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CHEMISTRY Inorganic Physical Organic Analytical Biochemistry

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CHEMISTRY. Inorganic Physical Organic Analytical Biochemistry. Matter : space and has mass. Mass : quantity of matter Matter Solid Liquid Gas. Physical state and Changes in Matter. Melting Heat Solid Liquid Cool - PowerPoint PPT Presentation

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CHEMISTRY

CHEMISTRYInorganic

Physical Organic Analytical BiochemistryMatter : space and has massMass : quantity of matterMatter

Solid Liquid GasPhysical state and Changes in MatterMeltingHeat Solid Liquid

Cool Solidification

Physical state and Changes in MatterEvaporationHeatLiquid Vapor

Cool Condensation

Physical state and Changes in MatterHeat Solid Vapor

Cooling Sublimation

Physical state and Changes in MatterHeat Ice Water

Cool

MATTER HOMOGENEOUSSUBSTANCES

HETEROGENEOUSMIXTURE

SOLUTIONSHomogeneous mixture of variable composition.Can be separated into

PURESUBSTANCESHomogeneous matter of fixed composition

COMPOUNDSComposed of 2 or more elements.Can be separated into

ELEMENTS

Heterogeneous and Homogeneous

Solutions, Pure Substanceand Compounds

MassA mass of an object pertains to the quantity of the matter that object contains.

10MassA physical property that every Manager possesses is a mass.

The amount of mass in a pizza will never change when the object is moved from place to place.

WEIGHT A physical property that is related to mass is weight The weight of a chef may change if it is moved to Uranus because weight is determined by gravity.

ATOMAtoms are the basic building blocks of all the chalk around you. It is the smallest particle of matter that can enter into chemical combinations with other particles.

MOLECULEA smallest particle of an element or compound that can have a stable independent existence.Atoms make up molecules. Molecules make up a hairy eagle.

ELEMENTSElements are pure substances, made from one type of atom. Soda can be broken down into many elements but nitrogen can not be broken down.

Symbols and Latin Names for Some ElementsNameSymbolLatin nameSodiumNanatriumPotassiumKkaliumGoldAuaurumSilverAgargentumIronFeferrum

METALSGold, silver, copper, and iron are examples of metals. A gold diamond is shiny because of its metal properties.

PROPERTIES OF METALSGold conducts heat and electricity. Nickel can be hammered into thin sheets without breaking. Platinum can be pulled into wire.

NONMETALThe helium in my Christmas balloon is a nonmetal. The Oxygen in the air is not shiny because of its nonmetal properties.

PROPERTIES OF NONMETALA dog cannot conduct electricity. A snap dragon cannot be hammered into thin sheets. A snicker cannot be pulled into wire because they are not metals.

METALLOIDSMetalloids have properties of both metals and nonmetals. Silicon is a metalloid that can be found in many materials such as the sand on Lake Tahoe the glass in a vase and certain plastics that make up a favorite toy, car.

Chemical ChangesIron is abundant easy to shape when heated and relatively strong.Chemical Property ability of a substance to undergo chemical change Composition of matter always changes

Chemical Reaction Another term for Chemical change One or more substance change into one or more new substance during chemical reactionReactant a substance present at the start of the reactionProduct substance produced in the reaction

23Chemical ChangeHow can you tell whether a chemical change has taken place? transfer in energy change in color production of gas formation of a precipitate

24IONS An atom or a group of atoms that has acquired electric charge by gaining or losing one more electron Cathode Anode Anion Cation

LAW OF CONSERVATION OF MASS Any physical change or chemical reaction, mass is conserved. Mass is neither created nor destroyed.

Law of Definite Composition / Definite Proportion A given compound always shows a fixed proportion. A chemical compound always contains the same elements in the same percent by mass. When two elements combine to form a given compound, they always do so in a fixed proportion.Law of Definite Composition / Definite ProportionFinding the % of Carbon and Oxygen% C = mass C x 100 % O = mass of O x 100 72.8% mass of CO2 27.2% mass of CO2 TrialMass of C (g)Mass of O2 (g)Mass of CO2(g)12.005.347.34215.0040.0555.0535.0013.3618.36Law of Multiple Proportions When two elements combine to form more than one compound, the masses of one element which combine with a fixed mass of the other element are in a ratio of small whole numbers such as 2:1, 1:1, 2:3, etc.Example C D1st Compound 2.276 0.792 0.3482nd 1.422 0.948 0.667A. Mass fixed at CContinuation of Law of Multiple Proportions therefore the formulas of the two compounds are C DCD 1 0.348 = 1 0.348

