注意 : 允許學生個人 非營利性的圖書館或公立學校合理使用本基金會網站所提供之各項試題及其解答 可直接下載而不須申請 重版 系統地複製或大量重製這些資料的任何部分, 必須獲得財團法人臺北市九章數學教育基金會的授權許可 申請此項授權請電郵 ccmp@seednettw Notice: Individual students, nonprofit libraries, or schools are permitted to make fair use of the papers and its solutions Republication, systematic copying, or multiple reproduction of any part of this material is permitted only under license from the Chiuchang Mathematics Foundation Requests for such permission should be made by e-mailing Mr Wen-Hsien SUN ccmp@seednettw
A u s t r a l i a n M at h e m at i c s C 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 at h e m at i c s t r u s t thursday 2 August 2012 Name junior Division Competition Paper australian School Years 7 and 8 time allowed: 75 minutes Instructions and Information GENERAL 1 Do not open the booklet until told to do so by your teacher 2 NO calculators, slide rules, log tables, maths stencils, mobile phones or other calculating aids are permitted Scribbling paper, graph paper, ruler and compasses are permitted, but are not essential 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 answer 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 entered It is your responsibility to correctly code your answer sheet 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 scanned The optical scanner will attempt to read 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 AMT reserves the right to re-examine students before deciding whether to grant official status to their score AMT Publishing 2012 amtt limited acn 083 950 341
Junior Division 1 The value of 99 2 + 1 + 102 is Questions 1 to 10, 3 marks each (A) 0 (B) 100 (C) 198 (D) 200 (E) 202 2 The size, in degrees, of 6 Q is Q P 55 45 R (A) 40 (B) 55 (C) 60 (D) 80 (E) 90 3 Yesterday it rained continuously from 9:45 am until 3:10 pm For how long did it rain? (A) 3 hours 25 minutes (B) 3 hours 35 minutes (C) 5 hours 25 minutes (D) 6 hours 25 minutes (E) 6 hours 35 minutes 4 The value of 8 31 is (A) 111 (B) 168 (C) 831 (D) 241 (E) 248 5 The change you should receive from a $20 note after paying a bill of $945 is (A) $1055 (B) $1045 (C) $1155 (D) $955 (E) $1065 6 Three-fifths of a number is 48 What is the number? (A) 54 (B) 60 (C) 64 (D) 80 (E) 84 7 Which of the following is closest to 100? (A) 99 + 201 (B) 98 + 3011 (C) 97 + 40111 (D) 101 101 (E) 102 2011
J 2 8 The adjacent sides of the decagon shown meet at right angles and all dimensions are in metres 7 8 16 What is the perimeter, in metres, of this decagon? 8 6 (A) 45 (B) 60 (C) 34 (D) 90 (E) cannot be calculated 9 If 5 9 of the children in a choir are boys and the rest are girls, the ratio of boys to girls is (A) 4 : 9 (B) 4 : 5 (C) 5 : 4 (D) 9 : 4 (E) 5 : 9 10 By what number must 6 be divided to obtain 1 3 as a result? (A) 18 (B) 1 2 (C) 1 18 (D) 2 (E) 9 Questions 11 to 20, 4 marks each 11 In the diagram, the size of three angles are given Find the value of x (A) 90 (B) 95 (C) 100 (D) 110 (E) 120 50 30 x 40 12 A jar of mixed lollies contains 100 g of jellybeans, 30 g of licorice bullets and 20 g of bilby bears Extra bilby bears are added to make the mix 50% bilby bears by weight How many grams of bilby bears are added? (A) 20 (B) 30 (C) 60 (D) 110 (E) 600
J 3 13 A square piece of paper is folded in half The resulting rectangle has a perimeter of 18 cm What is the area, in square centimetres, of the original square? (A) 9 (B) 16 (C) 36 (D) 81 (E) 144 14 If 750 45 = p, then 750 44 equals (A) p 45 (B) p 750 (C) p 1 (D) 44p (E) 750p 15 The grid shown is part of a cross-number puzzle 1 2 3 6 7 2 11 12 13 16 17 20 21 22 What is 7 down? Clues 16 across is the reverse of 2 down 1 down is the sum of 16 across and 2 down 7 down is the sum of the digits in 16 across (A) 11 (B) 12 (C) 13 (D) 14 (E) 15 16 I can ride my bike 3 times as fast as Ted can jog Ted starts 40 minutes before me and then I chase him How long does it take me to catch Ted? (A) 20 min (B) 30 min (C) 40 min (D) 50 min (E) 60 min 17 Five towns are joined by roads, as shown in the diagram P Q R T How many ways are there of travelling from town P to town T if no town can be visited more than once? (A) 3 (B) 5 (C) 6 (D) 7 (E) 9 S
