitution method
Worksheet Week Review of Chapter 5, from Definition of integral to Substitution method This worksheet is for improvement of your mathematical writing skill. Writing using correct mathematical expressions
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 informationCSE370 HW6 Solutions (Winter 2010)
SE370 HW6 Solutions (Winter 2010) 1. L2e, 6.10 For this problem we are given a blank waveform with clock and input and asked to draw out the how different flip-flops and latches would behave. LK a) b)
More informationCRUSTACEANS MOLLUSCS SOYBEANS FISH
allergen menu allergen menu This guide lists what allergenic ingredients are contained in each of our dishes. The guide also shows whether or not each dish is suitable for vegetarian or vegan customers.
More informationCSC 344 Algorithms and Complexity. Proof by Mathematical Induction
CSC 344 Algorithms and Complexity Lecture #1 Review of Mathematical Induction Proof by Mathematical Induction Many results in mathematics are claimed true for every positive integer. Any of these results
More informationLong-Term Care Ombudsman Programs and Legal Assistance Developers Collaboration
N A T I O N A L L O N G - T E R M C A R E O M B U D S M A N R E S O U R C E C E N T E R Long-Term Care Ombudsman Programs and Legal Assistance Developers Collaboration N a t i o n a l L T C O m b u d s
More informationSTEP Support Programme. Hints and Partial Solutions for Assignment 1
STEP Support Programme Hints and Partial Solutions for Assignment 1 Warm-up 1 You can check many of your answers to this question by using Wolfram Alpha. Only use this as a check though and if your answer
More informationExamples. f (x) = 3x 2 + 2x + 4 f (x) = 2x 4 x 3 + 2x 2 5x 2 f (x) = 3x 6 5x 5 + 7x 3 x
Section 4 3A: Power Functions Limits A power function is a polynomial function with the x terms raised to powers that are positive integers. The terms are written in decreasing powers of x. Examples f
More informationMath 1270 Honors Fall, 2008 Background Material on Uniform Convergence
Math 27 Honors Fall, 28 Background Material on Uniform Convergence Uniform convergence is discussed in Bartle and Sherbert s book Introduction to Real Analysis, which was the tet last year for 42 and 45.
More informationYour Galactic Address
How Big is the Universe? Usually you think of your address as only three or four lines long: your name, street, city, and state. But to address a letter to a friend in a distant galaxy, you have to specify
More informationForecast User Manual FORECAST. User Manual. Version P a g e
FORECAST Version 1.0 1 P a g e Version Created By Created On Verified By Verified On Description No Draft Mr. Jayendrasinh 22/04/2016 Gohil 1.0 Mr. Jayendrasinh Gohil 23/04/2016 Mr. Hemal Patel 2 P a g
More informationLesson Ten. What role does energy play in chemical reactions? Grade 8. Science. 90 minutes ENGLISH LANGUAGE ARTS
Lesson Ten What role does energy play in chemical reactions? Science Asking Questions, Developing Models, Investigating, Analyzing Data and Obtaining, Evaluating, and Communicating Information ENGLISH
More informationE S T 2005 METRO BAR & BISTRO P E R T H AUSTRALIA
E S T 2005 METRO BAR & BISTRO 3 3 MOUNTS BAY RD P E R T H AUSTRALIA 6000 + 6 1 8 9485 1218 I N F O@METROBARANDBISTRO.COM.AU W W W.METROBARANDBISTRO.COM.AU F A C E B O O K. C O M / M E T R O B A R A N D
More informationSection 4.2: Mathematical Induction 1
Section 4.: Mathematical Induction 1 Over the next couple of sections, we shall consider a method of proof called mathematical induction. Induction is fairly complicated, but a very useful proof technique,
More informationMath 116 Practice for Exam 2
Math 6 Practice for Exam Generated October 6, 5 Name: Instructor: Section Number:. This exam has 5 questions. Note that the problems are not of equal difficulty, so you may want to skip over and return
More informationHandbook on Online Proficiency Test Evaluation of Shoot-Root Ratio of Seedlings
Handbook on Online Proficiency Test Evaluation of Shoot-Root Ratio of Seedlings 4 th Edition Institute of Plant Breeding, Seed Science and Population Genetics, Division of Seed Science and Technology,
More informationEdible Rocks: How Can a Cookie Be a Model of a Rock?
