.s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 3 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 4 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 5 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 6 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 7 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 8 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 9 BEATTY SECONDARY SCHOOL MID-YEAR EXAMINATION 2017 SUBJECT: Mathematics LEVEL: PAPER: 2 DURATION: 1 hour 30 minutes SETTER: Mr Alvin Lim DATE: .s g 12 May 2017 NAME: REG NO: ut Additional Materials: Writing paper or CLASS: Sec 1 Express READ THESE INSTRUCTIONS FIRST ile T Write your name, class and index number in the spaces on the top of this page. Write in dark blue or black pen. You may use a pencil for any diagrams or graphs. Do not use staples, paper clips, highlighters, glue or correction fluid. Answer all questions. S m If working is needed for any question, it must be shown with the answer. Omission of essential working will result in loss of marks. You are expected to use a scientific calculator to evaluate explicit numerical expressions. If the degree of accuracy is not specified in the question, and if the answer is not exact, give the answer to three significant figures. Give answers in degrees to one decimal place. For S , use either your calculator value or 3.142, unless the question requires the answer in terms of S . The number of marks is given in brackets [ ] at the end of each question or part question. The total number of marks for this paper is 50. For Examiner’s Use 50 This paper consists of 4 printed pages (including this cover page) Answer all the questions Need a home tutor? Visit smiletutor.sg [Turn over 10 2 1 The numbers A, B and C, written as the products of their prime factors, are given below. A 22 u 34 u 52 B 24 u 36 u 52 C 37 u 52 u 7 Giving your answers in index notation, find [1] (b) the lowest common multiple of A and C, [1] (c) the square root of B. .s g the highest common factor of A and B, [1] or The local time of Rio de Janeiro in Brazil and that of Singapore is GMT 3 and GMT 8 respectively. The World Cup soccer final game is played at 16 00 on 13 July in Rio de Janeiro. Find the local time and date in Singapore when the soccer game is played. (b) It takes 30 hours to travel from Singapore to Rio de Janeiro. Mr Beatty departs from Singapore on 12 July at 17 00 to Rio de Janeiro. Find out if he is in time to watch the soccer game. [2] ut (a) [1] 5 [3] The smallest of three consecutive odd numbers is x. S 4 11 1 of the audience were students, of the remainder 15 4 were parents and the rest were teachers, What fraction were teachers? At the school Sports Day, m 3 ile T 2 (a) (a) Express the sum of the three consecutive odd numbers in terms of x. [1] (b) Find the largest number if the sum is 321. [2] (a) Without using a calculator, express (b) 5 as a recurring decimal. 18 Find the fraction that is exactly halfway between In its simplest form. 4 4 and . Give your answer 5 6 [2] [2] Need a home tutor? Visit smiletutor.sg 11 3 6 The salary of a car salesman with Company A includes a fixed monthly amount of $1 250 and an additional $650 for every car that he sells. Another car sales salesman with Company B does not have a fixed component in his salary and is paid $875 for every car that he sells. In a particular month, both salesmen sold n cars. [1] (b) Express, in terms of n, the monthly salary of the salesman with company B. [1] (c) If both of them sold 6 cars in a particular month, deduce which company’s salary package is more attractive. [3] .s g Express, in terms of n, the monthly salary of the salesman with company A. In the figure, angle ABG such that BG //CD . 39q , angle FED 152q , AC //EF and B is a point on AC or 7 (a) B A ut C G T D E ile F Giving your reasons, find [2] (b) acute angle CDE, [3] (a) A school has both primary and secondary sections. The bell of the primary section goes off every 30 minutes while the bell of the secondary section goes off every 35 minutes. The first bell at both primary and secondary sections goes off at 07 30. m reflex angle ACD, S 8 (a) When will the bells of both schools next go off at the same time? (b) [3] Amy wants to pack 56 apples, 72 bananas and 104 cherries into as many fruit Bags as possible without leaving any fruit unpacked. Every fruit bag must contain the same number of apples, bananas and cherries. Find (i) the greatest number of fruit bags that can be packed, (ii) the number of cherries in each fruit bag. [3] [1] Need a home tutor? Visit smiletutor.sg [Turn over 12 4 Express (b) Simplify 4a 3b 8 ª¬3 a b 2 º¼ . [3] (c) (i) Factorise ax ya . [1] (ii) Hence, without the use of a calculator, find the value of 321u 37 27 u 321 [1] .s g Solve (a) x3 (b) 2 2x 5 (c) 3x x 1 5. 5 3 [3] or 661 4 9 x3 , 3 , 5 x [3] [3] [3] T 10 x4 x x as a single fraction. 6 9 (a) ut 9 S m ile End of Paper Need a home tutor? Visit smiletutor.sg 13 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 14 BEATTY SECONDARY SCHOOL MID-YEAR EXAMINATION 2017 SUBJECT: Mathematics LEVEL: PAPER: 1 DURATION: 1 hour 15 minutes SETTER: Mr Alvin Lim DATE: .s g 11 May 2017 NAME: RE NO REG NO: READ THESE INSTRUCTIONS FIRST or CLASS: Sec 1 Express T ut top page. Write your name, class and index number in the spaces oon n the the tto th op of of tthis hiiiss pa h page ge.. ge Write in dark blue or black pen. You may use a pencil for any diagrams or graphs. Do not use staples, paper clips, highlighters, glue or correct correction c ion fluid. Answer all questions on the question paper. m ile If working is needed for any question, it m must shown with ust be us b sho hown wn w ith it h th tthee answer. Omission of essential working will result marks. resul ultt in lloss osss of m arks ar k. You are expected to use a scientific calculator callcu cula lato torr to eevaluate valu va luat ate explicit numerical expressions. fied ed in n th thee qu ques esti tion on, and if the answer is not exact, give If the degree of accuracy is not specifi specified question, a swer to three significant an sign g ificant figure es. s G ive answers in degrees to one decimal place. iv the answer figures. Give our calculator calc lculator or vvalue alue al ue oorr 3.142, 3 142, unless the question requires the answer in 3. For S , use either yyour terms of S . S The number off m marks arks ar ks iiss gi give given en in bbrackets rackets [ ] at the end of each question or part question. ber ooff m arrks ffor o this paper is 50. or The total numb number marks For Examiner’s Use 50 This paper consists of 7 printed pages (including this cover page). Need a home tutor? Visit smiletutor.sg [Turn over 15 2 For Examiner's Use Answer all the questions. 1 For Examiner's Use Evaluate the following. (a) $11.30 26¢ $2.75 (b) 10 3 8 5 $8.81 [B1] Answer (a) $ ………………… [1] 2 Evaluate .s g 1 [B1] b ……………………… [1] (b) 0.8562 . Give your answer correct to 8.593 13.89 or (a) 3 decimal places, ut (b) 3 significant figures. 0.038 0. 0 .03 38 [B [B1] B1] Answer Answe weer (a) w ((a a) …………………… …… ……… ………… ……… … [1] T The numbers a, b, c and d are represented represe s nt nted on a number numb nu mber er lline. ine. ile 3 0 .03 0381 [B1 B1] B1 0.0381 [B1] (b) …………………… …… ……… ……………… [1] S m < < 2 3.14 14, 3 . It is given tha that at th the he nu numberss ar aree S , 1 , 33.14, 3 Find a, b, c aand nd dd.. 4 2 3 1 3 , c A Answer nswer a ……… , b ……… < < 3.14 ……… , and d S [B2] (2 correct, 1 mark) ……… [2] By writing each number correct to 1 significant place, estimate the value of 59.4 u 0.493 . Show your working clearly. 2.16 59.4 u 0.493 2.16 60 u 0.5 2 15 [M1] [A1] Answer ……………………… [2] Need a home tutor? Visit smiletutor.sg 16 3 For Examiner's Use 5 It is given that x (a) 5y 2 xy 3 , (b) x y . y x 4 and y 2 (a) 5 u 3 4 u 3 3 3 . Evaluate 5 u 9 4 u 27 153 Answer (a) …………………… [1] [B1] b ……………………… [1] (b) Factorise the following. (a) 4m 4n or 6 4 3 3 4 1 2 12 [B1] .s g 4 3 3 4 (b) For Examiner's Use ut (b) 15ax 20ay 10a 4 mn [ 1] Answe wer (a) we (a) …………………… (a …… ……… ………… ……… … [1] Answer 9 2x 5 3. T Solve ile 7 5a…3…… x… 4…………… y 2 [ B1][1] b …… [ ……………………… (b) 9 3 2x 5 9 3 2x 5 [M1] m 9 6 x 15 1 6 x 24 2 4 [A1 [A1] A11] A S x 8 Answer x ………………… [2] (a) The nu nnumber mber of students in Beatty Secondary School is 1300 correct to the nearest hundred. d Write down the least possible number of students in the school. school (b) Without using a calculator, estimate the value of working clearly. (a) 1250 (b) 98 100 | 20.019 20 10 1 20 2 98 . Show your 20.019 [B1] [M1] Answer (a) ……………………… [1] [A1] (b) ……………………… [2] Need a home tutor? Visit smiletutor.sg [Turn over 17 4 For Examiner's Use 9 In the figure, three straight lines intersect at a point. Giving your reasons clearly, find the values of For Examiner's Use (a) x, (b) y. x 52q (vert opp s) [ A1] (b) [M 1] x y 2 y 10q 180q (adj s on a str line) 52q 3 y 10q 180q 3 y 180q 42q 138q [A1] y 46q Answer (a) x …… ………………… ………… ………… [1 [[1]] or .s g (a) (b) b) y Consider the following numbers. List down all the 3 < 1 S 2, 42 , 27, 29, 0.7, 3.21, 1 , 6 2 T 0, ut 10 ………………… … …… …… ………… … [2] ile (a) irrational number(s), (b) composite comp m osite number(s). (c) integer(s) m 0, 42 , 27, 29 [B2] [2] (c) ……………………… S 11 S 2, [B1] 2 Answer (a) …………………… [1] 27, 42 [B1] (b) b ……………………… [1] 3 Express the th he following word statements algebraically in their simplest form. (a) Subtract b. S btract a from the cube c be of b (b) Divide the product of 2c and 3 by the square root of d. (c) Multiply 3f to the sum of 4f and 5f. (a) (b) (c ) b3 a 6c d 3f u 4 f 5f [B1] Answer (a) …………………… [1] [B1] (b) ……………………… [1] [M1] (c) ……………………… [2] Need a home tutor? Visit smiletutor.sg 3 f u9 f 27 f 2 18 5 For Examiner's Use 12 (a) Simplify 2x 1 x . 3 12 For Examiner's Use (b) Expand and simplify 3 2 x 3 4 x 1 . (b) 4 2x 1 x 12 12 8x 4 x 12 12 7x 4 12 3 2x 3 4 x 1 [M1] [A1] .s g 2x 1 x 3 12 (a) 6 x 9 4 x 4 [M1] [A1] or 10 x 13 (b) ((b b) ……………………… …………… …… … …… …… ……… [2] (a) Express 60 and 72 as thee product of their prim prime i e ffactors. T 13 ut Answerr (a) ((a a) …………………… …… … …………… … …… [2] (b) Find the lowest common multiple of 60 and 72. 72 2. which Find the smallest positive ve iinteger nteg nt eger er n fo forr wh whic ichh m (d) ile (c) Write down the smallest po ppositive sitiive v iinteger, nteg ger, m, m, su such ch tthat hat 60m is a perfect square. 60 22 u 3 u 5 60 [B1] [B B1] 1] 72 23 u 32 72 [B1] [[B B1] (b) 23 u 32 u 5 3360 60 [B1] (c ) 3 u 5 15 [B1] (d ) n 32 [B1] S (a) 9 72 is a perfect cube. n Answer (a) 60 ………………… [1] 72 ………………… [1] (b) ……………………… [1] (c) m ………………… [1] (d) n ………………… [1] Need a home tutor? Visit smiletutor.sg [Turn over 19 6 For Examiner's Use 14 The diagram shows a rectangle ABCD with a square PBQR of side x cm removed. It is given that AP 3 cm and QC 4 cm. A 3 P B R Q For Examiner's Use D .s g 4 C S (a) Find, in terms of x, an expression for the area of the rectanglee RQCS. RQCS CS. or rectangle (b) Find, in terms of x, an expression for the area of the rec cta tang ngle le APSD. APSD AP SD. rectangle RQCS. The area of the rectangle APSD is twice the area of the re ect c an ng glle R QCS CS. ut (c) Form an equation in x and solve it. (d) Hence find the area of the rectangle APSD. Area of rectangle RQCS 4u x T (a) (b) S (d ) [A [A1] A1] Area off re rrectangle ccttan a gl gle APSD 3 u 4 x Area S Areea of of the APSD m (c ) ile 4 x cm cm 2 12 3 x ccm m2 [A1] o.e. 2 u Area of RQCS 12 12 3 x 2 u 4 x 12 12 3 x 8 x 5 x 12 x 2.4 [M1] [A1] Area of rectangle APSD 12 3 2.4 19.2 cm [A1] Answer (a) ………………… cm2 [1] (b) ………………… cm2 [1] (c) x ………………… [2] (d) …………………… cm2 [1] Need a home tutor? Visit smiletutor.sg 20 7 For Examiner's Use 15 (a) Construct a triangle ABC such that AC AB has already been drawn. 8 cm and angle ABC 50q . [2] For Examiner's Use (b) Measure and write down the angle BCA. (c) Construct the angle bisector of angle BAC. [1] (d) Construct the perpendicular bisector of AB. [1] The bisectors in (c) and (d) intersect at the point X. ((e)) Label the ppoint X. .s g (f) [1] [ ] Construct a circle with centre X and which passes through A and nd B. B. or (g) Write down the radius of the circle. [1] S m ile T ut Answer (a), (c), (d), (e), (f) B A (b) ………………… q [1] (g) ……………… cm [1] End of Paper Need a home tutor? Visit smiletutor.sg [Turn over 21 6 Paper 2 Solutions 4(a) x x 2 x 4 1(a) HCF 22 u 34 u 52 (b) LCM 22 u 37 u 52 u 7 (c) Square root of B 22 u 33 u 5 [B1] [B1] [B1] (b) 3 x 6 321 3 x 315 Rio io de Janeiro 16 00, 13 July 1600 600 1100 110 2700 0.277 5(a) 18 50 36 T Reached eached Rio de Janeiro at Singapore a time: 2 July at 17 00 + 1day 6h = 13 July 2300 12 OR R Reached eached Rio de Janeiro at Rio de Janeiro time: 13 3 July 2300 – 1100 = 13 July 1200 m ile [A2] A2] ? he is in time to watch the soccer game. [A S Fraction n that were parents 1 1 4 u 4 1155 1 = 15 4 1 Fraction that were teachers 15 15 3 = 15 1 = 5 4 15 [A1] [M1] [M 140 14 40 126 1 12 26 1140 40 40 1126 26 6 14 ut (b) Flight ight time = 30h = 1day 6h = x4 105 4 109 or [A1] ? Singapore 0300, 14July par arents Fractionn that were teachers & parents [M1] .s g 2(a) Time difference = 8+3 = 11 hours 2700 700 2400 0300 1 [B1] x 105 Largest number 3 3x 6 5 1188 < 0.2 0.2 7 [A1] [A §4 4· (b)) ¨ ¸ y 2 (b ©5 6¹ 11 15 [M [M1] [A [A1] 111 [M1] [M1 M ] 15 6(a) $ 1 250 650n [M1] [B1] [B (b) $875n (c) $ 1 250 650 u 6 $875 u 6 $5 250 [B1] [B $5150 Company B, $5 250>$ 5150 [M1] [M1] [A1] [A1] Need a home tutor? Visit smiletutor.sg 22 7(a) BCD 39q corr. s [M1] 7 9(a) Reflex ACD 360q 39q s at a point 321q (b) [A1] B C Z A D G E F raw line ZD // to FE E and CA. Draw [M1] EDZ 180q 152q int s [M1] CDE 28q 39q 28q 67q [A1] [A1] [M1] [M 4a 3b 8 3a 3b 2 a6 [M1] [M [A1] [A (c)(i) ax ya a x y or 39q alt. s [M1] 4a 3b 8 ª¬3 a b 2 º¼ 4a 3b 8 >3a 3b 2@ [B1] [B (ii) 321u 337 227 7 u 321 321 32 321 21 37 27 ut CDZ [M1] .s g (b) x4 x x 6 9 3 u x 4 2 u x 18 x 18 18 18 3x 12 2 x 18 x = 18 12 13 x 18 21u10 =321 =321 2100 =3210 [A [A1] 300 2 u 3 u 5 355 5 u 7 CM 2 u 3 u 5 u 7 LCM 210 [M1] 23 8 (ii) No. of cherries 104 y 8 13 661 6 1 36 4 x3 66 3 625 6 3 [M1] [M1] 125 5 (b) [M1] [M1] [A1 [A 1] [A1] 2 3 2x 5 5 x 2 5 x 3 2x 5 [M2] 10 2 x 6 x 15 8 x 25 8 1 x 3 8 722 23 u 32 HCF x3 x (b)(i) 566 23 u 7 104=2 04=23 u13 661 66 4 9 x3 5x S 077 30 03 30 11 00 x3 125 1 5 x3 12 3h30 min m 10 min 210 ile 8(a) T 10(a) (c) [A1] [A1] [A1] [M1] [M1] [A1] 3x x 1 5 5 3 3 u 3 x 5 x 1 75 [M1] 15 15 15 9 x 5x 5 75 15 15 15 9 x 5 x 5 75 [M1] 4 x 80 xNeed 20 a home tutor? Visit smiletutor.sg [A1] [Turn over 23 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 24 1 Calculator Model: Name: Class Class Register Number .s g Parent’s Signature Writing paper or Additional Materials: 3 May 2017 2 hours ut Mathematics MID – YEAR EXAMINATION 2017 SECONDARY 1 READ THESE INSTRUCTIONS FIRST T Do not open this booklet until you are told to do so. ile Write your name, class and index number on all the work you hand in. Write in dark blue or black pen on both sides of the paper. You may use a pencil for any diagrams, graphs or rough working. Do not use highlighters or correction fluid. Answer all questions in Sections A and B. S m If working is needed for any question it must be shown with the answer. Omission of essential working will result in loss of marks. The use of an approved scientific calculator is expected, where appropriate. If the degree of accuracy is not specified in the question, and if the answer is not exact, give the answer to three significant figures. Give answers in degrees to one decimal place. For S , use either your calculator value or 3.142, unless the question requires the answer in terms of S . At the end of the examination, fasten all your work securely together. The number of marks is given in brackets [ ] at the end of each question or part question. The total number of marks for this paper is 80. Section A : Answer the questions in the space provided. Section B : Answer the questions on the writing paper provided. For Examiner’s Use Section A / 40 Section B Total / 40 / 80 This document consists of 11 printed pages and 1 blank page. Need a home tutor? Visit smiletutor.sg 2017 Mid-Year Examination/S1/Mathematics 113 2 Section A: Answer all the questions. 1 Round 0.999 to 2 significant figures. Answer: ……...….…...........………..…. [1] (b) Write your answer to part (a), correct to 3 significant figures. .s g (a) ut or 2 0.42153 Calculate 3 . Truncate your answer to 6 decimal places. 645 3.5 (b) ….……………..…….….…… [1] ile Find 3 1728 by using prime factorisation. S m 3 T Answer: (a) …..…………..……….....…… [1] Answer: ……...….…...........……….……. [3] Need a home tutor? Visit smiletutor.sg 2017 Mid-Year Examination/S1/Mathematics 114 3 4 (a) Express 90 as a product of its prime factors, giving your answer in index notation. (b) ut or .s g Find the smallest possible value of n such that 90n is a perfect cube. Answer: 90 =…..………………….....…… [1] T ile Consider the following numbers : 5 S 0, 4, 3 27, , 5, . 4 3 (a) Write down the (i) irrational numbers, (ii) positive integers, m 5 n = ….…………..…….….…… [1] S (iii) prime numbers. (b) Represent all the numbers on the number line below. Answer: (a)(i)..…………………………....……….. [1] (a)(ii).................………………………….. [1] (a)(iii)................………………………….. [1] (b) 6 5 4 3 2 1 0 1 2 3 4 5 6 [2] Need a home tutor? Visit smiletutor.sg 2017 Mid-Year Examination/S1/Mathematics 115 4 (a) Express 125 g as a percentage of 5 kg. (b) Find the value of 4.5 % of $8. or .s g 6 ut Answer: (a) …..……………….....…… % [2] (b) $ ….…………..…….….…… [2] 3 Evaluate, without the use of a calculator, ª8 4 º > 2(12 3) y 3@ , showing all ¬ ¼ T 7 S m ile your working clearly. Answer: ……..…............................…….… [3] Need a home tutor? Visit smiletutor.sg 2017 Mid-Year Examination/S1/Mathematics 116 5 Simplify the following (a) x(2 x 3) 7(3x 1) , (b) 5a u (2b) u 3 125a3 . ut or .s g 8 Answer: (a) ..….……….………....……… [2] (b) ..….…………..…………….... [2] (a) 15a 2b 6ac , (2v w)( p 1) 2w( p 1) . S m (b) T Factorise the following expressions ile 9 Answer: (a) ….……….……….....……… [1] (b) ..….………………....……… [2] Need a home tutor? Visit smiletutor.sg 2017 Mid-Year Examination/S1/Mathematics 117 6 Given that a 3 , b 2 and c (a) 2a 3c , (b) ab 2 3a . c 1 , evaluate 2 or .s g 10 ut Answer: (a) ….……………..…………… [2] (b) ..….…………..…......……… [2] A train 320 m long passes through a tunnel 5.2 km long. T 11 ile The average speed of the train is 28 km/h. (a) Convert 28 km/h into m/s. (b) Calculate the time taken for the train to pass completely through the tunnel. S m Give your answer in minutes. Answer: (a) …..