ε = R d ρ v ρ d ρ m CIVE322 BASIC HYDROLOGY I O = ds dt e s ( 1 T )] (T ) = 611exp[ L R v = = P + R 1 ΔS s + R g R 2 T s I E s
|
|
|
- Ezra Hunter
- 6 years ago
- Views:
Transcription
1 CVE3 BSC HYDROOGY Hydrlgc Scc ad Egrg Cvl ad Evrmal Egrg Dparm Fr Clls, CO Fall ( Hydrlgc Budg Equas O ds d S ds d O d S ΔS s P + R R + R g E s s Saura vapr prssur s ( 6xp[ ( 73.5 ] ε.6 Masurs f war vapr c ΔS g + G G R g E g g ΔS P + R R + G G (E s + E g ( s + g ΔS P R G E R R R G G G E E s + E g s + g Prcpa - msphrc Msur dal Gas aw al prssur p d ρ d ρ v p p d + bslu Humdy Mxg ra w m v m d Spcfc humdy ρ v ρ v ρ d ε p ε p m q h v ρ v ε m d + m v ρ m p.378 Rlav humdy Prcpabl war r.h. s ( Hydrsac qua - Prssur dsrbu dp dz ρg; p(z gρ(z dz mpraur dsrbu (z (z Γ amb (z z Dsy f ms ar ρ m p (.378 p z W Z ρ v (zdz g Prcpa Daa alyss rhmc vrag mhd p(z p(z q h (pdp MP λ P ; λ hss Plygs mhd MP λ P ; λ rg Ramírz
2 shyal mhd Bw Ra MP λ P B h λ,+ ; P P + P + DW rpla mhd B c p p ε ( a γ ( a s ( Rsk alyss P x λ P λ / d x j / d jx Prbably f xcdac yar: p Rsk f falur yar: γ c p p ε Ergy dvcd by Evaprad War N avalabl rgy w c pw ( b s r + a ar bs + v R p Evapra Ra Rsk f falur yars: R ( p rcp ad Dprss Srag rcp + B + c pw( b Mass rasfr Mhd E f (u( a E ρ w S( P /S + KE Myr Equa Dprss srag V S d ( P /S d Ra f dprss srag v P /S d ( f Surfac ruff ra σ f v σ f kp P /S d Evapra Ergy Budg s r + a ar bs + v w h E C(+ W ( a Emprcal Pma Equa E.6( +.54u( a Cmba Mhd Pma Equa Δ E ( Δ + γ + ( γ Δ + γ E Δ d s( d Equlbrum vapra s( s ( a rg Ramírz
3 Csas Δ E ( Δ + γ c p 4 c pw 486 φ CN + S a.s (P a P a + S, P a; S a + F F P a φ-dx: Vl. f Prc. - Vl. f Drc Ruff Dura f srm Basflw Spara ( ( ( k flra 5 kg.5e6 kg cual flra ra cual flra ra f ( m[(, (] F( f (d ( f c + ( f k F( f c + ( f ( k k V l ( k( + l( ( d U Hydrgraph alyss Vlum f Drc Ruff: V ( d Dscr Cvlu qua Cvlu qua m P U m m+ Δ Δ Gr-mp mdl + S ( K s K + K S(θ θ s s s F( F p ( (θ s θ F p ( S(θ s θ l[ F p( + S(θ s θ ] K s S(θ s θ Rcvry f flra capacy ( f ( f k d ( w Sl Csrva Srvc Curv Numbr prcdur ( Syhc U Hydrgraphs ar Rsrvr (τ u( τ dτ u( k k Cascad f lar rsrvrs (Nash Mdl /k u( k(! ( k Sydr UH Sadard U Hydrgraph 3 rg Ramírz
4 l l 5.5 r C C.3 ( c.75 mrc C Eglsh C q p C C p l.75 mrc 64 Eglsh f rqurd UH s a sadard u hydrgraph: R r pr l q p f rqurd UH s a sadard u hydrgraph: pr l r R 4 q p l pr b C mrc C 3 9 Eglsh W C 5% C 75% % C w qlr.8.4 mrc 77 Eglsh. mrc 44 Eglsh Hydrgraph Rug - umpd Rug ( O( d S ( + S( S( + + S( ( d + O( d Δ Δ S ( + S( [ ( + + ( ] [ O( + + O( ] vl Pl Rug Equas: S( Δ + + O( + S ( [ ( Muskgum Mhd + f [ O( ] S( + ( ] + [ O( ] Δ ( O( d S k[ x + ( x O] O + C+ + C + C C kx +.5Δ k( x +.5Δ kx +.5Δ C k( x +.5Δ C k( x.5δ k( x +.5Δ as-squars Paramr Esma Prcdur B O O S O S O kx O [ O ] SO O k( x O [ O ] S 4 rg Ramírz
5 Hydrgraph Rug - Dsrbud Rug Cuy qua Mmum qua + q ( β / y + + g( S + S f βqvx Kmac Wav pprxma: + q S α β V y/3 Kmac Wav Clry, : d dx d + + q dx c + d q d dx d d d Kmac Wav Clry fr a wd, rcagular chal ad Mag Equa dx d d d 5 3 k y/3 5 3 V Mag Equa S f / 3 R (f usg mrc us Kmac Wav slu fr q : Fllwg ach wav, s csa, hus, gra dx d ad ba.49 R /3 (f usg Eglsh us x x [ P/3 ] 3/5 3/5 α [ P/3 ] 3/5 R P r P /3 [ ] 3/5 3/5.49 P /3 r α [ ] 3/5.49 β Wd rcagular chal, B>>y P B ad R y y5/3 B ad y [ ] 3/5 B F dffrc slu f larzd Kmac Wav quas d d αββ ( r x + αββ ( q j+ j+ + + αβ( j + Δx + j+ [ Δ j+ + Δx j+ + αβ( j + j+ + [ Δ j Δx + αβ( + β ( j+ j + + ( q + Δ β j + j+ + β ] j+ j + q + + Δ( q j+ j + + q + ] 5 rg Ramírz
CIVE322 BASIC HYDROLOGY Hydrologic Science and Engineering Civil and Environmental Engineering Department Fort Collins, CO (970)
CVE322 BASC HYDROLOGY Hydrologic Scic ad Egirig Civil ad Evirotal Egirig Dpartt Fort Collis, CO 80523-1372 (970 491-7621 MDERM EXAM 1 NO. 1 Moday, Octobr 3, 2016 8:00-8:50 AM Haod Auditoriu You ay ot cosult
