section b instructions for section b · 11 2016 mathmeth exam 2 section b – question 1 –...
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![Page 1: SECTION B Instructions for Section B · 11 2016 MATHMETH EXAM 2 SECTION B – Question 1 – continued TURN OVER Question 1 (11 marks) Let f : [0, 8π] → R, fx x = cos 2 + 2 π](https://reader033.vdocuments.net/reader033/viewer/2022052816/60ac147a46bd384d8b4fb1bc/html5/thumbnails/1.jpg)
11 2016MATHMETHEXAM2
SECTION B – Question 1–continuedTURN OVER
Question 1 (11marks)
Let f :[0,8π]→ R, f xx( ) cos=
+2
2π .
a. Findtheperiodandrangeof f. 2marks
b. Statetheruleforthederivativefunction f ′. 1mark
c. Findtheequationofthetangenttothegraphof f at x=π. 1mark
SECTION B
Instructions for Section BAnswerallquestionsinthespacesprovided.Inallquestionswhereanumericalanswerisrequired,anexactvaluemustbegivenunlessotherwisespecified.Inquestionswheremorethanonemarkisavailable,appropriateworkingmust beshown.Unlessotherwiseindicated,thediagramsinthisbookarenotdrawntoscale.
![Page 2: SECTION B Instructions for Section B · 11 2016 MATHMETH EXAM 2 SECTION B – Question 1 – continued TURN OVER Question 1 (11 marks) Let f : [0, 8π] → R, fx x = cos 2 + 2 π](https://reader033.vdocuments.net/reader033/viewer/2022052816/60ac147a46bd384d8b4fb1bc/html5/thumbnails/2.jpg)
2016MATHMETHEXAM2 12
SECTION B – continued
d. Findtheequationsofthetangentstothegraphof f :[0,8π]→ R, f x x( ) cos=
+2
2π that
haveagradientof1. 2marks
e. Theruleof f ′canbeobtainedfromtheruleof f underatransformationT,suchthat
T R R Txy a
xy b
: ,2 2 1 00
→
=
+
−
π
Findthevalueofaandthevalueofb. 3marks
f. Findthevaluesofx,0≤x≤8π,suchthat f (x)=2f ′(x)+π. 2marks
![Page 3: SECTION B Instructions for Section B · 11 2016 MATHMETH EXAM 2 SECTION B – Question 1 – continued TURN OVER Question 1 (11 marks) Let f : [0, 8π] → R, fx x = cos 2 + 2 π](https://reader033.vdocuments.net/reader033/viewer/2022052816/60ac147a46bd384d8b4fb1bc/html5/thumbnails/3.jpg)
2013MATHMETH(CAS)EXAM2 12
SECTION 2 – Question 1–continued
Question 1 (12marks)Triggthegardenerisworkinginatemperature-controlledgreenhouse.Duringaparticular24-hour
timeinterval,thetemperature(T°C)isgivenbyT(t)=25+2cos π t8
,0≤t≤24,wheretisthe
timeinhoursfromthebeginningofthe24-hourtimeinterval.
a. Statethemaximumtemperatureinthegreenhouseandthevaluesoftwhenthisoccurs. 2marks
b. StatetheperiodofthefunctionT. 1mark
c. FindthesmallestvalueoftforwhichT=26. 2marks
SECTION 2
Instructions for Section 2Answerallquestionsinthespacesprovided.Inallquestionswhereanumericalanswerisrequired,anexactvaluemustbegivenunlessotherwisespecified.Inquestionswheremorethanonemarkisavailable,appropriateworkingmust beshown.Unlessotherwiseindicated,thediagramsinthisbookarenotdrawntoscale.
![Page 4: SECTION B Instructions for Section B · 11 2016 MATHMETH EXAM 2 SECTION B – Question 1 – continued TURN OVER Question 1 (11 marks) Let f : [0, 8π] → R, fx x = cos 2 + 2 π](https://reader033.vdocuments.net/reader033/viewer/2022052816/60ac147a46bd384d8b4fb1bc/html5/thumbnails/4.jpg)
13 2013MATHMETH(CAS)EXAM2
SECTION 2 – Question 1–continuedTURN OVER
d. Forhowmanyhoursduringthe24-hourtimeintervalisT≥26? 2marks
![Page 5: SECTION B Instructions for Section B · 11 2016 MATHMETH EXAM 2 SECTION B – Question 1 – continued TURN OVER Question 1 (11 marks) Let f : [0, 8π] → R, fx x = cos 2 + 2 π](https://reader033.vdocuments.net/reader033/viewer/2022052816/60ac147a46bd384d8b4fb1bc/html5/thumbnails/5.jpg)
2013MATHMETH(CAS)EXAM2 14
SECTION 2 – Question 1–continued
Triggisdesigningagardenthatistobebuiltonflatground.Inhisinitialplans,hedrawsthegraphof y=sin(x)for0≤x≤2πanddecidesthatthegardenbedswillhavetheshapeoftheshadedregions showninthediagrambelow.Heincludesagardenpath,whichisshownaslinesegmentPC.