…………….......…… m/s [1] (b) ………………..…….….. min [3] Need a home tutor? Visit smiletutor.sg 2017 Mid-Year Examination/S1/Mathematics 118 7 12 A factory produces a type of baking powder made with baking soda, cream of tartar and cornstarch. The amount of baking soda, cream of tartar and cornstarch are in the ratio of 7 : 3 : 4 respectively. (a) In a small bag of baking powder, there are 60g of cornstarch. What is the weight of the baking powder in the small bag? (b) Bags of baking powder are filled at a rate of 180g per second. .s g How many bags of baking powder weighing 1.5 kg each can be filled in S m ile T ut or 3.5 hours? Answer: (a) …..……………….......…… g [2] (b) ……………….…….….. bags [3] End of Section A 2017 Mid-Year Examination/S1/Mathematics 119 Need a home tutor? Visit smiletutor.sg 8 Section B: Answer all the questions. (a) Write down an algebraic expression for each of the following statements. (i) 2 y 3[ x 4( x y)] , (ii) 3n m 2n m . 4 5 [2] If a : b = 5 : 4 and b : c = 4.2 : 0.65 , find a : c. store. What is the original price of the shoes? [2] ile [2] Marcus wants to change 600 Singapore Dollars (S$) to Thai Baht (THB). m 15 [3] Joey paid $28.80 for a pair of shoes after a discount of 25% from a departmental T 14 (i) ut (c) Simplify the following. or (b) [2] Subtract 5x 3 from 3x 2 5 . .s g 13 The exchange rate is S$1 = 24.72 THB. (a) Find the amount of Thai Baht (THB) Marcus will receive if he changes 600 [1] S Singapore Dollars (S$). (b) The money changer is only able to change amounts in multiples of 1000 THB. The money changer decides to round up the amount in (a) to the nearest 1000 THB. Find the amount in S$ that Marcus needs to top up for the extra amount, giving [3] your answer to the nearest cent. Need a home tutor? Visit smiletutor.sg 2017 Mid-Year Examination/S1/Mathematics 120 9 16 One pen costs x cents. An eraser costs 30 cents less than a pen and a ruler costs two-third of a pen. Find a simplified expression for [1] (i) the cost of an eraser in cent, (ii) the total cost of an examination goodie pack consisting of 3 pens, 1 eraser and 1 x, 5 (a) 1 (b) 2(5 y 3) 2 y 14 . ut 1 x 2 or Solve the equations: [2] [2] [2] 18 ile T 17 .s g 2 rulers in cent. Susan cycles from home to a coffeeshop to purchase dinner before continuing the journey to her grandmother’s place. m Susan cycled at a speed of 4 m/s to the coffeeshop for 3 minutes, took another 10 minutes to buy dinner and continued the rest of the journey to her grandmother’s house at a speed of 6 m/s. Given that the total distance travelled is 4500 m, find the distance between Susan’s house and the coffeeshop. [1] (b) Find the average speed for the whole journey in m/s. [3] S (a) Need a home tutor? Visit smiletutor.sg 2017 Mid-Year Examination/S1/Mathematics 121 10 19 (a) Mr Lee was paid a monthly basic salary of $3 850 since January 2015. At the end of 2015, he was given a bonus of 13.5% of the value of sales that he has made during the year. If the total value of his sales in 2015 was $300 000, calculate Mr Lee’s total income in 2015. (b) [2] Mr Lee has to pay income tax in January 2016 for the annual income earned in .s g 2015. The relief amount that will not be subjected to income tax is shown in the table below. Amount Personal relief $1000 or Type of relief Child relief $5000 each child $17 340 Voluntary donation Three times the amount donated ut CPF T Mr Lee has only one child and he has been making voluntary donation of $50 every month to an approved organization. The gross tax payable for the first ile $40 000 is $550 and the tax rate for the rest is 7%. Calculate his income tax payable for 2015 using the information given above. In January 2016, Mr Lee’s basic monthly basic salary was cut by $200. m (c) [3] (i) Calculate the percentage decrease in the basic monthly salary from 2015 S to 2016, giving your answer to three significant figures. (ii) [2] In 2016, he was paid a bonus of 15.5% of the value of his sales that he has made during the year. Given that his bonus in 2016 is $33 790, calculate the total value of his sales in 2016. [2] Need a home tutor? Visit smiletutor.sg 2017 Mid-Year Examination/S1/Mathematics 122 11 20 Kale ordered one set meal at $55.60 and an ice cream for $12.90 at a restaurant. Below shows Kale’s bill before payment. $55.60 Ice cream $12.90 SUBTOTAL $68.50 10% Service Charge $6.85 7% Goods and Services Tax (GST) .s g 1 set meal $5.27 or Currently, the restaurant is offering two discount packages that Kale can choose Discount Package I: ut from. Enjoys 10% off the subtotal of the bill, which is thereafter subjected to 10% Service T Charge first and then 7% GST. ile Discount Package II: There is no service charge and the subtotal is subjected to 7% GST. Explain, showing all necessary working, which discount package is a better option [5] S m for Kale. ~ End of Paper ~ Need a home tutor? Visit smiletutor.sg 2017 Mid-Year Examination/S1/Mathematics 123 12 S m ile T ut or .s g BLANK PAGE Need a home tutor? Visit smiletutor.sg 2017 Mid-Year Examination/S1/Mathematics 124 Calculator Model: Name: Class Class Register Number .s g Parent’s Signature MID – YEAR EXAMINATION 2017 SECONDARY 1 Wednesday, Wedn We dnesda ay, 3 Ma May y 2017 Writing paper 2 hours ut Additional Materials: or Mathematics READ THESE INSTRUCTIONS FIRST Do not open this booklet until you are told to do so. ile T Write your name, class and index number on all the work you hand in. Write in dark blue or black pen on both sides of the paper. You may use a pencil for any diagrams, graph phs s or rough rou ugh g working. working ng. graphs Do not use highlighters or correction fluid. Answer all questions in Sections A and B. S m If working is needed for any question it must musst be b shown sho h wn with witith h the th he answer. Omission of essential working g will result in n lloss oss of marks. os The use of an approved sci scientific cien e ti tifi f c calcul calculator ulat ator or is s ex expe expected, p cted, where appropriate. If the degree of accuracy accurac acyy is not not o specified spe eci cifi fied ed in in the the question, and if the answer is not exact, give the answer to three significant figures. figure es. s Give Giv i e answers an nsw swer e s in degrees deg egrees to one decimal place. For S , use either your calcul calculator ulat ator or vvalue a ue o al orr 3.142, unless the question requires the answer in terms of S . At the end of the ex exam examination, amin inat a ion, n, ffasten aste as t n all your work securely together. The number of mark marks rkss is given givven in brackets [ ] at the end of each question or part question. The total number of ma mark rkss fo fforr this paper is 80. marks Section A : Answer the questions in the space provided. Section B : Answer the questions on the writing paper provided. For Examiner’s Use Section A Section B Total / 40 / 40 / 80 This document consists of 9 printed pages and 1 blank page. Need a home tutor? Visit smiletutor.sg 125 2 Section A: Answer all the questions. 1 Round 0.999 to 2 significant figures. Answer: 1.0 [1] 0.42153 . Truncate your answer to 6 decimal places. 3 645 3.5 (b) Write your answer to part (a), correct to 3 significant figures. 2 0.42153 3 645 3.5 3 0.014568 = 0.0146 (to 3 s.f.) or (b) 0.42153 3 645 3.5 0.014568 (truncated to 6 d.p.) An nsswe w r : (a) (a a) 0.014568 0.01 0145 4568 [1] Answer ut (a) .s g (a) Calculate (b)) 0. (b 0.01 0.0146 0146 [1] 1728 864 432 216 108 54 27 9 3 1 3 26 u 33 1728 3 26 u 33 Answer: 12 [3] S 4 1728 22 u 3 12 m ile 2 2 2 2 2 2 3 3 3 T Find 3 1728 by using prime factorisation. (a) Express Expres esss 90 as as a product of its prime factors, giving your answer index notation. (b) Find thee smallest sma m llest possible value of n such that 90n is a perfect cube. 2 3 3 5 90n n 90 45 15 5 1 90 2 u 32 u 5 23 u 33 u 53 2 2 u 3 u 52 Answer: 90 2 u 32 u 5 [1] n 300 n= 2017 Mid-Year Examination/S1/Mathematics 300 [1] Need a home tutor? Visit smiletutor.sg 126 3 5 Consider the following numbers : 0, 4, 3 27, (a) Write down the 5 S , 5, 4 3 (i) irrational numbers, .s g (ii) positive integers, (iii) prime numbers. (b) Represent all the numbers on the number line below. (b) 6 5 4 T ut or An Answ swer er:: (a)(i) (a)(i (i)) Answer: 3 2 27 0 0 S 4 1 2 4 3 5 3 4 4,, 5 [1] 4 (a)(ii) (a)( )(ii ii)) (a)(iii) (a)( (a )(ii iiii) 4 4,, 5 [1] 5 5 6 [2] (a) Express 125 g as a percentage off 5 kg kg. (b) Find the value of 4.5% of $8.. 125 u u10 100% 10 00% 2.5% % 5000 0 m 6 1 ile 3 5 S [1] , 3 4 (a) 4..5 4.5 $8 $0.36 $0.36 6 u $8 100 10 00 S (b) Answer : (a) 2.5 % [2] (b) $0.36 [2] 2017 Mid-Year Examination/S1/Mathematics Need a home tutor? Visit smiletutor.sg 127 4 7 3 Evaluate, without the use of a calculator, ª8 4 º > 2(12 3) y 3@ , showing all your ¬ ¼ workings clearly. ª8 4 3 º > 2(12 3) y 3@ [8 (64)] [2(15) y 3] ¬ ¼ [8 64] [30 y 3] 56 (10) 56 10 Answer : -46 [3] Simplify x(2 x 3) 7(3x 1) , (a) x(2 (b) 5a u (2b) u 3 125 125a a3 . or 8 .s g 46 (a) x(2 x 3) 7(3x 1) 2 x 2 3x 21x 7 (b) 5a u (2b) u 3 125a3 ut 2 x 2 18 x 7 5a u ( 2b) u ( 5a) T 50a 2b ile 2 Answer A nswer : (a) 2 x 18x 7 [2] (b) 50a 2b [2] m 9 Factorise the following expression expressions ns 2 (a) 15 15a a b 6ac , (b) (2v w))(( p 1 1)) 2w( p 1 1)) . S (a) 15a 2b 6ac 3a((5 5ab 2c) (b) (2v w)( )( p 1) 1) 2w( p 1) 1 ( p 1)(2 1 2v w 2w) ( p 1)(2 1 2v w) Answer : (a) 3a(5ab 2c) [1] (b) (p+1)(2v+w) [2] 2017 Mid-Year Examination/S1/Mathematics Need a home tutor? Visit smiletutor.sg 128 5 10 Given that a 3 , b 2 and c (a) 2a 3c , (b) ab 2 3a . c 1 , evaluate 2 or ut 3(2) 2 3(3) 1 2 12 9 1 2 3u 2 6 ile T ab 2 3a (b) c .s g 1 2(3) 3( ) 2 3 6 2 1 4 or 4.5 2 (a) 2a 3c 1 4 or 4.5 Answer : (a) 2 [2] m (b) 11 6 [2] S A train 320 m long lon passes passe sess th thro through roug ugh h a tunnel 5.2 km long. The average speed of tthe he ttrain rain ra in is 28 km/h. Convert (a) Con nve vert rt 28 8 kkm/h m h in m/ into to m/s. Calculate (b) Calc lcul ulat atee th thee ti time me taken for the train to pass completely through the tunnel. answer Givee yyour our an ou answ swer in minutes. a) 28km 1h 28 u1000m 1u 3600 s 28000m 3600 s 7 7 m/s 9 b) Total length of the tunnel and train = 5.2km + 0.32 km = 5.52 km 2017 Mid-Year Examination/S1/Mathematics Need a home tutor? Visit smiletutor.sg 129 6 5.52 28 69 = h 350 Time taken = Time taken in minutes = 11.8 min (3 s.f) or 11 29 min 35 (b)11.8 or 11 29 min [3] 35 A factory produces a type of baking powder made with with baking soda, sod oda, cream ream of cre tartar and cornstarch. The amount of baking soda, cream of tartar and and cornstarch corn rnst staarch are in the ratio of 7 : 3 : 4 respectively. (a) In a small bag of baking powder, there are 60g of corn nst star arch ch. cornstarch. bag? What is the weight of the baking powder in the smalll b ba ag g?? (b) Bags of baking powder are filled at a rate of 180g 0gg pper eerr ssecond. eco ec on nd d.. 1.5 .5 kkgg each How many bags of baking powder weighing g1 eac ach can ccaan be ffilled ille il led le d in 3.5 hours? ut or 12 7 m/s [1] 9 .s g Answer: (a) 7 60 u14 4 = 210g 0g ile T (a) Weight of baking powder in the small bag = (b) 3.5 hours = 12600sec 0.18 u12600 1.5 = 1512 S m Number of bags gs of 1.5 1.55 kgg each each that tha hatt can be filled in 3.5 hours = Answer: (a) 210 g [2] (b) 1512 bags [3] End of Section A 2017 Mid-Year Examination/S1/Mathematics Need a home tutor? Visit smiletutor.sg 130 7 Section B: Answer all the questions. 13 (a) Write down an algebraic expression for each of the following statements. (i) Subtract 5x 3 from 3x 2 5 . [2] 3x 2 5 (5 x 3) 3x 2 5 5 x 3 (b) Simplify the following: (i) Simplify 2 y 3[ x 4( x y)] . [2] 2 y 3[ x 4( 4 x y )] 2 y 3[ x 4 x 4 y ] 3n m 2 2n nm . 4 5 [3] 5(3 ( n m) 4(2n m) 20 20 15n 5m 8n 4m 20 23n 9m 20 m ile T 3n m 2n m 4 5 ut (ii) or 2 y 3[5 x 4 y ] 2 y 15 x 12 y 15 15 x 14 y .s g 3x 2 5 x 2 (c) If a : b = 5 : 4 an and nd b : c = 4 4.2 0.65 .2 2 : 0 .65 , find a : c. [2] S b : c = 4.2 2: 0 0.65 .65 = 42 420 20 : 665 5 a : b = 5 : 4 b : c = 420 : 65 a : b = 525 : 420 b : c = 420 : 65 a : c = 525 : 65 = 105 : 13 2017 Mid-Year Examination/S1/Mathematics Need a home tutor? Visit smiletutor.sg 131 8 14 Joey paid $28.80 for a pair of shoes from a departmental store. If the store made a [2] loss of 25%, what is the original price of the shoes? Original price of shoes = 100 u $28.80 75 15 .s g = $38.40 Marcus wants to change 600 Singapore Dollars (S$) to Thai Baht (THB). The exchange rate is S$1 = 24.72 THB. Find the amount of Thai Baht Marcus will receive if he uses S S$600. $600 $6 00.. or (a) S$600 = 600 u 24.72 The money changer is only able to change amounts iin n multiples of 10 1000 000 THB. T (b) ut = 14832 THB [[1] 1] [3] THB. ile The money changer decides to round up the amount iin n (a (a) to the nearest 1000 Find the amount in S$ that Marcus needss to top top up for the extra amount, m giving your answer to the nearest cent. nearesst ce cent nt.. Amount that Marcus Marc Ma rcus u needs ds tto o top top up in Thai Baht = 15000 – 14832 S = 168 THB 168 THB B = S$ 6.7971 6.7797 971 1 Amount off S$ that tha hatt Marcus M rcus needs to top up = S$6.80 (rounded to nearest cents) Ma 16 One pen costs x cents. An eraser costs 30 cents less than a pen and a ruler costs two-third of a pen. Find a simplified expression for (a) the cost of an eraser in cents, [1] Cost of an eraser = ( x 30 ) cents 2017 Mid-Year Examination/S1/Mathematics Need a home tutor? Visit smiletutor.sg 132 9 (b) the total cost of an examination goodie pack consisting of 3 pens, 1 eraser and [2] 2 rulers in cents. 2 Total cost of examination goodie pack = 3x ( x 30) 2( x) 3 3 x x 30 4 x 3 Solve the equations: 1 x 2 1 x 5 1 1 x 2 1 x 5 2(5 y 3) 3 2 y 14 14 . m (b) ile 1 1 x x 1 2 5 5 2 x x 1 10 10 3 x 1 10 3 x 10 1 x 3 3 [2] or 1 ut (a) T 17 .s g 16 ( x 30)) cents 3 [2] 2(5 y 3) 3 2 y 1144 S 10 y 6 2 y 1144 8y 8 y 1 18 Susan cycles from home to a coffeeshop to purchase dinner before continuing the journey to her grandmother’s place. Susan cycled at a speed of 4 m/s to the coffeeshop for 3 minutes, took another 10 minutes to buy dinner and continued the rest of the journey to her grandmother’s house at a speed of 6 m/s. Given that the total distance travelled is 4500 m, (a) find the distance between Susan’s house and the coffeeshop. 2017 Mid-Year Examination/S1/Mathematics [1] Need a home tutor? Visit smiletutor.sg 133 10 Distance between coffeeshop and Susan house = 4 u180 = 720 m (b) Find the average speed for the whole journey in m/s. [3] Time taken to travel from Susan to Grandma’s house = 4500 720 6 Average speed for the whole journey = .s g = 630 s 4500 180 630 600 19 (a) 9 m/s 47 or = 3.19 (3 s.f) or 3 Mr Lee was paid a monthly basic salary of $3 850 since sincce Ja JJanuary an nu uar ary 20 2015. 015. [2] ut At the end of 2015, he was given a bonus of 13.5% % ooff tth the he va he vvalue alu lue o off ssales ales al es tthat hatt ha he has made during the year. If the total value of his saless iin n 2015 was was T $300 000, calculate Mr Lee’s total income in 2015. ile § 13.5 · 12) u3 300000 (3850 0 u1 2) ¨ 00 0000 000 ¸ Mr Lee’s total income in 2015 = (3850 10 00 © 100 ¹ = $8 $867 $86700 6700 00 Mr Lee has to pay income tax in Ja Janu January nuaary 20 2016 1 for the annual income earned in [3] m (b) 2015. The reli l ef amount am mou ount tha hatt wi willl not not bbee subjected to income tax is shown in relief that S the table below. w Type off re reli relief lief ef Amount Personal relief rellie ieff $1000 Child relief $5000 each child CPF $17 340 Voluntary donation Three times the amount donated Mr Lee has only one child he has been making voluntary donation of $50 every month to an approved organization. The gross tax payable for the first 2017 Mid-Year Examination/S1/Mathematics Need a home tutor? Visit smiletutor.sg 134 11 $40 000 is $550 and the tax rate for the rest is 7%. Calculate his income tax payable for 2015 using the information given above. Amount of relief = $1000 $5000 $17340 3(50 u12) = $25140 Amount taxable = $86700 $25140 Amount of tax payable = 550 .s g = $61 560 7 (61560 40000) 100 = 550+1509.20 In January 2016, Mr Lee’s basic monthly basic salar salary ary yw wa was as ccu cut ut b by y $$200. 200. 20 Calculate the percentage decrease in the basic m monthly on o nthl thly th ly ssalary alarry fr fro from om 22015 015 01 5 [2] to 2016, giving your answer to three significant figures. 200 u100% 3850 T (i) ut (c) or = $2059.20 Percentage decrease = ile = 5.19 5.1948% 948 4 % m = 5.19 9% (3 (3s.f.)) 5.19% In 2016, 6 he he was w s paid wa id a bonus bon onus us of 15.5% of the value of his sales that he (ii) [2] has made dur during urin ingg th thee ye year year. a . Given that his bonus in 2016 is $33 790, S calc lcul ulat atee th thee to tota tall va vvalue lue of his sales in 2016. calculate total Total value of sales = $33790 u100 15.5 = $218000 2017 Mid-Year Examination/S1/Mathematics Need a home tutor? Visit smiletutor.sg 135 12 20 Kale ordered one set meals at $55.60 and an ice cream for $12.90 at a restaurant. [5] 1 set meal $55.60 Ice cream $12.90 SUBTOTAL $68.50 10% Service Charge $6.85 7% Goods and Services Tax (GST) $5.27 .s g Below shows Kale’s bill before payment. or Currently, the restaurant is offering two discount packages that Kale can can ch choo choose oose se Discount Package I: ut from. Enjoys 10% off the subtotal of the bill, which is thereafter subjected sub ubbjjeect cted ed to 10% 10% Service Serv vic icee ile Discount Package II: T Charge first and then 7% GST. 10% Service Charge is waived, which is thereafter the here reaf after subjected subj su bjec ecte ted d to t 7% GST. Explain, showing all necessary working, g which ch discount dis isco coun untt package is a better option for Kale. m Discount Disc count Package I: S Bill subjected to Service Seerv rvic icee Charge Chhar arge ge aand nd G ST = 90% u $68.50 GST = $61.65. Total amount paid pai aid d in Discount Dissco coun unt Package I = (110% u $61.65) u1.07 = $72.56 Discount Package II: Bill subjected to GST = $68.50 Total amount paid in Discount Package II = $68.50 u1.07 = $73.30 Since amount paid in Package II is more than amount paid in Package I, therefore Package I is a better option for Kale. ~ End of Paper ~ 2017 Mid-Year Examination/S1/Mathematics Need a home tutor? Visit smiletutor.sg 136 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 137 Pasir Ris Secondary School Name Class Register Number SECONDARY 1 EXPRESS .s g MID-YEAR EXAMINATION 2017 MATHEMATICS 03 May 2017 2 hours Additional Materials: Electronic calculator READ THESE INSTRUCTIONS FIRST or 0800 – 1000 ut Wednesday Write your name, class and register number on all the work you hand in. Write in dark blue or black pen. T You may use a pencil for any diagrams or graphs. Do not use staples, paper clips, highlighters, glue or correction fluid. ile Answer all questions. If working is needed for any question it must be shown with the answer. Omission of essential working will result in loss of marks. m You are expected to use a scientific calculator to evaluate explicit numerical expressions. If the degree of accuracy is not specified in the question, and if the answer is not exact, give the answer to three significant figures. Give answers in degrees to one decimal place. S For S , use either your calculator value or 3.142, unless the question requires the answer in terms of S . The number of marks is given in brackets [ ] at the end of each question or part question. This paper consists of 2 sections, Section 1 and Section 2. The marks for each section is 40 marks. The total number of marks for this paper is 80. This document consists of 14 printed pages. [Turn over Need a home tutor? Visit smiletutor.sg Setter: Mr Daniel Chng 225 2 PRSS_2017_MYE_1E_MATH Section 1 [40 marks] For Examiner’s Use Answer all the questions. (a) Rearrange the following numbers, in descending order, on the number line provided. 