Edible Rocks: How Can a Cookie Be a Model of a Rock? For this investigation, we will be learning about models. A model is a representation of something that is too difficult to study otherwise. For example,
More informationCentral limit theorem - go to web applet
Central limit theorem - go to web applet Correlation maps vs. regression maps PNA is a time series of fluctuations in 500 mb heights PNA = 0.25 * [ Z(20N,160W) - Z(45N,165W) + Z(55N,115W) - Z(30N,85W)
More informationMETRO BAR & BISTRO CHRISTMAS 2018
E S T 2005 METRO BAR & BISTRO CHRISTMAS 2018 3 3 MOUNTS BAY RD P E R T H AUSTRALIA 6000 + 6 1 8 9485 1218 I N F O@METROBARANDBISTRO.COM.AU W W W.METROBARANDBISTRO.COM.AU F A C E B O O K. C O M / M E T
More informationSolutions for Quadratic Equations and Applications
Solutions for Quadratic Equations and Applications I. Souldatos January 14, 2019 1 Solutions Disclaimer: Although I tried to eliminate typos multiple times, there might still be some typos around. If you
More informationThere Is Therefore Now No Condemnation Romans 8:1-12
Lesson 314 There Is Therefore Now No Condemnation Romans 8:1-12 MEMORY VERSE ROMAN S 8:1 There is therefore now no c ondem nation to those w ho are in Christ Jesus, who do not walk according to the flesh,
More informationLesson 20: Polygraph with a Twist - Inequalities
Opening Exploration You will need: A Chrome book 1. Go to student.desmos.com and type in your class code: to play Polygraph: Linear Inequalities. You played a game similar to this one in Lesson 16 with
More informationIM 3 Assignment 4.3 : Graph Investigation Unit 4 Polynomial Functions
(A) Lesson Context BIG PICTURE of this UNIT: What is a Polynomial and how do they look? What are the attributes of a Polynomial? How do I work with Polynomials? CONTEXT of this LESSON: Where we ve been
More informationVelocity distribution of ideal gas molecules
September 5, 2006 Contents Review of the distribution of the velocity of a molecule in ideal gas. Contents Review of the distribution of the velocity of a molecule in ideal gas. Boltzmann distribution
More informationPanHomc'r I'rui;* :".>r '.a'' W"»' I'fltolt. 'j'l :. r... Jnfii<on. Kslaiaaac. <.T i.. %.. 1 >
5 28 (x / &» )»(»»» Q ( 3 Q» (» ( (3 5» ( q 2 5 q 2 5 5 8) 5 2 2 ) ~ ( / x {» /»»»»» (»»» ( 3 ) / & Q ) X ] Q & X X X x» 8 ( &» 2 & % X ) 8 x & X ( #»»q 3 ( ) & X 3 / Q X»»» %» ( z 22 (»» 2» }» / & 2 X
More informationClosing Wed: HW_9A,9B (9.3/4,3.8) Final: Sat, June 3 th, 1:30-4:20, ARC 147
Closing Wed: HW_9A,9B (9.3/4,3.8) Final: Sat, June 3 th, 1:30-4:20, ARC 147 New material for the final, be able to: Solve separable diff. eq.. Use initial conditions & constants. Be able to set up the
More informationLesson 33 - Trigonometric Identities. Pre-Calculus
Lesson 33 - Trigonometric Identities Pre-Calculus 1 (A) Review of Equations An equation is an algebraic statement that is true for only several values of the variable The linear equation 5 = 2x 3 is only
More informationPartnerships Implementing Engineering Education Worcester Polytechnic Institute Worcester Public Schools
Life Sciences: 4.E.6 Seeds Part 3 of 3 Grade Level 4 Sessions Seasonality Instructional Mode(s) Team Size WPS Benchmarks MA Frameworks Key Words 45-60 min. N/A Whole class N/A 04.SC.LS.06 04.SC.LS.07 04.SC.LS.08
More informationIM 3 Assignment 4.3 : Graph Investigation Unit 4 Polynomial Functions
(A) Lesson Context BIG PICTURE of this UNIT: What is a Polynomial and how do they look? What are the attributes of a Polynomial? How do I work with Polynomials? CONTEXT of this LESSON: Where we ve been
More informationCh. 9: Be able to 1. Solve separable diff. eq. 2. Use initial conditions & constants. 3. Set up and do ALL the applied problems from homework.
