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A
u s t r A l i A nM
At h e M At i c sc
o M p e t i t i o n a n a c t i v i t y o f t h e a u s t r a l i a n m a t h e m a t i c s t r u s tt h u r s d ay
31 J u ly
2 0 0 8
uPPEr PrImarY dIvIsIon comPEtItIon PaPEr
InstructIons and InformatIon
GEnEraL
1. Do not open the booklet until told to do so by your teacher.
2. You may use any teaching aids normally available in your classroom, such as MAB blocks, counters, currency, calculators, play money etc. You are allowed to work on scrap paper and teachers may explain the meaning of words in the paper.
3. Diagrams are NOT drawn to scale. They are intended only as aids.
4. There are 25 multiple-choice questions, each with 5 possible answers given and 5 questions that require a whole number between 0 and 999. The questions generally get harder as you work through the paper. There is no penalty for an incorrect response.
5. This is a competition not a test; do not expect to answer all questions. You are only competing against your own year in your own State or Region so different years doing the same paper are not compared.
6. Read the instructions on the answer sheet carefully. Ensure your name, school name and
school year are filled in. It is your responsibility that the Answer Sheet is correctly coded. 7. When your teacher gives the signal, begin working on the problems.
tHE ansWEr sHEEt
1. Use only lead pencil.
2. Record your answers on the reverse of the Answer Sheet (not on the question paper) by FULLY colouring the circle matching your answer.
3. Your Answer Sheet will be read by a machine. The machine will see all markings even if they are in the wrong places, so please be careful not to doodle or write anything extra on the Answer Sheet. If you want to change an answer or remove any marks, use a plastic eraser and be sure to remove all marks and smudges.
IntEGrItY of tHE comPEtItIon
The AMC reserves the right to re-examine students before deciding whether to grant official status to their score.
a u s t r a l i a n s c h o o l y e a r s 5 , 6 a n d p r i m a r y 7 * t i m e a l l o w e d : 6 0 m i n u t e s
What is the AMC?
The AMC is a mathematics competition containing thirty problems that students can attempt to answer in the time allowed. The students use a special answer sheet that is processed and marked by computer. There are five papers. While each paper is attempted by students from different year levels, each student is assessed only against other students in the same school year and region.
The earliest problems are very easy, then the problems get progressively more difficult until the end when they are challenging to the most gifted student. Students of all standards will progress and find their point of challenge.
We believe this to be the largest event in Australia for which participants pay an entry fee. The AMC has run every year since 1978 and is now a significant international event.
Benefits to Students
The AMC gives students external recognition of their achievements. All students receive a certificate and a detailed report showing how they went on each problem with comparative statistics.
Prizes will be awarded to the top students.
Unlike formal mathematics testing, many of the problems are set in situations to which students can relate, showing the relevance of mathematics to everyday life. Above all, the AMC is designed to be a fun event removed from the pressures of formal assessment with problems designed to be of sufficient interest to stimulate discussion with friends, parents or in the classroom.
Australian Mathematics Trust
The AMT is a national non-profit organisation and its Board includes representatives from the Australian Association of Mathematics Teachers, Australian Academy of Science and Australian Mathematical Society. The AMT administers a number of further mathematical activities such as the Mathematics Challenge for Young Australians and the Australian Mathematical Olympiad.
AMT Publishing
The AMT publishes its own material of national and international significance for those students who seek extra mathematical challenge.
Problems to Solve in Middle School Mathematics, is a collection of problems presented in ready to be
photocopied format for classroom use with students in Years 5 to 8.
A Primary version of AMC (Australian Mathematics Competition for the Westpac Awards) Solutions and Statistics is available for 2004, 2005 and 2006. The 2008 version will be available in early 2009. Each year these books include the questions, full solutions, statistics, information on Australian achievement rates, analyses of the statistics as well as discrimination and difficulty factors for each question. Prize winners are also listed.
These and other titles can be ordered via the internet or by mail.
Contact
Australian Mathematics Competition for the Westpac Awards Australian Mathematics Trust
University of Canberra ACT 2601 Australia Tel: 02 6201 5137 Intl Tel: +61 2 6201 5137 Fax: 02 6201 5052 Intl Fax: +61 2 6201 5052 Email: amc@amt.edu.au Web: www.amt.edu.au/events.html
©amt Publishing 2008 amttlimitedacn 083 950 341
Upper Primary Division
Questions 1 to 10, 3 marks each
1. What is the largest 4-digit number which can be made from a selection of the following number cards if each card may be used only once?
