lesson 1: functions
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. . . . . .
Sections1.1–1.2Functions
V63.0121, CalculusI
September10, 2009
Announcements
I SyllabusisonthecommonBlackboardI OfficeHoursTBA
. . . . . .
OutlineWhatisafunction?
Modeling
ExamplesoffunctionsFunctionsexpressedbyformulasFunctionsdescribednumericallyFunctionsdescribedgraphicallyFunctionsdescribedverbally
PropertiesoffunctionsMonotonicity
ClassesofFunctionsLinearfunctionsOtherPolynomialfunctionsOtherpowerfunctionsRationalfunctionsTrigonometricFunctionsExponentialandLogarithmicfunctions
. . . . . .
DefinitionA function f isarelationwhichassignstotoeveryelement x inaset D asingleelement f(x) inaset E.
I Theset D iscalledthe domain of f.I Theset E iscalledthe target of f.I Theset { f(x) | x ∈ D } iscalledthe range of f.
. . . . . .
OutlineWhatisafunction?
Modeling
ExamplesoffunctionsFunctionsexpressedbyformulasFunctionsdescribednumericallyFunctionsdescribedgraphicallyFunctionsdescribedverbally
PropertiesoffunctionsMonotonicity
ClassesofFunctionsLinearfunctionsOtherPolynomialfunctionsOtherpowerfunctionsRationalfunctionsTrigonometricFunctionsExponentialandLogarithmicfunctions
. . . . . .
TheModelingProcess
...Real-worldProblems
..Mathematical
Model
..MathematicalConclusions
..Real-worldPredictions
.model.solve
.interpret
.test
. . . . . .
Plato’sCave
. . . . . .
TheModelingProcess
...Real-worldProblems
..Mathematical
Model
..MathematicalConclusions
..Real-worldPredictions
.model.solve
.interpret
.test
.Shadows .Forms
. . . . . .
OutlineWhatisafunction?
Modeling
ExamplesoffunctionsFunctionsexpressedbyformulasFunctionsdescribednumericallyFunctionsdescribedgraphicallyFunctionsdescribedverbally
PropertiesoffunctionsMonotonicity
ClassesofFunctionsLinearfunctionsOtherPolynomialfunctionsOtherpowerfunctionsRationalfunctionsTrigonometricFunctionsExponentialandLogarithmicfunctions
. . . . . .
Functionsexpressedbyformulas
Anyexpressioninasinglevariable x definesafunction. Inthiscase, thedomainisunderstoodtobethelargestsetof x whichaftersubstitution, givearealnumber.
. . . . . .
Example
Let f(x) =x + 1x− 1
. Findthedomainandrangeof f.
SolutionThedenominatoriszerowhen x = 1, sothedomainisallrealnumbersexceptingone. Asfortherange, wecansolve
y =x + 1x− 1
=⇒ x =y + 1y− 1
Soaslongas y ̸= 1, thereisan x associatedto y.
. . . . . .
Example
Let f(x) =x + 1x− 1
. Findthedomainandrangeof f.
SolutionThedenominatoriszerowhen x = 1, sothedomainisallrealnumbersexceptingone. Asfortherange, wecansolve
y =x + 1x− 1
=⇒ x =y + 1y− 1
Soaslongas y ̸= 1, thereisan x associatedto y.
. . . . . .
No-no’sforexpressions
I CannothavezerointhedenominatorofanexpressionI Cannothaveanegativenumberunderanevenroot(e.g.,squareroot)
I Cannothavethelogarithmofanegativenumber
. . . . . .
Piecewise-definedfunctions
ExampleLet
f(x) =
{x2 0 ≤ x ≤ 1;
3− x 1 < x ≤ 2.
Findthedomainandrangeof f andgraphthefunction.
SolutionThedomainis [0, 2]. Therangeis [0, 2). Thegraphispiecewise.
...0
..1
..2
..1
..2
.
.
.
. . . . . .
Piecewise-definedfunctions
ExampleLet
f(x) =
{x2 0 ≤ x ≤ 1;
3− x 1 < x ≤ 2.