Closing Wed: HW9A, 9B (9.3, 9.4) Final: March 10 th, 1:30-4:20 in KANE 210 Comprehensive (8-10 pages). There will be two pages on ch 9. Ch. 9: Be able to 1. Solve separable diff. eq. 2. Use initial conditions
More information' Liberty and Umou Ono and Inseparablo "
3 5? #< q 8 2 / / ) 9 ) 2 ) > < _ / ] > ) 2 ) ) 5 > x > [ < > < ) > _ ] ]? <
More informationSection 5.6 Integration by Parts
.. 98 Section.6 Integration by Parts Integration by parts is another technique that we can use to integrate problems. Typically, we save integration by parts as a last resort when substitution will not
More informationTopic 5-1: Introduction to Phonons Kittel pages: 91, 92
Topic 5-1: Introduction to Phonons Kittel pages: 91, 92 Summary: In this video we introduce the concept that atoms are not rigid, fixed points within the lattice. Instead we treat them as quantum harmonic
More informationCHAPTER 10 NOTES DAVID SEAL
CHAPTER 1 NOTES DAVID SEA 1. Two Point Boundary Value Problems All of the problems listed in 14 2 ask you to find eigenfunctions for the problem (1 y + λy = with some prescribed data on the boundary. To
More informationThe final is comprehensive (8-9 pages). There will be two pages on ch 9.
Closing Wed: HW_9A,9B (9.3/4,3.8) Final: Sat, Dec. 9 th, 1:30-4:20, KANE 130 Assigned seats, for your seat go to: catalyst.uw.edu/gradebook/aloveles/102715 The final is comprehensive (8-9 pages). There
More informationRadiometric Dating (tap anywhere)
Radiometric Dating (tap anywhere) Protons Neutrons Electrons Elements on the periodic table are STABLE Elements can have radioactive versions of itself called ISOTOPES!! Page 1 in your ESRT has your list!
More informationMultiple OLS Regression
Multiple OLS Regression Ronet Bachman, Ph.D. Presented by Justice Research and Statistics Association 12/8/2016 Justice Research and Statistics Association 720 7 th Street, NW, Third Floor Washington,
More informationRegistered Company No facebook.com/ghosthunteastanglia twitter.com/ghosthunt01
Registered Company No. 09181574 www.ghosthunteastanglia.co.uk facebook.com/ghosthunteastanglia twitter.com/ghosthunt01 OK, we give up, where has the warm weather gone? The nights are now pulling in, but
More informationMy signature below certifies that I have complied with the University of Pennsylvania s Code of Academic Integrity in completing this exam.
My signature below certifies that I have complied with the University of Pennsylvania s Code of Academic Integrity in completing this exam. Signature Printed Name Math 241 Exam 1 Jerry Kazdan Feb. 17,
More information1 Some general theory for 2nd order linear nonhomogeneous
Math 175 Honors ODE I Spring, 013 Notes 5 1 Some general theory for nd order linear nonhomogeneous equations 1.1 General form of the solution Suppose that p; q; and g are continuous on an interval I; and
More informationGeometry - Summer 2016
Geometry - Summer 2016 Introduction PLEASE READ! The purpose of providing summer work is to keep your skills fresh and strengthen your base knowledge so we can build on that foundation in Geometry. All
More informationMANY BILLS OF CONCERN TO PUBLIC
- 6 8 9-6 8 9 6 9 XXX 4 > -? - 8 9 x 4 z ) - -! x - x - - X - - - - - x 00 - - - - - x z - - - x x - x - - - - - ) x - - - - - - 0 > - 000-90 - - 4 0 x 00 - -? z 8 & x - - 8? > 9 - - - - 64 49 9 x - -
More informationQuadratic and Other Inequalities in One Variable
Quadratic and Other Inequalities in One Variable If a quadratic equation is not in the standard form equaling zero, but rather uses an inequality sign ( , ), the equation is said to be a quadratic
More informationThorpe Bay Lawn Tennis Club
MEN S OPEN SINGLES FINAL SUNDAY TH JULY 0-0 0 0 FIRST ROUND - SECOND ROUND - QUARTER-FINALS - SEMI-FINALS - FINAL - TH MAY 0TH MAY TH JUNE TH JUNE SUNDAY TH JULY.00 PM W inners should writ e u p t he ir
More informationA N I N N E R - C I T Y O A S I S A N D S O C I A L C E N T R E A T O N E O F P E R T H S M O S T