9, 7 , 22 S, State the number(s) which are irrational. (a) Answer ut or (b) x 3.142 , 3.18 . .s g 1 [1] (b) Write down the first 5 figures of 3 ile 2 (a) T (b) ……………………………….. [1] 26.6 u 19.9 2 . 49.6 529 Use your calculator to evaluate the value of 26.6 u 19.912 , giving your answer 49.63 529.01 m correct to 3 (i) 2 decimal places, S (ii) 1 significant figure. Answer(a) ……...………………………….. [2] (b)(i) ….…………………………….. [1] (ii) ………….……………...…….. [1] Need a home tutor? Visit smiletutor.sg 226 3 For Examiner’s Use x x (a) Express 100 u 0. 4 7 as a recurring decimal. (b) Find the value of 100 u 0. 4 7 0. 4 7 . (c) Hence, express 0. 4 7 as a fraction in its lowest terms. x x x x x x ut or .s g 3 PRSS_2017_MYE_1E_MATH Answer (a) ………...…..……………….. [1] 4 (c) ………...………….………... [1] ile T (b) ………...………….………... [1] Factorise completely (a) 8 x 2 y 20 xy 3 , 2(m 5n) m(m 5n) . S m (b) Answer (a) ………...…..……………….. [1] (b) ………...………….………... [1] Need a home tutor? Visit smiletutor.sg 227 4 In a particular shopping centre, the ground level is indicated by 0 and the basement levels are indicated by 1, 2 and so on. The shopping centre has 4 basement levels. (a) Zhenqi parked her car at Level 2 and took the lift to the highest level. If the lift travelled up by 7 levels, find the highest level of the shopping centre. (b) There are two lifts located at Lift Lobby A of the shopping centre. For every two levels that Lift 1 travels, Lift 2 travels three levels. If Lift 1 is now at the highest level and Lift 2 at the lowest level, find the level that Lift 2 is at when Lift 1 is at Level 1. (b) ………...………….………... [2] (a) 0.068% of a number is 85. Find the number. (b) String P is 3.8 m long. The length of String Q is 135% of the length of String P and 95% of the length of String R. Find the length of String R. S m 6 Answer (a) ………...…..……………….. [1] ile T ut or .s g 5 PRSS_2017_MYE_1E_MATH Answer (a) ………...…..……………….. [1] (b) ………...………….……....m [2] Need a home tutor? Visit smiletutor.sg 228 For Examiner’s Use 5 PRSS_2017_MYE_1E_MATH 1 7 The journey of a motorist from Town A to Town B took him 2 hours. 4 (a) If the motorist travelled at an average speed of 10 m/s, calculate the distance between the two towns in kilometres. or .s g (b) The motorist arrived at 12 10. Calculate the time he left Town A. ut Answer (a) ………...…..………...….km [2] (b) ………...………….……....h [1] 2 g 3h 6 g h . 2 4 S m (b) ile T 8 Simplify (a) 2 xy 3 yz 5 xy 2 yz , Answer (a) ………...…..………...…….. [1] (b) ………...………….……...... [3] Need a home tutor? Visit smiletutor.sg 229 For Examiner’s Use 6 Jazzy has a job for which the basic rate of pay is $C/hour and the overtime rate of pay is $24/hour. On a particular day, she works for 12 hours, of which 4 hours are overtime. (a) Express her pay in terms of C. (b) Find the value of C if she is paid $180 for that day. (c) How many hours of overtime must she work in total in order to earn $660 in a 5-day work week? or .s g 9 PRSS_2017_MYE_1E_MATH ut Answer (a) $..……...…..………...…….. [1] (b) $..……...………….……...... [2] T ile 10 It is given that v Find the value of v when u = 30, a u 2ab 2 . 3 3 and b 2 . S m (c) ………...………….……....h [2] Answer v = ....……...…..………...……[2] Need a home tutor? Visit smiletutor.sg 230 For Examiner’s Use 7 PRSS_2017_MYE_1E_MATH 11 (a) The mass of Xueling, measured to the nearest kg, is 43kg. Find the smallest possible value of Xueling’s mass. or .s g (b) In the number 608R32, R represents a digit. Given that 608R32, correct to three significant figures is 608 000, state the smallest value of the digit R, where R is a prime number. ut Answer (a) ....……...…..……........….kg [1] (b) ....……...………………....... [1] T 12 Eunice, Megan and Shannon planned to contribute money in the ratio 3 : 2 : 4 respectively to buy a present for their friend. The cost of the present is $270. ile (a) Calculate Megan’s contribution. (b) (i) If Eunice doubles her planned contribution and Megan halves her planned contribution, find out how much must Shannon contribute for the present. S m (ii) Hence, write down the new contribution ratio. Answer (a) $..……...…..………...…….. [1] (b)(i)$…......………….……...... [2] (ii)…........:….....….:……..... [2] Need a home tutor? Visit smiletutor.sg 231 For Examiner’s Use 8 PRSS_2017_MYE_1E_MATH 13 The figure below is made up of small rectangles each of length a cm and breadth b cm. Calculate in terms of a and b, the area of the region not enclosed by ABCD. a cm ile T ut or .s g b cm S m Answer ….....……...…….……...….cm2 [2] Need a home tutor? Visit smiletutor.sg 232 For Examiner’s Use 9 PRSS_2017_MYE_1E_MATH Section 2 [40 marks] Answer all the questions. .s g 14 (a) Expand and simplify 3 (4 12 x) . Answer (a) ………...…..………...…….. [2] 0. or 5 2 y 4 3y 1 m ile T ut (b) Solve S (b) ………...…..………...…….. [3] (c) A faulty watch gains x seconds in one hour. Write down an expression for the number of minutes it would gain in y days. Give your answer in its simplest form. (c) ………...…..………...…….. [2] Need a home tutor? Visit smiletutor.sg 233 For Examiner’s Use 10 PRSS_2017_MYE_1E_MATH For Examiner’s Use 15 (a) (i) Solve the inequality, 2(3 x) d 42 2 x . Answer (a)(i)………….….……...…….. [2] or .s g (ii) Hence, write down the smallest value of x that satisfies the inequality 2(3 x) d 42 2 x such that x is a perfect square. (ii) x =…..…………....…….. [1] ut (b) Ms Lau went shopping for groceries at the supermarket. She intends to buy two bottles of juice at $6.15 each, 5 packets of fresh milk at $1.67 each, 2 loaves of bread at $2.49 each and some fruits. S m ile T (i) Estimate the total cost Ms Lau will spend by rounding each of the prices to the nearest ten cents. (b)(i) $….....…..………...…….. [1] (ii) If Ms Lau does not wish to exceed her budget of $30, calculate how much money she should use to buy fruits. (ii) $…….....…..……..…….. [1] Need a home tutor? Visit smiletutor.sg 234 11 PRSS_2017_MYE_1E_MATH 16 (a) (i) It is given that 240 2 4 u 3 u 5 . Express 2750 as a product of its prime factors, giving your answer in index notation. .s g Answer (a)(i)2750 =…..….……...…….. [1] or (ii) Find the smallest positive integer k for which 240k is a multiple of 2750. (ii)…….…...…..……..…….. [1] 3 2750n is a whole number. T ut (iii) Find the smallest positive integer n for which (iii)...….…...…..……..…….. [1] ile (b) Nabilah bought 2 vanguard sheets each measuring 70 cm by 90 cm. She cut out square cards of identical size from the vanguard sheets such that there was no wastage. S m (i) Calculate the largest possible length of the side of each square card that she can cut out. (b)(i)……....…..….……...…cm [2] (ii) Find the total number of square cards she cut out such that there was no wastage. (ii)…….…...…..……..…….. [2] Need a home tutor? Visit smiletutor.sg 235 For Examiner’s Use 12 PRSS_2017_MYE_1E_MATH 17 Hongxiang bought 12 boxes of apples at $60 and each box contains x apples. 15% of the apples were rotten and could not be sold. He would make a profit of 70% if he sells each apple at 50 cents. (a) Find in terms of x, the total number of apples Hongxiang bought. Calculate the total sales made from the apples that could be sold. ut or (b) .s g Answer (a) ....…..………...….......apples[1] (b) $.....…...…..………...…….. [2] T Express the profit, in terms of x, as a percentage of the total amount paid for all 12 boxes of apples, assuming that all the remaining apples are sold. S m ile (c) (d) (c) ………...…..………….…% [2] Hence, find the number of apples per box. (d) ………...…..………..apples [2] Need a home tutor? Visit smiletutor.sg 236 For Examiner’s Use 13 18 In the diagram, ABCD is a rectangular field. AD perimeter of the field ABCD is (24 x 6) m. PRSS_2017_MYE_1E_MATH (5 x 9) m, AE (3 x 12) m, and the (5 x 9) m (3 x 12) m E D B C ile T ut Find an expression in terms of x for (a) (i) the length of AB, or .s g A (ii) the length of DE. 3 AD , show that 11x = 66. 13 (ii) ……….………...…......m [1] S m (b) Given that DE Answer (a)(i) ………..…..……….......m [2] (c) Solve the equation in part (b) to find the value of x. (b) ………..……..……....….......[2] (c) ………..…..….……...….......[1] (d) The shaded region shows the location of a flower bed. Calculate the area of the flower bed. (d) ……...…..………...…......m2 [1] Need a home tutor? Visit smiletutor.sg 237 For Examiner’s Use 14 PRSS_2017_MYE_1E_MATH 19 Mr Ding who is an NSman is married with 2 children and his wife is not working. In 2016, he earned a gross annual income of $85 000. The data for the tax reliefs and the tax rates available are shown in the tables below. Tax Rates $550 7% $3 350 11.5% First $40 000 Next $40 000 First $80 000 Next $40 000 $5 000 T ut or Calculate (a) (i) the amount of tax relief that he is entitled to, .s g Personal Wife Each child CPF contributions Parent/Handicapped parent NSman Reliefs $3 000 $2 000 $4 000 $15 000 $11 000 Answer (a)(i) $.............…..……...….......[2] ile (ii) his amount of taxable income, m (ii) $…….....…..…………… [2] Mr Ding told his wife he needs to pay a total income tax of $3 350. Showing your working clearly, explain why his calculation is wrong. State a possible reason for his error. S (b) (b) …………………………………………………….……….…..………...……..................... ………………………………………………………………………………………………. ……………………………………………………………………………………………[3] END OF PAPER 238 Need a home tutor? Visit smiletutor.sg For Examiner’s Use .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 239 Solutions 1Exp EM 2017 SA1 Paper SECTION 1 (40 marks) 1(a) 2M S 3.142 [B1] 26.6 u 19.9 2 49.6 529 | 2.465861.... [B1/B2] ut 2.47 [B1] 2 [B1] x x x x 100 u 0. 4 7 100 00 u 0.474747... = 47. 4 7 x x x x x x 4M 3M [B1] 100 u 0. 4 7 0. 4 7 = 47.474747… 0.4 0.474747…= .474 4747…= = 447 7 ile 3(c) c) [B1] T 2(b)(i) b)(i) 2(b)(ii) b)(ii) 3(a) a) [B1] or 3 2.4658 3(b) b) 9 3.18 .s g S 1(b) b) 2(a) a) x 7 22 [B [B1] x x 100 u 0. 4 7 0. 4 7 = 47 x x m 4(a) a) 99 u 0. 4 7 = 477 x x 47 47 ? 0. 4 7 99 9 9 S [B1] [B1] 2(m 5n) m(m 5n) (m 5n)((2 m) 5(a) a) 5(b) 2M 8 x 2 y 20 xy 3 4 xyy (2 x 5 y 2 ) 4(b) b) [[B 1] [B1] [B1] 2 + 7 = 5 ?the highest level is Level 5. [B1] Number of levels Lift 1 travels= 5 – (1) = 6 Number of levels Lift 2 travels=(6 y 2)u3 =9 Level Lift 2 is at = 4 + 9 = 5 6(a) 0.068 x 85 100 x 125000 3M [M1] for method to find levels that L1 and L2 will be at. [A1] 3M [B1] Need a home tutor? Visit smiletutor.sg 240 6(b) 7(a) String Q = 135 (3.8) 5.13 m 100 [M1cao] String R = 5.13 (100) 5.40 m 95 [A1] 10m/s = 10 y 1000 u 3600 36 km/h 1 [A1] Therefore distance = 36 u 2 81 km 4 1210 0215 0955 h [B1] 2 xy 3 yz 5 xy 2 yz 7 xy yz [B1] 2 g 3h 6 g h 2 4 2(2 g 3h) 6 g h [M1cao] 4 4 g 6h 6 g h [M1] 4 7h 2 g [A1] 4 $(8C + 96) [B1] 3M 4M 9(a) a) 9(b) b) T 5M ile [A1] 660 y 5 $132 8(10.50) 24(OT ) 132 OT 2 or 2 u 5 10 m 9(c) c) 2(3)(2) 2 v 30 3 22 S 100 [M1] 8C 96 180 8C 84 C $10.50 ut or 7(b) b) 8(a) a) 8(b) b) .s g [M1] to convert m/s to km/s 11(a) 1(a) 11(b) 1(b) 12(a) 2( ) 12(b)(i) 42.5 kg R=2 [M1] [M 1]ca cao o [M1]cao [A A1] [A1] 2M [M1] [M1] tto o sub in values [A1] 2M [B1] [B1] 2 u 270 $60 [B1] 9 3 Eunice’s initial contribution [M1cao] u 270 $90 9 Eunice’s new contribution 90 u 2 $180 1 $30 Megan’s new contribution 60 u 2 ? Shannon’s contribution 270 180 30 $60 [A1] Megan’s contribution 4M Need a home tutor? Visit smiletutor.sg 241 12(b)(ii) 13 New contribution ratio 180 : 30 : 60 6 : 1 : 2 [B1] 2 Area of one small rectangle = ab cm . 2M [M1] There are 12 small rectangles and four half rectangles outside ABCD. ?total area = area of 14 small rectangles = 14ab cm2 14(c) 4(c) multiply [M1] for cross multipl plly [A A1] [A1] [M M1] 1 [M1] ile 1 day – 24 hours y days – 24y 4 hours [M1] T 5 2 0 y 4 3y 1 2 5 y 4 3y 1 5(3 y 1 1)) 2( y 4) 15 y 5 2 y 8 13 y 13 y 1 or [M1]cao [A1] 12 x 1 14(b) 4(b) .s g SECTION 2 (40 marks) 3 (4 12 x) 3 4 12 x ut 14(a) [A1] 1 hour – x seconds 24y 4 hours – 24xy seconds m minutes Therefore number ooff mi m nutess = 2(3 x) d 4 42 2 2x 6 2 x d 42 42 2 x [M1] 4 x d 36 xd9 [A1] S 15(a)(i) 5(a)(i) 24 xy 24xy minutes 60 [A1] Q14 Total Marks: 7 15(a)(ii) 5( )(ii) 15(b)(i) x = 9 [B1] Total cost = 2 u 6.15 + 5 u 1.67 + 2 u 2.49 | 2 u 6.20 + 5 u 1.70 + 2 u 2.50 = 12.40 + 8.50 + 5 = $ 25.90 [B1] 15(b)(ii) Amount of money = 30 – 25.90 = $ 4.10 [B1] 16(a)(i) 2750 Q15 Total Marks: 5 2 u 5 u11 [B1] 3 Need a home tutor? Visit smiletutor.sg 242 16(a)(ii) LCM 2 4 u 3 u 5 3 u 11 Therefore k 5 2 u 11 275 [B1] 16(a)(iii) n 2 2 u 112 484 [B1] 16(b)(i) 70 = 2 u 5 u 7 [M1] to prime factorise both 70 and 90 90 = 2 u 32 u 5 HCF = 2 u 5 = 10 ?largest possible length = 10 cm [A1] Number of cards per sheet = (70 y 10) u (90 y 10) = 63 ?total number of cards = 63 u 2 = 126 Number of apples in the 12 boxes [A1] 12x [B1] Number of remaining apples that could be sold 5.1x 60 u 100 60 $5.1x $5 5..1 .1x [A1] [A 1] [M1] [A1] ile ? $(5.1x – 60) 51 x u 0.5 5 [M1] [M M1] T Profit 51 85 x u 12 x 5 100 ut Total sales made from remaining apples 17(c) 7(c) Q16 Q1 16 Total Total Marks: 7 or 17(a) 7(a) 17(b) 7(b) [[M1]] .s g 16(b)(ii) 5.1x 60 u u100 100 60 5.1x 102 x 20 70 [M M1cao o] [M1cao] m 17(d) 7(d) ?there are 20 20 ap aapples pless iinn a bo box. x [A1] Q17 Total Marks: 7 S 18(a)(i) 8(a)(i) Length AD D + BC = 2(5 x 99)) 10 x 18 24 x 6 10 x 18 Length AB = 2 = 18(a)(ii) 18(b) 14 x 12 2 7x 6 Length DE = 5 x 9 3 x 12 3 DE AD 13 [M1] [A1] 2 x 3 [B1] Need a home tutor? Visit smiletutor.sg 243 3 (5 x 9) 13 15 27 2x 3 x 13 13 11 66 x 13 13 11x 66 2x 3 66 11 6 .s g 18(d) 8(d) 11 x 11 x [A1] [B1] ª 7(6) 6 º Area of 1 small rectangle = « » u [2(6) 3] 108 m ¬ 3 ¼ or 18(c) [M1] Area of flower bed = 6 u 108 648 m2 ut Amount of taxable income = 85000 850000 33 33000 0 = $522 00 000 0 [M1cao] [A1] [M1c [M [M1cao] 1cao ao] [A1] [A A1] 1st $40 000 = $550 m 19(c) 9(c) T 19(b) 9(b) Q19 Q1 19 Total To Marks: 7 15000 Amount of tax relief = 3000 + 2000 + 2(4000) + 150 5 00 + 5000 = $33 000 ile 19(a) 9(a) [B1] S 2nd $40 000, 000 0, 7 u (52000 520000 40000 400000) = 100 $8400 [M1] Therefore, total tota to t l in ta income tax payable = 550 + 840 = $1390 [A1] Possible reason: he assumed his taxable income was the gross annual income. [B1] Q19 Total Marks: 7 Need a home tutor? Visit smiletutor.sg 244 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 245 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 275 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 276 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 277 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 278 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 279 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 280 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 281 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 282 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 283 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 284 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 285 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 286 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 287 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 288 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 289 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 290 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 291 Need a home tutor? Visit smiletutor.sg 292 4 3 2. (b) (a) (b) (c) (a) (c) Qn 1. (a) (b) Ͳ ܣ ǣ ܣǣ ܤǣ ܤǣ ܥെ ʹͲǣ ʹͶǣ ͻ ʹͲǣǣ ʹͶ ʹ ʹͲ ʹͶǣ ʹ ǣͻ ʹͶ ͵ ut ͷǤͷ T ξͳͲͲ ͵ ile ͲǤͷͶͻ ξ ξʹ͵ ͷ ͳͲΨ െ ̈́ͷ͵ͷ ͳΨ െ ̈́ͷ ܲ݁ܿ݅ݎ ܲܶܵܩ݁ݎ݂ܾ݁݁ܿ݅ݎ ܾ݂݁ ܶܵܩ ݁ݎെ ͳͲͲ ൈ ͷ ൌ ̈́ͷͲͲ ̈́ͷͲͲ ʹͶͲ݉ ʹͶͲ ݉ ͳ Ǥ͵ ͳǤ͵݇݉ ݇݉ ʹͶͲǣ ͳ͵ͲͲ ͳʹǣ ͳʹ ͷ ܣǣǣ ܤെ ͷǣ ܣ ͺǣ ͵ െ ܤ ͺǣ ܤǣǣ ܥ ʹ Solution m S LCM CM = ʹଵଵ ൈ ͵ଵ ൈ ͳͳ଼ ݔൌ ͵ଶ ൈ ͳͳ ξʹ െͳͶ HCF CF = ͵ସ ൈ ͳͳ ͵ǡ Ͳ 23 14 , 5 2 Secondary 1 Express ction A Marking Scheme 2017 MYE Section or A1 M1 B1 A1 M1 B1 B1 B1 B2 Marks B1 B1 .s g Guidance Need a home tutor? Visit smiletutor.sg 293 8 7. 