Findthedomainandrangeof f andgraphthefunction.
SolutionThedomainis [0, 2]. Therangeis [0, 2). Thegraphispiecewise.
...0
..1
..2
..1
..2
.
.
.
. . . . . .
Functionsdescribednumerically
Wecanjustdescribeafunctionbyatableofvalues, oradiagram.
. . . . . .
Example
Isthisafunction? Ifso, whatistherange?
x f(x)1 42 53 6
.
. .
..1
..2
..3
. .4
. .5
. .6
Yes, therangeis {4, 5, 6}.
. . . . . .
Example
Isthisafunction? Ifso, whatistherange?
x f(x)1 42 53 6
.
. .
..1
..2
..3
. .4
. .5
. .6
Yes, therangeis {4, 5, 6}.
. . . . . .
Example
Isthisafunction? Ifso, whatistherange?
x f(x)1 42 53 6
.
. .
..1
..2
..3
. .4
. .5
. .6
Yes, therangeis {4, 5, 6}.
. . . . . .
Example
Isthisafunction? Ifso, whatistherange?
x f(x)1 42 43 6
.
. .
..1
..2
..3
. .4
. .5
. .6
Yes, therangeis {4, 6}.
. . . . . .
Example
Isthisafunction? Ifso, whatistherange?
x f(x)1 42 43 6
.
. .
..1
..2
..3
. .4
. .5
. .6
Yes, therangeis {4, 6}.
. . . . . .
Example
Isthisafunction? Ifso, whatistherange?
x f(x)1 42 43 6
.
. .
..1
..2
..3
. .4
. .5
. .6
Yes, therangeis {4, 6}.
. . . . . .
Example
Howaboutthisone?
x f(x)1 41 53 6
.
. .
..1
..2
..3
. .4
. .5
. .6
No, thatone’snot“deterministic.”
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Example
Howaboutthisone?
x f(x)1 41 53 6
.
. .
..1
..2
..3
. .4
. .5
. .6
No, thatone’snot“deterministic.”
. . . . . .
Example
Howaboutthisone?
x f(x)1 41 53 6
.
. .
..1
..2
..3
. .4
. .5
. .6
No, thatone’snot“deterministic.”
. . . . . .
Inscience, functionsareoftendefinedbydata. Or, weobservedataandassumethatit’sclosetosomenicecontinuousfunction.
. . . . . .
Example
HereisthetemperatureinBoise, Idahomeasuredin15-minuteintervalsovertheperiodAugust22–29, 2008.
...8/22
..8/23
..8/24
..8/25
..8/26
..8/27
..8/28
..8/29
..10
..20
..30
..40
..50
..60
..70
..80
..90
..100
. . . . . .
Functionsdescribedgraphically
Sometimesallwehaveisthe“picture”ofafunction, bywhichwemean, itsgraph.
.
.
Theoneontherightisarelationbutnotafunction.
. . . . . .
Functionsdescribedgraphically
Sometimesallwehaveisthe“picture”ofafunction, bywhichwemean, itsgraph.
.
.
Theoneontherightisarelationbutnotafunction.
. . . . . .
Functionsdescribedverbally
Oftentimesourfunctionscomeoutofnatureandhaveverbaldescriptions:
I Thetemperature T(t) inthisroomattime t.I Theelevation h(θ) ofthepointontheequationatlongitude
θ.I Theutility u(x) I derivebyconsuming x burritos.
. . . . . .
OutlineWhatisafunction?
Modeling
ExamplesoffunctionsFunctionsexpressedbyformulasFunctionsdescribednumericallyFunctionsdescribedgraphicallyFunctionsdescribedverbally
PropertiesoffunctionsMonotonicity
ClassesofFunctionsLinearfunctionsOtherPolynomialfunctionsOtherpowerfunctionsRationalfunctionsTrigonometricFunctionsExponentialandLogarithmicfunctions
. . . . . .
Monotonicity
ExampleLet P(x) betheprobabilitythatmyincomewasatleast$x lastyear. Whatmightagraphof P(x) looklike?
.
..1
. . . . . .
