USC - CHEM - 325BL

Chapter 16 Practice Problems. Chemistry 322b Fall 2011 1. OH & any saturated alcohol as only carbon sources 2. OO O & any saturated alcohol or other 12 carbon source as only carbo

USC - CHEM - 325BL

USC - CHEM - 325BL

Practice Problem Set #5 CHEM 322b Fall 2011 1. OOHOHNH2 2. O OOHOO 3. OOHOOH 4. OONHN & a 14 C source 5. O & any 13 carbon sources O

USC - CHEM - 325BL

Practice Problem Set #6 CHEM 322b Fall 2011 1. OOO+BrH 2. OCO2EtCO2EtCO2Et O& any 4 carbon source 3. O 4. NH2 5. OM eOMeMeOMeOOM eOM eNHNH2 & any 6 carbon source

USC - CHEM - 325BL

Practice Problem Set #7. CHEM 322b Fall 2011 1. FCNNH3Cl 2. NCH3LiBr 3. ClOMeNO 2CF 3CF 3 & any 1 carbon source 4. HNN 5. BrOHNO 2NH2

USC - CHEM - 325BL

@+LC9\+' ,-\.\(a7"lrt,yF.^l).1t )^Dc r yAl , h l'lg,hz,z , a .oIN O AO9o c ln?1.\/\n-t\7 Xcyl-Q'r / )tct3, 1,uJJr ,l )-oo?-,2- ) N "fufr3uSd-t-,+L l ). o +l), 1 )lcl3,cA.,fhr:\ifl? u 'utF,agaoVcoolP.0t1VoBr,

USC - CHEM - 325BL

USC - CHEM - 325BL

Boise State - PHYSICS - 104

3 Sept 2003Solar System - C. C. Lang1Check your knowledge-Northerners have cold days in January because:(a) the earth is farthest from the Sun in January(b) the orbital velocity of Earth is greatest in Jan.(c) the Sun is lower in the sky in January

Boise State - PHYSICS - 104

Water on Mars Geological Evidence for Water on Mars*- gullies, erosion channels- layers/sedimentary features The Physics of Water on Marspolar ice caps seasonal variationatmosphere - history Chemical Evidence for Water on Mars Theories for Water o

Boise State - PHYSICS - 104

Surface Exploration of Mars: Past & Future Martian Meteorites Martian Moons Martian Surface ExplorationThe Viking Landers (early 80s)Pathfinder (1997)Current Surface Explorers (three en route!)Future of Martian Exploration (astrobiology) Review of

Boise State - PHYSICS - 104

Solar System Planets: The Earth + MoonI. Moon- Atmosphere- Surface/Geological Features/Moon Rocks- Interior- OriginII. Mercury- Basic Facts- Exploration- Cratering13 Oct 2003Solar System - Dr. C.C. Lang1The Moon has no atmosphere allows us t

Boise State - PHYSICS - 104

Exploring the Solar System:all about spacecraft/spaceflightI. How can we explore the Solar System?- types of space missionsII. How do we get there?- launch & orbits- gravity assist- fuel/propulsionIII. Onboard Systems- everything but the kitchen

Boise State - PHYSICS - 104

BlackHolesBlackHolesTheintensegravitationalfieldleftwhenagiantstarcollapsesItiscalledablackholebecausenotevenlightcanescapePhotonSphereTheouteredgewherelightbendsbutisstillescapableEventHorizonThepointatwhichnolightcanescapeSingularityT

Boise State - PHYSICS - 104

Cosmic rays and solar flaresDraw in the back of your book thelife cycle of a starSolar flares and Cosmic raysYou should learn: Cosmic rays are fast-moving ionising particlesfrom the Sun. The Earths magnetic field prevents themfrom reaching us beca

Boise State - PHYSICS - 104

Comet Impact:July 4, 2005Impact Velocity:23,000 mphSpacecraft Size:Flyby spacecraft nearly as large as aVolkswagen Beetleautomobile.Impactor spacecraft about the samedimensions as atypical living roomcoffee table.Principal Investigator, Dr. Mi

Boise State - PHYSICS - 104

Exploring our Solar SystemP2f part 2ObjectivesIn this lesson we should learn: about the distances involved in spacetravel about manned and unmanned space flight how very large distances are measured inspaceOutcomesFoundation PaperYou should now