6 5 (b) (a) (b) (c) (b) (a) Qn ଷ Rate ate of increase of Temperature = ଵଶ ൌ ʹǤͷιȀ Temperature emperature difference = ͳ͵ െ ሺെͳʹሻ ൌ ʹͷι ʹͷ ܶ݅݉݁ ݊݁݇ܽݐൌ ൌ ͳͲ݄ݏݎ ͳͲ ݄ݏݎ ܶ݅݉݁݊݁݇ܽݐ ʹǤͷ ܶ݅݉݁ ൌ ͳͲͲͲ݄ݏݎ 3p 2 2q q 2 p 10q p 12q a 2b b c 2(c a) ൌ ܽ െ ʹܾ ܾ ܿ െ ʹܿ ʹܽ ൌ ͵ܽ െ ܾ െ ܿ ݔͷ ݔ ͳ ͵ ͵ ݔሺͷ ݔ ͳ ͳሻሻ ൌ ʹ ʹͳ ʹͳ ͵ ݔ ͵ͷݔ ͵ͷ ͷ ݔ ͵ͺ ͵ͺݔ ݔ ൌ ൌ ʹͳ ʹͳ ut T ile 724 = 0.300305... | 0.300 (3 s.f.) 3.2 (8.24 5.32) Temp emp Difference = ͳͺ െ ሺെͳʹሻ ൌ ͵Ͳι 2 3 m Solution ͳ͵ݏݐ݅݊ݑ ͳ͵ ݏݐ݅݊ݑെ ݏݐ݊ܽݏݏ݅ݎܥ ͳͲ ݏݐ݅݊ݑെ ݐ݅ݑݎܨ ܶܽݏݐݎ ͳͲݏݐ݅݊ݑ ݏݐݎܽܶݐ݅ݑݎܨ ʹ͵ ݏݐ݅݊ݑെ ͷͷ ʹ͵ݏݐ݅݊ݑ ͳ ݐ݅݊ݑൌ ʹͷ ͳݐ݅݊ݑ ݏݐ݊ܽݏݏ݅ݎܥ ݂ൌ ʹͷ ൈ ͳ͵ ൌ ͵ʹͷ ܰǤ ݏݐ݊ܽݏݏ݅ݎܥ݂ ݏݐݎܽݐ ݐ݅ݑݎܨ ݂ൌ ʹͷ ൈ ͳͲ ൌ ʹͷͲ ܰǤ ݏݐݎܽݐݐ݅ݑݎܨ݂ S Secondary 1 Express ction A Marking Scheme 2017 MYE Section or M1A1 M1 M1 A1 B1 B B1 B1 B1 B 1 B1 B 1 B11 B 1 B1 Marks .s g Guidance Need a home tutor? Visit smiletutor.sg 294 12 11 10 (a) (b) (bii) (bi) (a) (b) Qn 9 (a) ut T ile m ଵ ͳ ʹʹ ݏݐ݊ܽݎ݀ܽݑݍ݂ܽ݁ݎܣ ܽ݁ݎܣ ݏݏݐ݊ܽݎ݀ܽݑݍ ݂ൌ ʹ ൈ ൈ ଶ ൈ ൌ ଶ Ͷ ݄ܵܽ݀݁݀ ݀ ܽ݁ݎܣ ݁ܽ ൌ ͻͺ ͺ െ ൌ ʹͳ ݄ܵܽ݀݁݀ܽ݁ݎܣ ʹͳ ଶ Volume olume of container = ͳͲͲ ൈ ͷͲ ൈ ͷͲ ൌ ʹͷ ʹͷͲͲ ʹͷͲͲͲͲ ͲͲͲͲ ଷ No. o. of containers that ccan an n ffit it int into ntoo tr truck ruckk ଶ ଷ = ଵ ൈ ହ ൈ ହ ൌ ͳͶ ͳͶͶ ͶͶ Area rea of rectangle = ൈ ͳͶ ൌ ͻͺ ͻͺ ଶ ݁ܿ݊݁ܪǡ ݄݁ݏ ͵͵݈݈݁ݏݐݏݑ݄݉݁ݏͶݐݏ݈ܽ݁ݐܽݏ݈݄݁݁ݓ݊݅Ǥ ݉͵͵ ݈݈݁ݏ ݐݏݑͶ ݏ݈݄݁݁ݓ݊݅ ݈ ܽݏ݈ܽ݁݁ ݐ ܽݐݐݏǤ ̈́ହ How ow many pinwheels to sell seell = ̈́Ǥଵହ ൌ ͵͵͵ ଷ Profit ofit made = ̈́ͲǤͷͲ െ ̈́ͲǤ͵ͷ ൌ ̈́ͲǤͳͷ Solution ͷ ܽ ൌ ͳǤͷ ൊ ൌ ͳǤͺ ͳǤͺȀ Ȁ ܾ ൌ ͲǤͷ݄ ݏݎൈ ʹͷ ൌ ͳʹǤͷ ͳʹǤͷ ܿ ൌ ͺ ൊ ͳͲ ൌ ͲǤͺ݄ݏݎ ͳǤͷ ͳʹǤͷ ͺ ʹʹ ᇱ ൌ ൌ ൎ ͳͲǤ͵ ͳͲǤ͵Ȁሺ͵ݏǤ Ȁ ሺ͵ݏǤ ݂Ǥ ሻ ʹ ͷ ʹ ͲǤͷ ͲǤͺ ͳͷ ͳͲ ݎ݂݁ܽ݁݊ݐݏܥ ݐݏܥ ݎ݁ܽ ݁݊ ݂ൌ ൌ ̈́ͲǤʹͲ ͷͲ ͷ ݂݊݅݁݊ݐݏܥ ݊݅ ݁݊ ݂ ݐݏܥൌ ൌ ̈́ͲǤͲͷ ͳͲͲ ͷ ݐݏܥ ݓܽݎݐݏ ܿ݅ݐݏ݈ܽ ݁݊ ݂ൌ ൌ ̈́ͲǤͳͲ ݓܽݎݐݏܿ݅ݐݏ݈݂ܽ݁݊ݐݏܥ ͷͲ ݁ܿ݊݁ܪǡ ݈݄݁݁ݓ݊݅ͳ݂ݐݏ݈ܿܽݐݐ ݈݄݁݁ݓ݊݅ ͳ ݂ ݐݏܿ ݈ܽݐݐൌ ̈́ͲǤʹͲ ̈́ͲǤͲͷ ̈́ͲǤͳͲ ൌ ̈́ͲǤ͵ͷ ͷ S Secondary 1 Express ction A Marking Scheme 2017 MYE Section M1A1 B1 M1A1 M1 Guidance .s g Students need to show rounded rounde answer Don’t accept 15 cents Don’t Don’ Do n’t accept 35 cents – 1 mark mar for working or B1 B1 M1A1 B1 Marks B1 B1 B1 Need a home tutor? Visit smiletutor.sg 295 4 3 2. ݎ݁ݒݐ݂݈݁ݐ݊ݑ݉ܣ ݐ݊ݑ݉ܣ ݈݂݁ݒݐ ݎ݁ݒൌ ̈́ͻͺͳͲͳ െ ̈́ʹͷͲͲͲ ൌ ̈́ ̈́͵ͳͲͳ ͵ͳͲ ͵ ͳͲͳ ܶ݀݁ݎݎݑܿ݊݅ݐݏ݁ݎ݁ݐ݈݊݅ܽݐ ܶ ݀݁ݎݎݑܿ݊݅ ݐݏ݁ݎ݁ݐ݊݅ ݈ܽݐൌ ሺʹǤͷΨ ൈ ͵ͳͲͳሻ ൈ ͷ ൌ ̈́ͻͳ͵Ǥʹͷ ̈́ͻͳ ͻͳ͵ ͵Ǥʹ ʹͷ ͷ ̈́͵ͳͲͳ ͻͳ͵Ǥʹͷ ݐ݈݊݁݉ܽݐݏ݊ܫ ݕ݈݄ݐ݊ܯൌ ൌ ̈́ͳ͵ͲǤͶ ̈́ͳ͵ ͳ͵Ͳ ǤͶ ൎ ̈́ ̈́ͳ͵ͳ ͳ͵ͳ ͳ͵ ͳ ݐ݈݊݁݉ܽݐݏ݊ܫݕ݈݄ݐ݊ܯ Ͳ (b) (d) (a) (b) (c) Sister’s ster’s age ge = x 12 Father’s ther’s ageൌ ʹሺ ݔ ͳʹሻ ൌ ʹ ݔ ʹͶ Sum um of agesൌ ݔ ݔ ͳʹ ʹሺݔ ʹሺ ݔ ͳʹሻ ͳʹ ʹሻ ൌ Ͷݔ Ͷ ݔ ͵ Erica’s ica’s age = 12, let ݔൌ ͳʹǡ ͳʹǡ ݎ݄݁ݐܽܨ ݐܽܨ ܽܨ ݎݎ݄݁ݐᇱ ݁݃ܽݏݏ ܽ݃݁݁ ൌ ʹሺͳʹሻ ܽ݃ ʹሺͳʹሻ ʹͶ ൌ Ͷͺ݈݀ݏݎܽ݁ݕ Ͷͺ ͺ ݁ݕ ݈݀ ݏݎܽ݁ݕ ݀݁݊ݎܽ݁݊݅ݏݏ݅݉݉ܥ ݊݅ݏݏ݅݉݉ܥ ݁ܽ ݀݁݊ݎൌ ̈́ͶͺͲͲͲ ൈ ͵Ψ Ψൌ̈́ ̈́ͳͶͶͲ ͳͶͶͲ ͳͶ ͶͲ ݈݈ܵ݁݅݊݃ݖݖܽܬ݂݁ܿ݅ݎሺܧܱܥݐݑ݄ݐ݅ݓሻ ݈݈ܵ݁݅݊݃ ݖݖܽܬ ݂ ݁ܿ݅ݎሺܧܱܥ ݐݑ݄ݐ݅ݓሻ ൌ ͻͺͳͲͳ െ ͷͲͳͲͳ ͳ ൌ ̈́ͶͺͲͲͲ ܯܥܮൌ ʹଶ ൈ ͵ ൈ ͷ ൈ ൌ ͶʹͲݏݎܽ݁ݕ ͶʹͲ ݏݎܽ݁ݕ ݁ܿ݊݁ܪǡ ͵ʹݎܽ݁ݕ݄݁ݐ݈݈݅ݓ݈݊݃݅ܽݏݐ݈݄݁݊ܽ݁ݐ݁݉݅ݐݐݔ݄݁݊݁ݐͷʹ ݁ݕ ݄݁ݐ ݈݈݅ݓ ݈݊݃݅ܽ ݏݐ݈݁݊ܽ ݄݁ݐ ݁݉݅ݐ ݐݔ݁݊ ݄݁ݐ ͵ʹ ݎܽ ݕͷʹ (a) M1A1 A1 B1 B1 M1 A1 M1 M A1 A M1 A1 M1 M1 .s g Guidance Accept either answer or B1 B 1 B1 B 1 B1 B 1 B1 B1 Marks B1 B1 B1 ut T ile m S Solution ݁ܿ݊݁ܪǡ ݁݊ܿ݁ǡ ݉ܿʹͳݏܾ݅݁ݑ݄݂݄ܿܿܽ݁ݐ݈݃݊݁ݐݏ݁݃ݎ݈݄ܽ݁ݐ. ݉ܿ ʹͳ ݏ݅ ܾ݁ݑܿ ݄ܿܽ݁ ݂ ݄ݐ݈݃݊݁ ݐݏ݁݃ݎ݈ܽ ݄݁ݐ. ͻ͵ ʹͷʹ ͳ͵ʹ ܶݐݑܾܿ݁݊ܽܿݏܾ݁ݑ݂ܿݎܾ݁݉ݑ݈݊ܽݐ ݐݑܿ ܾ݁ ݊ܽܿ ݏܾ݁ݑܿ ݂ ݎܾ݁݉ݑ݊ ݈ܽݐൌ ൈ ൈ ͳʹ ͳʹ ͳʹ ൌ ͳͺͲͳͺܿݏܾ݁ݑ ͳͺͲͳͺ ܿݏܾ݁ݑ ͳʹ ൌ ʹଶ ൈ ͵ ͵Ͳ ൌ ʹ ൈ ͵ ൈ ͷ ͺͶ ൌ ʹଶ ൈ ͵ ൈ ଶ ͻ͵ ͵ ൌ ʹ ൈ ͵ ൈ ͳ͵ ଶ ଶ ͷʹ ൌ ʹ ൈ ͵ ൈ ʹͷʹ ͵ʹ ൌ ʹଶ ൈ ͵ ͵ ͳ͵ʹ ൈ ͳͳ ଶ ൌ ʹ ൈ ͵ ൌ ͳʹ ͳʹ ଷ (b) (a) (c) (b) Qn 1. (a) Secondary 1 Express ction B Marking Scheme 2017 MYE Section Need a home tutor? Visit smiletutor.sg 296 8 7 6 (b) (a) (b) (a) (b) (a) (b) Qn 5 (a) T ile m M1A1 M1 M 1A1 A1 A1 A1 M1 M1A1 Marks A1 M1 M1A1 M1A1 or A A1 M1 A1 M1 ut Solution ͷݏݐ݅݊ݑ ͷ ݏݐ݅݊ݑെ ʹͲͲ ʹͲͲ ͳ ݐ݅݊ݑെ ͶͲ ͳݐ݅݊ݑ ݀݁݀݁݁݊ ݈݇݅ܯൌ ͵ ൈ ͶͲ ൌ ͳʹͲ ͳʹͲ ݈݀݁݀݁݁݊݇݅ܯ ʹͲ݉݀݁݁݊ݏ݂݂݊݅ݑͶͲͲ݈݉ݎݑ݈݂݂ ʹͲ ݉ ݀݁݁݊ ݏ݂݂݊݅ݑͶͲͲ ݈݉ ݎݑ݈݂ ݂ ͶͲͲ ݁ܿ݊݁ܪǡ ͷͲ݉݀݁݁݊ݏ݂݂݊݅ݑ ͷͲ ݉ ݀݁݁݊ ݏ݂݂݊݅ݑൌ ൈ ͷͲ ൌ ͳͲͲͲ ͳͲͲͲ݈݉ݎݑ݈݂݂Ǥ ݈݉ ݎݑ݈݂ ݂Ǥ ʹͲ ͳͲͲͲ ݎܨ ͳͲͲͲ ݈݉ ݎݑ݈݂ ݂ǡ ݈݉݅݇ ݊݁݁݀݁݀ ൌ ൈ ͵ ൌ ͲͲ݈݉ ͲͲ ݈݉ ݎݑ݈݂݂݈݉ͲͲͲͳݎܨǡ ݈݉݅݇݊݁݁݀݁݀ ͷ Selling lling price of the vacuum cleaner for Shop A ͺͷ ͻͲ ൌ ̈́ͺͲͲ ൈ ൈ ൌ ̈́ͳʹ ͳͲͲ ͳͲͲ Selling lling price of VC for Shop B ͷ ൌ ̈́ͺͲͲ ൈ ൌ ̈́ͲͲ ͳͲͲ Since nce Shop B is cheaper, Mr Sim should buy from Shop B. Since nce S$1 to 0.71 USD ̈́͵ͲͲ ൌ ͵ͲͲ ൈ ͲǤͳ ൌ ʹͷͷ ʹͷͷ ence, Mr Sim got ʹͷͷ Ǥ Hence, ʹͷͷǤ ݎ݁ݒݐ݂݁ܮൌ ͺͲͲܷܵܦ ͺͲͲ ͺͲ Ͳ ݁ܿ݊݁ܪǡ ܾܽ݉݇ܿܽݐ݄݃݁ܦܩ݂ܵݐ݊ݑ ܽ݉ ܾ݇ܿܽ ݐ݃ ݄݁ ܦܩܵ ݂ ݐ݊ݑൌ ൌ ܵ̈́ͳͳʹ ܵ̈́ͳͳ ͳͳʹ ʹ Ͳ Ǥͳ ͳ ͲǤͳ Total otal intere interest rest accumulated ͲͲͲ ൈ ͺǤͷΨ ൈ Ͷ ൌ ̈́ͶͲͺͲ ͳʹͲͲͲ mount he have to pay back k ൌ ̈́ͳʹͲͲͲ ̈́ͳʹ ͳ ͲͲͲ ̈́ ͶͲͺͲ ͶͲ ͺͲ ൌ ̈́ ̈́ͳͲͺͲ Amount ̈́ͶͲͺͲ ̈́̈́ͳͲͺͲ ݐ݊݁݉ݐݏ݁ݒ݊ܫ ݐݏ݁ݒ݊ܫ ݐݐ݊݁݉ݐൌ ̈́͵ͷͲͲͲ ̈́͵ͷ ͵ͷͲͲ ͲͲͲ Ͳ ݁ݎ݁ݐ݊ܫ ܽ݁ ݐݏ݁ݎ ܽ݊ݎ ݊݁݀ ൌ ̈́ͳͺͲͲ ̈́ͳ ͳ ͺͲͲ ݀݁݊ݎܽ݁ݐݏ݁ݎ݁ݐ݊ܫ ͳͺͲ ͳ ͺ Ͳ ͳͺͲͲ ݁ ݐݏ݁݁ݎ݁ݐ݊ܫ ݁ݕ ݎݎ݁ ݎܽ ݕൌ ൌ ̈́ʹͳͲͲ ݎܽ݁ݕݎ݁ݐݏ݁ݎ݁ݐ݊ܫ ͺ ʹ ʹͳ ʹͳͲͲ ͲͲ ݐݏ݁ݎ݁ݐ݊ܫ ݁ݐܽݎ ܽݎ ݁ݐൌ ൈ ͳͲͲΨ ൌ Ψ ݁ݐܽݎݐݏ݁ݎ݁ݐ݊ܫ ͵ͷͲͲͲ S Secondary 1 Express ction B Marking Scheme 2017 MYE Section .s g Guidance Need a home tutor? Visit smiletutor.sg 297 (b) Qn 9 (a) ile m or Mark Marks ks B1 B1 B1 ut T Solution ݈݂݂݄݀݁݅ݐ݈݈ܾ݃݊݁݁݅ݏݏݐݏ݁ݐܽ݁ݎܩ ݐݏ݁ݐܽ݁ݎܩ ݈݂݀݁݅ ݂ ݄ݐ݈݃݊݁ ݈ܾ݁݅ݏݏൌ ͳͲͷǤͶ݉ ͳͲͷ ͷǤͶ Ͷ݉ ݐݏ݁ݐܽ݁ݎܩ ݈݂݀݁݅ ݂ ݄ݐ݀ܽ݁ݎܾ ݈ܾ݁݅ݏݏൌ ͲǤͶ݉ Ͳ ͲǤͶ ݉ ݈݂݂݄݀݁݅ݐ݀ܽ݁ݎܾ݈ܾ݁݅ݏݏݐݏ݁ݐܽ݁ݎܩ ݎ݁ݐ݁݉݅ݎ݈ܾ݁݁݅ݏݏݐݏ݁ݐܽ݁ݎܩ ݐݏ݁ݐܽ݁ݎܩ ݎ݁ݐ݁݉݅ݎ݁ ݈ܾ݁݅ݏݏൌ ʹሺͳͲͷǤͶሻ ʹሺͲǤͶሻ ʹሺሺͲ ͲǤͶሻ ൌ ͵ͷͳǤ ͵ͷ ͵ ͷͳǤ S Secondary 1 Express 2017 MYE Section B Marking Scheme .s g Guidance .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 298 Register No. Class Name : Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School yS chool Bendemeer Ben Bendemeer Secondary School Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Secon con cco oonnddar daar ary S chhho ccho oooll Ben Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Seeco ccon oonnddar daar ary S cho cch hho oooll Ben B Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Seeccco Se oon nddar arry S cho cho hool ol B Ben Be e Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Seeco S coon ndda dar ar ary S ch cho hhoool ol B en Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School ecoonnd dar da ar ary S cho cch hhooooll B en Bendemeer S Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Se eco con oon ondar ndda dar aarry ry S cho cch hhooooll Be B en Bendemeer S Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School S eccon co oonnddar daar ary S cch cho h ol ho ol B en Bendemeer Se Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School S ecco con oonnddar daar ary S cho ch hoooll B Ben Be e Bendemeer Se Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School ecco con oonnda ddar ar ary S ch ccho hho oooll B en Bendemeer Se Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School nda ddar ar ary S cho cch hhoool o Ben Bendemeer Secon Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Ben Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School : : : 5 Oct 2017 1 hour 50 Marks ut READ THESE INSTRUCTIONS FIRST or DATE DURATION TOTAL .s g BENDEMEER SECONDARY SCHOOL 2017 END OF YEAR EXAMINATION SECONDARY 1 EXPRESS Mathematics Paper 1 T Write your name, class and register number on all the work you hand in. Write in dark blue or black pen on both sides of the paper. You may use a 2B pencil for any diagrams or graphs. Do not use staples, paper clips, highlighters, glue or correction fluid/tape. S m ile Answer all questions. Write your answers in the spaces provided on the question paper. All the diagrams in this paper are not drawn to scale. If working is needed for any question, it must be shown with the answer. Omission of essential working will result in loss of marks. The use of an approved scientific calculator is expected, where appropriate. If the degree of accuracy is not specified in the question, and if the answer is not exact, give the answer to three significant figures. Give answers in degrees to one decimal place. For S , use either your calculator value or 3.142, unless the question requires the answer in terms of S . At the end of the examination, fasten all your work securely together. The number of marks is given in brackets [ ] at the end of each question or part question. FOR EXAMINER’S USE 50 This document consists of 9 printed pages including this cover page. Need a home tutor? Visit smiletutor.sg 25 Answer all the questions. 1 For Examiner’s Use Arrange the following numbers in ascending order. x x x x x 6 , 0.4 6 5 13 .s g 0. 4 6 5, 0.46 5, Answer: [2] ______________________________________________________________________ (b) 900 1500 ut (i) (ii) or (a) Using prime factorisation, express the following two numbers as a product of its prime factors. Leave your answer in index notation. Hence or otherwise, find the HCF of 900 and 1500 LCM of 900 and 1500 S m ile (i) (ii) T 2 Answer: 2(a)(i) ………………………. [2] 2(a)(ii) ………...……………. [2] 2(b)(i) ………………………. [1] 2(b)(ii) ……………………… [1] Need a home tutor? Visit smiletutor.sg 26 Evaluate the following, and show your working clearly. (a) 3 42 y 2 3 8 u 2 8 (b) ª 2 § 1 ·º 6 § 4 3· «1 3 ¨ 6 ¸» y 7 u ¨1 5 2 10 ¸ © ¹¼ © ¹ ¬ For Examiner’s Use ile T ut or .s g 3 Answer: 3(a) ………………………. [2] Nana bought 5 chocolate blocks and 3 bottles of carbonated drinks from a supermarket. The price of a chocolate block is $3.95 and that of a bottle of carbonated drink is $2.05. By estimating the price of each item, calculate the estimated total price of Nana’s purchase. S 4 m 3(b) ………………………. [2] ______________________________________________________________________ Answer: $ ………………………… [2] Need a home tutor? Visit smiletutor.sg 27 5 Given the formula x For Examiner’s Use or .s g and c = –3. b b 2 4ac , find the value of x when a = –4, b = 8 2a Answer: ………………………. [2] ______________________________________________________________________ (a) S m ile (b) 4g 3 2 g 1 7 3 9 s 4t 3s 2t s 5t 5 2 3 ut Express each of the following as a single fraction in its simplest form. T 6 Answer: 6(a) …………………………… [2] 6(b) …………………………… [2] Need a home tutor? Visit smiletutor.sg 28 7 (a) Expand and simplify (2 – b)(-3a) + 5(6ab – 2a + 3) (b) Factorise the following completely 25bx + 35by 8mn – 4m – 2n + 1 ut or .s g (i) (ii) For Examiner’s Use 7(a) ………………………… [2] 7(b)(i) ………………………… [1] ile T Answer: 7(b)(ii) ………………………… [2] ______________________________________________________________________ Three numbers x, y and 36 have an average of 30. Five numbers w, x, y, z and 36 have an average of 40. What is the average of w and z? S m 8 Answer: ………………………… [3] Need a home tutor? Visit smiletutor.sg 29 Given that 3x and 6y are complementary angles, find the value of x + 2y. For Examiner’s Use .s g 9 Answer: ………………………… [2] ______________________________________________________________________ Three of the exterior angles of a polygon with n sides are 60q, 45q and 75q. The remaining exterior angles are each 30q. Calculate the value of n. or (a) ile T ut 10 A F 130q 120q 2w B 2w S m (b) ABCDEF is a hexagon. Find the value of w. E 140q 2w D C 10(a) ………………………… [2] Answer: 10(b) ………………………… [3] Need a home tutor? Visit smiletutor.sg 30 Zilong suffered a loss of 20% when his watch was sold at $80. How much should he have sold his watch if he wanted to make a gain of 20%? For Examiner’s Use .s g 11 ut Karrie, Layla & Miya buy a present for their friend. The present costs $270 and it is shared by Karrie, Layla & Miya in the ratio 3: 2 : 4. (a) Calculate the amount Karrie needs to contribute. (b) (i) If Layla doubles the amount she needs to contribute and Karrie halves her amount, how much must Miya contribute? (ii) Hence, write down the new ratio of the amount that Karrie, Layla & Miya need to contribute. S m ile T 12 or $ Answer: ………………………… [2] ______________________________________________________________________ $ 12(a) ………………………… [1] Answer: $ 12(b)(i) ……………………… [2] 12(b)(ii) ……………………... [1] Need a home tutor? Visit smiletutor.sg 31 If k 21 , find the largest possible value of k such that k is a prime number. 5 4 For Examiner’s Use or .s g 13 Line V Line W S m (a) (b) T Write down the equation of the following graphs. ile 14 ut Answer: ………………………… [2] ______________________________________________________________________ y Line W x Line V 14(a) ………………………… [1] Answer: 14(b) ………………………… [2] Need a home tutor? Visit smiletutor.sg 32 15 A group of Singaporeans were surveyed to determine which countries they would like to visit the most. Their choices were represented on a pie chart as given below. (a) (b) Find the value of w. Hence, calculate the percentage of the group who would like to visit Japan most. If 40 adults would like to visit USA most, find the total number of adults surveyed. S m ile T ut or .s g (c) For Examiner’s Use Answer: 15(a) ………………………… [2] 15(b) ………………………… [1] 15(c) ………………………… [1] - End of Paper - Need a home tutor? Visit smiletutor.sg 33 Register No. Class Name : Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School yS chool Bendemeer Ben Bendemeer Secondary School Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Secon con cco oonnddar daar ary S chhho ccho oooll Ben Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Seeco ccon oonnddar daar ary S cho cch hho oooll Ben B Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Seeccco Se oon nddar arry S cho cho hool ol B Ben Be e Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Seeco S coon ndda dar ar ary S ch cho hhoool ol B en Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School ecoonnd dar da ar ary S cho cch hhooooll B en Bendemeer S Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Se eco con oon ondar ndda dar aarry ry S cho cch hhooooll Be B en Bendemeer S Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School S eccon co oonnddar daar ary S cch cho h ol ho ol B en Bendemeer Se Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School S ecco con oonnddar daar ary S cho ch hoooll B Ben Be e Bendemeer Se Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School ecco con oonnda ddar ar ary S ch ccho hho oooll B en Bendemeer Se Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School nda ddar ar ary S cho cch hhoool o Ben Bendemeer Secon Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Ben Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School Bendemeer Secondary School : : : 10 Oct 2017 1 hour 30 minutes 50 Marks ut READ THESE INSTRUCTIONS FIRST or DATE DURATION TOTAL .s g BENDEMEER SECONDARY SCHOOL 2017 END OF YEAR EXAMINATION SECONDARY 1 EXPRESS Mathematics Paper 2 T Write your name, class and register number on all the work you hand in. Write in dark blue or black pen on both sides of the paper. You may use a 2B pencil for any diagrams or graphs. Do not use staples, paper clips, highlighters, glue or correction fluid/tape. S m ile Answer all questions. Write your answers in the spaces provided on the question paper. All the diagrams in this paper are not drawn to scale. If working is needed for any question, it must be shown with the answer. Omission of essential working will result in loss of marks. The use of an approved scientific calculator is expected, where appropriate. If the degree of accuracy is not specified in the question, and if the answer is not exact, give the answer to three significant figures. Give answers in degrees to one decimal place. For S , use either your calculator value or 3.142, unless the question requires the answer in terms of S . At the end of the examination, fasten all your work securely together. The number of marks is given in brackets [ ] at the end of each question or part question. FOR EXAMINER’S USE 50 This document consists of 9 printed pages including this cover page. Need a home tutor? Visit smiletutor.sg 34 Answer all the questions. A sequence of patterns formed by dots is as shown. Pattern 2 Pattern 3 Number of dots = 1 Number of dots = 5 Number of dots = 9 (a) (b) Draw the 4th pattern of the sequence in the above box. State the total number of dots required, in terms of n, to form the nth pattern? Pattern P requires 333 dots. What is the value of ‘P’? [1] m ile T ut (c) Pattern 4 .s g Pattern 1 or 1 For Examiner’s Use Answer: 1(b) ………………………… [1] S 1(c) ………………………… [1] ______________________________________________________________________ 2 (a) Factorise xy – yz. (b) Using the answer in (a), find the exact value of the following without the use of calculator. 3165 × 876543 – 876543 × 3155 Answer: 2(a) ………………………… [1] 2(b) ………………………… [1] Need a home tutor? Visit smiletutor.sg 35 3 Franco went to a fast-food restaurant and saw the following sign. Burger o $2x each For Examiner’s Use Fries o $2.00 each Drink o $(x+1) each He bought 5 burgers, 5x fries, 3 drinks and 6 sundaes. (a) Write down, in the expanded form, the amount Franco paid for the following items, in terms of x, or (i) burger (ii) fries (iii) drinks ut Find the cost of each burger if Franco paid $58 for all the items. S m ile T (b) .s g Sundae o $1.50 each Answer: 3(a)(i) ……………………… [1] 3(a)(ii) ……………………... [1] 3(a)(iii) …………………….. [1] 3(b) ………………………... [2] Need a home tutor? Visit smiletutor.sg 36 4 ଵ Tigreal spent x hours per day to revise for his examinations. He spent of his ଵ ଵ revision time on Geography, of his remaining revision time on English, of the ହ ସ remaining revision time after English on Biology and then spent the last 40 minutes on Mathematics. For Examiner’s Use (i) Biology (ii) Mathematics (b) Hence, find the value of x. ut or (a) .s g Giving each answer in its simplest form, find an expression, in terms of x, for the time Tigreal spent revising for 4(a)(i) ……………………… [1] 4(a)(ii) ……………………... [1] ile T Answer: 4(b) ………………………... [1] ______________________________________________________________________ Freya drives a distance of 150 km at a speed of 90 km/h. After resting for 20 mins, she took another 2.5 h to complete the remaining 245 km of the journey. Find Freya’s average speed for the whole journey. S m 5 Answer: ………………………… [3] Need a home tutor? Visit smiletutor.sg 37 In the figure, AF // BE, FJG = 115q and KLM = 120q. Find the following angles, giving reasons for each answer (a) (b) (c) For Examiner’s Use angle x angle y angle z F E 115q J K H M x y 120q z L B C S m ile T ut A D or G .s g 6 Answer: 6(a) ………………………… [1] 6(b) ………………………… [1] 6(c) ………………………… [1] Need a home tutor? Visit smiletutor.sg 38 In the figure, ABCD is a trapezium. Given that DA is parallel to GF, BA is parallel to CD, CG = CF, DAG = 78°, FGC = 43° and BFE = 35°, show that AG is parallel to EF. [3] E A For Examiner’s Use B 35q 78q .s g 7 F 43q D C S m ile T ut or G Need a home tutor? Visit smiletutor.sg 39 8 ABCD is a square of side 10 cm. P, Q, R and S are midpoints of AB, BC, CD and AD respectively. The figure is drawn using 4 equal semicircles and 4 equal quadrants of circles. Calculate S A (a) the area of the shaded region (b) the perimeter of the shaded region For Examiner’s Use D .s g (Take S to be 3.14) R Q C S m ile T ut B or P Answer: 8(a) ………………………… [4] 8(b) ………………………… [4] Need a home tutor? Visit smiletutor.sg 40 9 During the ancient days in China, the coins were used for transactions. A typical coin has a circular cross-section area with a square hole. It has an uniform thickness of 2 mm and its outermost diameter is 25 mm. The square hole is 5 mm by 5 mm. Find its (a) (b) For Examiner’s Use volume total surface area .s g (Take S to be 3.14, and round off your answers to the nearest integer) 25 mm S m ile T ut or 5mm Answer: 9(a) ………………………… [4] 9(b) ………………………… [4] Need a home tutor? Visit smiletutor.sg 41 10 The marked price, inclusive of 7% GST, of a LCD television was $2675. Harley bought the television during the recent COMEX exhibition and received a 5% discount. Calculate the marked price before GST. Find the original GST amount. Find the selling price, before GST, of the LCD television. Find the GST amount after the discount. ut or .s g (a) (b) (c) (d) For Examiner’s Use 10(a) ………………………… [1] 10(b) ………………………… [1] 10(c) ………………………… [1] ile T Answer: 10(d) ………………………… [1] ______________________________________________________________________ Answer the WHOLE of this question on a graph paper m 11 Given that y = 1 – 3x, copy and complete the following table. x -3 y 10 S (a) -2 -1 1 2 [2] 3 -2 (b) Using a scale of 2 cm to represent 1 unit on the x-axis and 2 cm to represent 2 units on the y-axis, draw the graph of y = 1 – 3x for values of x from -3 to 3. [3] (c) Using your graph, find the value of (i) y when x = 1.5 (ii) x when y = 1 [1] [1] (d) Hence, or otherwise, find the gradient of the graph. [1] - End of Paper - Need a home tutor? Visit smiletutor.sg 42 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 43 PAPER 1 MARKING SCHEME . Answer all the questions. 