CD2 1 0.667 = 2 0.348

See the ppt: Folder at the desktop : New Bio lecturesFind the File name: introduction to Biology page 61 (Scientific Measurements) Measurements in Chemistry Encounter very large or very small numbers.Examples: A single gram of hydrogen, contains approximately 602 000 000 000 hydrogen atoms 6.02 x 10 ? The mass of an atom gold is 0.000 000 000 000 327 gram. 3.27 x 10 ?Scientific Notation A given number is written as the product of two numbers: a coefficient a 10 raised to a power Accuracy, Precision, and ErrorAccuracy how close a measurement to the True valuePrecision series of measurement

Accuracy Correct valuePrecision repeated measurements

ErrorAccepted value: true valueExperimental value: measured in labFormulaError: experimental value accepted value

Percent error: _____error_______ x 100 accepted valueSignificant Figures in MeasurementsInclude all the digits that are known, plus a last digit that is estimated. Measurements must always be reported to the correct number of significant figures because calculated answers often depend on the number of significant figures in the values used in the calculation.

Rules in Significant FigureEvery nonzero digit in a reported measurement is assumed to be significant. Ex. 24.7 meters, 0.743 meters and 714 meters each has 3 significant measurement.Zeros appearing between nonzero digits are significant. Examples 7003 meters and 40.79 metes have 4 s.f.Left zeros appearing in front of nonzero digits are not significant. They are just a placeholder. Ex. 0.000 099 meters has 2 s.f. you will write them as 7.1 x 10 -Rules in Significant FigureZeros at the end of a number and to the right of a decimal point are always significant. Ex. 43.00 meters, 1.010 meters have 4 s.f.Zeros at the right most end of a measurement that lie to the left of an understood decimal point are not significant if they serve as placeholders to show the magnitude of the number. Example 7000 meters and 27210 meters have 1 and 4 s.f respectively.The numbers are all in s.f. if it is exact amount/count for ex. 23 students or 60 mins= 1 hour.Examples of Significant Figures 24.7 74.3 512 meters

7.003 1.505 87.29

0.0071 0.043 0.000 0044

9.000 43.00 1.010

300 7000 27210 Significant Figures in AdditionCalculate the sum of the three measurements. Give the answer to the correct number of significant figures. 12.52 meters + 349.0m + 8.24m Answer: 369.8 or 3.69 x 102 meters Significant Figures in Multiplication2.10 meters x 0.70 meter = 1.47 (meter)2

Answer: 1.47 (meter)2 = 1.5 meters 2Units of Length Basic unit of length or linear measure is meter

METRIC UNITS OF LENGTHKilometer (km)1 km = 103 mLength of 5 city blocksMeter (m)Base unitHeight of doorknob from the floorDecimeter (dm)101 dmDiameter of large orangeCentimeter (cm)102 cmWidth of shirt buttonMillimeter (mm)103 mmThickness of dimeMicrometer (um)106 umDiameter of bacterial cellNanometer (nm)109 nmThickness of RNA moleculeUnits of VolumeVolume is the space occupied by any sample of matter. Unit being use cubic meter (m3)

Metric Units of VolumeUnitRelationshipExampleLiter (L)Base unitQuart of milk = LMilliliter (mL)103 mL + 1 L20 drops of water = 1 mLCubic centimeter (cm3)1 cm3 =1 mLCube of sugar = 1 cm3Microliter (uL)106 uL = 1 LCrystal of table salt = 1uLUnits of MassKilogram (kg) is the basic unit of massPlatform balance to measure mass of an object

Metric Units of MassKilogram (kg) 103 gSmall textbookGram (g)10-3 kgDollar billMilligram (mg)103mg = 1 gTen grains of saltMicrogram (ug)106 ug = 1gParticle of baking powderUnits of Temperature When you hold a glass of hot water the transfer of heat. Almost all substances expand with an increase in temperature and contract as the temperature decreases. (very important exception is water)Celsius was named after to Anders Celsius a Swedish astronomer. Celsius scale sets freezing point of water at 0 degree and the boiling temperature is 100 degree C. Kelvin, named after to Lord Kelvin a Scottish physicist and mathematician freezing point 273.15 and the boiling point 373.15 degree CFormulaF = 9 C + 32 5