Almost unbiased exponential estimator for the finite population mean
Almos ubasd poal smaor for f populao ma Rajs Sg, Pakaj aua, ad rmala Saa, Scool of Sascs, DAVV, Idor (M.P., Ida (rsgsa@aoo.com Flor Smaradac ar of Dparm of Mamacs, Uvrs of Mco, Gallup, USA (smarad@um.du
Lecture 12: Introduction to nonlinear optics II.
Lcur : Iroduco o olar opcs II r Kužl ropagao of srog opc sgals propr olar ffcs Scod ordr ffcs! Thr-wav mxg has machg codo! Scod harmoc grao! Sum frqucy grao! aramrc grao Thrd ordr ffcs! Four-wav mxg! Opcal
Ruin Probability in a Generalized Risk Process under Rates of Interest with Homogenous Markov Chain Claims
ahmaca Ara, Vl 4, 4, 6, 6-63 Ru Prbably a Gralzd Rs Prcss udr Ras f Irs wh Hmgus arv Cha Clams Phug Duy Quag Dparm f ahmcs Frg Trad Uvrsy, 9- Chua Lag, Ha, V Nam Nguy Va Vu Tra Quc Tua Uvrsy Nguy Hg Nha
Entropy Equation for a Control Volume
Fudamtals of Thrmodyamcs Chaptr 7 Etropy Equato for a Cotrol Volum Prof. Syoug Jog Thrmodyamcs I MEE2022-02 Thrmal Egrg Lab. 2 Q ds Srr T Q S2 S1 1 Q S S2 S1 Srr T t t T t S S s m 1 2 t S S s m tt S S
Almost Unbiased Exponential Estimator for the Finite Population Mean
Rajs Sg, Pakaj aua, rmala Saa Scool of Sascs, DAVV, Idor (M.P., Ida Flor Smaradac Uvrs of Mco, USA Almos Ubasd Epoal Esmaor for F Populao Ma Publsd : Rajs Sg, Pakaj aua, rmala Saa, Flor Smaradac (Edors
s f o r s o l v i n g t h e n o n l i n
M M R M q q D O : q 7 8 q q q M q x- q M M M 9 R R D O : 78 / x q D MO : M 7 9 8 / D q P F x z M q M q D T P - z P G S F q q q q q q q D q q PZ w - z q - P q q q w q q q w q q w z q - w P w q w w - w w
Improved Exponential Estimator for Population Variance Using Two Auxiliary Variables
Improvd Epoal Emaor for Populao Varac Ug Two Aular Varabl Rajh gh Dparm of ac,baara Hdu Uvr(U.P., Ida (rgha@ahoo.com Pakaj Chauha ad rmala awa chool of ac, DAVV, Idor (M.P., Ida Flor maradach Dparm of
Chain DOUBLE PITCH TYPE RS TYPE RS POLY-STEEL TYPE
d Fr Flw OULE IC YE YE OLY-EEL YE Oubard wh d s (d ) s usd fr fr flw vya. Usually w srads ar usd h qupm. d s basd sadard rllr ha wh sd rllrs salld xdd ps. hr ar hr yps f bas ha: (1) ubl ph rllr ha wh sadard
Dr. Junchao Xia Center of Biophysics and Computational Biology. Fall /21/2016 1/23
BIO53 Bosascs Lcur 04: Cral Lm Thorm ad Thr Dsrbuos Drvd from h Normal Dsrbuo Dr. Juchao a Cr of Bophyscs ad Compuaoal Bology Fall 06 906 3 Iroduco I hs lcur w wll alk abou ma cocps as lsd blow, pcd valu
Lectures on Applied Reactor Technology and Nuclear Power Safety. Lecture No 7
ectures on Nuclear Power Safety ecture No 7 itle: hermal-hydraulic nalysis of Single-Phase lows in Heated hannels Department of Energy echnology KH Spring 005 Slide No Outline of the ecture lad-oolant
Chap 2: Reliability and Availability Models
Chap : lably ad valably Modls lably = prob{s s fully fucog [,]} Suppos from [,] m prod, w masur ou of N compos, of whch N : # of compos oprag corrcly a m N f : # of compos whch hav fald a m rlably of h
Relate p and T at equilibrium between two phases. An open system where a new phase may form or a new component can be added
4.3, 4.4 Phas Equlbrum Dtrmn th slops of th f lns Rlat p and at qulbrum btwn two phass ts consdr th Gbbs functon dg η + V Appls to a homognous systm An opn systm whr a nw phas may form or a nw componnt
Length L 2 l N RS50KU RS08BKU
paly Aahm Cha subak ffrs a full l f dusry spf spaly has. hs s llusras may ha ar avalabl fr fas dlvry. Ohr spaly has ar avalabl a mad--rdr bass. Cha yp: F (skr aahm) Appla: Cvyg h marals suh as amra flm
Comparison of Explicit Finite Difference Model and Galerkin Finite Element Model for Simulation of Groundwater Flow
Iraal Jural f Ivav Rsarc Advacd Egrg (IJIRAE Vlum Issu (Arl 4 Cmars f Elc F Dffrc Mdl ad Galr F Elm Mdl fr mula f Grudar Fl.H.Kular * A.K.Rasg Assca Prfssr Prfssr D. f Cvl& ar Maagm Egg.GGIE&add-4366.