1 For Examiner’s Use Arrange the following numbers in ascending order. x x x 0. 4 6 5, 0.46 5, x x 6 , 0.4 6 5 13 .s g [B2] – 0.5 for ea ch correct order x x x x x 6 , 0. 4 6 5, 0.46 5, 0.4 6 5 13 Answer: [2] [ ] [2 ______________________________________________________________________ ________________________________________________________________ _______ __ (i) (ii) (b) 900 1500 or numbers Using prime factorisation, express the following two number rs as a product produ duct du ct of its prime factors. Leave your answer in index notation. ut (a) Hence or otherwise, find the HCF of 900 and 1500 LCM of 900 and 1500 ile (i) (ii) T 2 Prime fa ctor ctoriza riz i a tion for 900 [M1] reee or ddivision re ivision method } fa ctorr ttree Prime fa ctoriza tion for 1500 [M1] m 900 = 22 × 32 × 52 1500 = 22 × 3 × 53 [A1] [A1] [A11] LCM of 900 0 & 150 500 = 22 × 32 × 53 = 4500 [A11] S HCF of 900 900 & 1500 50 0 = 22 × 3 × 52 = 3300 00 22 × 32 × 52 2(a)(i) ………………………. [2] Answer: 22 × 3 × 53 2(a)(ii) ………...……………. [2] 300 2(b)(i) ………………………. [1] 4500 2(b)(ii) ……………………… [1] Need a home tutor? Visit smiletutor.sg 44 3 Evaluate the following, and show your working clearly. (a) 3 42 y 2 3 8 u 2 8 (b) ª 2 § 1 ·º 6 § 4 3· «1 3 ¨ 6 ¸» y 7 u ¨1 5 2 10 ¸ © ¹¼ ¹ © ¬ = 3 + 16 y 2 + 2 ×(-6) = 3 + 8 + (-12) = -1 ut T [M1] [A1] ile 7 8 or [M11] [A1] ª 2 § 1 ·º 6 § 4 3· «1 3 ¨ 6 ¸» y 7 u ¨1 5 2 10 ¸ ¹ © ¹¼ © ¬ 3 6 1 · § = y u¨ ¸ 2 7 © 2¹ 7 = u §¨ 1 ·¸ 4 © 2¹ = .s g 3 42 y 2 3 8 u 2 8 For Examiner’s Use –1 1 3(a) 3(a (a)) ………………………. [2] 7 8 3(b) ………………………. [2] ______________________________________________________________________ ________________________ _ __ _ __________ ____ ____ __________________________________ chocolate Nana bought 5 cho hocolatee bblocks lock lo ckss and and 3 bottles of carbonated drinks from a supermarket.. The he pprice rice ce of of a ch choc chocolate o olate block is $3.95 and that of a bottle of carbonated ddrink rink ri nk is is $2.05. $2.0 $2 05. By estimating the price of each item, calculate the estimated total tota tall price pric pr icee of Nana’s purchase. S 4 m Answer: A An swerr: Estima ted cost of chocola te block | $4.00 } [M1] Estima ted cost of ca rbona ted drink | $2.00 Tota l price | $4.00 × 5 + $2.00 × 3 [A1] = $26.00 Answer: 26 $ ………………………… [2] Need a home tutor? Visit smiletutor.sg 45 5 Given the formula x and c = –3. x b b 2 4ac , find the value of x when a = –4, b = 8 2a 8 82 4 4 3 2 4 For Examiner’s Use [M1] .s g 8 64 48 8 8 16 8 8 4 1 8 2 [A1] (a) ile (b) 4g 3 2 g 1 7 3 9 s 4t 3s 2t s 5t 5 2 3 ut Express each of the following as a single fraction in it its simplest ts ssi im mp ple lesstt form. for orm m.. T 6 or 1 ………………………. Answer: ……… ……… …2…… … …… …. [2 [2]] ______________________________________________________________________ ____________________________________________________ __ __ __ _____ ____ ____ ___________ S m 4g 3 2 g 1 7 3 9s 4t 3s 2t s 5t 5 2 3 3 4 g 3 14 g 1 21 2 1 12 g 9 14 14 g 14 4 21 2 1 2g 5 21 2 1 [M1] [A1] 6 9s 4t 15 3s 2t 10 s 5t 30 54 s 24t 45s 30t 10 s 50t 30 109s 44t 30 [M1] [A1] 2g 5 21 6(a) …………………………… [2] Answer: 109 s 44t 30 6(b) …………………………… [2] Need a home tutor? Visit smiletutor.sg 46 7 (a) Expand and simplify (2 – b)(-3a) + 5(6ab – 2a + 3) (b) Factorise the following completely (i) (ii) For Examiner’s Use 25bx + 35by 8mn – 4m – 2n + 1 25bxx + 35by = 5b (5x + 7y) [M1] [A1] .s g (2 – b )(-3a ) + 5(6a b – 2a + 3) = -6a +3a b + 30 a b – 10 a + 15 = 33a b – 16a + 15 or [A1] 8mn n – 4m – 2n + 1 = 4m (2n – 1) – (2n – 1) = (2n – 1)(4m – 1) ut [M1] [A1 1] a b – 16a…… + 15 7(a) ………………………… … 33 …… ……………… ………… [[2] 2] T Answer: An 5b (5x + 7y) 7(b)(i) ………………………… ……… ……………………… [1] Three numbers x, y and 36 have an average aver av erag agee of 30. 30. Five numbers w, x, y, z and 36 have aan average n av averag ge of 40. What Wh hat is the average of w aand nd z?? m 8 ile ( n – 1)(4m – 1) (2 7(b)(ii) 7(b) b)(i (ii) i) ………………………… ……… ……………………… [2] ______________________________________________________________________ _______________________________________________ _ __ ____ _ ____________________ [B1] w + x + y + z + 36 = 40 × 5 w + x + y + z = 200 – 36 w +54 + z = 164 w + z = 164 – 54 w + z = 110 [B1] Avera ge of w & z = 110 y 2 = 55 [B1] S x + y + 36 = 30 × 3 = 90 x + y = 90 – 36 x + y = 54 Answer: 55 ………………………… [3] Need a home tutor? Visit smiletutor.sg 47 9 Given that 3x and 6y are complementary angles, find the value of x + 2y. [M1] [A1] .s g 3x +6y = 90 3(x + 2y) = 90 x + 2y = 30 For Examiner’s Use x +2 + 2y = 30 Answer: ………………………… ……………………… ……… [2] [2 ______________________________________________________________________ ________________________________________________________________ ________ (a) Three of the exterior angles of a polygon with n sides are 60q, 60 0q, 45 45qq and and 75q. 75q. The remaining exterior angles are each 30q. Calculate the value valu va luee of n. or 10 0 ile T ut Sum of a ll ext. s = 360q Sum of rema ining ext. s = 360q - 60q - 45q - 75q 75 5q = 180q [B1] No. of rema ining ext. s = 180q y 30q = 6 n = 6 +3 = 9 [B1] m w.. (b) ABCDEF F iiss a hexagon. Find thee value valu va lue of w A F 1 0q 13 130q 2w 2w S B 120q E 140q 2w Sum of a ll int. s = (6 – 2) × 180q = 720q + 120q +2 + 2w +1 130q +1 + 140q + +2 2w +2 + 2w = 720q 390q + 6w = 720q w = 55q [B1] C D [B1] [B1] 9 10(a) ………………………… [2] Answer: 55° 10(b) ………………………… [3] Need a home tutor? Visit smiletutor.sg 48 11 Zilong suffered a loss of 20% when his watch was sold at $80. How much should he have sold his watch if he wanted to make a gain of 20%? [B1] [B1] .s g 80% o $80 1% o $1 120% o $120 For Examiner’s Use ut Karrie, Layla & Miya buy a present for their friend. The presen present en nt costs cco osstts $270 $2 aand nd iitt is shared by Karrie, Layla & Miya in the ratio 3: 2 : 4. (a) Calculate the amount Karrie needs to contribute. (b) (i) If Layla doubles the amount she needs to contribute contrribute and Karrie halves her amount, how much mustt Miya contribute? (ii) Hence, write down the new rratio amount Karrie, atio of at of th tthee amou unt tthat hatt Ka ha K rrie, Layla & Miya need to contribute. ile T 122 or 120 $ Answer: ………………………… ………………… ………… … [2] [2] ______________________________________________________________________ _________________________________________________________ ____ ____ ___________ Tota l pa rts = 3 + 2 + 4 = 9 pa rts m 9 pa rts = $270 1pa rt = $30 3 pa rts = $900 [A1] [A1 [B1] Miya ’s new contribution = $270 - $120 - $45 = $105 [B1] S origina La yla ’s or orig igin inaa l ccontribution ontr on trib b ut utio i n : 2 pa rts o $60 contribution La yla ’s ne new w co cont n riibu buti tion = $60 × 2 = $120 Ka rrie’s new ew contribution con ontr trib ibution = $90 y 2 = $45 Ka rrie : La yla : Miya 45 : 120 : 105 3:8:7 [A1] $ 90 12(a) ………………………… [1] Answer: 105 $ 12(b)(i) ……………………… [2] 3:8:7 12(b)(ii) ……………………... [1] Need a home tutor? Visit smiletutor.sg 49 13 If k 21 , find the largest possible value of k such that k is a prime number. 5 4 k 21 u5 4 For Examiner’s Use [B1] .s g k < 26.25 [B1] or la rgest possible va lue of k , such tha t k is a prime number = 23 Write down the equation of the following graphs. Line V Line W m ile (a) (b) T 14 4 ut 23 23 Answer: ………………………… …… …… …… …… …… …… ……… ……… … [2] [2] ______________________________________________________________________ _____________________________________________________ ___ __ __ _______ ____ __ _________ __ y Line W x S Line V Line W: Gra dient = –1 y-intercept = 1 equa tion: y = –x + 1 [B1] [B1] x = –1 14(a) ………………………… [1] Answer: y = –x + 1 14(b) ………………………… [2] Need a home tutor? Visit smiletutor.sg 50 15 A group of Singaporeans were surveyed to determine which countries they would like to visit the most. Their choices were represented on a pie chart as given below. (a) (b) Find the value of w. Hence, calculate the percentage of the group who would like to visit Japan most. If 40 adults would like to visit USA most, find the total number of adults surveyed. T ut or .s g (c) For Examiner’s Use ile 3w + 80q + w + 120q = 360q 4w + 200q = 360q w = 40q [B1] [B1 [B1] 3w = 3 × 40q = 120q (120/360) × 100% = 33.3% m [A1] S 80q o 40 10q o 5 360q o 5 × 36 = 180 a dults [A1] 40° 15(a) 15( ) ………………………… [2] Answer: A 33.3% 15(b) ………………………… [1] 180 15(c) ………………………… [1] - End of Paper - Need a home tutor? Visit smiletutor.sg 51 PAPER 2 MARKING SCHEME Answer all the questions. A sequence of patterns formed by dots is as shown. Pattern 1 Pattern 2 Pattern 3 Number of dots = 1 Number of dots = 5 Number of dots = 9 Draw the 4th pattern of the sequence in the above box. State the total number of dots required, in terms of n, to form m th thee nth pattern? Pattern P requires 333 dots. What is the value of ‘P’? [1] ut (c) .s g (a) (b) Pattern 4 or 1 For Examiner’s Use ile T dots. The difference between ea ch pa ttern is 4 dot ott s. T1 =1 = 4(1) – 3 T2 =5 = 4(2) – 3 T3 =9 = 4(3) – 3 T4 = 4(4) – 3 = 13 [A1] Tn = 4n – 3 4p – 3 = 333 = 336 4p = 84 p m Tp = [A11] [[A 4n – 3 1(b) ………………………… [1] Answer: An S 84 1(c) ………………………… [1] ______________________________________________________________________ ______________ ___ ____ ____ _ __ ___ _ ______________________________________________ 2 (a) Factorise xy – yz. (b) Using the answer in (a), find the exact value of the following without the use of calculator. xy – yz = y (x – z) 3165 × 876543 – 876543 × 3155 [A1] x = 3165, y = 876543, z = 3155 3165 × 876543 – 876543 × 3155 = 876543 (3165 – 3155) Answer: = 876543 (10) = 8765430 [A1] y (x – z) 2(a) ………………………… [1] 8 765 430 2(b) ………………………… [1] Need a home tutor? Visit smiletutor.sg 52 3 Franco went to a fast-food restaurant and saw the following sign. Burger o $2x each For Examiner’s Use Fries o $2.00 each Drink o $(x+1) each He bought 5 burgers, 5x fries, 3 drinks and 6 sundaes. (a) Write down, in the expanded form, the amount Franco paid for the he following items, in terms of x, or (i) burger (ii) fries (iii) drinks ut Find the cost of each burger if Franco paid $58 the $558 fo ffor or al aall ll tth he items. iitteem ms. 5 × 2x = 10 x [A1] Fries: T (b) .s g Sundae o $1.50 each 5x × 2 = 10 x [A1] Drinks: Drinks ks: 3 × (x + 1) = 3x + +3 3 [A1 [A A1] ile Burger: [B1] S m 10 x + 10 x + 3x + 3 + 6 × 1.50 50 = 558 8 23x + 12 = 558 8 23x = 466 x =2 Eaa ch bburger urge ur gerr co cost costs stss = 2x = 2 × 2 = $4 Answer: [B1] 10 x 3(a)(i) ……………………… [1] 10 x 3(a)(ii) ……………………... [1] 3x + 3 3(a)(iii) …………………….. [1] $4 3(b) ………………………... [2] Need a home tutor? Visit smiletutor.sg 53 4 Tigreal spent x hours per day to revise for his examinations. He spent of his revision time on Geography, of his remaining revision time on English, of the remaining revision time after English on Biology and then spent the last 40 minutes on Mathematics. For Examiner’s Use (a) (i) Biology (ii) Mathematics (b) Hence, find the value of x. Time spent on Geogra ph = h Time spent on English = ut = h or Let x be the tota l time spent for the study period. Time spent on Biology = T = h Time spent on Ma thema tics = [A1] = h [A1 [A1] h 4(a)(i) 4(a (a)( )(i) i) ……………………… ……………………… [1] Answer: An Answer er: ile Given = .s g Giving each answer in its simplest form, find an expression, in terms of x, for the time Tigreal spent revising for h 4(a)(ii) 4( 4(a) a)(ii) ……………………... [1] 1 h 4(b) ………………………... [1] ______________________________________________________________________ ______________________ ___ _______ _ __ ____ ____ ____ _ ________________________________ Freya drives a distance dis ista tance of 1150 50 kkm m at a speed of 90 km/h. After resting for 20 mins, she took another anoth her 2.5 2.5 h ttoo complete the remaining 245 km of the journey. Find Freya’s Freya ya’s ’s average ave vera rage ge speed spe peed ed d for the whole journey. S 5 [A1] m =1 h Tota l distaa nce nce ttra ra ve velled = 150 + 245 = 395 km Time ta ken for first pa rt of journey = Time spent on resting = [B1] = h = h Tota l time ta ken = + + 2.5 = h [B1] Avera ge speed for the whole journey = = Answer: km/h [B1] km/h ………………………… [3] Need a home tutor? Visit smiletutor.sg 54 In the figure, AF // BE, FJG = 115q and KLM = 120q. Find the following angles, giving reasons for each answer (a) (b) (c) For Examiner’s Use angle x angle y angle z F E 115q 115 J K H M x y 120q z L A C ut B D or G .s g 6 x = 115° [A1] T (vert. opp. s) y = x = 115° [A1] ile (corr. s, // lines) z = 180° – 120° [A1] [A1 S m (int. s, // lines) z = 60° Minus M inuss 1m ffor or not sta ting properties used Answer: 115q 6(a) ………………………… [1] 115q 6(b) ………………………… [1] 60q 6(c) ………………………… [1] Need a home tutor? Visit smiletutor.sg 55 7 In the figure, ABCD is a trapezium. Given that DA is parallel to GF, BA is parallel to CD, CG = CF, DAG = 78°, FGC = 43° and BFE = 35°, show that AG is parallel to EF. [3] E A For Examiner’s Use B 35q 78q .s g F 43q D AGF = DAG = 78° (a lt. s, // lines) C or G ut ngle) CFG = CGF = 43° (ba se a ngles of isoceles tria ng glee ) T BFE +EFG +CFG = 180° (s on a st. line) 35° + EFG +43° = 180° EFG = 102° [M2] [M2 M] [A1] S m ile AGF +EFG = 78° + 102° = 180° Therefore, AGF & EFG must be inte interior e rior o a ngless of ppaa ra ra llel l lines, a nd the pa ra llel lines a re AG G a nd nd E EF F. Need a home tutor? Visit smiletutor.sg 56 8 ABCD is a square of side 10 cm. P, Q, R and S are midpoints of AB, BC, CD and AD respectively. The figure is drawn using 4 equal semicircles and 4 equal quadrants of circles. Calculate S A (a) the area of the shaded region (b) the perimeter of the shaded region For Examiner’s Use D .s g (Take S to be 3.14) R Q ut B or P [B1] [B2] [B1] ile T Area of sha ded region = a rea of 4 qua dra nts – a rea of 4 semi-circles = [(3.14 ×5 × 52) y 4] × 4 – [(3.14 × 2.52) y 2] × 4 = 78.5 – 39.25 = 39.25 cm 2 C S m Perimeter of sha ded region = circumference of 4 qua dr ra nts nts + cir rcu cumf mferen e ce of 4 semi-circles [B1] dra circumference + 4 × 5 cm m [B2] = [(3.14 × 10) y 4] × 4 + [[(3.1 (3.1 (3 .14 × 5) y 2] × 4 + 20 = 31.4 + 31.44 + 20 [B1] = 82.8 cm Answer: 39.25 cm 2 8(a) ………………………… [4] 82.8 cm 8(b) ………………………… [4] Need a home tutor? Visit smiletutor.sg 57 9 During the ancient days in China, the coins were used for transactions. A typical coin has a circular cross-section area with a square hole. It has an uniform thickness of 2 mm and its outermost diameter is 25 mm. The square hole is 5 mm by 5 mm. Find its (a) (b) For Examiner’s Use volume total surface area .s g (Take S to be 3.14, and round off your answers to the nearest integer) ut = volume of cylinder – volumee ooff ccu u bo b oid id cuboid 2 = 3.14 × (25 y 2) × 2 – 5 × 5 × 2 = 981.25 – 50 = 931.25 mm 3 est integer) | 931mm 3 (rounding off to nea rrest T Volume of coin 255 m mm m or 5mm [B1] = surfa ccee a rea rea of cy cyli lind nder er – a rrea ea of two squa res [B1] cylinder ea ooff sides of cub uboi oid d + a rea cuboid (25 y 2)2 × 2 + 3. 3.14 × ×25 = 3.14 × (25 25 × 2 – 5 × 5 × 2 [B2] +5 ×4 ×2 = (981 81.25 .25 + 157)) – 50 + 40 = 1128.25 28.2 28 .25 5 mm m 2 m m 2 (rounding off to nea rest integer) | 1128 mm [B1] S m ile Tota l surfa ce a rea of coin [B1 [B1] [B2] [B2 B2]] Answer: 931 mm 3 9(a) ………………………… [4] 1128 mm 2 9(b) ………………………… [4] Need a home tutor? Visit smiletutor.sg 58 The marked price, inclusive of 7% GST, of a LCD television was $2675. Harley bought the television during the recent COMEX exhibition and received a 5% discount. 107% o $2675 100% o $2500 [A1] GST = $2675 – $2500 = $175 [A1] 00% 100 % o $2500 95% o $2375 [A1] GST = 7% × $2375 = $166.25 .s g Calculate the marked price before GST. Find the original GST amount. Find the selling price, before GST, of the LCD television. Find the GST amount after the discount. or (a) (b) (c) (d) For Examiner’s Use [A1] ut 10 $2500 $2500 $2 0 10(a) ………………………… ………………… ……… …… ……… [1 [1] $175……… 10(b) ………………………… ……………… ………… [1] 10(c)) ………………………… ………… …… … $2375 ……………… [1] ile T Answer: $166.25 66 25 10(d) 10(d 10 (d)) ………………………… [1] ______________________________________________________________________ ____________________________________ ____ ____ ____ _ __ ____ __________________________ Answer the WHOLE of this question quest stio ion n on o a graph graph paper m 11 Given thatt y = 1 – 3x, copy c py aand co nd ccomplete omplete the following table. x --33 y 10 S (a) --2 2 -1 1 2 [2] 3 -2 (b) Using a scale sccal a e of 2 cm to represent 1 unit on the x-axis and 2 cm to represent 2 units on the y-axis, draw the graph of y = 1 – 3x for values of x from -3 to 3. [3] 3 (c) Using your graph, find the value of (i) y when x = 1.5 (ii) x when y = 1 [1] [1] (d) Hence, or otherwise, find the gradient of the graph. [1] - End of Paper - Need a home tutor? Visit smiletutor.sg 59 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 60 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 61 Class Index Number Name BUKIT MERAH SECONDARY SCHOOL .s g END OF YEAR EXAMINATION 2017 SECONDARY 1 EXPRESS MATHEMATICS READ THESE INSTRUCTIONS FIRST ut Candidates answer on the Question Paper. No additional material is required. 5 October 2017 1 hour 15 minutes or Paper 1 4048/01 T Write your name, class and index number on all the work you hand in. Write in dark blue or black pen on both sides of the paper. You may use a pencil for any diagram or graphs. Do not use staples, paper clips, highlighters, glue or correction fluid. m ile Answer all questions. If working is needed for any question it must be shown with the answer. Omission of essential working will result in loss of marks. Calculators should be used where appropriate. If the degree of accuracy is not specified in the question, and if the answer is not exact, give the answer to three significant figures. Give the answers in degrees to one decimal place. For ߨ, use either your calculator value or 3.142, unless the question requires the answer in terms of ߨ. S At the end of the examination, fasten all your work securely together. The number of marks is given in brackets [ ] at the end of each question or part question. The total number of marks for this paper is 50. For Examiner’s Use Part A (Algebra Component) Part B Calculator Model: Total This document consists of 12 printed pages, including this cover page. Setter: Yvonne Lee [Turn over Need a home tutor? Visit smiletutor.sg 62 2 Part A – Answer all questions Simplify (a) a u 3b a , (b) x 2 y 2x , (c) 4 z 3 2 5z . 3 4 S m ile T ut or .s g 1 Answer (a) ……………….…………… [1] (b) ……………….…………… [2] (c) ……………….…………… [2] Need a home tutor? Visit smiletutor.sg Yvonne Lee/BMSS/2017/1E/P1/EOY 63 2 3 Factorise (a) v w v( w v) . or .s g (b) 3 p 2 q 12 pq 6 pq 2 , …………………..