ThelinethroughpointsP 23
32
π ,
andC(c,0)isatangenttothegraphofy=sin(x)atpointP.
XO
y
xC(c, 0)
1
–1
P 2π3
32
,
2π
e. i. Finddydx
whenx = 23π. 1mark
ii. Showthatthevalueofcis 3 23
+π . 1mark
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15 2013MATHMETH(CAS)EXAM2
SECTION 2–continuedTURN OVER
Infurtherplanningforthegarden,Triggusesatransformationoftheplanedefinedasadilationoffactorkfromthex-axisandadilationoffactormfromthey-axis,wherekandmarepositiverealnumbers.f. LetX′,P′andC′betheimage,underthistransformation,ofthepointsX,PandCrespectively. i. FindthevaluesofkandmifX′P′=10andX′C′=30. 2marks
ii. FindthecoordinatesofthepointP′. 1mark
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2010 MATHMETH(CAS) EXAM 2 16
Question 3An ancient civilisation buried its kings and queens in tombs in the shape of a square-based pyramid, WABCD.The kings and queens were each buried in a pyramid with WA = WB = WC = WD = 10 m.Each of the isosceles triangle faces is congruent to each of the other triangular faces.
The base angle of each of these triangles is x, where 4 2< < .
Pyramid WABCD and a face of the pyramid, WAB, are shown here.
Axx
B A B
D C
Z Z
Y
WW
Z is the midpoint of AB.a. i. Find AB in terms of x.
ii. Find WZ in terms of x.
1 + 1 = 2 marks
b. Show that the total surface area (including the base), S m2, of the pyramid, WABCD, is given by S = 400(cos2 (x) + cos (x) sin (x)).
2 marks
SECTION 2 – Question 3 – continued
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17 2010 MATHMETH(CAS) EXAM 2
c. Find WY, the height of the pyramid WABCD, in terms of x.
2 marks
d. The volume of any pyramid is given by the formula Volume = 13
× area of base × vertical height.
Show that the volume, T m3, of the pyramid WABCD is 4000
324 6cos cosx x .
1 mark
Queen Hepzabah’s pyramid was designed so that it had the maximum possible volume.
e. Find dTdx
and hence find the exact volume of Queen Hepzabah’s pyramid and the corresponding value of x.
4 marks
SECTION 2 – Question 3 – continuedTURN OVER
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2010 MATHMETH(CAS) EXAM 2 18
SECTION 2 – continued
Queen Hepzabah’s daughter, Queen Jepzibah, was also buried in a pyramid. It also had
WA = WB = WC = WD = 10 m.
The volume of Jepzibah’s pyramid is exactly one half of the volume of Queen Hepzabah’s pyramid. The volume of Queen Jepzibah’s pyramid is also given by the formula for T obtained in part d.f. Find the possible values of x, for Jepzibah’s pyramid, correct to two decimal places.
2 marks
Total 13 marks
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2008 MATHMETH(CAS) EXAM 2 22
Question 4The graph of f : (–π, π) ∪ (π, 3π) → R, f (x) = tan
x2
⎛⎝⎜
⎞⎠⎟ is shown below.
x
y
O– 32
a. i. Find f ' π2
⎛⎝⎜
⎞⎠⎟
.
ii. Find the equation of the normal to the graph of y = f (x) at the point where x = π2
.
iii. Sketch the graph of this normal on the axes above. Give the exact axis intercepts.
1 + 2 + 3 = 6 marks
SECTION 2 – Question 4 – continued
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23 2008 MATHMETH(CAS) EXAM 2
b. Find the exact values of x∈ − ∪( , ) ( , )π π π π3 such that f ' (x) = f ' π2
⎛⎝⎜
⎞⎠⎟
.
2 marks
Let g(x) = f (x – a).c. Find the exact value of a ∈ ( –1, 1) such that g(1) = 1.
2 marks
Let h : ( , ) ( , )− ∪π π π π3 → R, h(x) = sin tanx x2 2
2⎛⎝⎜
⎞⎠⎟
+ ⎛⎝⎜
⎞⎠⎟
+ . d. i. Find h' (x).
ii. Solve the equation h' (x) = 0 for x∈ − ∪( , ) ( , )π π π π3 . (Give exact values.)
1 + 2 = 3 marks
SECTION 2 – Question 4 – continuedTURN OVER
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2008 MATHMETH(CAS) EXAM 2 24
e. Sketch the graph of y = h(x) on the axes below.• Give the exact coordinates of any stationary points.• Label each asymptote with its equation.• Give the exact value of the y-intercept.
y
xO
2 marks
Total 15 marks
END OF QUESTION AND ANSWER BOOK