LOWELL STORES SERVE THRONGS OF LOV PEOPLE ON FRIDAY NIGHT
J p M 879 61 p 260 M G W j p : b p pp M M K p b J M G * p P p b p p D W P p b G 14 b p qp j b p p p J p z M- K W W G Gbb Wb M J W W K G J D D b b P P M p p b p p b b p J W ; p jb b p x b p p b b W Pp pp
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
Sample Final Questions: Solutions Math 21B, Winter y ( y 1)(1 + y)) = A y + B
Sample Final Questions: Solutions Math 2B, Winter 23. Evaluate the following integrals: tan a) y y dy; b) x dx; c) 3 x 2 + x dx. a) We use partial fractions: y y 3 = y y ) + y)) = A y + B y + C y +. Putting
Integrated Optical Waveguides
Su Opls Faha Raa Cll Uvs Chap 8 Ia Opal Wavus 7 Dl Slab Wavus 7 Iu: A va f ff a pal wavus a us f a u lh a hp Th s bas pal wavu s a slab wavus shw blw Th suu s uf h - Lh s u s h b al al fl a h -la fas Cla
EE 232 Lightwave Devices. Photodiodes
EE 3 Lgwav Dvcs Lcur 8: oocoucors a p-- ooos Rag: Cuag, Cap. 4 Isrucor: Mg C. Wu Uvrsy of Calfora, Brkly Elcrcal Egrg a Compur Sccs Dp. EE3 Lcur 8-8. Uvrsy of Calfora oocoucors ω + - x Ara w L Euval Crcu
Harold s AP Physics Cheat Sheet 23 February Electricity / Magnetism
Harold s AP Physics Cheat Sheet 23 February 206 Kinematics Position (m) (rad) Translation Horizontal: x = x 0 + v x0 t + 2 at2 Vertical: y = y 0 + v y0 t 2 gt2 x = x 0 + vt s = rθ x = v / Rotational Motion
Byeong-Joo Lee
OSECH - MSE calphad@postch.ac.kr Equipartition horm h avrag nrgy o a particl pr indpndnt componnt o motion is ε ε ' ε '' ε ''' U ln Z Z ε < ε > U ln Z β ( ε ' ε '' ε ''' / Z' Z translational kintic nrgy
MECE 3320 Measurements & Instrumentation. Static and Dynamic Characteristics of Signals
MECE 330 MECE 330 Masurms & Isrumao Sac ad Damc Characrscs of Sgals Dr. Isaac Chouapall Dparm of Mchacal Egrg Uvrs of Txas Pa Amrca MECE 330 Sgal Cocps A sgal s h phscal formao abou a masurd varabl bg
Chemical Reaction Engineering. Lecture 7
hemical Reaction Engineering Lecture 7 Home problem: nitroaniline synthesis the disappearance rate of orthonitrochlorobenzene [ ] d ONB ra k ONB NH dt Stoichiometric table: [ ][ ] 3 hange Remaining* oncentration**
arxiv: v1 [hep-th] 11 Sep 2008
![arxiv: v1 [hep-th] 11 Sep 2008](/thumbs/77/75789263.jpg "arxiv: v1 [hep-th] 11 Sep 2008")
The Hubble parameters in the D-brane models arxiv:009.1997v1 [hep-th] 11 Sep 200 Pawel Gusin University of Silesia, Institute of Physics, ul. Uniwersytecka 4, PL-40007 Katowice, Poland, e-mail: pgusin@us.edu.pl
Supporting Information
Supporting Information A: Calculation of radial distribution functions To get an effective propagator in one dimension, we first transform 1) into spherical coordinates: x a = ρ sin θ cos φ, y = ρ sin
Vexilla regis prodeunt
Vl prt Vnnus Frn (530609) Cn Pir l Ru (c. 1452 151) pr t d,,, r, : mn m p V Qu Im Ar B spn gn sn dm D r p pl br Qu cr ns cn lc s c gt cr n l d r mm t l, cr v n fc 4 R p st d br qu r nt c t qu r r pn prd
NOTES ON CARTIER DUALITY
NOTES ON CARTIER DUALITY Let k be a commutative ring with, and let G = SpecA be a commutative finite locally free group scheme over k. We have the following k-linear maps unity i: k A, multiplication m:
Chapter 4: Fundamental Forces
Chapter 4: Fundamental Forces Newton s Second Law: F=ma In atmospheric science it is typical to consider the force per unit mass acting on the atmosphere: Force mass = a In order to understand atmospheric
Pressure in stationary and moving fluid Lab- Lab On- On Chip: Lecture 2
Pressure in stationary and moving fluid Lab-On-Chip: Lecture Lecture plan what is pressure e and how it s distributed in static fluid water pressure in engineering problems buoyancy y and archimedes law;