………… [1] (b) …………………..………… [1] (a) Solve the inequality 4 x ! 8 and illustrate your solution on the number line below. S m ile 3 T ut Answer (a) [2] Answer (a) -4 -3 -2 -1 0 1 2 3 (b) Hence, write down the largest integer value of x which satisfies 4 x ! 8 . Answer (b) x ……………..………… [1] Need a home tutor? Visit smiletutor.sg Yvonne Lee/BMSS/2017/1E/P1/EOY 64 Solve (a) 2 3c 1 3 2 c (b) f 2 1 5 0 f 1 2 S m ile T ut or .s g 4 4 Answer (a) c ……………..………… [2] (b) f ...…………..………… [3] Need a home tutor? Visit smiletutor.sg Yvonne Lee/BMSS/2017/1E/P1/EOY 65 5 Part B – Answer all questions (a) Express 0.28 as a fraction in its simplest form. Answer (a) 13.6 1.482 S , correct your answer to 2 significant figures, (ii) 3 decimal places. T ut (i) [1] or (b) Evaluate …………………………….. .s g 5 (i) ……………………… [1] (ii) ……………………… [1] 2 § 1· 3 § 2· Without using a calculator, evaluate ¨1 ¸ y ¨ ¸ . Show your workings clearly. © 2¹ 7 © 3¹ S m 6 ile Answer (b) Answer …………………………………... [3] Need a home tutor? Visit smiletutor.sg Yvonne Lee/BMSS/2017/1E/P1/EOY 66 7 When written as a product of their prime factors, 6 p 23 u 39 , q 2 u 32 u 5 , r 22 u 3 u 7 . Find (a) the value of the cube root of p , .s g (b) the LCM of p , q and r , giving your answer as the product of its prime factors, S m ile T ut or (c) the greatest number that will divide p , q and r exactly. Answer (a) …………………..………… [1] (b) LCM = ...………………….. [1] (c) …………………………….. [1] Need a home tutor? Visit smiletutor.sg Yvonne Lee/BMSS/2017/1E/P1/EOY 67 8 7 (a) Apple juice, peach juice and lemonade were used to make a fruit punch in the ratio 5 : 3 : 7 respectively. Ali used 2.8 litres of lemonade. How much apple juice did he use? .s g (i) ...………..………..... l [1] How much fruit punch did he make altogether? ile T ut (ii) (i) or Answer (a) Answer (a) (ii) …...……..……...….. l [1] m (b) Baba makes a fruit punch using mango juice, orange juice and lemonade. The ratio of mango juice : orange juice is 2 : 3 . S The ratio of orange juice : lemonade is 4 : 3 . Find the ratio of mango juice : orange juice : lemonade. Answer (b) ……..… : ….…... : ………. [1] Need a home tutor? Visit smiletutor.sg Yvonne Lee/BMSS/2017/1E/P1/EOY 68 9 8 (a) Express 3 centimetres as a percentage of 6 metres. Answer (a) ………………..……...… % [1] or .s g (b) Express 24 m/s into km/h. Answer (b) ………………..…….. km/h ut 10 In the diagram, ABCD is a trapezium in which AD 13 cm, AB 10 cm, BC DAB 90q . E and F are points on AD and AB respectively such that AE [1] 20 cm and 6 cm and AF 8 cm. S m ile T Find the area of the shaded region EFBC. Answer …………………………….... cm2 [3] Need a home tutor? Visit smiletutor.sg Yvonne Lee/BMSS/2017/1E/P1/EOY 69 .s g 11 Mrs Lee bought 2 books during a sale. 9 Calculate (a) the total amount she paid for both books, S m ile T ut or (b) the total amount of GST. Answer (a) $ …………………………... [2] (b) $ …………………………... [2] Need a home tutor? Visit smiletutor.sg Yvonne Lee/BMSS/2017/1E/P1/EOY 70 10 12 Given the following sequence, .s g 1 1 1 6 3 2 1 1 1 12 4 3 1 1 1 20 5 4 1 1 1 30 6 5 # 1 1 1 p 12 11 or find (a) the 5th line of sequence, ut (b) the value of p , S m ile T (c) the value of 1 1 , showing your workings clearly. 98 99 Answer (a) …………………..………… [1] (b) p ...…………..………… [1] (c) …………………..………… [2] Need a home tutor? Visit smiletutor.sg Yvonne Lee/BMSS/2017/1E/P1/EOY 71 11 13 In the diagram, UTR is a straight line and TQR is an isosceles triangle such that QT that PQ // RS , UTQ 155q and PQT 90q , find TRS . or (b) S m ile T ut TQR , .s g 155o (a) QR . Given Answer (a) TQR ............................q [2] (b) TRS .............................q [2] Need a home tutor? Visit smiletutor.sg Yvonne Lee/BMSS/2017/1E/P1/EOY 72 12 14 (a) Complete the following table for the equation y 0 x 4 1 x. 2 4 [2] 8 y 4 1 x for 0 d x d 8 on the grid provided below. 2 [2] S m ile T ut or .s g (b) Draw the graph of y (c) Draw a straight line y 3 on the same grid. [1] (d) Write down the coordinates of the point of intersection of the two lines. Answer (d) ( .................. , .................... ) [1] End of paper Need a home tutor? Visit smiletutor.sg Yvonne Lee/BMSS/2017/1E/P1/EOY 73 Class Index Number Name BUKIT MERAH SECONDARY SCHOOL .s g END OF YEAR EXAMINATION 2017 SECONDARY 1 EXPRESS MATHEMATICS READ THESE INSTRUCTIONS FIRST ut Additional Materials: Writing paper (5 sheets) Cover Page (1 sheet) 10 October 2017 1 hour 30 minutes or Paper 2 4048/02 T Write your name, class and index number on all the work you hand in. Write in dark blue or black pen on both sides of the paper. You may use a pencil for any diagram or graphs. Do not use staples, paper clips, highlighters, glue or correction fluid. m ile Answer all questions. If working is needed for any question it must be shown with the answer. Omission of essential working will result in loss of marks. Calculators should be used where appropriate. If the degree of accuracy is not specified in the question, and if the answer is not exact, give the answer to three significant figures. Give the answers in degrees to one decimal place. For ߨ, use either your calculator value or 3.142, unless the question requires the answer in terms of ߨ. S At the end of the examination, fasten all your work securely together. The number of marks is given in brackets [ ] at the end of each question or part question. The total number of marks for this paper is 60. For Examiner’s Use Part A (Algebra Component) Part B Calculator Model: Total This document consists of 7 printed pages, including this cover page. Setter: Yvonne Lee [Turn over Need a home tutor? Visit smiletutor.sg 74 2 Part A – Answer all questions 1 (a) Solve x 3 2x 4 1. 4 5 [3] (b) If a 3 , b 2 and c 5 , evaluate a 4 b 2c , [1] (ii) ac 2 b 3 . [1] .s g (i) (c) Soil costs x cents per kilogram. or Peter paid y dollars for some soil. (a) Find the interior angle of a regular 15-sided polygon. [2] [2] T 2 ut Find an expression, in terms of x and y, for the number of kilograms of soil that Peter bought. (b) An n-sided polygon has 2 interior angles measuring 100q each and the remaining ile interior angles are qq each. [2] S m Find an expression for q in terms of n. Need a home tutor? Visit smiletutor.sg Yvonne Lee/BMSS/2017/1E/P2/EOY 75 3 Part B – Answer all questions 3 In a sewing kit, there are blue, green and red buttons. 1 4 of the buttons are blue and of the 5 7 remainder are green. The rest are red buttons. (a) the fraction of red buttons in the sewing kit, [2] (b) the ratio of blue buttons to green buttons to red buttons, [1] (c) the total number of buttons if there are 80 green buttons in the sewing kit. [2] (a) The cash price of a new car is $90 500. or 4 .s g Find ut David buys the car under the hire purchase scheme as shown below. Hire Purchase Scheme a deposit of 20% of cash price x simple interest of 2% per year over 3 years x repayment to be made monthly ile T x Calculate the total amount of interest payable, [3] (ii) the monthly instalment paid by David. [2] m (i) (b) A bag costs 1 850 000 Korean Won (KRW). The conversion rate between Singapore dollars S and Korean Won is SGD1 = KRW815.79. Calculate the price of the bag in Singapore dollars. [2] Need a home tutor? Visit smiletutor.sg Yvonne Lee/BMSS/2017/1E/P2/EOY 76 4 5 A cylindrical block of metal has radius 10 cm and height 30 cm. (a) Calculate its volume, leaving your answer in terms of S . [1] The block of metal is then melted and recast into 6 similar rods of height 15 cm. (b) Show that the radius of the base area of one such rod is 5.77 cm, correct to 3 significant [2] .s g figures. The diagram shows the cross-sectional view of a box holding the 6 rods. The box is in the shape ut or of a cuboid and the rods just fit into the box. [3] S m ile T (c) Calculate the volume of empty space in the box. Need a home tutor? Visit smiletutor.sg Yvonne Lee/BMSS/2017/1E/P2/EOY 77 5 (a) Calculate the gradient of AB. (ii) Write down the equation of BC. (iii) Find the area of 'ABC . ut (i) or .s g 6 the value of y when x 3 , 4 [2] (ii) the value of x when y 1 . [1] ile (i) m Hence, explain why 7 , 1 does not lie on the line. (a) Calculate the total surface area of the prism below. [2] [3] S 7 [1] 1 x 2 . Find 3 T (b) The equation of a function is y [1] (b) Mr Lee took 30 mins to drive from Jurong to Changi at an average speed of 72 km/h. He took the same route (but in the opposite direction) at an average speed of 5 km/h faster for his return trip. Find his average speed for the round trip correct to the nearest km/h. [4] Need a home tutor? Visit smiletutor.sg Yvonne Lee/BMSS/2017/1E/P2/EOY 78 6 The pie chart shows how a box of sweets was shared among Alex, Bryan and Clement. or (a) Find the fraction of the sweets that Alex received. .s g 8 [1] (c) If Bryan received 345 sweets, how many sweets were there in the box? [2] ut (b) If Clement received 22.5% of the sweets, find x. In the diagram, the shape is made up of trapezium ABFG, rectangle BCEF and semicircle CDE. S m ile T 9 [1] Find (a) its perimeter, [3] (b) its area. [4] Need a home tutor? Visit smiletutor.sg Yvonne Lee/BMSS/2017/1E/P2/EOY 79 7 10 Mrs Lee would like to dine at the Big Signboard Thai Restaurant. Below shows the pricing of the food items she would like to order. There is a service charge of 10% and GST of 7% but no service charge is imposed for takeout. Big Signboard Thai Restaurant $13.50 Green papaya salad $7.90 Green curry $10.90 Thai fish cake $6.70 Chendol $4.30 or .s g Pineapple rice (a) How much more must Mrs Lee pay if she were to dine in instead of takeout? (b) If Mrs Lee has only $50, suggest on which is a better option for her. Support your answer with ut relevant workings. [4] [2] S m ile T End of paper Need a home tutor? Visit smiletutor.sg Yvonne Lee/BMSS/2017/1E/P2/EOY 80 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 81 BMSS 1Exp End-Of-Year Examination 2017 (Mathematics P1) – Marking Scheme c 2 a b x 2 y 4x 5x 2 y 4 z 3 2 5z 3 4 16 z 9 2 5 z 12 16 z 18 45 z 12 61z 18 12 3 pq p 4 2q v w 1 v a M1 a x 3 B B1 B1 1, B1 B1, 2 3c 1 3 2 c 0 6c 2 6 3c 0 8 2 or c 2 or 3 3 f 2 f 1 11 5 2 f 7 f 1 5 2 2 f 7 5 f 1 2 f 14 5 f 5 f 3 M1 A1 S b 5 a bi 7 25 1.9 (2 s.f.) bii 1.906 (3 decimal places) B1 ffor or correct inequality B1 for correct illustration on number line B1 m 4 common den de nominator denominator A1 B B1 ile b Remarks M1 A1 T 3 Marks B1 .s g b Solution 3ab a or Qn a ut 1 correct expansion M1 fraction=fraction M1 cross-multiply A1 B1 B1 B1 Need a home tutor? Visit smiletutor.sg 82 6 c 8 ai aii .s g y to u B1 B B1 B 1 B1 B1 B1 mango : orange 2:3 8 : 12 ile b HCF 22u 3 6 7 parts Æ 2.8l 1 part Æ 0.4l 5 parts Æ 2l 15 parts Æ 6l M1 or b removing the brackets B1 ut a M1 A1 T 7 2 3 § 2· § 1· ¨1 ¸ y ¨ ¸ © 2¹ 7 © 3¹ 9 3 2 y 4 7 3 9 7 2 u 4 3 3 21 2 4 3 63 8 12 55 7 4 or 12 12 3 p 2 u 33 54 LCM 2 3 u 39 u 5 u 7 m orange : lemonade 4:3 12 : 9 a S 9 ? mango : oran orange ange ge : llemonade emon em o ade 8 : 12 : 9 3 u 100 100% 0. 0.5% 5% 60 600 00 24 m Æ 1 s 0 m Æ 60 s 1440 86400 m Æ 1 h 86.4 km Æ 1 h b B1 B1 B1 2 ? 86.4 km/h or 86 km/h 5 Need a home tutor? Visit smiletutor.sg 83 10 Divide shaded diagram into 2 parts by drawing a line perpendicular to BC through E. area of shaded triangle 1 2 10 6 36 cm2 2 1 u 14 u 10 2 70 cm2 12 a b GST 1 1 1 99 u 98 99 98 1 1 1 98 99 99 u 98 1 9702 2 QTR 1800q 155 155q 255q m c 7 u 30.60 107 $2 1 1 1 42 7 6 p 132 70 u 18 18 100 $30.60 a S 13 QRT T b M1 QRS M1 M 1 A A1 A1 A1 M1 A1 (adj s on a str. line) QTR QTR 25q TQR 25q 25q TQR PQR 90q 130q PQR area of trapezium ABCD 165 cm2 [M1] area of ' AEF 24 cm2 area of ' EDC 35 cm2 [M1] area are ar ea of shaded ea re egi gion EFBC region 165 24 35 165 1106 06 cm2 [A1] A1 A ut b total amount paid T a A1 ile 11 M1 or area of shaded region EFBC 36 70 106 cm2 M1 .s g area of shaded trapezium accept alternative method: 180q 130q 360q 140q PQR 140q M1 (base s of isos. tri) ( sum of tri) A1 ( s at a pt) M1 (alt s , PQ // RS ) TRS 140q 25q 115q A1 Need a home tutor? Visit smiletutor.sg 84 14 a B2 minus 1m for every wrong / missing answer Refer to b d (2, 3) ile c T ut or .s g b B1 S m B1 Need a home tutor? Visit smiletutor.sg 85 BMSS 1Exp End-Of-Year Examination 2017 (Mathematics P2) – Marking Scheme 3 4> 2 2 5 @ bii 3 5 2 c $ y 100 y cents 2 3 Marks 1 M1 1 1 M1 20 2 11 x 3 or 3 3 51 a A1 A1 83 x cents Æ 1 kg §1· 1 cent Æ ¨ ¸ kg © x¹ § 100 y · 100y cents Æ ¨ ¸ kg © x ¹ 15 2 u 1800q interior o angle 15 156q n 2 u q 100 100 n 2 u 18 180 1 0 n 2 q 20 2 200 0 180 180 0n 36 360 3 0 1180 80n 560 q n2 4 4 u fraction frac fr acti tion on of of green gree gr eenn bu but buttons ttons 7 5 16 35 1 16 fraction of red buttons 1 5 35 12 35 1 16 12 7 : 16 : 12 : : 5 35 35 16 parts Æ 80 1 part Æ 5 35 parts Æ 175 80 amount borrowed u 90500 100 a S 3 b c 4 ai cross-multiply A1 m b LHS into a single fraction A1 ile 2 Remarks or bi Solution .s g x 3 2x 4 4 5 5 x 3 4 2x 4 20 3 x 31 20 3 x 31 ut Qn a T 1 M M1 A1 M1 A1 M1 A1 M1 A1 A1 M1 A1 Need a home tutor? Visit smiletutor.sg 86 $72400 total interest 72400 u aii M1 2 u3 100 M1 A1 $4344 total amount payable 72400 4344 $76744 76744 36 $2131.78 1850000 price in SGD 815.79 $2267.74 2 volume S 10 30 3000S cm3 2 6 u Sr 15 3000S r 5.7735 cm rej. -5.7735 5.77 (shown) length 5.7735 u 6 34.641 cm breadth 5.7735 u 4 23.094 cm M1 monthly instalment b c .s g a A1 B1 or 5 M1 M1 A A1 ut b A1 empty space (cross sectional)) 34.641 23.094 6 S 5.7735 171.681 cm2 2 @ ile T > M1 accept alternative method: A1 vol. of box 34.641u 23.094 u15 11999.99 cm3 [M1] S m 6881u 155 emptyy space in box 171.681 2575.2220 20 25800 cm3 (3 (3 s.f.) s.f. s. f.)) M1 M 6 ai gradient aii x 6 a iii area bi y B1 3 4 empty space 11999.99 3000S 2580 cm3 [A1] B1 M1 1 u 3u 8 2 12 units2 3 1§ 3· ¨ ¸2 1 4 3© 4¹ A1 B1 Need a home tutor? Visit smiletutor.sg 87 7 a 1 1 x 2 3 x 9 B1 B1 when y 1 , x 9 and not 7. base area 15 u 3 3 u 3 54 cm2 M1 perimeter of base 3 3 3 3 9 3 15 3 42 cm 42 10 area of lateral faces 42u 420 cm2 A1 M M1 1 2 36 km distance from Jurong to Changi 72 u ut b 420 2 u 54 528 cm2 M1 or S.A. .s g bii 36 77 36 36 1 36 2 77 7744.4416 16 km kkm/h m/h 7744 km km/h m/h (nearest (nea (n eare rest st km/h) km/h) T time taken for return trip a 7 12 22 5 2..5 x u 360 36 60 100 10 00 81 8 q fraction frac cti tion on of of sw sweets Bryan received 360 0 21 2 210 0 81 360 23 120 c no. of sweets in a box 9 a BC FE 55 12 11 32 cm A1 B1 S b M1 B1 210 360 m 8 ile average speed for the round trip M M1 M1 120 u 345 23 1800 A1 M1 Need a home tutor? Visit smiletutor.sg 88 length of arc CE perimeter 40 15 32 34.558 32 15 169 cm (3 s.f.) 1 40 22 12 372 cm2 area of trapezium 2 M1 area of rectangle 22 u 32 704 cm2 M1 area of semicircle a 1 2 u S 11 2 190.07 cm2 A1 M1 1 .07 1270 cm2 (3 s.f.) area 372 7044 190 Dine in 10.90 6.70 4.30 cost of food 13.50 7.90 1 $43.30 A1 or 10 M1 .s g b 1 u 2S 11 2 34.558 cm M M1 ut 43.3300 cost of food including service charge 1.1u 43 $47.6633 T cost of food including servi service vice charge and GST 1.07 u 47.63 $50.96 M1 M1 amount 50.96 46.33 $4.6633 A1 50 $50 50.96 96 $0.96 , Mrs Lee does not have Since $50 enough money en nou ough gh m oney on ey too dine din in with the purchase of the food items. item em ms. s I would wouuld su sug suggest ggest that she takeout her purchase. M1 m ile Takeout cost of of food including GST 1.0077 u 433.3300 $4466.3333 S b A1 Need a home tutor? Visit smiletutor.sg 89 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 90 East Spring Secondary School J Towards Excellence and Success Name : _____________________________________________________ ( ) Class : Sec 1-___ Second Semester Examination 2017 4016/1 .s g Mathematics Paper 1 Secondary 1 Express 1 hour 7.45 am – 8.45 am Additional materials: Nil INSTRUCTIONS TO CANDIDATES or Monday 9th Oct 2017 T Answer All questions. ut Write your name, class and register number in the spaces provided on the paper/answer booklet. ile All necessary working must be shown. Omission of essential working will result in loss of marks. ELECTRONIC CALCULATORS CAN BE USED IN THIS PAPER. m INFORMATION FOR CANDIDATES The number of mark is given in brackets [ ] at the end of each question or part question. You should not spend too much time on any one question. S The total marks for this paper is 40. If the degree of accuracy is not specified in the question and if the answer in not exact, the answer should be given to three significant figures. Answers in degrees should be given to one decimal place. For π, use either your calculator value or 3.142 unless the question requires the answer in terms of π. MARKS: 40 This question paper consists of 8 printed pages including the cover page. Need a home tutor? Visit smiletutor.sg 138 East Spring Secondary School Mathematics Department Do It Right. Always S1Ex Maths Paper 1 2017 2SE Mathematical Formulae Compound Interest r ⎞ ⎛ Total amount = P⎜ 1 + ⎟ ⎝ 100 ⎠ .s g Mensuration n Curve surface area of a cone = πrl Surface area of a sphere = 4πr 2 or 1 2 πr h 3 4 Volume of a sphere = πr 3 3 1 Volume of triangle ABC = absin C 2 Arc length = rθ , where θ is in radians T ut Volume of a cone = ile Area of sector = 1 2 r θ where θ is in radians 2 S m Trigonemetry a b c = = sin A sin B sinC a 2 = b 2 + c 2 − 2bc cos A Statistics Mean = ∑ fx ∑f Standard derivation = ∑ fx ∑f 2 ⎛ fx ⎞ −⎜∑ ⎟ ⎜∑f ⎟ ⎠ ⎝ 2 Need a home tutor? Visit smiletutor.sg 2SE 2017 1E MATHS P1 Towards Excellence and Success 139 2 East Spring Secondary School Mathematics Department Do It Right. Always S1Ex Maths Paper 1 2017 2SE Answer all questions. 1. Without using a calculator, estimate each of the following. (a) √ +√ .s g (b) × Use your calculator to find the value of [2] (b) _______________ [2] √ . × . . Give your answer . Ans: _______________ [2] ___________ m/s [2] ___________ m3 [2] Express each of the following in the respective units. m 3. ile T ut correct to 4 significant figures. _______________ or 2. Ans: (a) (a) km/h to m/s S (b) 2 400 000 cm3 to m3 Ans: (a) (b) Need a home tutor? Visit smiletutor.sg 2SE 2017 1E MATHS P1 Towards Excellence and Success 140 3 East Spring Secondary School Mathematics Department Do It Right. Always 4. S1Ex Maths Paper 1 2017 2SE Consider the following number sequence. − ,− , , , ,… (a) Write down the next two terms for the following sequence. (b) Express Find the 100th term. ut or .s g (c) in terms of . 