T I N Y S B R I N G S G O O D T I M E S T O T H E C I T Y S W E S T E N D, C U L T I V A T I N G A N I N N E R - C I T Y O A S I S A N D S O C I A L C E N T R E A T O N E O F P E R T H S M O S T I C O
More informationChemistry- Unit 3. Section II - Chapter 7 ( , 7.11) Quantum Mechanics
Chemistry- Unit 3 Section II - Chapter 7 (7.6-7.8, 7.11) Quantum Mechanics Atomic Review What subatomic particles do you get to play with? Protons Neutrons Electrons NO! It would change the element Don
More informationSwim with Dwarf Minke Whales. Great Barrier Reef & Daintree tour by Majestic Whale Enounters
Swim with Dwarf Minke Whales Great Barrier Reef & Daintree tour by Majestic Whale Enounters Why us? A t M a j e s t i c W h a l e e n c o u n t e r s o u r m i s s i o n i s t o p r o t e c t t h e w
More informationExample: f(x) = 2x² + 1 Solution: Math 2 VM Part 5 Quadratic Functions April 25, 2017
Math 2 Variable Manipulation Part 5 Quadratic Functions MATH 1 REVIEW THE CONCEPT OF FUNCTIONS The concept of a function is both a different way of thinking about equations and a different way of notating
More informationSOLUTIONS TO PROBLEMS FROM ASSIGNMENT 5. Problems 3.1:6bd
SOLUTIONS TO PROBLEMS FROM ASSIGNMENT 5 Statement. Solve the problem Problems 3.1:6bd u t = u xx, (t ), with the initial condition u(x, ) = f(x), where the functions u(x, t) and f(x) are assumed to be
More informationPractice Midterm Solutions
Practice Midterm Solutions Math 4B: Ordinary Differential Equations Winter 20 University of California, Santa Barbara TA: Victoria Kala DO NOT LOOK AT THESE SOLUTIONS UNTIL YOU HAVE ATTEMPTED EVERY PROBLEM
More informationPhilosophy 244: #14 Existence and Identity
Philosophy 244: #14 Existence and Identity Existence Predicates The problem we ve been having is that (a) we want to allow models that invalidate the CBF ( xα x α), (b) these will have to be models in
More informationMTH 252 Final Exam No Calc Portion Winter Term x
MTH 5 Final Exam No Calc Portion Winter Term 7 Name 1. Evaluate each integral. All solutions must be fully substantiated by the work presented on this paper. (5 points each) a. 3x dx 8 3x 1 3 7 x b. xe
More informationSect Exponents, Algebraic Expressions, and the Order of Operations
Sect 1.7 - Exponents, Algebraic Expressions, and the Order of Operations Objective a: Understanding and evaluating exponents. We have seen that multiplication is a shortcut for repeated addition and division
More informationX2 DESIGNER W E D D I N G S
X2 DESIGNER W E D D I N G S D e l i v e r e d s e a m l e s s l y i n s t y l e w i t h you i n m i n d b y l i s t e n i n g, planning and t h e n e x e c u t i n g m e m o r a b l e bounds o f w h i
More informationHANDOUT ABOUT THE TABLE OF SIGNS METHOD. The method To find the sign of a rational (including polynomial) function
HANDOUT ABOUT THE TABLE OF SIGNS METHOD NIKOS APOSTOLAKIS The method To find the sign of a rational (including polynomial) function = p(x) q(x) where p(x) and q(x) have no common factors proceed as follows:
More informationWISCONSIN HIGH SCHOOL STATE MATHEMATICS MEET WISCONSIN MATHEMATICS COUNCIL March 4 8, Solutions
WISCONSIN HIGH SCHOOL STATE MATHEMATICS MEET WISCONSIN MATHEMATICS COUNCIL March 4 8, 2013 Problem set #1 Solutions 1. 2 4 + a b 2 5 16 + a b 32 a b 16 2 4 16, 4 2 16, and 16 1 16, so the three ordered
More informationSection 2.8: The Power Chain Rule
calculus sin frontera Section 2.8: The Power Chain Rule I want to see what happens when I take a function I know, like g(x) = x 2, and raise it to a power, f (x) = ( x 2 ) a : f (x) = ( x 2 ) a = ( x 2
More informationMath 311, Partial Differential Equations, Winter 2015, Midterm
Score: Name: Math 3, Partial Differential Equations, Winter 205, Midterm Instructions. Write all solutions in the space provided, and use the back pages if you have to. 2. The test is out of 60. There
More informationFinal Exam Practice Problems Part II: Sequences and Series Math 1C: Calculus III
Name : c Jeffrey A. Anderson Class Number:. Final Exam Practice Problems Part II: Sequences and Series Math C: Calculus III What are the rules of this exam? PLEASE DO NOT TURN THIS PAGE UNTIL TOLD TO DO