Work and Kinetic Energy
Chapter 6 Work and Kinetic Energy PowerPoint Lectures for University Physics, Twelfth Edition Hugh D. Young and Roger A. Freedman Lectures by James Pazun Copyright 2008 Pearson Education Inc., publishing
Improved Exponential Estimator for Population Variance Using Two Auxiliary Variables
Rajh gh Dparm of ac,baara Hdu Uvr(U.P.), Ida Pakaj Chauha, rmala awa chool of ac, DAVV, Idor (M.P.), Ida Flor maradach Dparm of Mahmac, Uvr of w Mco, Gallup, UA Improvd Epoal Emaor for Populao Varac Ug
ASHLA UO MUJJlGl PAL c OUtT. filing for office of Q 50t 5 1 Coo I 5 OS. Filing of Candidacy by Declaration ORS
F ddy p EL v 6 GR 49 7h pub d d y b pubhd pdud p yp p by bk k ub ud dd L hw hud pp b d u K LR L V R AHLA U MUG PAL U dp p ub L 6 HwA qq u A L d dd u v zp d H b A U uy d Y q w A @ 9 Y x dd P B qq AHLP UD
G r a y T a k e s P o s t. A s N e w Y S e c ' y
Z- V XX,, P 10, 1942 26 k P x z V - P g U z - g P U B g,, k - g, x g P g,, B P,,, QU g P g P gz g g g g g, xg gz : J - U, ; z g, -; B x g W, ; U, g g B g k:, J z, g, zg, J, J, Jk,,, "" Pk, K, B K W P 2
Prof. dr. A. Achterberg, Astronomical Dept., IMAPP, Radboud Universiteit
Prof. dr. A. Achterberg, Astronomical Dept., IMAPP, Radboud Universiteit Central concepts: Phase velocity: velocity with which surfaces of constant phase move Group velocity: velocity with which slow
ODE Homework Solutions of Linear Homogeneous Equations; the Wronskian
ODE Homework 3 3.. Solutions of Linear Homogeneous Equations; the Wronskian 1. Verify that the functions y 1 (t = e t and y (t = te t are solutions of the differential equation y y + y = 0 Do they constitute
Multiple Random Variables
Multiple Random Variables Joint Probability Density Let X and Y be two random variables. Their joint distribution function is F ( XY x, y) P X x Y y. F XY ( ) 1, < x
Detoxification of wastewater containing As and Sb by hydrothermal mineralization
P l Sp ETp S 2007, SETS07 2007 Dx ww Sb b hhl lz Tkh k, R S, 2 Hk h 2 ETp S, N Uv, N, Jp 2 Dp ppl h, G Shl E, N Uv, N, Jp b: W h x ww x b hhl lz Th 50200 wh OH 2 w h l ww 2000 p Th w v h pp l l 5 O 4 OH
Classical membranes. M. Groeneveld Introduction. 2. The principle of least action
Classical membranes M. Groeneveld 398253 With the use of the principle of least action the equation of motion of a relativistic particle can be derived. With the Nambu-Goto action, we are able to derive
From the last time, we ended with an expression for the energy equation. u = ρg u + (τ u) q (9.1)
Lecture 9 9. Administration None. 9. Continuation of energy equation From the last time, we ended with an expression for the energy equation ρ D (e + ) u = ρg u + (τ u) q (9.) Where ρg u changes in potential
M3/4A16. GEOMETRICAL MECHANICS, Part 1
M3/4A16 GEOMETRICAL MECHANICS, Part 1 (2009) Page 1 of 5 UNIVERSITY OF LONDON Course: M3/4A16 Setter: Holm Checker: Gibbons Editor: Chen External: Date: January 27, 2008 BSc and MSci EXAMINATIONS (MATHEMATICS)
[ zd z zdz dψ + 2i. 2 e i ψ 2 dz. (σ 2 ) 2 +(σ 3 ) 2 = (1+ z 2 ) 2
2 S 2 2 2 2 2 M M 4 S 2 S 2 z, w : C S 2 z = 1/w e iψ S 1 S 2 σ 1 = 1 ( ) [ zd z zdz dψ + 2i 2 1 + z 2, σ 2 = Re 2 e i ψ 2 dz 1 + z 2 ], σ 3 = Im [ 2 e i ψ 2 dz 1 + z 2 σ 2 σ 3 (σ 2 ) 2 (σ 3 ) 2 σ 2 σ
MP :40-2:40 3:00-4:00 PM
PHY294H l Professor: Joey Huston l email:huston@msu.edu l office: BPS3230 l Homework will be with Mastering Physics (and an average of 1 handwritten problem per week) Added problem 28.68 for 3 rd MP assignment
Models of ocean circulation are all based on the equations of motion.