Boise State - PHYSICS - 104

Exploring our Solar SystemP2f part 1ObjectivesIn this lesson we should learn: about the bodies in space that make upthe Universe why planets and moons stay in orbits about the planets in our Solar System,producing a model of the Solar SystemOutco

Boise State - PHYSICS - 104

Free powerpoints at http:/www.worldofteaching.comFirststopMercury(e e k,re a lly h o th e re s o wo nts tic ka ro und to o lo ng ) wh e re g ra vity is 3N/kg.ontoVenus,theplanetofluuurrrvewheregravityis9N/kg(bitlikeEarth).AthomeonEarth,wh

Boise State - PHYSICS - 104

HowFarisFar?Earth to Mo o n Dis tanc eAverage of 238,000 MilesS un to Earth Dis tanc e1 As tro no mic al Mile s(AU)9 3,000,000 UnitB o dyMercuryVenusEarthMarsJ upiterSaturnUranusNeptunePlutoAU.39.721.01.55.29.519.230.139.5S o lar

Boise State - PHYSICS - 104

Whe re is Jupite r?5th P lanet from the Sun483,600,000 Miles(5.2 AngstromUnits)Plane t OrbitalP e rio ds(in Earth-Ye ars )29.461.88.24.6284.0111.86164.8247.7What is Jupite r?Gaseous Atmosphereof Hydrogen, Helium,Carbon Dioxide, Methane

Boise State - PHYSICS - 104

Meteors & Meteor ShowersMeteorsThe DifferencesThe Meteoroid,Meteorite, Meteor? Meteoroid- small, solid body moving withinsmall,the solar system.the Meteorite- solid remains of a meteor thatsolidfalls to the Earth.falls Meteor- (shooting star

Boise State - PHYSICS - 104

50:50Welcome toWho Wants tobe a Millionaire151413121110987654321$1 Million$500,000$250,000$125,000$64,000$32,000$16,000$8,000$4,000$2,000$1,000$500$300$200$100 H.M.Murphy- All Rights Reserved H.M.Murphy- All Rights Reser

Boise State - PHYSICS - 104

The MoonA look at our nearestneighbor in Space!Free powerpoints at http:/www.worldofteaching.comWhat is the Moon? A natural satellite One of more than 96 moons inour Solar System The only moon of the planetEarthLocation, location, location! Abo

Boise State - PHYSICS - 104

OUR SOLAR SYSTEMTHE MILKY WAYTHE SUNMERCURYVENUSEARTHMARSJUPITERSATURNURANUSNEPTUNEPLUTOThis powerpoint was kindly donated towww.worldofteaching.comhttp:/www.worldofteaching.com is home to over athousand powerpoints submitted by teachers. T

Boise State - PHYSICS - 104

OuterSpaceObjectsOuterSpaceObjectsCenterofMilkyWayCenterofMilkyWayCOMETSCOMETSPhotographsprovidedonthewebbyNASASeriesof7slidesHalleysCometHalleysComet13May1910overFlagstaff,ArizonaHalleyCometHalleyCometfromGiotto1986GiottoGiottoCometBrad

Boise State - PHYSICS - 104

SpectrafromRetinaNebula:Green=hydrogenBlue=oxygenRed=nitrogenTarantulaNebulaintheLargeMagellanicCloudStellarStellarformationinPapillonNebulainLargeMagellanicCloudLagoonNebulaOrionOrionNebulafromHubble1,500 light yearsfrom earthS

Boise State - PHYSICS - 104

Our Solar SystemOurThese photographs are taken from the NASAspace missions.spacehttp:/nssdc.gsfc.nasa.gov/photo_gallery/Our SunOurMicrosoft Clip ArtSolar Eclipse 2001SolarTransittime:3hoursinLusaka,ZambiaTotaleclipse:2sec.shortof3minutesPhoto

Boise State - PHYSICS - 104

Part 2 of Solar SystemPartMars GlobalSurveyor (MGS)1996 to 20061996240,000 photos240,000Marsphotographphotograph4viewsofsurfaceMarsMars19June1976SngiViktrafcecpaMars surfaceMarsOlympus MonsOlympuslargest volcano in solar system