C = 5 (F 32) 9

K = C + 273 C= K - 273Sample ProblemsNormal human body temperature is 37 C. What is the temperature in Kelvin?Given: 37 CUnknown: KelvinFormula : K = C + 273Solution: K = 37 C + 273Answer: K= 310 Correct! It lies between 273K up to 373KSample ProblemsConvert 14 F to C and KelvinGiven: 14 FUnknown: C and KelvinFormula: C = 5 (F 32) 9

K = C + 273Solution:Anwers: -10 C and 263 K

Units of Energy Energy is the capacity to do work or to produce heat. Joule (J), named after the English physicist James Prescott Joule and the Calorie (cal) are common units of energy. One calorie is the quantity of heat that raises the temperature of 1 g of pure water by 1 CFormula1J = 0.23901 cal = 4.184 J

Sample ProblemCalculate the quantity of heat in joules required to raise the temperature of 135 g of water from 11 C heat to 41 C.Given : 135 g of water 11 to 41 CFormula: Heat required = mass x specific heat x temperature change1 cal = 4.184 J/ g CSolution: 135g x 4.184 J x (41-11 C) g C = 1.7 x 104 Conversion Factors Are ratio of equivalent measurements. Useful in solving problems in which a given measurement is multiplied by a conversion factor, the numerical value is generally changed, but the actual size of the quantity measured remains the same.Example:I meter = 10 decimeters = 100 centimeters = 1000 millimetersConverting Between UnitsExpress 750 dg to gGiven: mass : 750 dg1g = 10 dg or 1g 10 dgSolution: 750 dg x 1g 10 dg

Answer: 75 gConverting Between UnitsWhat is 0.073 cm in micrometers?Given: 0.073 cm = 7.3 x 10 -2 cm 10 2 = 1 m 1m = 10 6 umUnknown: umFormula: cm meters micrometersSolution: 7.3 x 10 -2 cm x 1 m x 10 6 um 10 2 1m

Answer: 7.3 x 10 2 umDensity Mass per unit volume of a substance Ratio of the mass of an object to its volume. Is an intensive property that depends only on the composition of a substance, not on the size of a sample. Formula: Density = mass volume Corn oil and corn syrup

DensityMaterialDensity at 20C (g/cm3)MaterialDensity at 20CCorn oil0.9222Helium0.166Corn syrup1.35 1.38Oxygen1.33Table sugar1.59Carbon Dioxide1.83Gold19.3Ammonia0.718DensityExample :A copper penny has a mass of 3.1 g and a volume of 0.35 cm 3. What is the density of copper?Given:Mass: 3.1 g volume= 0.35 cm3Unknown: density= ?g/cm3Formula: Density = mass = 3.1 g volume 0.35 cm3 = 8.8571 g/cm3 = 8.9 g/cm3 (rounded off to two significant figures)Density Density of a substance generally decreases as its temperature increaseDemocrituss Atomic PhilosophyAtom is the smallest particle of an element that retains its identity in a chemical reaction.Democritus (460 B.C.-370 B.C.) is a Greek philosopher was among the first to suggest the existence of atom. He believed that atoms were indivisible and indestructible.

Daltons Atomic TheoryAn English chemist and school teacher responsible for the modern process of discovery regarding atoms. By using experimental methods, he transformed Democraticuss ideas on atoms into a scientific theory. All elements are composed of tiny indivisible particles called atoms. Atoms of the same element are identical. Atoms of different elements can physically mix together or can chemically combime in simple whole-number ratios to form compounds. Chemical reactions occur when atoms are separated, joined, or rearranged.

Subatomic ParticlesOne important change in Daltons atomic theory is that atoms are now known to be divisible. They can be broken down into even smaller, more fundamental particles called subatomic.Three kinds of Subatomic Particles: Electrons Protons NeutronsELECTRONS Negatively charged subatomic particles. Thomson performed experiments that involved passing electric current through gases at low pressure. Travels from cathode (-) to anode (+) Thomson examine two ways that a cathode ray can be deflected by using magnet and by using electrically charged plates.

Cont. of Electron A positively charged plate attracts the cathode ray, while negatively charged plate repels it.Thomson knew that opposite charges attract and like charges repel, so he hypothesized that a cathode ray is a stream of negatively charged particles moving at high speed. He called these particles corpuscles, later named electrons. He concluded that electrons must be parts of the atoms of the elements. US physicist Robert Millikan carried out experiments to find the quantity of charged carried by an electron. He is the one responsible for charge and mass.