Equations of motion Models of ocean circulation are all based on the equations of motion. Only in simple cases the equations of motion can be solved analytically, usually they must be solved numerically.
7.2. Matrix Multiplication. Introduction. Prerequisites. Learning Outcomes
Matrix Multiplication 7.2 Introduction When we wish to multiply matrices together we have to ensure that the operation is possible - and this is not always so. Also, unlike number arithmetic and algebra,
Speed of light c = m/s. x n e a x d x = 1. 2 n+1 a n π a. He Li Ne Na Ar K Ni 58.
Physical Chemistry II Test Name: KEY CHEM 464 Spring 18 Chapters 7-11 Average = 1. / 16 6 questions worth a total of 16 points Planck's constant h = 6.63 1-34 J s Speed of light c = 3. 1 8 m/s ħ = h π
Simulating a Mathematical. Representation of Stochastic Combat. Model
Smulag a Mahmacal Rprsa f Schasc Cmba Mdl Asss rf Dr Saad Talb Hass Uvrs f Babl - acul f Scc - cmpurs sccs dparm Iraq Absrac Th ma purps f hs papr s buld a M Carl smula mdl whch ca b usd smag h ms mpra
J. Szantyr Lecture No. 3 Fluid in equilibrium
J. Szantyr Lecture No. 3 Fluid in equilibrium Internal forces mutual interactions of the selected mass elements of the analysed region of fluid, forces having a surface character, forming pairs acting
Multi-fluid magnetohydrodynamics in the solar atmosphere
Mul-flud magohydrodyams h solar amoshr Tmuraz Zaqarashvl თეიმურაზ ზაქარაშვილი Sa Rsarh Isu of Ausra Aadmy of Ss Graz Ausra ISSI-orksho Parally ozd lasmas asrohyss 6 Jauary- Fbruary 04 ISSI-orksho Parally
The Exile Began. Family Journal Page. God Called Jeremiah Jeremiah 1. Preschool. below. Tell. them too. Kids. Ke Passage: Ezekiel 37:27
Faily Jo Pag Th Exil Bg io hy u c prof b jo ou Shar ab ou job ab ar h o ay u Yo ra u ar u r a i A h ) ar par ( grp hav h y y b jo i crib blo Tll ri ir r a r gro up Allo big u r a i Rvi h b of ha u ha a
Convection and buoyancy oscillation
Convection and buoyancy oscillation Recap: We analyzed the static stability of a vertical profile by the "parcel method"; For a given environmental profile (of T 0, p 0, θ 0, etc.), if the density of an
LM A F LABL Y H FRMA H P UBLCA B LV B ACCURA ALL R PC H WVR W C A AU M RP BLY FR AY C QUC RUL G F RM H U HR F H FRMA C A HR UBJC CHA G WHU C R V R W H
H R & C C M RX700-2 Bx C LM A F LABL Y H FRMA H P UBLCA B LV B ACCURA ALL R PC H WVR W C A AU M RP BLY FR AY C QUC RUL G F RM H U HR F H FRMA C A HR UBJC CHA G WHU C R V R W H PUBLCA M AY B U CRP RA UCH
Calculus Math 21B, Winter 2009 Final Exam: Solutions
Calculus Math B, Winter 9 Final Exam: Solutions. (a) Express the area of the region enclosed between the x-axis and the curve y = x 4 x for x as a definite integral. (b) Find the area by evaluating the
In 1991 Fermat s Last Theorem Has Been Proved
I 99 Frmat s Last Thorm Has B Provd Chu-Xua Jag P.O.Box 94Bg 00854Cha Jcxua00@s.com;cxxxx@6.com bstract I 67 Frmat wrot: It s mpossbl to sparat a cub to two cubs or a bquadrat to two bquadrats or gral
Vector Calculus. Dr. D. Sukumar
Vector Calculus Dr. D. Sukumar Space co-ordinates Change of variable Cartesian co-ordinates < x < Cartesian co-ordinates < x < < y < Cartesian co-ordinates < x < < y < < z < Cylindrical Cylindrical Cylindrical
Mathematics 22: Lecture 5
Mathematics 22: Lecture 5 Autonomous Equations Dan Sloughter Furman University January 11, 2008 Dan Sloughter (Furman University) Mathematics 22: Lecture 5 January 11, 2008 1 / 11 Solving the logistics
S n+1 (1 + r) n+1 S ] (1 + r) n + n X T = X 0 + ( S) T,
![S n+1 (1 + r) n+1 S ] (1 + r) n + n X T = X 0 + ( S) T,](/thumbs/86/94788187.jpg "S n+1 (1 + r) n+1 S ] (1 + r) n + n X T = X 0 + ( S) T,")
(S K) + (S K) + (S K) + (X 0 0 S 0, 0 S 0 ) X 0 0 (X 0 0 S 0 ) X 0 ( + r)(x 0 0 S 0 ) + 0 S (S K) +. S (H) us 0 S (T ) ds 0 X 0 0 u d X 0.0 0 (S K) + ( X 0 + 0 S 0, 0 S 0 ) 0 0 S 0 X 0 X 0 C 0 X 0 C 0
Pressure in stationary and moving fluid. Lab-On-Chip: Lecture 2
Pressure in stationary and moving fluid Lab-On-Chip: Lecture Fluid Statics No shearing stress.no relative movement between adjacent fluid particles, i.e. static or moving as a single block Pressure at
Networking Management system Protocol. User s Manual
wk M U M Id hp : I : dw : fw : w hp : w h : h : h : h h pwd : f. M p f. d h p : h : 7: f M-MU. h f d dp f d. h f d dp f b- d. h f d dp f * d. h f d dp f d. h f d dp f Y d. h f d dp f. d 7. h f d dp f V
Buoyancy-induced Flow:
Buoyancy-induced Flow: Natural Convection in a Unconfined Space If we examine the flow induced by heat transfer from a single vertical flat plat, we observe that the flow resembles that of a boundary layer.