More informationUnit 2: Polynomials Guided Notes
Unit 2: Polynomials Guided Notes Name Period **If found, please return to Mrs. Brandley s room, M 8.** Self Assessment The following are the concepts you should know by the end of Unit 1. Periodically
More informationUnit 4: Function Composition
Haberman MTH 111 Section I: Functions and Their Graphs Unit 4: Function Composition In The Algebra of Functions (Section I: Unit ) we discussed adding, subtracting, multiplying, and dividing functions.
More informationLesson 22 - Trigonometric Identities
POP QUIZ Lesson - Trigonometric Identities IB Math HL () Solve 5 = x 3 () Solve 0 = x x 6 (3) Solve = /x (4) Solve 4 = x (5) Solve sin(θ) = (6) Solve x x x x (6) Solve x + = (x + ) (7) Solve 4(x ) = (x
More information2. A Motivational Example: Consider the second-order homogeneous linear DE: y y 2y = 0
MATH 246: Chapter 2 Section 2 Justin Wyss-Gallifent 1. Introduction: Since even linear higher-order DEs are difficult we are going to simplify even more. For today we re going to look at homogeneous higher-order
More informationChapter 8A. Recall. where. DeMoivre: then. Now lets do something NEW some groovy algebra. therefore, So clearly, we get:
Chapter 8A We are revisiting this so we can use Euler Form later in the Chapter to assist us Integrate different functions (amongst other fun things). But first lets go over some old ground: Recall where
More informationA Quick Algebra Review
1. Simplifying Epressions. Solving Equations 3. Problem Solving 4. Inequalities 5. Absolute Values 6. Linear Equations 7. Systems of Equations 8. Laws of Eponents 9. Quadratics 10. Rationals 11. Radicals
More informationWe e k l y S c h e d u l e
CULINARY CENTER 2019 Closed Closed We e k l y S c h e d u l e Mon Tue Wed Thu Fri Sat Sun 1:00 PM Cucina Italiana Magic Yucatán Semi Cocina Mexicana Magic Yucatán Semi Junior Mexico Ritz-Kids Junior Mexico
More informationWarm-Up Exercises. Daily Ho ework Quiz for use after Lesson 5.2, pages x = 0. Solve the equation.
! Date Warm-Up Exercises For use before Lesson 5.3, pages 264-271 Availa le as a tran parency Solve the equation. 1. 5x - 3 = 17 2. 0 = -12 + 3? Find the value of y when = 0,1, and 2. 3. y = -16*2 + 24
More informationSolving with Absolute Value
Solving with Absolute Value Who knew two little lines could cause so much trouble? Ask someone to solve the equation 3x 2 = 7 and they ll say No problem! Add just two little lines, and ask them to solve
More informationPMT. GCE Edexcel GCE Mathematics Core Mathematics C1 (6663) June Mark Scheme (Results) Mathematics. Edexcel GCE
GCE Edecel GCE Mathematics Core Mathematics C (666) June 006 Mark Scheme (Results) Edecel GCE Mathematics June 006 Mark Scheme. 6 + + (+c) A = + + A +c B 4 for some attempt to integrate n n + st A for
More informationSect Least Common Denominator
4 Sect.3 - Least Common Denominator Concept #1 Writing Equivalent Rational Expressions Two fractions are equivalent if they are equal. In other words, they are equivalent if they both reduce to the same
More information4.5 Integration of Rational Functions by Partial Fractions
4.5 Integration of Rational Functions by Partial Fractions From algebra, we learned how to find common denominators so we can do something like this, 2 x + 1 + 3 x 3 = 2(x 3) (x + 1)(x 3) + 3(x + 1) (x
More informationCS1010E Programming. Methodology GER1000 (GE2) Quantitative Reasoning ESP2107 Numerical Methods & Stat. ME2121 Engineering Thermodynamics
Science Programme Schedule AY18/19 (new as of 6 June 18) This schedule is only a sample. Student can customised own schedule taking into consideration e.g. semester a module is offered, required pre-/co-requisites
More informationModule 5: Function Composition
Haberman / Kling MTH 111c Section I: Sets and Functions Module 5: Function Composition In The Algebra of Functions (Section I: Module 4) we discussed adding, subtracting, multiplying, and dividing functions.
