2012 Mathematical Methods (CAS) Written examination 1 · 2016. 8. 7. · Mathematical Methods (CAS)...
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Figures Words STUDENT NUMBER Letter MATHEMATICAL METHODS (CAS) Written examination 1 Wednesday 7 November 2012 Reading time: 9.00 am to 9.15 am (15 minutes) Writing time: 9.15 am to 10.15 am (1 hour) QUESTION AND ANSWER BOOK Structure of book Number of questions Number of questions to be answered Number of marks 10 10 40 • Students are permitted to bring into the examination room: pens, pencils, highlighters, erasers, sharpeners, rulers. • Students are NOT permitted to bring into the examination room: notes of any kind, blank sheets of paper, white out liquid/tape or a calculator of any type. Materials supplied • Question and answer book of 10 pages, with a detachable sheet of miscellaneous formulas in the centrefold. • Working space is provided throughout the book. Instructions • Detach the formula sheet from the centre of this book during reading time. • Write your student number in the space provided above on this page. • All written responses must be in English. Students are NOT permitted to bring mobile phones and/or any other unauthorised electronic devices into the examination room. © VICTORIAN CURRICULUM AND ASSESSMENT AUTHORITY 2012 SUPERVISOR TO ATTACH PROCESSING LABEL HERE Victorian Certificate of Education 2012 Any questions not applicable for Study Design 2016- are marked clearly
Transcript of 2012 Mathematical Methods (CAS) Written examination 1 · 2016. 8. 7. · Mathematical Methods (CAS)...
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Words
STUDENT NUMBER Letter
MATHEMATICAL METHODS (CAS)Written examination 1
Wednesday 7 November 2012Reading time: 9.00 am to 9.15 am (15 minutes) Writing time: 9.15 am to 10.15 am (1 hour)
QUESTION AND ANSWER BOOK
Structure of bookNumber of questions
Number of questions to be answered
Number of marks
10 10 40
• Studentsarepermittedtobringintotheexaminationroom:pens,pencils,highlighters,erasers,sharpeners,rulers.
• StudentsareNOTpermittedtobringintotheexaminationroom:notesofanykind,blanksheetsofpaper,whiteoutliquid/tapeoracalculatorofanytype.
Materials supplied• Questionandanswerbookof10pages,withadetachablesheetofmiscellaneousformulasinthe
centrefold.• Workingspaceisprovidedthroughoutthebook.
Instructions• Detachtheformulasheetfromthecentreofthisbookduringreadingtime.• Writeyourstudent numberinthespaceprovidedaboveonthispage.
• AllwrittenresponsesmustbeinEnglish.
Students are NOT permitted to bring mobile phones and/or any other unauthorised electronic devices into the examination room.
©VICTORIANCURRICULUMANDASSESSMENTAUTHORITY2012
SUPERVISOR TO ATTACH PROCESSING LABEL HEREVictorian Certificate of Education 2012
Any questions not applicable for Study Design 2016- are marked clearly
2012MATHMETH(CAS)EXAM1 2
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3 2012 MATHMETH(CAS) EXAM 1
TURN OVER
Question 1
a. If y = (x2 – 5x)4, find dydx
.
1 mark
b. If f (x) =x
xsin( ), find f ' π
2.
2 marks
InstructionsAnswer all questions in the spaces provided.In all questions where a numerical answer is required an exact value must be given unless otherwise specified.In questions where more than one mark is available, appropriate working must be shown.Unless otherwise indicated, the diagrams in this book are not drawn to scale.
Any questions not applicable for Study Design 2016- are marked clearly
2012MATHMETH(CAS)EXAM1 4
Question 2
Findananti-derivativeof 12 1 3x −( )
withrespecttox.
2marks
Question 3Theruleforfunctionhish(x)=2x3+1.Findtherulefortheinversefunctionh–1.
2marks
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5 2012MATHMETH(CAS)EXAM1
TURN OVER
Question 4Onanygivenday,thenumberXoftelephonecallsthatDanielreceivesisarandomvariablewithprobabilitydistributiongivenby
x 0 1 2 3
Pr(X = x) 0.2 0.2 0.5 0.1
a. FindthemeanofX.
2marks
b. WhatistheprobabilitythatDanielreceivesonlyonetelephonecalloneachofthreeconsecutivedays?
1mark
c. DanielreceivestelephonecallsonbothMondayandTuesday.WhatistheprobabilitythatDanielreceivesatotaloffourcallsoverthesetwodays?