J 4 18 What are the last three digits of 7777 9999? (A) 223 (B) 233 (C) 333 (D) 323 (E) 343 19 In how many ways can 52 be written as the sum of three prime numbers? (A) 1 (B) 2 (C) 3 (D) 4 (E) 5 20 Four points P, Q, R and S are such that P Q = 10, QR = 30, RS = 15 and P S = m If m is an integer and no three of these points lie on a straight line, what is the number of possible values of m? (A) 5 (B) 49 (C) 50 (D) 54 (E) 55 Questions 21 to 25, 5 marks each 21 A courier company has motorbikes that can travel 300 km starting with a full tank Two couriers, Anna and Brian, set off from the depot together to deliver a letter to Connor s house The only refuelling is when they stop for Anna to transfer some fuel from her tank to Brian s tank She then returns to the depot while Brian keeps going, delivers the letter and returns to the depot What is the greatest distance that Connor s house could be from the depot? (A) 180 km (B) 200 km (C) 225 km (D) 250 km (E) 300 km 22 The square P QRS has sides of 3 metres The points X and Y divide P Q into 3 equal parts P X Y Q Z S Find the area, in square metres, of 4XY Z R (A) 3 8 (B) 1 2 (C) 3 16 (D) 1 3 (E) 1 4
J 5 23 The product of three consecutive odd numbers is 226 737 What is the middle number? (A) 57 (B) 59 (C) 61 (D) 63 (E) 65 24 A Meeker number is a 7-digit number of the form pqrstup, where p q = 10r + s and s t = 10u + p and none of the digits are zero For example, 6 742 816 is a Meeker number The value of s in the largest Meeker number is (A) 2 (B) 3 (C) 5 (D) 7 (E) 8 25 Four positive integers are arranged in a 2 2 table For each row and column of the table, the product of the two numbers in this row or column is calculated When all four such products are added together, the result is 1001 What is the largest possible sum of two numbers in the table that are neither in the same row nor in the same column? (A) 33 (B) 77 (C) 91 (D) 143 (E) 500 For questions 26 to 30, shade the answer as an integer 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 This cube has a different whole number on each face, and has the property that whichever pair of opposite faces is chosen, the two numbers multiply to give the same result What is the smallest possible total of all 6 numbers on the cube? 27 How many four-digit numbers containing no zeros have the property that whenever any its four digits is removed, the resulting three-digit number is divisible by 3?
J 6 28 A rhombus-shaped tile is formed by joining two equilateral triangles together Three of these tiles are combined edge to edge to form a variety of shapes as in the example given How many different shapes can be formed? (Shapes which are reflections or rotations of other shapes are not considered different) 29 Warren has a strip of paper 10 metres long He wishes to cut from it as many pieces as possible, not necessarily using all the paper, with each piece of paper a whole number of centimetres long The second piece must be 10 cm longer than the first, the third 10 cm longer than the second and so on What is the length, in centimetres, of the largest possible piece? 30 Terry has invented a new way to extend lists of numbers To Terryfy a list such as [1, 8] he creates two lists [2, 9] and [3, 10] where each term is one more than the corresponding term in the previous list, and then joins the three lists together to give [1, 8, 2, 9, 3, 10] If he starts with a list containing one number [0] and repeatedly Terryfies it he creates the list [0, 1, 2, 1, 2, 3, 2, 3, 4, 1, 2, 3, 2, 3, 4, 3, 4, 5, 2, 3, 4, ] What is the 2012th number in this Terryfic list?