Boise State - PHYSICS - 104

Celestial Objects to scaleOuter Space 4czones of the Solar system: inner solar system, asteroidbelt, giant planets (Jovians) and Kuiper belt.Sizes and orbits not to scale.Sizes are to scale.Arp147 imageHeres what NASA thinks.www.nasa.gov/multimed

Boise State - PHYSICS - 104

Space The Final FrontierSpaceEarly astronomersEarly Astronomer - Astronomers use the principles of physics and mathematicsAstronomer Astronomersto learn about the fundamental nature of the universe, including the sun, moon,planets, stars, ..Nicho

Boise State - PHYSICS - 104

Space Science UnitQuick overview:GalaxiesMultiple Star SystemsConstellationsSpectroscope LabToilet Paper SolarSystem LabCharacteristics of StarsH-R DiagramMeasuring Star distances(parallax)The Sun: Our special StarActivities of the SunIntrod

Boise State - PHYSICS - 104

The solar systemWhat is the solar system?The Sun, its planets and other objectsin orbit are all together known as thesolar system.The nine planets(starting with the closest to the Sun)MercuryVenusEarthMarsJupiterSaturnUranusNeptunePlutoHow

Boise State - PHYSICS - 104

Threats to EarthP2g part 1 & 2ObjectivesIn this lesson we should learn: about the properties of asteroids how asteroids have affected Earth in thepastOutcomesFoundation PaperYou should now be able to. State that large asteroids have collided wit

FSU - MAC - 1130

1 Right Triangle TrigonometryTrigonometry is the study of the relations between the sides and angles of triangles. Theword trigonometry is derived from the Greek words trigono (o), meaning triangle,and metro (), meaning measure. Though the ancient Gree

FSU - MAC - 1130

2Chapter 1 Right Triangle Trigonometry1.1(a) Two acute angles are complementary if their sum equals 90 . In other words, if 0 A , B 90 then A and B are complementary if A + B = 90 .(b) Two angles between 0 and 180 are supplementary if their sum equa

FSU - MAC - 1130

Angles Section 1.13Example 1.1For each triangle below, determine the unknown angle(s):EBY3532035ADCFXZNote: We will sometimes refer to the angles of a triangle by their vertex points. For example, in therst triangle above we will simply

FSU - MAC - 1130

4Chapter 1 Right Triangle Trigonometry1.1In a right triangle, the side opposite the right angle is called the hyBpotenuse, and the other two sides are called its legs. For example, incFigure 1.1.4 the right angle is C , the hypotenuse is the line se

FSU - MAC - 1130

Angles Section 1.15Example 1.3For each right triangle below, determine the length of the unknown side:B5AYEa42DCz11eF1XZSolution: For triangle ABC , the Pythagorean Theorem says thata2 + 42 = 52a2 = 25 16 = 9a=3 .For triangle DEF

FSU - MAC - 1130

6Chapter 1 Right Triangle Trigonometry1.110. One end of a rope is attached to the top of a pole 100 ft high. If the rope is 150 ft long, what isthe maximum distance along the ground from the base of the pole to where the other end can beattached? You

FSU - MAC - 1130

Trigonometric Functions of an Acute Angle Section 1.271.2 Trigonometric Functions of an Acute AngleTable 1.2Name of functionuseenotyp chAbadjacentBaoppositeConsider a right triangle ABC , with the right angle at C andwith lengths a, b, a

FSU - MAC - 1130

8Chapter 1 Right Triangle Trigonometry1.2Example 1.5For the right triangle ABC shown on the right, nd the values of all six trigonometric functions of the acute angles A and B.B53Solution: The hypotenuse of ABC has length 5. For angle A , the oppo

FSU - MAC - 1130

Trigonometric Functions of an Acute Angle Section 1.29are equal and the ratios of the corresponding sides are equal. In fact, we know that common ratio: the sides of ABC are approximately 2.54 times longer than the correspondingsides of A B C . So when

FSU - MAC - 1130

10Chapter 1 Right Triangle Trigonometry1.2Example 1.7Find the values of all six trigonometric functions of 60 .BSolution: Since we may use any right triangle which has 60 as one ofthe angles, we will use a simple one: take a triangle whose sides ar

FSU - MAC - 1130

Trigonometric Functions of an Acute Angle Section 1.211We now know the lengths of all sides of the triangle ABC , so we have:cos A =csc A =adjacent5=hypotenuse33hypotenuse=opposite2sec A =tan A =opposite2=adjacent5hypotenuse3=adja