5. ile T Ans: (a) _____ _____ [1] (b) _______________ [1] (c) _______________ [2] 3 drones can deliver 9 packages in 2 hours. Assuming that the packages are identical and the drones work at the same rate, how long will it take 5 drones to S m deliver 30 packages? Ans: _____________ hours [2] Need a home tutor? Visit smiletutor.sg 2SE 2017 1E MATHS P1 Towards Excellence and Success 141 4 East Spring Secondary School Mathematics Department Do It Right. Always 6. S1Ex Maths Paper 1 2017 2SE Clare needs to pack 108 chocolate chip cookies, 162 oatmeal cookies and 54 macadamia nut cookies into identical boxes so that each type of cookies is equally distributed. Find (a) the largest number of boxes that can be packed, ut or .s g (b) the total number of cookies in each box. Ans: (a) ___________boxes [2] Expand and simplify each of the following. ile 7. T (b) ___________cookies [1] (a) + + − − S m (b) − Ans: (a) _______________ [2] (b) _______________ [2] Need a home tutor? Visit smiletutor.sg 2SE 2017 1E MATHS P1 Towards Excellence and Success 142 5 East Spring Secondary School Mathematics Department Do It Right. Always 8. S1Ex Maths Paper 1 2017 2SE Factorise each of the following expressions completely. (a) − + .s g (b) − [1] (b) _______________ [1] or 9. Ans: (a) _______________ For the following figure, consisting of a trapezium and a circle, find the area of ut the shaded region, where O is the centre of the circle. 5 cm O 26 cm S m ile T 18 cm Ans: _______________ cm2 [3] Need a home tutor? Visit smiletutor.sg 2SE 2017 1E MATHS P1 Towards Excellence and Success 143 6 East Spring Secondary School Mathematics Department Do It Right. Always 10. S1Ex Maths Paper 1 2017 2SE In the given diagram, AB is parallel to CD and CG is parallel to BF, ∠ABF = 46° and ∠GCE = 108° . B A .s g D C or E F G ∠CED (b) ∠CDB (c) reflex ∠DCG S m ile T (a) ut State with reasons clearly, find the value of the following. Ans: (a) ______________° [2] (b) ______________° [2] (c) [3] ______________° Need a home tutor? Visit smiletutor.sg 2SE 2017 1E MATHS P1 Towards Excellence and Success 144 7 East Spring Secondary School Mathematics Department Do It Right. Always 11. S1Ex Maths Paper 1 2017 2SE The sum of the interior angles of a regular polygon is 1080°. Find the size or .s g of one exterior angle. ut Ans: ___________________ [3] 12. Emma and Rupert each conduct a survey among 100 people to find out their T most commonly used form of transportation. The information they gathered is ile shown in the table below. Rupert Car 67 9 Public Transport 26 71 Walking 7 20 m Emma Give two reasons to account for the differences in their results. [2] Reason 1: S Ans: _________________________________________________________ _________________________________________________________ _________________________________________________________ _________________________________________________________ Reason 2: _________________________________________________________ _________________________________________________________ _________________________________________________________ _________________________________________________________ – End of paper – 2SE 2017 1E MATHS P1 Need a home tutor? Visit smiletutor.sg Towards Excellence and Success 145 8 East Spring Secondary School J Towards Excellence and Success Name : _____________________________________________________ ( ) Class : Sec 1-___ Second Semester Examination 2017 .s g Secondary 1 Express 4016/2 Mathematics Paper 2 1 hour 15 minutes 10.05 am – 11.20 am or Monday 2nd October 2017 ut Additional materials: 3 sheets of writing paper , 1 sheet of blank paper and 1 sheet of graph paper READ THESE INSTRUCTIONS FIRST ile T Write your Name and Index Number on all the work you hand in. Write in dark blue or black pen. You may use a pencil for any diagrams or graphs. Do not use staples, paper clips, highlighters, glue or correction fluid. S m Answer all questions. If working is needed for any question, it must be shown with the answer. Omission of essential working will result in loss of marks. You are expected to use an electronic calculator to evaluate explicit numerical expressions. If the degree of accuracy is not specified in the question, and if the answer is not, give the exact answer to three significant figures. Give answers in degrees to one decimal place. For π, use either your calculator value or 3⋅142, unless the question requires the answer in term of π. At the end of the examination, fasten all your work securely together. The number of marks is given in brackets [ ] at the end of each question or part question. The total number of marks for this paper is 50. MARKS: 50 This question paper consists of 6 printed pages including the cover page. Need a home tutor? Visit smiletutor.sg 146 S m ile T ut or .s g East Spring Secondary School Mathematics Department Do It Right. Always 2SE 2017 1E MATHS P2 Need a home tutor? Visit smiletutor.sg Towards Excellence and Success 147 Page |2 East Spring Secondary School Mathematics Department Do It Right. Always (a) Solve the following equations. (i) − 13x − 3 + 5 x = 5 [2] (ii) 5x x + 2 − =5 2 3 [3] Solve the inequality 32 + 3 x ≤ 23 . [2] Hence, find the biggest possible value of x if x is an even number. [1] (b) (i) (ii) 2. .s g 1. Nathiel walks from home at a speed of 60 m/min to school at 0630 in the morning to school. After walking for 12 minutes he stopped by 7-eleven for 5 or minutes to buy some snacks. Nathiel then continues to walk at the same speed for another 8 minutes before reaching school. [2] ut (a) Express Nathiel’s walking speed in km/h. (b) What is the distance, in metres, of the school from his home? [1] (c) [2] What is the average speed, in m/min, of the whole journey? T (d) Allen cycles at a speed of 12 km/h from home which is 4 km away from [2] school. He leaves home at 0640 in the morning. Who will reach school 3. ile first, Nathiel or Allen? The diagram below is made up of a square, a regular pentagon and a regular m polygon of n sides. ABCDE shows part of the n-sided polygon. K S L M Find (a) ∠BCM [2] (b) the interior angle of n-sided polygon ∠BCD [2] (c) the number of sides n 2SE 2017 1E MATHS P2 [2] Need a home tutor? Visit smiletutor.sg Towards Excellence and Success 148 Page |3 East Spring Secondary School Mathematics Department Do It Right. Always 4. (a) The tickets to Thomas & Friends the Musical were sold at $30, $50 and $100. The number of $30-tickets sold was thrice the number of $50tickets. The number of $100-tickets sold was 100 less than the number of $50-tickets. The number of $50-tickets sold was x. The total number of the tickets sold were 2605. Write down an expression, in terms of x, for the total number of [1] .s g (i) tickets sold. (ii) Hence, find the value of x. (iii) The following year, the tickets to Thomas & Friends the Musical [1] [2] price for each ticket. or were sold at $33, $55 and $110. Find the percentage increase in ut (b) Selina Kyle, a cat burglar broke into Wayne Enterprise and stole a [2] diamond pendant worth 12 million dollars. She then sells the diamond pendant at 240% of the original value on the black market. Find the The price of My Melody figurine toy in the month of October was $m. [2] ile (c) T price of the diamond pendant on the black market. During a toy fair in November, the price increased by 25%. After the toy fair, the sales of the figurine dropped by 25% in March. After the m sales, did the price of the figurine dropped back to its original price? S Explain your answer. 2SE 2017 1E MATHS P2 Need a home tutor? Visit smiletutor.sg Towards Excellence and Success 149 Page |4 East Spring Secondary School Mathematics Department Do It Right. Always 5. The figure below shows a rectangular children’s swimming pool that is 15 m long, 8 m wide and 0.9 m deep. On one end of the pool, along the width, a flight .s g of three steps is built. Each step is 0.3 m in height and 0.4 m in width. Find the (a) depth of the swimming pool, [1] (b) volume of water needed to fill the pool [3] (c) [2] ut total surface area of the water in contact with the sides of the pool. T 6. or 0.9 Answer the whole of this question on the graph paper provided. ile Given the equation y = 2 x , 0 0 4 a 8 16 m x y (a) Find the value of a. [1] (b) Using a scale of 2 cm to represent 1 unit on the x-axis and 1 cm to [3] S represent 1 unit on the y-axis, draw the graph of y = 2 x for 0 ≤ x ≤ 8 . (c) From the graph, find the value of x when y = 5 . [1] (d) Find the gradient of the graph. [1] 2SE 2017 1E MATHS P2 Need a home tutor? Visit smiletutor.sg Towards Excellence and Success 150 Page |5 East Spring Secondary School Mathematics Department Do It Right. Always 7. Answer the whole of this question on the blank paper provided. Indiana Jeromes was looking for a treasure chest buried in a field ABCD. His father Benry decided to help him map out the dimensions of the field ABCD. The dimensions are as follow. AB = 9 cm, BC = 4 cm, AD = 7 cm, ∠ABC = 60° and ∠BAD = 90° (b) (i) Draw the angle bisector of ∠BAD , [4] .s g (a) Construct the quadrilateral field ABCD on your writing paper [2] (ii) Draw the perpendicular bisector of AB. (iii) The treasure chest is located at the intersection of the 2 [1] [2] S m ile T ut measure the length of BT. or bisectors. Label the location of the treasure chest as T and – END OF PAPER – Please check your work. 2SE 2017 1E MATHS P2 Need a home tutor? Visit smiletutor.sg Towards Excellence and Success 151 Page |6 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 152 East Spring Secondary School Mathematics Department Do It Right. Always S1Ex Maths Paper 1 2017 2SE MARK SCHEME √ +√ × . . =√ = . 3(a) /ℎ = = (b) × + ≈ = +√ = M1 A1 M1 A1 × M1 = 5.3396859… .s g 2 √ ≈ = A1 = 5.340 ℎ / = = = . 4(a) 19, 24 (b) T1 = 5(1) – 11 = -6 ÷ M1 1 ÷ ÷ A1 1 M1 A1 B1 Tn = 5n – 11 B1 T100 = 5(100) – 11 M1 m (c) ile T T2 = 5(2) – 11 = -1 × × × or (b) × ut 1(a) = 489 Drones e 3 5 5 S 5 A1 ECF Pack Pa Packages ckag ages e 9 15 30 Hours 2 2 4 M1 Answer : 4 6(a) (b) 2 3 3 3 108 54 18 6 2 A1 162 81 27 9 3 54 27 9 3 1 M1 HCF = 54 Total number of cookies in each box = 2 + 3 + 1 = 6 A1 B1 Need a home tutor? Visit smiletutor.sg 2SE 2017 1E MATHS P1 Towards Excellence and Success 153 9 East Spring Secondary School Mathematics Department Do It Right. Always 9 10 − − + = + + + − − = + = M1 + + A1 − − M1 A1 − = B1 B1 − + Area of Circle = = Area of trapezium = Area of shaded region = M1 M1 = . × = − . ≈ or 8(a) (b) = − A1 1 B ut (b) = − .s g 7(a) S1Ex Maths Paper 1 2017 2SE A ile T D m C S (b) ∠ 11 (alt (al altt ∠ , =∠ = ° (c) ∠ = = = =∠ = reflex ∠ °−∠ °− ° ° ° // M1 A1 = = (int ∠ , (alt ∠ , °− ° Sum of int. angles = − °= − × ° ° − = ° = + = 2SE 2017 1E MATHS P1 Deduct one mark overall if no reasons given. F G (a) ∠ E // M1 A1 // M1 M1 A1 ° (∠ × ° M1 M1 Need a home tutor? Visit smiletutor.sg Towards Excellence and Success 154 10 East Spring Secondary School Mathematics Department Do It Right. Always 12 1 ext. angle = = S1Ex Maths Paper 1 2017 2SE ° A1 ° Location: Emma conducted her survey near an office while Rupert was near a school/interchange. S m ile T ut or .s g People surveyed: Emma chose mostly working adults to survey while Rupert chose students. B1 for each correct reason, up to B2 Need a home tutor? Visit smiletutor.sg 2SE 2017 1E MATHS P1 Towards Excellence and Success 155 11 East Spring Secondary School Mathematics Department Do It Right. Always MARK SCHEME 1(a)(i) − 8x = 8 M1 A1 x = −1 .s g M1 M1 1 or (b)(i) 15 x 2 x + 4 − =5 6 6 15 x − 2 x − 4 =5 6 13x = 4 = 30 13x = 34 8 x=2 13 (or 2.62) ut (a)(ii) 3x ≤ −9 -4 2(a) 60m/min 3600m/hr 3.6 km/hr (b) 12+8 = 20 20 x 60 =1200m ile (b)(ii) T x ≤ −3 m (d) M1 A1 1 B1 M1 A1 B1 M1 1200 12 + 5 + 8 = 48m / m min in A1 S (c) A1 1 4 12 = 20 min i 60 × M1 0640 + 20 = 0700 3 Nathiel reached first (5-2)180 =540 A1 M1 540/5 A1 =108 2SE 2017 1E MATHS P2 Need a home tutor? Visit smiletutor.sg Towards Excellence and Success 156 Page |7 East Spring Secondary School Mathematics Department Do It Right. Always (b) 360 – 108 – 90 =162 (c) 180 – 162 =18 360/18 =20 M1 A1 3 x + x + x − 100 .s g 4(a) M1 A1 B1 5 x − 100 (iii) 3 × 100% 30 = 10% 10% same throughout 240 × 12 100 = 28.8million or 28800000 ile Nov toy price = 1.25m After discount =0.75 (1.25m) 0.9375m It became cheaper A1 M1 A1 M1 A1 m (c) M1 T b) B1 or 5 x − 100 = 2605 x = 541 ut (ii) 0.9m B1 (ii) Volume e off step steps epss in nw water ater at er = 0.3x 3x 0.4x 0.4 .4xx 3 x 8 2.88 M1 Volume off wa water w ter (13.8 x 8 x 0.9) – 2.88 =102.24 =102 24 M1 A1 S 5(a)) iii) Accept other ways: 1m for calculation of water above steps 1m for calculation of cuboid pool excluding steps 1m for final ans Surface are (14.6 x8) + 2(14.6 x 0.9- 0.3 x 0.4x 3) + 2(0.9 x 8) =157 (3sf) 2SE 2017 1E MATHS P2 M1 A1 Need a home tutor? Visit smiletutor.sg Towards Excellence and Success 157 Page |8 East Spring Secondary School Mathematics Department Do It Right. Always 6a) a=8 B1 d) 2 ut (c) 1m for correct plot with label 1m for correct scale x axis 1m for correct scale y axis x = 2 .5 or .s g (b) B1 1 S m ile T 7(a) B1 B1 2SE 2017 1E MATHS P2 Need a home tutor? Visit smiletutor.sg Towards Excellence and Success 158 Page |9 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 159 EAST VIEW SECONDARY SCHOOL SECOND SEMESTRAL EXAMINATION 2017 SECONDARY ONE EXPRESS CANDIDATE NAME CLASS INDEX NUMBER MATHEMATICS .s g 4048/02 Paper 2 11 October 2017 Total Marks: 50 1 Hours 15 Minutes READ THESE INSTRUCTIONS FIRST or Additional Materials: Writing Paper (4 sheets) and Graph Paper (1 sheet) ile Answer all questions. T ut Write your name, class and index number on all your answer sheets to be handed in. Write in dark blue or black pen. You may use a soft pencil for any diagrams, graphs or rough working. Do not use staples, paper clips, highlighters, glue or correction fluid. S m If working is needed for any question it must be shown with the answer. Omission of essential working will result in loss of marks. Calculators should be used where appropriate. If the degree of accuracy is not specified in the question, and if the answer is not exact, give the answer to three significant figures. Give answers in degrees to one decimal place. For S, use either your calculator value or 3.142, unless the question requires the answer in terms of S. At the end of the examination, fasten all your work securely together. The number of marks is given in brackets [ ] at the end of each question or part question. For Examiner’s Use This paper consists of 6 printed pages (including the cover page) 50 Setter: Mdm Humairah Need a home tutor? Visit smiletutor.sg 170 2 Mathematical Formulae Compound interest r · § Total amount = P ¨1 ¸ © 100 ¹ .s g Mensuration n Curved surface area of a cone = S rl Surface area of a sphere = 4S r 2 1 2 Sr h 3 or Volume of a cone = Volume of a sphere = 4 3 Sr 3 1 absin C 2 ut Area of triangle ABC Arc length = rT, where T is in radians T 1 2 r T , where T is in radians 2 m Trigonometry ile Sector area = a sin A a2 b sin B c sin C b 2 c 2 2bc cos A S Statistics Mean = ¦ fx ¦f Standard deviation = ¦ fx ¦f 2 § ¦ fx · ¨ ¨ ¦ f ¸¸ © ¹ 2 Need a home tutor? Visit smiletutor.sg 171 3 Answer all the questions. (a) Sarah buys the car on hire purchase. She pays a deposit of one fifth of the cash price. She then pays $1300 monthly for 10 years. What is the total amount that Sarah pays for the car? [3] (b) The original value of the car is its cash price of $175 000. Each year the value of the car decreases by 10% of its value at the start of the year. At the end of three years, Sarah decides to sell the car. Calculate the overall percentage reduction in the value of the car compared with its original value. [3] Marcus, Ali and Tan shared a sum of money in the ratio 11 : 4 : 1. (a) Given that Ali received $4.80 more than Tan, find the sum of money shared by the three of them. [2] (b) Marcus distributed part of his money equally to Ali and Tan and was left with $2.60. Find the new ratio of Marcus’s money to Ali’s money to Tan’s money. [3] S m ile T ut or 2 The cash price of a new car is $175 000. .s g 1 Need a home tutor? Visit smiletutor.sg 172 4 There are 16 adults and 10 children going to the Singapore Flyer. You are required to book taxis for them. Below is the taxi seating capacity given to you. At least one adult must accompany the children. ut or .s g 3 Source: https://www.cdgtaxi.com.sg/commuters_seating_capacity.mvn?cid=256 (b) There is a change of number of people going to the Singapore Flyer. An additional 4 adults and 2 children would like to go too. How many more taxis do you need to [2] book? [3] ile T What is the minimum number of taxis you need? Show all your working clearly. m Two different sizes of cylindrical fruit cans are shown below. The small can has a diameter of 12 cm and a height of 13 cm. The prices of the fruit cans are given on the respective cans. S 4 (a) LARGE SMALL $18.80 13 cm $4.80 11 310 cm3 12 cm (a) Find the volume of the small can. (b) Which size of canned fruit gives the better value? Show all the working clearly of [3] can. (c) What is the maximum number of small cans that can fit into a rectangular packaging of size 72 cm by 24 cm and height of 39 cm? [3] [2] Need a home tutor? Visit smiletutor.sg 173 5 (a) Express the number of apples in term of k. [1] (b) Express the number of oranges in term of k. [1] (c) [3] If there are a total of 35 fruits in the box, how many peaches are there in the box? [3] (e) [2] .s g (d) If the cost of a peach, an apple and an orange is $1.10, $0.20 and $0.50 respectively, what is the cost of one box of fruits? How many numbers of boxes of fruits can May purchase with $42? An aeroplane travelled a distance of 1130 km from Singapore to Jakarta. For the first x hour of its journey, the aeroplane travelled at a constant speed of 350 km/h. The speed x of the aeroplane was increased by 80 km/h for the remaining hour of its journey. 2 ut 6 There are 2(k – 3) peaches in a box. There are 3 more apples than peaches and twice as many oranges as peaches in the same box. or 5 T (a) Write down the total distance travelled for the first x hour of its journey, in terms of x. (b) Write down the distance travelled by the aeroplane in the remaining (c) ile journey, in terms of x. x hour of its 2 [1] [2] [3] (d) Find the average speed, in km/h, for the whole journey, correct to 2 decimal places. [2] S m Find the value of x. Hence, find the total time, in hours, taken for the whole journey. Need a home tutor? Visit smiletutor.sg 174 6 7 Answer the whole of this question on a sheet of graph paper. The variables x and y are connected by the equation y 2 2x . Some corresponding values of x and y, are given in the table below. 