3marks
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2012MATHMETH(CAS)EXAM1 6
Question 5a. Sketchthegraphoff :[0,5]→R, f (x)=–|x–3|+2.Labeltheaxesinterceptsandendpointswiththeir
coordinates.y
x
1
1 2 3 4 5 6 7
–1
–1–2–3–4–5–6–7
–2
–3
–4
–5
–6
–7
2
3
4
5
6
7
O
3marks
b. i. Findthecoordinatesoftheimageofthepoint(3,2)underareflectioninthex-axis,followedbyatranslationof5unitsinthepositivedirectionofthex-axis.
ii. Findtheequationoftheimageofthegraphoffunderareflectioninthex-axis,followedbyatranslationof5unitsinthepositivedirectionofthex-axis.
1+2=3marks
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7 2012MATHMETH(CAS)EXAM1
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Question 6Thegraphsofy=cos(x)andy = asin(x),whereaisarealconstant,haveapointofintersectionat x = π
3.
a. Findthevalueofa.
2marks
b. Ifx ∈[0,2π],findthex-coordinateoftheotherpointofintersectionofthetwographs.
1mark
Question 7Solvetheequation2loge(x+2)–loge(x)=loge(2x+1),wherex>0,forx.
3marks
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2012 MATHMETH(CAS) EXAM 1 8
Question 8a. The random variable X is normally distributed with mean 100 and standard deviation 4.
If Pr(X < 106) = q, find Pr(94 < X < 100) in terms of q.
2 marks
b. The probability density function f of a random variable X is given by
f (x) = x x+
≤ ≤1
124
0
0
otherwise
Find the value of b such that Pr(X ≤ b) = 58
.
3 marks
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9 2012 MATHMETH(CAS) EXAM 1
TURN OVER
Question 9a. Let f : R → R, f (x) = x sin (x).
Find f '(x).
1 mark
b. Use the result of part a. to find the value of x xcos( )π
π
6
2∫ dx in the form aπ + b.
3 marks
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2012MATHMETH(CAS)EXAM1 10
Question 10Let f :R→R, f (x)=e–mx + 3x,wheremisapositiverationalnumber.a. i. Find,intermsofm,thex-coordinateofthestationarypointofthegraphofy = f (x).
ii. Statethevaluesofmsuchthatthex-coordinateofthisstationarypointisapositivenumber.
2+1=3marks
b. Foraparticularvalueofm,thetangenttothegraphofy = f (x)atx=–6passesthroughtheorigin.Findthisvalueofm.
3marks
END OF QUESTION AND ANSWER BOOK
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MATHEMATICAL METHODS (CAS)
Written examinations 1 and 2
FORMULA SHEET
Directions to students
Detach this formula sheet during reading time.
This formula sheet is provided for your reference.
© VICTORIAN CURRICULUM AND ASSESSMENT AUTHORITY 2012
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MATHMETH (CAS) 2
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3 MATHMETH (CAS)
END OF FORMULA SHEET
Mathematical Methods (CAS)Formulas
Mensuration
area of a trapezium: 12a b h+( ) volume of a pyramid:
13Ah
curved surface area of a cylinder: 2π rh volume of a sphere: 43
3π r
volume of a cylinder: π r 2h area of a triangle: 12bc Asin
volume of a cone: 13
2π r h
Calculusddx
x nxn n( ) = −1
x dx
nx c nn n=
++ ≠ −+∫
11
11 ,
ddxe aeax ax( ) = e dx a e cax ax= +∫
1
ddx
x xelog ( )( ) = 1 1x dx x ce= +∫ log
ddx
ax a axsin( ) cos( )( ) = sin( ) cos( )ax dx a ax c= − +∫
1
ddx
ax a axcos( )( ) −= sin( ) cos( ) sin( )ax dx a ax c= +∫
1
ddx
ax aax
a axtan( )( )
( ) ==cos
sec ( )22
product rule: ddxuv u dv
dxv dudx
( ) = + quotient rule: ddx
uv
v dudx
u dvdx
v
=
−
2
chain rule: dydx
dydududx
= approximation: f x h f x h f x+( ) ≈ ( ) + ′( )
ProbabilityPr(A) = 1 – Pr(A′) Pr(A ∪ B) = Pr(A) + Pr(B) – Pr(A ∩ B)
Pr(A|B) = Pr
PrA BB∩( )( ) transition matrices: Sn = Tn × S0
mean: µ = E(X) variance: var(X) = σ 2 = E((X – µ)2) = E(X2) – µ2
Probability distribution Mean Variance
discrete Pr(X = x) = p(x) µ = ∑ x p(x) σ 2 = ∑ (x – µ)2 p(x)
continuous Pr(a < X < b) = f x dxa
b( )∫ µ =
−∞
∞∫ x f x dx( ) σ µ2 2= −
−∞
∞∫ ( ) ( )x f x dx
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