0 1 4 5 8
(A) 4581 (B) 8542 (C) 8541 (D) 5480 (E) 8851
2. What is the number represented on the number line?
0 1 2 3
...
(A) 0.3 (B) 3 (C) 13 (D) 1.03 (E) 1.3
3. If 100 tickets are sold in a class raffle, how many tickets will Matthew have to buy to have a 1
10 chance of winning?
(A) 100 (B) 1 (C) 20 (D) 10 (E) 5
4. A water tank holds 7500 litres when full. How many litres does it hold when it is exactly half full?
(A) 3275 (B) 3500 (C) 4000 (D) 3750 (E) 3725
5. If 1 bottle of water can fill 3 glasses, how many glasses of the same size would be filled with 7 bottles of water?
(A) 21 (B) 24 (C) 14 (D) 18 (E) 25
6. The cost of petrol is 149.9 cents per litre on a Tuesday and 153.5 cents per litre the next morning. What was the increase in cents per litre overnight?
UP 2
7. Jill walked along a two-kilometre track. How far had she walked if she had walked 3
4 of the track?
(A) 112 km (B) 175 metres (C) 300 metres (D) 1750 metres (E) 1.34 km
8. Which of the following shapes could not be formed from a number of equal-sized equilateral triangles?
(A) rhombus (B) trapezium (C) square (D) hexagon (E) parallelogram
9. Jenny has three boxes, each having the same number of toy cars inside. She finds two more cars down the back of the sofa. When she counts all her cars she finds that she has 17. How many cars are there in each box?
(A) 3 (B) 5 (C) 6 (D) 8 (E) 15
10. In the number sentence,
40× 40 = 20 × 20 ×
what number do we put in the to make the number sentence true? (A) 2 (B) 4 (C) 8 (D) 16 (E) 40
Questions 11 to 20, 4 marks each
11. A box holds socks which are all the same size. There are 6 white, 10 blue and 16 grey socks. What is the least number of socks I need to take out, without looking, so that I can be certain of getting a pair of matching socks?
UP 3
12. Kiesha has a fish tank which is the right size for 3 fish. A friend gave her 3 more fish and she needs to get a tank with double the volume. She could do this by buying a new tank which is:
(A) double the width and the length of the old tank (B) double the width, length and depth of the old tank
(C) half the length and double the width and depth of the old tank (D) half the length and double the depth of the old tank
(E) half the length and double the width of the old tank
13. If Joachim has 26 m of garden fencing, how many different ways can he make a rectangular garden, using all the fencing, if each side of his garden is a whole number of metres?
(A) 8 (B) 6 (C) 4 (D) 2 (E) 1
14. At half-time in a soccer match between Newcastle and Melbourne, the score was Newcastle 1, Melbourne 0. Three goals were scored in the second half. Which of the following could not be the result of the match?
(A) The match was drawn (B) Newcastle won by 2 goals (C) Melbourne won by 2 goals (D) Newcastle won by 1 goal
(E) Newcastle won by 4 goals
15. Two 1 litre jugs are each filled with a mixture of olive oil and vinegar. The first jug has three times as much oil as vinegar and the second has four times as much oil as vinegar. They are poured into a larger container. In the new mixture, the volume of oil will be
(A) 750 mL (B) 800 mL (C) 1250 mL (D) 1450 mL (E) 1550 mL
UP 4
16. In a circle dance, everyone is evenly spaced around a circle and has a number in the order 1, 2, 3, 4, 5, . . . , and so on. The dancer with number 15 is directly opposite dancer number 3. How many dancers are in the circle?
(A) 18 (B) 20 (C) 22 (D) 24 (E) 26
17. In the 5 × 5 square below, the numbers 1, 2, 3, 4 and 5 are to be placed in the squares so that each number appears exactly once in each row and once in each column. Some numbers have already been placed. 3 2 2 5 X 1 3 5 1
When the square is completed, the number which is in the square marked with an X is
(A) 1 (B) 2 (C) 3 (D) 4 (E) 5
18. The perimeter of this rectangular paddock is 700 m. It is subdivided into six identical paddocks as shown.
The perimeter, in metres, of each of the six smaller paddocks is
(A) 1161
UP 5
19. You roll three regular 6-sided dice. The product of the numbers rolled is 24. What is the maximum possible sum of three such numbers? (A) 8 (B) 9 (C) 10 (D) 11 (E) 12