PROTONS Positively charged subatomic particles. Example is a hydrogen atom (lightest kind of atom) loses an electron, what is left? Eugen Goldstein (1850-1930) a German Physicist observed a cathode-ray-tube and found rays travelling in the direction opposite of that cathode rays. He called that canal rays and concluded that they were composed of positive particles.

NEUTRONS No charge but with a mass nearly equal to that of a proton James Chadwick (1891-1974) an English Physicist confirmed its existence Properties of Subatomic ParticlesParticleSymbolRelativeChargeRelative mass(mass of proton= 1)Actual mass(g)Electrone -1 -1/18409.1 x 10 -28Protonp+1 +11.67 x 10 -24Neutronn o011.67 x 10 -24Ernest Rutherford Atomic Model He concluded that all the positive charge and almost all the mass are concentrated in a small region that has enough positive charge to account. He called this region as Nucleus. He said that a nucleus is a tiny central core of an tom and is composed of proton and neutrons. Rutherford atomic model is known as the nuclear atom. In nuclear atom, the protons and electrons are located in the nucleus. While the Electrons are distributed around the nucleus and occupy almost all of the volume of atom.

ATOMIC NUMBER of an element is the number of protons in the nucleus of an atom of that element. Elements are different because they contain different number of protons.NameSymbolAtomic #ProtonsNeutronMass ## of ElectronsHydrogenH11011HeliumHe22242LithiumLi33473BerylliumBe44594Boron B556115CarbonC666126NitrogenN777147OxygenO888168FluorineF9910199NeonNe1010102010Mass Number Total number of protons and neutrons in an atom Example a helium atom has 2 protons and 2 neutrons so its mass is 4. The number of neutrons in an atom is the difference between the mass number and atomic number. Number of neutron = mass number atomic number

Example Exercise How many protons, electrons and neutrons are in each atom? Atomic number Mass Number

Beryllium (Be) 4 9

Neon (Ne) 10 20

Sodium 11 23Isotopes are atoms that have the same number of protons but different neutrons. Because isotopes of an element have different numbers of neutrons, they also have different mass numbers. Have an identical numbers of protons and electronsThree known isotopes of Hydrogen Hydrogen has a mass number of 1 and is called hydrogen -1 second isotope has one neutron and a mass number of 2 or a hydrogen -2 or deuterium. third isotope has 2 neutrons and a mass number of 3, or hydrogen -3 or tritium. Remember mass number superscript; atomic number subscript

Atomic Mass Unit (AMU)Example is Carbon -12, This isotope of a carbon was assigned a mass exactly of 12 atomic mass units. AMU is defined as one-twelfth of the mass of a carbon -12 atom. Using these units, a helium -4 atom with a mass of 4.0026 amu, has about one-third the mass of a carbon -12. While a nickel -60 atom has about 5 times the mass of a carbon -12 atom. Atomic Mass of an element is a weighted average mass of the atoms in a naturally occurring sample of the element.Natural Percent Abundance of Stable Isotopes of Some Elements NameSymbolNatural Percent AbundanceMass (amu)Average atomic massHydrogenH

H

H99.985

0.015

negligible1.0078

2.0141

3.01601.0079HeliumHe24He20.0001

99.99993.0160

4.00264.0026Example Exercise of AMUCalculate the atomic mass of Helium(To calculate: multiply the mass of each isotope by its natural abundance, express as a decimal, and then add the products.)

AMU of He = (3.0160 x 0.0001) + (4.0026 x 99.999) =More ExampleIsotope = 10 X Mass # = 10.012Relative abundance = 19.91% = 0.1991AMU = ?

Isotope = 11 X Mass # = 11.009Relative abundance = 80.09% = 0.8009AMU = ?

10.012 amu x 0.1991 = 1.993 amu11.009 amu x 0.8009 = 8.817 amu Answer = 10.810 amu

The Periodic Table A Preview An arrangement of elements in which the elements are separated into groups based on a set of repeating properties. Allows you to easily compare the rpoperties of one element (or group of elements) to another element.

Notice that the elements are listed in order of increasing atomic number, from left to right and top to bottom.

Each horizontal row of the periodic table is called a PERIOD.Each vertical row of the periodic table is called a GROUP.