FSU - MAC - 1130

12Chapter 1 Right Triangle Trigonometry1.2Example 1.10Find the sine, cosine, and tangent of 75 .DSolution: Since 75 = 45 +30 , place a 306090 right triangle ADB with legs of length 3 and 1 on top of the hypotenuseof a 45 45 90 right triangle ABC w

FSU - MAC - 1130

Trigonometric Functions of an Acute Angle Section 1.211. sin A =3412. cos A =2313. cos A =15. tan A =5916. tan A = 317. sec A =21014. sin A =73132418. csc A = 3For Exercises 19-23, write the given number as a trigonometric function o

FSU - MAC - 1130

14Chapter 1 Right Triangle Trigonometry1.31.3 Applications and Solving Right TrianglesThroughout its early development, trigonometry was often used as a means of indirect measurement, e.g. determining large distances or lengths by using measurements o

FSU - MAC - 1130

Applications and Solving Right Triangles Section 1.315Example 1.13A blimp 4280 ft above the ground measures an angle of depression of 24 from its horizontal line ofsight to the base of a house on the ground. Assuming the ground is at, how far away alo

FSU - MAC - 1130

16Chapter 1 Right Triangle Trigonometry1.3Example 1.15As another application of trigonometry to astronomy, we will nd the distancefrom the earth to the sun. Let O be the center of the earth, let A be a pointon the equator, and let B represent an obj

FSU - MAC - 1130

Applications and Solving Right Triangles Section 1.317You may have noticed that the solutions to the examples we have shown required at leastone right triangle. In applied problems it is not always obvious which right triangle touse, which is why thes

FSU - MAC - 1130

18Chapter 1 Right Triangle Trigonometry1.3Example 1.18A slider-crank mechanism is shown in Figure 1.3.2 below. As the piston moves downward the connecting rod rotates the crank in the clockwise direction, as indicated.pistonaAeconnbCcrocting

FSU - MAC - 1130

Applications and Solving Right Triangles Section 1.319For some problems it may help to remember that when a right trirangle has a hypotenuse of length r and an acute angle , as in ther sin picture on the right, the adjacent side will have length r co

FSU - MAC - 1130

20Chapter 1 Right Triangle Trigonometry1.3Exercises1. From a position 150 ft above the ground, an observer in a building measures angles of depression of 12 and 34 to the top andbottom, respectively, of a smaller building, as in the picture onthe ri

FSU - MAC - 1130

Applications and Solving Right Triangles Section 1.38. A ball bearing sits between two metal grooves, with the top groove having anangle of 120 and the bottom groove having an angle of 90 , as in the pictureon the right. What must the diameter of the b

FSU - MAC - 1130

22Chapter 1 Right Triangle Trigonometry1.324. In Example 1.10 in Section 1.2, we found the exact values of all six trigonometric functions of75 . For example, we showed that cot 75 = 6 2 . So since tan 15 = cot 75 by the Cofunction6+ 2Theorem, this

FSU - MAC - 1130

Applications and Solving Right Triangles Section 1.325. A manufacturer needs to place ten identical ball bearings againstthe inner side of a circular container such that each ball bearing touches two other ball bearings, as in the picture on theright.

FSU - MAC - 1130

24Chapter 1 Right Triangle Trigonometry1.41.4 Trigonometric Functions of Any AngleTo dene the trigonometric functions of any angle - including angles less than 0 or greaterthan 360 - we need a more general denition of an angle. We say that an angle i

FSU - MAC - 1130

Trigonometric Functions of Any Angle Section 1.425We can now dene the trigonometric functions of any angle in terms of Cartesian coordinates. Recall that the x y-coordinate plane consists of points denoted by pairs ( x, y) ofreal numbers. The rst numbe

FSU - MAC - 1130

26Chapter 1 Right Triangle Trigonometry1.4Notice that in the case of an acute angle these denitions are equivalent to our earlierdenitions in terms of right triangles: draw a right triangle with angle such that x =adjacent side, y = opposite side, an

FSU - MAC - 1130

Trigonometric Functions of Any Angle Section 1.427Example 1.20Find the exact values of all six trigonometric functions of 120 .Solution: We know 120 = 180 60 . By Example 1.7 in Section 1.2,we see that we can use the point (1, 3) on the terminal side