Monotonicity
ExampleLet P(x) betheprobabilitythatmyincomewasatleast$x lastyear. Whatmightagraphof P(x) looklike?
.
..1
. . . . . .
Monotonicity
Definition
I A function f is decreasing if f(x1) > f(x2) whenever x1 < x2foranytwopoints x1 and x2 inthedomainof f.
I A function f is increasing if f(x1) < f(x2) whenever x1 < x2foranytwopoints x1 and x2 inthedomainof f.
. . . . . .
Examples
ExampleGoingbacktotheburritofunction, wouldyoucallitincreasing?
ExampleObviously, thetemperatureinBoiseisneitherincreasingnordecreasing.
. . . . . .
Examples
ExampleGoingbacktotheburritofunction, wouldyoucallitincreasing?
ExampleObviously, thetemperatureinBoiseisneitherincreasingnordecreasing.
. . . . . .
OutlineWhatisafunction?
Modeling
ExamplesoffunctionsFunctionsexpressedbyformulasFunctionsdescribednumericallyFunctionsdescribedgraphicallyFunctionsdescribedverbally
PropertiesoffunctionsMonotonicity
ClassesofFunctionsLinearfunctionsOtherPolynomialfunctionsOtherpowerfunctionsRationalfunctionsTrigonometricFunctionsExponentialandLogarithmicfunctions
. . . . . .
ClassesofFunctions
I linearfunctions, definedbyslopeanintercept, pointandpoint, orpointandslope.
I quadraticfunctions, cubicfunctions, powerfunctions,polynomials
I rationalfunctionsI trigonometricfunctionsI exponential/logarithmicfunctions
. . . . . .
Linearfunctions
Linearfunctionshaveaconstantrateofgrowthandareoftheform
f(x) = mx + b.
ExampleInNewYorkCitytaxiscost$2.50togetinand$0.40per 1/5mile. Writethefare f(x) asafunctionofdistance x traveled.
AnswerIf x isinmilesand f(x) indollars,
f(x) = 2.5 + 2x
. . . . . .
Linearfunctions
Linearfunctionshaveaconstantrateofgrowthandareoftheform
f(x) = mx + b.
ExampleInNewYorkCitytaxiscost$2.50togetinand$0.40per 1/5mile. Writethefare f(x) asafunctionofdistance x traveled.
AnswerIf x isinmilesand f(x) indollars,
f(x) = 2.5 + 2x
. . . . . .
Linearfunctions
Linearfunctionshaveaconstantrateofgrowthandareoftheform
f(x) = mx + b.
ExampleInNewYorkCitytaxiscost$2.50togetinand$0.40per 1/5mile. Writethefare f(x) asafunctionofdistance x traveled.
AnswerIf x isinmilesand f(x) indollars,
f(x) = 2.5 + 2x
. . . . . .
OtherPolynomialfunctions
I Quadraticfunctions taketheform
f(x) = ax2 + bx + c
Thegraphisaparabolawhichopensupwardif a > 0,downwardif a < 0.
I Cubicfunctions taketheform
f(x) = ax3 + bx2 + cx + d
. . . . . .
OtherPolynomialfunctions
I Quadraticfunctions taketheform
f(x) = ax2 + bx + c
Thegraphisaparabolawhichopensupwardif a > 0,downwardif a < 0.
I Cubicfunctions taketheform
f(x) = ax3 + bx2 + cx + d
. . . . . .
Otherpowerfunctions
I Wholenumberpowers: f(x) = xn.
I negativepowersarereciprocals: x−3 =1x3.
I fractionalpowersareroots: x1/3 = 3√x.
. . . . . .
Rationalfunctions
DefinitionA rationalfunction isaquotientofpolynomials.
Example
Thefunction f(x) =x3(x + 3)
(x + 2)(x− 1)isrational.
. . . . . .
TrigonometricFunctions
I SineandcosineI TangentandcotangentI Secantandcosecant
. . . . . .
ExponentialandLogarithmicfunctions
I exponentialfunctions(forexample f(x) = 2x)I logarithmicfunctionsaretheirinverses(forexample
f(x) = log2(x))
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