- Marine Hydrodynamics. Lecture 14. F, M = [linear function of m ij ] [function of instantaneous U, U, Ω] not of motion history.
![- Marine Hydrodynamics. Lecture 14. F, M = [linear function of m ij ] [function of instantaneous U, U, Ω] not of motion history.](/thumbs/79/78889363.jpg "- Marine Hydrodynamics. Lecture 14. F, M = [linear function of m ij ] [function of instantaneous U, U, Ω] not of motion history.")
2.20 - Marine Hydrodynamics, Spring 2005 ecture 14 2.20 - Marine Hydrodynamics ecture 14 3.20 Some Properties of Added-Mass Coefficients 1. m ij = ρ [function of geometry only] F, M = [linear function
Principles of Physics II
Principles of Physics II J. M. Veal, Ph. D. version 18.05.4 Contents 1 Fluid Mechanics 3 1.1 Fluid pressure............................ 3 1. Buoyancy.............................. 3 1.3 Fluid flow..............................
Early Years in Colorado
Rp m H V I 6 p - Bb W M M M B L W M b w b B W C w m p w bm 7 Nw m m m p b p m w p E Y C W m D w w Em W m 7- A m m 7 w b m p V A Gw C M Am W P w C Am H m C q Dpm A m p w m m b W I w b-w C M B b m p W Nw
Some mathematical models from population genetics
Some mathematical models from population genetics 5: Muller s ratchet and the rate of adaptation Alison Etheridge University of Oxford joint work with Peter Pfaffelhuber (Vienna), Anton Wakolbinger (Frankfurt)
Functions of Several Variables: Chain Rules
Functions of Several Variables: Chain Rules Calculus III Josh Engwer TTU 29 September 2014 Josh Engwer (TTU) Functions of Several Variables: Chain Rules 29 September 2014 1 / 30 PART I PART I: MULTIVARIABLE
Assignment 6 Solution. Please do not copy and paste my answer. You will get similar questions but with different numbers!
Assignment 6 Solution Please do not copy and paste my answer. You will get similar questions but with different numbers! This question tests you the following points: Integration by Parts: Let u = x, dv
Hankel Transforms - Lecture 10
1 Introduction Hankel Transforms - Lecture 1 The Fourier transform was used in Cartesian coordinates. If we have problems with cylindrical geometry we will need to use cylindtical coordinates. Thus suppose
The Dirac δ-function
The Dirac δ-function Elias Kiritsis Contents 1 Definition 2 2 δ as a limit of functions 3 3 Relation to plane waves 5 4 Fourier integrals 8 5 Fourier series on the half-line 9 6 Gaussian integrals 11 Bibliography
) ) = γ. and P ( X. B(a, b) = Γ(a)Γ(b) Γ(a + b) ; (x + y, ) I J}. Then, (rx) a 1 (ry) b 1 e (x+y)r r 2 dxdy Γ(a)Γ(b) D
3 Independent Random Variables II: Examples 3.1 Some functions of independent r.v. s. Let X 1, X 2,... be independent r.v. s with the known distributions. Then, one can compute the distribution of a r.v.
LOWELL JOURNAL. LOWSLL, MICK., WSSDNaSDAY", FEB 1% 1894:
? jpv J V# 33 K DDY % 9 D Y D z K x p * pp J - jj Q D V Q< - j «K * j G»D K* G 3 zz DD V V K Y p K K 9 G 3 - G p! ( - p j p p p p Q 3 p ZZ - p- pp p- D p pp z p p pp G pp G pp J D p G z p _ YK G D xp p-
Math review. Math review
Math review 1 Math review 3 1 series approximations 3 Taylor s Theorem 3 Binomial approximation 3 sin(x), for x in radians and x close to zero 4 cos(x), for x in radians and x close to zero 5 2 some geometry
2 xg v Z u R u B pg x g Z v M 10 u Mu p uu Kg ugg k u g B M p gz N M u u v v p u R! k PEKER S : vg pk H g E u g p Muu O R B u H H v Yu u Bu x u B v RO
HE 1056 M EENG O HE BRODE UB 1056 g B u 7:30 p u p 17 2012 R 432 R Wg Z g Uv : G g B S : K v Su g 33; 29 4 g u R : P : E R B J B Y B B B B B u B u E B J Hu u M M P R g J Rg Rg S u S pk k R g: u D u G D
Contents FREE!