More informationUpdated: January 16, 2016 Calculus II 7.4. Math 230. Calculus II. Brian Veitch Fall 2015 Northern Illinois University
Math 30 Calculus II Brian Veitch Fall 015 Northern Illinois University Integration of Rational Functions by Partial Fractions From algebra, we learned how to find common denominators so we can do something
More informationThe minus sign indicates that the centroid is located below point E. We will relocate the axis as shown in Figure (1) and take discard the sign:
AOE 304: Thin Walled Structures Solutions to Consider a cantilever beam as shown in the attached figure. At the tip of the beam, a bending moment M = 1000 N-m is applied at an angle θ with respect to the
More information20 E A S T 76 TH S T R E E T NEW Y O R K NY T E L F A X PRIVATE DINING BROCHURE 2018
PRIVATE DINING BROCHURE 2018 W E L C O M E Our private dining team at Café Boulud looks forward to planning your next private event in one of our two lovely private salons. Each room can be used individually
More informationUnit 2: Polynomials Guided Notes
Unit 2: Polynomials Guided Notes Name Period **If found, please return to Mrs. Brandley s room, M 8.** Self Assessment The following are the concepts you should know by the end of Unit 1. Periodically
More information15 Sapium Rd, Southport, 4215 ph: e:
15 Sapium Rd, Southport, 4215 ph: 07 5597 3844 e: info@benowaearlylearning.com.au www.benowaearlylearning.com.au Office Use Only: Class Required: Date of Commencement: ENROLMENT FORM 2017 Enrolled Formal
More informationCanadian Graduate and Professional Student Survey (CGPSS) 2016
Ac a d e m i c S t u d e n t l i f e O v e r a l l Canadian Graduate and Professional Student Survey (CGPSS) Summary of Results Prepared by the Office of Institutional Analysis The CGPSS was administered
More informationControl Systems. Frequency Method Nyquist Analysis.
Frequency Method Nyquist Analysis chibum@seoultech.ac.kr Outline Polar plots Nyquist plots Factors of polar plots PolarNyquist Plots Polar plot: he locus of the magnitude of ω vs. the phase of ω on polar
More informationCSE 331 Winter 2018 Reasoning About Code I
CSE 331 Winter 2018 Reasoning About Code I Notes by Krysta Yousoufian Original lectures by Hal Perkins Additional contributions from Michael Ernst, David Notkin, and Dan Grossman These notes cover most
More informationPrepared by Sa diyya Hendrickson. Package Summary
Introduction Prepared by Sa diyya Hendrickson Name: Date: Package Summary Understanding Variables Translations The Distributive Property Expanding Expressions Collecting Like Terms Solving Linear Equations
More informationz-test, t-test Kenneth A. Ribet Math 10A November 28, 2017
Math 10A November 28, 2017 Welcome back, Bears! This is the last week of classes. RRR Week December 4 8: This class will meet in this room on December 5, 7 for structured reviews by T. Zhu and crew. Final
More informationBase Menu Spreadsheet
Values Menu Name: Site: K-8 K-12 BREAKFAST Include Cost: Report Style: No Detailed Monday ursable Meal Total 100 990079 BAR,FRENCH TOAST BENEFIT BAR 30 290 2.50 200 21 9.00 0.00 25 47.00 3.00 5.00 0 990201
More informationChapter 9: Elementary Sampling Theory
Chapter 9: Elementary Sampling Theory James B. Ramsey Economics; NYU 2007-2-3 Ramsey (Institute) Chapter 9: 2007-2-3 1 / 20 Sampling Theory is the LINK between Theory & Observation Chapters 1 to 5: Data
More informationAnswer Key b c d e. 14. b c d e. 15. a b c e. 16. a b c e. 17. a b c d. 18. a b c e. 19. a b d e. 20. a b c e. 21. a c d e. 22.