20. Which of the following methods would divide seven identical loaves of bread equally between 12 hungry people?
(A) cut 5 into quarters and 2 into thirds (B) cut 3 into thirds and 4 into quarters (C) cut 5 into thirds and 2 into quarters (D) cut 3 into quarters and 4 into thirds (E) cut 5 into halves and 2 into thirds
Questions 21 to 25, 5 marks each
21. Three water pipes can be used to fill a water tank. The first pipe by itself takes 8 hours to fill the tank, the second pipe by itself takes 12 hours to fill the tank and the third pipe by itself takes 24 hours to fill the tank. How long would it take to fill the tank from empty if all pipes were used at the same time?
(A) 2 hrs (B) 3 hrs (C) 6 hrs (D) 5 hrs (E) 4 hrs
22. The average age of the 11 players in the Australian soccer team is 22.
One player got a red card and had to leave the field. Then, the average age of the remaining 10 players on the field was 21. How old was the player with the red card?
UP 6
23. Anne designs the dart board shown, where she scores P points in the centre circle, Q points in the next ring and R points in the outer ring. She throws three darts in each turn. In her first turn, she gets two darts in ring Q and one in ring R and scores 10 points. In her second turn, she gets two in circle P and one in ring R and scores 22 points. ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... .... ... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... ... .... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ...... ...... ...... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... ... ... ... ... ... ... ... ... ... ... ... ...... ...... ... ... ... ... ... ... ... .... .... .... .... .... .... .... .... ... ... ... ... ...... ...P Q R
In her next turn, she gets one dart in each of the regions. How many points does she score?
(A) 12 (B) 13 (C) 15 (D) 16 (E) 18
24. Paradise is a circular island. There are 4 villages on the island at the N, E, S and SE points. Each village has fishing rights for a single continuous strip of coastline, which must include the village plus 3 km either side. If the fishing rights are distributed as evenly as possible between the four villages under the above rules, and the difference between the length of coastline fished by the village at N and the village at SE is as small as possible, then this difference, in kilometres, is
(A) 6 (B) 9 (C) 12 (D) 15 (E) 36
25. A town centre has a series of roads which form a two by two square as shown. On any particular journey from P to Q, I may not drive down the same section of road twice, though I may cross any intersection more than once. How many different jour-neys are there from P to Q? P
Q
UP 7
For questions 26 to 30, shade the answer as a whole number from 0 to 999 in the space provided on the answer sheet. Question 26 is 6 marks, question 27 is 7 marks, question 28 is 8
marks, question 29 is 9 marks and question 30 is 10 marks.
26. What is the largest number less than 1000, which is odd, leaves a remainder of 2 when divided by 3, and a remainder of 4 when divided by 5?
27. A cube with edge length 1 m is cut up into cubes each with edge length 5 cm. If all these cubes were stacked one on top of the other to form a tower, what would be the height, in metres, of this tower?
28. A beetle sets out on a journey. On the first day it crawls 1 m in a straight line. On the second day it makes a right-angled turn (in either direction) and crawls 2 m in a straight line. On the third day it makes a right-angled turn (in either direction) and crawls 3 m in a straight line. This continues each day with the bug making a right-angled turn (in either direction) and crawling 1 m further than it did the day before. What is the least number of days before the beetle could find itself stopped at its starting point?
29. Two identical coins are placed one inside and one outside a thin circular wire, which has twice the diameter of each coin. Each coin is rolled, without slipping, around the wire until it returns to its starting point. If the direction of rotation does not mat-ter, what is the difference, in degrees, be-tween the angle through which the outer coin rotates and the angle through which
the inner coin rotates? ...
... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... .... ... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... ... .... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ... ...... ...... ...... ...... ... ... ... ... ... ... ... ... ... ... ... ... .... .... .... .... .... .... .... .... .... .... .... .... .... .... ... ... ... ... ... ... ... ... ... ... ...... ... ... ... ... ... ... ... ... ... ... ... ... ... .... .... .... .... .... .... .... .... .... .... .... .... .... .... .... ... ... ... ... ... ... ... ... ...... ...... ...
⇑
⇓
UP 8
30. I have a number of bricks which are each 3 units long, 1 unit deep and 1 unit wide. I want to stack them in a tower 3 units wide, 1 unit deep and 10 units high. In how many ways can I do this? (One such way is shown.)