Fw h Hu G, h Cp h w bu Vy Tu u P. Th p h pk wh h pp h. Th u y D 1 D 1 h h Cp. Th. Th hu K E xp h Th Hu I Ch F, bh K P pp h u. Du h p, K G u h xp Ch F. P u D 11, 8, 6, 4, 3. Th bk w K pp. Wh P p pp h p,
o Alphabet Recitation
Letter-Sound Inventory (Record Sheet #1) 5-11 o Alphabet Recitation o Alphabet Recitation a b c d e f 9 h a b c d e f 9 h j k m n 0 p q k m n 0 p q r s t u v w x y z r s t u v w x y z 0 Upper Case Letter
Physics 598ACC Accelerators: Theory and Applications
hysics 598ACC Accelerators: Theory and Instructors: Fred Mills, Deborah Errede Lecture 3: Equations of Motion in Accelerator Coordinates 1 Summary A. Curvilinear (Frenet-Serret) coordinate system B. The
SHOOTING STAR LOT 79 A102 LANDSCAPE CONTEXT PLAN 3175 FOUR PINES RD TETON VILLAGE, WY LANDSCAPE CONTEXT PERMIT SUBMISSION
DG R 0 KG, 0 JK 800 () 07 7 600 PRJ.: - R: D R B-08 P R. R 0 DG R G Date: ay 8, 00 U R. U D PR UB -7-6 DPG V 6--6 DPG : P PUG - (9) RD PRU P PUG -' () RD PRU PPUU RUD - -.".' (7) QUKG P P PUG -' () RD
Rotation. Rotational Variables
Rotation Rigid Bodies Rotation variables Constant angular acceleration Rotational KE Rotational Inertia Rotational Variables Rotation of a rigid body About a fixed rotation axis. Rigid Body an object that
Orbital Motion in Schwarzschild Geometry
Physics 4 Lecture 29 Orbital Motion in Schwarzschild Geometry Lecture 29 Physics 4 Classical Mechanics II November 9th, 2007 We have seen, through the study of the weak field solutions of Einstein s equation
Y k p p Y < 5 # X < k < kk Resonant Tunneling in Quantum Field Theory
Resonant Tunneling in Quantum Field Theory Dan Wohns Cornell University work in progress with S.-H. Henry Tye September 18, 2009 Dan Wohns Resonant Tunneling in Quantum Field Theory 1/36 Resonant Tunneling
18 Green s function for the Poisson equation
8 Green s function for the Poisson equation Now we have some experience working with Green s functions in dimension, therefore, we are ready to see how Green s functions can be obtained in dimensions 2
EE 232 Lightwave Devices Lecture 3: Basic Semiconductor Physics and Optical Processes. Optical Properties of Semiconductors
3 Lightwav Dvics Lctur 3: Basic Smicoductor Physics ad Optical Procsss Istructor: Mig C. Wu Uivrsity of Califoria, Brly lctrical girig ad Computr Scics Dpt. 3 Lctur 3- Optical Proprtis of Smicoductors
MATH 56A SPRING 2008 STOCHASTIC PROCESSES 197
MATH 56A SPRING 8 STOCHASTIC PROCESSES 197 9.3. Itô s formula. First I stated the theorem. Then I did a simple example to make sure we understand what it says. Then I proved it. The key point is Lévy s
Arkansas Tech University MATH 2924: Calculus II Dr. Marcel B. Finan. Solutions to Assignment 7.6. sin. sin
Arkansas Tech University MATH 94: Calculus II Dr. Marcel B. Finan Solutions to Assignment 7.6 Exercise We have [ 5x dx = 5 ] = 4.5 ft lb x Exercise We have ( π cos x dx = [ ( π ] sin π x = J. From x =
Mechanical System. Seoul National Univ. School of Mechanical and Aerospace Engineering. Spring 2008
Mechanical Syste Newton s Laws 1)First law : conservation of oentu no external force no oentu change linear oentu : v Jω angular oentu : dv ) Second law : F = a= dt d T T = J α = J ω dt Three Basic Eleents
Electrodynamics PHY712. Lecture 4 Electrostatic potentials and fields. Reference: Chap. 1 & 2 in J. D. Jackson s textbook.