Math 20580 Answer Key 1 Your Name: Final Exam May 8, 2007 Instructor s name: Record your answers to the multiple choice problems by placing an through one letter for each problem on this answer sheet.
More informationProblem # Number of points 1 /20 2 /20 3 /20 4 /20 5 /20 6 /20 7 /20 8 /20 Total /150
Name Student ID # Instructor: SOLUTION Sergey Kirshner STAT 516 Fall 09 Practice Midterm #1 January 31, 2010 You are not allowed to use books or notes. Non-programmable non-graphic calculators are permitted.
More informationPhysics in the Classroom (Physics 304)
Physics in the Classroom () Timothy D. Usher Ph.D. CSUSB Please write down your responses to the following. Why are you hear? Go deeper by asking why to your response and writing that answer down. Continue
More informationMath Introduction to Numerical Methods - Winter 2011 Homework 2 Assigned: Friday, January 14, Due: Thursday, January 27,
Math 371 - Introduction to Numerical Methods - Winter 2011 Homework 2 Assigned: Friday, January 14, 2011. Due: Thursday, January 27, 2011.. Include a cover page. You do not need to hand in a problem sheet.
More informationAST 100 General Astronomy: Stars & Galaxies
AST 100 General Astronomy: Stars & Galaxies On to Our Nearest Star: the SUN ANNOUNCEMENTS PLEASE CHANGE CLICKER FREQUENCY TO 26 De-Mystifying science The case of the Sun Ancient philosophers/scientists
More informationWELCOME TO PROHIBITION
FUNCTION PACKAGES WELCOME TO PROHIBITION Inspired by all things 1920s, our venue is unique and will offer an experience never to be forgotten by your guests. Step back in time to the world of flappers
More informationQuotient Rings. is defined. Addition of cosets is defined by adding coset representatives:
Quotient Rings 4-21-2018 Let R be a ring, and let I be a (two-sided) ideal. Considering just the operation of addition, R is a group and I is a subgroup. In fact, since R is an abelian group under addition,
More informationLesson 2 The Unit Circle: A Rich Example for Gaining Perspective
Lesson 2 The Unit Circle: A Rich Example for Gaining Perspective Recall the definition of an affine variety, presented last lesson: Definition Let be a field, and let,. Then the affine variety, denoted
More informationLeader Discussion Guide for Cosmos: A SpaceTime Odyssey
Leader Discussion Guide for Cosmos: A SpaceTime Odyssey Episode 1: Standing Up in the Milky Way The creators of Cosmos: A SpaceTime Odyssey state that their aim is to promote scientific literacy. We know
More informationtomamu hokkaido, japan RIDE A DIFFERENT WAVE
tomamu hokkaido, japan RIDE A DIFFERENT WAVE IT S ALL TAKEN CARE OF SKI PASSES & LESSON INCLUDED NON-SKIING ACTIVITIES CHILDREN S CLUB GOURMET FOOD & OPEN BAR REDEFINED COMFORT NIGHT ENTERTAINMENT Flights
More informationTransition Density Function and Partial Di erential Equations
Transition Density Function and Partial Di erential Equations In this lecture Generalised Functions - Dirac delta and heaviside Transition Density Function - Forward and Backward Kolmogorov Equation Similarity
More informationCHEM 231 (Davis) Organic Chemistry Exam III 19 April, YOUR NAME (Last, First, M.I.) DISCUSSION SECTION #53 (5 Points)
EM 23 (avis) rganic hemistry Exam III 9 pril, 2006 YUR NME (Last, First, M.I.) ISUSSIN SETIN #53 (5 Points) Initial of last name Instructions Please fill in your name in the space above and on the next
More information