Electrodynamics PHY712 Lecture 4 Electrostatic potentials and fields Reference: Chap. 1 & 2 in J. D. Jackson s textbook. 1. Complete proof of Green s Theorem 2. Proof of mean value theorem for electrostatic
Optimal time travel in the Gödel universe
Optimal time travel in the Gödel universe José Natário (Instituto Superior Técnico, Lisbon) Based on arxiv:1105.6197 Porto, January 2013 Outline Newtonian cosmology Rotating Newtonian universe Newton-Cartan
Radiative equilibrium Some thermodynamics review Radiative-convective equilibrium. Goal: Develop a 1D description of the [tropical] atmosphere
![Radiative equilibrium Some thermodynamics review Radiative-convective equilibrium. Goal: Develop a 1D description of the [tropical] atmosphere](/thumbs/72/66535634.jpg "Radiative equilibrium Some thermodynamics review Radiative-convective equilibrium. Goal: Develop a 1D description of the [tropical] atmosphere")
Radiative equilibrium Some thermodynamics review Radiative-convective equilibrium Goal: Develop a 1D description of the [tropical] atmosphere Vertical temperature profile Total atmospheric mass: ~5.15x10
Numerical integration and importance sampling
2 Numerical integration and importance sampling 2.1 Quadrature Consider the numerical evaluation of the integral I(a, b) = b a dx f(x) Rectangle rule: on small interval, construct interpolating function
'g$-y- )4r0---aooaOC- r. o. A9.Heo'i.OMaoa)a.9. w?s. R ; : ; 09a:.aaa'. L31ia. a.j-rf-boam- WaTaB Z. rf5. ,at. f2 OOMS09r.)tafi.aaatrnvrtt.f.ai. l"s!
P K PD K D 0 D X P P Z $ X P R YR D z x R x P K 0 K x K K 0 x 0 0 0 0 0 Z x 0 0 0 0 0 x x 0 00 0 P 0 K K 0 0 0 K K 0 0 0 K K X G Z 0 0 0 K 0 0 P x x q P x R 0 0 K0 x q x P 0 0 P G 00 R 0 K x 0 0 0 Z 0
University of Illinois at Chicago Department of Physics
University of Illinois at Chicago Department of Physics Electromagnetism Qualifying Examination January 4, 2017 9.00 am - 12.00 pm Full credit can be achieved from completely correct answers to 4 questions.
" W I T H IvIALIGE T O W A R D ISTPISTE A N D O H A R I T Y F O R A L L LOWELL PEOPLE. A Fine Time with Mr. and Krs. Geo. W. Parker.
V - > >- VBz FB B DB j B DB&B G R D P D R Y F R V K CY C PR 9 2 B $200 3 G R G V C: C Y B B V F C F B $00 PC C VR CQ D P C x R q» G C R B BY B P Y P P J C CP F FRR D DRKR GD J B R D PC R P D < C x F B
Beer-Lambert (cont.)
The Beer-Lambert Law: Optical Depth Consider the following process: F(x) Absorbed flux df abs F(x + dx) Scattered flux df scat x x + dx The absorption or scattering of radiation by an optically active
Thermodynamics Review [?] Entropy & thermodynamic potentials Hydrostatic equilibrium & buoyancy Stability [dry & moist adiabatic]
![Thermodynamics Review [?] Entropy & thermodynamic potentials Hydrostatic equilibrium & buoyancy Stability [dry & moist adiabatic]](/thumbs/81/83694823.jpg "Thermodynamics Review [?] Entropy & thermodynamic potentials Hydrostatic equilibrium & buoyancy Stability [dry & moist adiabatic]")
Thermodynamics Review [?] Entropy & thermodynamic potentials Hydrostatic equilibrium & buoyancy Stability [dry & moist adiabatic] Entropy 1. (Thermodynamics) a thermodynamic quantity that changes in a
physicsandmathstutor.com 4727 Mark Scheme June 2010
477 Mark Scheme June 00 Direction of l = k[7, 0, 0] Direction of l = k[,, ] EITHER n = [7, 0, 0] [,, ] For both directions [ x, y, z]. [7,0, 0] = 0 7x 0z = 0 OR [ x, y, z]. [,, ] = 0 x y z = 0 n = k[0,,
Mathematical Tripos Part IA Lent Term Example Sheet 1. Calculate its tangent vector dr/du at each point and hence find its total length.
Mathematical Tripos Part IA Lent Term 205 ector Calculus Prof B C Allanach Example Sheet Sketch the curve in the plane given parametrically by r(u) = ( x(u), y(u) ) = ( a cos 3 u, a sin 3 u ) with 0 u
Stability of local observables
Stability of local observables in closed and open quantum systems Angelo Lucia anlucia@ucm.es Universidad Complutense de Madrid NSF/CBMS Conference Quantum Spin Systems UAB, June 20, 2014 A. Lucia (UCM)
K(ζ) = 4ζ 2 x = 20 Θ = {θ i } Θ i=1 M = {m i} M i=1 A = {a i } A i=1 M A π = (π i ) n i=1 (Θ) n := Θ Θ (a, θ) u(a, θ) E γq [ E π m [u(a, θ)] ] C(π, Q) Q γ Q π m m Q m π m a Π = (π) U M A Θ
LECTURE 5 Guassian Wave Packet
LECTURE 5 Guassian Wav Pact 1.5 Eampl f a guassian shap fr dscribing a wav pact Elctrn Pact ψ Guassian Assumptin Apprimatin ψ As w hav sn in QM th wav functin is ftn rprsntd as a Furir transfrm r sris.
Total energy in volume
General Heat Transfer Equations (Set #3) ChE 1B Fundamental Energy Postulate time rate of change of internal +kinetic energy = rate of heat transfer + surface work transfer (viscous & other deformations)