2 1 0 y p 4 2 1 2 .s g x q 2 Calculate the value of p and of q. (b) Using a scale of 2 cm to 1 unit for the y-axis and 4 cm to 1 unit for the x-axis, draw the graph y 2 2 x for 2 d x d 2 . [3] (c) Using your graph, find the value of x when y (d) On the same axes, draw the line x = 1.5 . Find the coordinates of the point of [2] intersection of the two lines. or (a) [1] T ut 3.5 . [2] S m ile --- End of Paper --- Need a home tutor? Visit smiletutor.sg 175 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 176 3 Answer all the questions. 1 (a) Consider the following numbers. 64, 2 , 121, 5 1.2, 79, 2 .s g Write down the prime number. Answer (a) By rounding each number to 1 significant figure, estimat estimate atte th thee vvalue aluee of or (b) 79 ……………………… [1] 251.76 . 22.65 .65 3.295 ile T 300 [ M 1] 33 ut You must show your working clearly. Answer A nswer (b) ns 50 ……………………… [2] 2 m _________________________________________________________________________________ ___________________________________ _____________________________________________ The first four terms ter erms m of of a sequence seequ q en ence ce are are 12, 12, 15, 18, 21 …… he 6th term. term te m. Write down the S (a) Answer (a) (b) 27 6th term = ……………… [1] i down d h generall term, Tn for f the h sequence. Write the 3n + 9 [1] Answer (b) Tn = …….....…………….. _________________________________________________________________________________ Need a home tutor? Visit smiletutor.sg 177 4 3 When written as the product of their prime factors, p 23 u 3n , q 52 u133 , r 23 u 5 u 7 2 . the value of the n if the cube root of p is 2 u 32 , or (a) .s g Find Answer (a) [1] rimee ffactors, prod pr oduc od du ucct of of iits tss pprime acto ac tors to r, rs the LCM of q and r, giving your answer as the product An nswer (b) Answer 23 u 52 u 7 2 u133 ……………………… [1] 5 ……………………… [1] the greatest st nnumber umbe um b r th hat w illl di divide q and r exactly. that will S m (c) ile T ut (b) 6 n = …………………… …………… ………… …… ……… …… Answer (c) _________________________________________________________________________________ Need a home tutor? Visit smiletutor.sg 178 5 4 (a) Jordan took two tests. In a second test, Jordan scored 18 marks. The second test mark is an improvement of 20% of the first test mark. Find Jordan’s first test mark. .s g [ M 1] or 18 1.2 [2] Convert 56 m/s to km/h. ile T (b) 115 5 …… marks ……… …… …………………… ………… ………… ut Answer (a) m Answer (b) [1] Giv ven that tha h t the th he ra rate te of of ex eexchange change between Euro and Singapore dollars is €1 = S$1.59. Given S (c) 201.6 …………………… km/h Find nd d tthe he amount amo moun u t of Euro dollars one can receive from S$300. Give your answer to 2 decimal places. Answer (c) 188.70 …………………… Euros [1] _________________________________________________________________________________ Need a home tutor? Visit smiletutor.sg 179 6 5 Given that x b b 2 4ac , 2a find the value of x when a = 4, b = –2 and c = –3. Give your answer to 3 decimal places. 2 2 4 4 3 2 4 [ M 1] .s g x 2 1.151 or = ………..………………….. Answerr x = …… ……… …… …… …… ..…… …… ….. [2] _________________________________________________________________________________ _____________________________________________________ ____ ____ ___ ______ ___ ____ ____ _________ 6 nd CEF nd 42q aand CE C EF 136q . m ile T ut In the diagram below, AB // CD // EF. ABC ABC Find BCD , S (a) (b) (c) Answer (a) 42 BCD = ……………… [1] Answer (b) 44 DCE = ……………… [1] o DCE , o the reflex BCE . Answer (c) reflex BCE o 274 …..……… [1] _________________________________________________________________________________ Need a home tutor? Visit smiletutor.sg 180 7 7 In the trapezium ABCD, AB // DC, AD is perpendicular to DC, AB = 14 cm, BC = 18 cm, CD = 26 cm and AD = 15 cm. 14 cm A B D Find the area of trapezium ABCD. > M 1@ T ut 1 14 26 15 2 C or 26 cm .s g 18 cm 15 cm 300 8 ile An Answer nsw swer e ………………………… cm2 [2] _________________________________________________________________________________ ______________________________________ _ ________ ____ ____ ____ ____________________________ Solve solution l tiion on on a number nu line. 2 2 x 10 d 4 and show the solu S m 22 x d 6 xx d 3 [ M 11]] x t 3 [ M 11]] x t 3 [A1] x –3 0 [3] _________________________________________________________________________________ Need a home tutor? Visit smiletutor.sg 181 8 9 (a) Using the line segment given below, AC, construct a triangle ABC, such that ile T ut or .s g BC = 10 cm and BAC = 40°. C [2] m A S On the same diagram, m (b) cons construct nstr truc uctt thee angle a gle bisector of ACB. an [1] (c) construc construct uctt the perpendicular bisector of AC. [1] _________________________________________________________________________________ Need a home tutor? Visit smiletutor.sg 182 9 10 (a) Factorise 8cd – 2cd 2 completely. 2cd ( 4 – d ) Answer (a) ..…………….....……………….. [1] Simplify S p y 3 – 3(2x ( – 3)) . .s g (b) 3 6 x 9 [ M 1] 1122 – 66x x Simplify 2x 1 x 3 . 3 2 ut (c) or Answer (b) ..…………….....……………….. ..………… ……… …… ….....… ……………….. [2] T 4 x 2 3x 9 [ M 1] 6 ile x 11 6 m Answer A An swer sw e (c) ..………..............................…….. [2] _________________________________________________________________________________ ________________________________ _ __ ____ ____ ____ _________ _ ________________________________ S 11 (a) 2 x2 x5 4 x4 Simplify Simpliify completely. u 2 2x2 x 4 x5 x2 2 x4 u x2 x5 [ M 1] 2 x2 x4 x2 x 5 Answer (a) ..…………….....……………….. [2] Need a home tutor? Visit smiletutor.sg 183 10 (b) Simplify 8x2 2x2 y completely. 2 5 x7 x7 x7 2 x7 x7 8x2 u 5 x7 2 x2 [ M 1] .s g 4 x7 x7 5 Answer (b) ..…………….....……………….. [2] _________________________________________________________________________________ ____________________________________________________________ ___ _ ____ _____________ or Express 35 m2 in cm2. ut 12 (a) 350 3 50 00 000 00 (b) T ……. … ....…………… cm2 [1] Answer (a) ..………… ..…………….....…………… The ratios of a : b and a : c are given g ven below. gi ile a : b = 2:3 a : c = 3:5 S m Find the ratio rat a io off a : b : c. c. 6 : 9 : 10 [B2] Answer (b) ...……… : ..….…… : ..…….… [2] _________________________________________________________________________________ Need a home tutor? Visit smiletutor.sg 184 11 13 The diagram below shows a straight line. y 16 14 12 8 6 4 2 4 6 8 100 12 14 16 1 x or 2 Find the gradient of this straight line. (b) ( ) (b T ut (a) ile 0 .s g 10 00.5 5 Answer Answ An wer e (a) (a) gradient = .....……………….. mx c , where m is S m Write down the equation equ q ation n of tthis hiss straight hi straig i ht line in the form y the gradient grad a ientt ooff th the li line, ine ne,, and and c is its y-intercept. [1] 0.5x + 8 Answer (b) y = .....………….............…….. [1] _________________________________________________________________________________ End of Paper Need a home tutor? Visit smiletutor.sg 185 EAST VIEW SECONDARY SCHOOL SECOND SEMESTRAL EXAMINATION 2017 SECONDARY ONE EXPRESS CANDIDATE NAME MARKING SCHEME CLASS INDEX NUMBER .s g MATHEMATICS Paper 2 4048/02 13 Octoberr 2017 201 Total otal Marks: 50 1 Hour Hours urs 15 Minutes ur Minute ut READ THESE INSTRUCTIONS FIRST or Additional Materials: Writing Paper (4 sheets) and Graph Paper (1 sheet) she heet et)) et ile Answer all questions. T Write your name, class and index number on all your answer an nsw we err sheets sh he eet ets to o be be handed ha and nded ed in. Write in dark blue or black pen. diag rough working You may use a soft pencil for any diagrams, gra r ms, graphs or rou o gh working. g. Do not use staples, paper clips, highlighters, glue or correction corre r ction fluid. S m Iff working is needed for any question it must mus ustt be shown sho hown wn n with the answer. Omission of essential working will result resul ultt in loss loss s of marks. Calculators Calculat attors should be used ussed e where whe h re ea appropriate. ppro pp ro opr pria i te. Iff the degree of accuracy give accurrac acyy is not specified spe peci cifi fied ed in the question, and if the answer is not exact, giv the figures. he answer to three significant sign si gnifican antt fi figu gure res. s Give answers in degrees to one decimal place. For or S, use either your you ourr calculator calc ca lcul ulat ator or value value or 3.142, unless the question requires the answer in i erms of S. terms At the end of the examination, exxam amin ination, fasten all your work securely together. The he number of marks is given in brackets [ ] at the end of each question or part question. For Examiner’s Use This paper consists of 6 printed pages (including the cover page) 50 Setter: Mdm Humairah Need a home tutor? Visit smiletutor.sg 186 2 Mathematical Formulae Compound interest r · § Total amount = P ¨1 ¸ © 100 ¹ .s g Mensuration n Curved surface area of a cone = S rl Surface area of a sphere = 4S r 2 1 2 Sr h 3 or Volume of a cone = Volume of a sphere = 4 3 Sr 3 1 absin ab C 2 ut Area of triangle ABC Arc lengthh = rT, where T is inn radians T 1 2 n ra radi radians d ans r T , where T is in 2 m Trigonometry ile Sector area = a sin si nA a2 b sin in B c sin C b 2 c 2 2bc cos A S Statistics Mean = ¦ fx ¦f Standard deviation = ¦ fx ¦f 2 § ¦ fx · ¨ ¨ ¦ f ¸¸ © ¹ 2 Need a home tutor? Visit smiletutor.sg 187 3 Answer all the questions. (a) Sarah buys the car on hire purchase. She pays a deposit of one fifth of the cash price. She then pays $1300 monthly for 10 years. What is the total amount that Sarah pays for the car? [3] (b) The original value of the car is its cash price of $175 000. Each year the value of the car decreases by 10% of its value at the start of the year. At the end of three yyears,, Sarah decides to sell the car. Calculate the overall ppercentage g reduction in the value of the car compared with its original value. [3] Answer 1 Deposit = $175000 u = $35000 5 Total monthly for 10 years = $1300 u 12 u 10 $156000 Total amount that Sarah pays for the car $35000 $156000 $191000 Mark Marker Mark Ma r er Report [M1] 1] [M1] [M 1] ut or S/N 1(a) The cash price of a new car is $175 000. .s g 1 [M1] [M1] [A1] S m ile T 1(b) At first year = $175000 At second year = $175000 u 0.9 $157500 At third year = $157500 u 0.9 $14 41750 141750 Reduction price = $175000 $141750 $33250 33250 Percentage reduction = u 100% 1 199% 175000 [A1] [[A A1] 1] Need a home tutor? Visit smiletutor.sg 188 4 Marcus, Ali and Tan shared a sum of money in the ratio 11 : 4 : 1. (a) Given that Ali received $4.80 more than Tan, find the sum of money shared by the three of them. [2] (b) Marcus distributed part of his money equally to Ali and Tan and was left with $2.60. Find the new ratio of Marcus’s money to Ali’s money to Tan’s money. [3] S/N 2(a) Marcus : Ali : Tan 11 : 4 :1 Answer 4-1 = 3 3 units = $4.80 1 unit = $4.80 y 3 $1.60 11+4+1 = 16 16 units = $1.60 u 16 $25.60 Mark Marker Report p .s g 2 or 1] [M1] [A1] [[A A1] 1] 2(b) At first, ile T Marcus = $1.60 u 11 $17.60 $17.60 $2.60 $15.00 $15.00 y 2 $7.50 ut The sum of money shared by the three of them is $25.60. $25. 5 60 5. 60. Ali and Tan received $7.50 each. Ali = ($1.60 u 4) $7.50 $13.90 Tan = $1.60 $7.50 $9.10 Marcus : Ali : Ta Tan n 2.60 : 13.90 : 9.10 26 : 139 : 991 1 [M1] m [M1] S [A1] Need a home tutor? Visit smiletutor.sg 189 5 There are 16 adults and 10 children going to the Singapore Flyer. You are required to book taxis for them. Below is the taxi seating capacity given to you. At least one adult must accompany the children. ut or .s g 3 What is the minimum number of taxis you need? Show ow all you your ur working wo clearly. (b) There is a change of number of peopl people ple going going too the the Singapore Sing Si ngapore Flyer. 4 adults and 2 children would like to go too. How How m many a y more an moree taxis tax axiis do d you need to book? [2] ile T (a) m S/N Answer Mark er 3(a) Note: We cannot take one child oonly nly nl y as w wee do not know how ho ow the seating capacity capa paciity ffor o onee child or chi hild ld tto o how many adults. Child cannot go o al aalone onee mu m must st be be accompany acco ac comp mpan any by an adult. S Child 4 4 2 0 0 0 10 Adul Ad Adult ultt 1 1 3 4 4 3 16 Taxi 1 1 1 1 1 1 6 [3] Marker Report [B3] or 6 is the minimum number of taxi needed. Need a home tutor? Visit smiletutor.sg 190 6 Adult 3 3 3 3 3 1 16 Taxi 1 1 1 1 1 1 6 6 is the minimum number of taxi needed. or Taxi 1 1 1 1 1 1 6 or Adult 3 3 3 3 2 2 16 ut Child 2 2 2 2 1 1 10 .s g Child 2 2 2 2 2 0 10 Adult 1 1 3 4 4 4 3 20 Taxi Ta x 1 1 1 1 1 1 1 7 Adult 3 3 3 3 3 3 2 20 Taxi 1 1 1 1 1 1 1 7 ile Child 4 4 2 0 0 0 2 12 S m 3(b) T 6 is the minimum number of taxi needed. neeed e ed. [B2] 7–6=1 1 more taxi needed. need eded ed. or Child 2 2 2 2 2 2 0 12 Need a home tutor? Visit smiletutor.sg 7–6=1 191 7 1 more taxi needed. Child 2 2 2 2 2 2 0 12 Adult 3 3 3 3 3 3 2 20 Taxi 1 1 1 1 1 1 1 7 S m ile T ut or 7–6=1 1 more taxi needed. .s g or Need a home tutor? Visit smiletutor.sg 192 8 4 Two different sizes of cylindrical fruit cans are shown below. The small can has a diameter of 12 cm and a height of 13 cm. The prices of the fruit cans are given on the respective cans. LARGE SMALL $18.80 13 cm 11 310 cm3 .s g $4.80 12 cm (a) Find the volume of the small can. (b) working Which size of canned fruit gives the better value? Show all thee wo work rkin rk ing in g clearly of [3] can. (c) What is the maximum number of small cans that thaat can can fit ca fit iin fi nto a rectangular rec ecta tang ta gular into [3] packaging of size 72 cm by 24 cm and height of 339 9 cm ccm? m? ut or [2] [M1] 4(b) Small can per cm c 3 = $4.80 y 1470.265 26 65 $$0 0.003264717 0032 3264 6471 7 7 71 3 Large can per cm = $18.80 80 y 11310 11310 $0 $0.001662245 0016 00 1662 6 24 62 245 5 [M1] [M1] La arge can gives the better value based bas ased ed d oon n per cm3. Large [A1] T Answer S/N 4(a) Volume of the small can = S u r 2 u h = S u (6) 2 u 13 = 1470.265 cm3 = 1470 cm3 Mark Mark k Marker Mark Ma rker Report rk m ile [A1] [B2] 6×2×3 = 36 [A1] S 4(c) 72 y 122 6 24 y 12 2 2 39 y 13 13 3 36 cans is the maximum number to fit into a rectangular packaging. k i Need a home tutor? Visit smiletutor.sg 193 9 There are 2(k – 3) peaches in a box. There are 3 more apples than peaches and twice as many oranges as peaches in the same box. (a) Express the number of apples in term of k. [1] (b) Express the number of oranges in term of k. [1] (c) [3] If there are a total of 35 fruits in the box, how many peaches are there in the box? [3] (e) [2] .s g ( ) If the cost of a ppeach,, an apple pp and an orange g is $1.10,, $0.20 and $0.50 (d) respectively, what is the cost of one box of fruits? How many numbers of boxes of fruits can May purchase with $42?? S/N Answer 5(a) peaches = 2(k 33)) 2k 6 apples = 2(k 3) 3 2k 6 3 2k 3 5(b) oranges = 2(2k 6) 35 [B1] [[B B1 1]] [M1] k k ile T 12) 5(c) (2k 6) (2k 3) (4k 12) 2k 6 2k 3 4k 12 35 8k 21 35 8k 35 21 8k 56 Marker Marker Report [B1] [B B1]] ut 4k 12 Mark rk k or 5 56 y 8 7 2( 7 ) 6 8 [A1] 2(7) 3 11 [M1] m peaches peeaches = 2k 6 5(d) apples = 2k 3 [M1] S oranges = 4k 112 2 4(7) 1122 16 [M1] total cost for oone ne bbox ox = 8(1.10) 11(0.20 20) 16(0.50) 5(e) $42.00 y $19.00 2 $19.00 [A1] [M1] 4 19 2 number of boxes that May is able to purchase with $42. [A1] Need a home tutor? Visit smiletutor.sg 194 10 6 An aeroplane travelled a distance of 1130 km from Singapore to Jakarta. For the first x hour of its journey, the aeroplane travelled at a constant speed of 350 km/h. The speed x of the aeroplane was increased by 80 km/h for the remaining hour of its journey. 2 (a) Write down the total distance travelled for the first x hour of its journey, in terms of x. terms of x. n for th the whole Find the value of x. Hence, find the total time, in hours, taken journey. or (c) x hour of its journey, in 2 .s g (b) Write down the distance travelled by the aeroplane in the (d) Find the average speed, in km/h, for the whole journey, journ ney ey,, correct corr co rrrect to rre o 2 ddecimal ecim ec imal im places. Answer ut S/N 6(a) First part of journey T Speed = 350 km/h Time taken = x hour ile Total distance travelled = 350x km Mark Ma M arrk k [1] [2] [3] [2] Marker Mark Ma rker rk err Report [B1] 6(b) Second part of jjourney ourney m Speed = 350 + 80 = 430 km/h Time taken = x/2 hour travelled Total distance tra rave vell lled = 430 430 u 215 x km S 11 130 6(c) 350 x 215 x 1130 565 x 1130 0 x 2 1 x 2 [M1] x 1 x 2 1 2 (2) 2 [A1] [M1] [M1] 3 Total time taken for the whole journey = 3 hours 6(d) Average speed for the whole journey 1130 3 2 376 km/h 3 = 376.67 km/h [A1] [M1] [A1] Need a home tutor? Visit smiletutor.sg 195 11 7 Answer the whole of this question on a sheet of graph paper. The variables x and y are connected by the equation y 2 2x . Some corresponding values of x and y, are given in the table below. 2 1 0 1 2 y p 4 2 q 2 .s g x Calculate the value of p and of q. (b) Using a scale of 2 cm to 1 unit for the y-axis and 4 cm to 1 unit forr the x-axis, th x-ax ax axis, x draw the graph y 2 2 x for 2 d x d 2 . [3] (c) Using your graph, find the value of x when y (d) On the same axes, draw the line x = 1.5 . Find the th he coordinates coo co orrd diina nattes off tthe he ppoint o nt of oi [2] intersection of the two lines. or (a) [1] ut 3.5 . [2] S m ile T --- End of Paper --- Need a home tutor? Visit smiletutor.sg 196 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 197 JUNYUAN SECONDARY SCHOOL END OF YEAR EXAMINATION 2017 SECONDARY ONE EXPRESS CANDIDATE NAME INDEX NUMBER .s g CLASS MATHEMATICS 9 October 2017 Candidates answer on the Question Paper. ut READ THESE INSTRUCTIONS FIRST 1 hour or Paper 1 4048/01 ile Answer all questions. T Write your name, class and index number on all the work you hand in. Write in dark blue or black pen. You may use an HB pencil for any diagrams or graphs. Do not use paper clips, highlighters, glue or correction fluid. If working is needed for any question it must be shown with the answer. Omission of essential working will result in loss of marks. m The use of calculator is not allowed for this paper. S At the end of the examination, fasten all your work securely together. The number of marks is given in brackets [ ] at the end of each question or part question. The total of the marks for this paper is 50. For Examiner’s Use This document consists of 12 printed pages (including the Cover Sheet). [Turn over Need a home tutor? Visit smiletutor.sg 198 2 Mathematical Formulae Compound interest r · § Total amount = P ¨1 ¸ © 100 ¹ n .s g Mensuration Curved surface area of a cone = Srl Surface area of a sphere = 4Sr2 Volume of a cone = 1 Sr2h 3 or Volume of a sphere = 4 Sr3 3 1 ab sin C 2 ut Area of triangle ABC = Arc length = rT, where T is in radians 1 2 r T, where T is in radians 2 Trigonometry ile T Sector area = m a b c = = sin A sin B sin C a2 = b2 + c2 2bc cos A S Statistics Mean = ¦ fx ¦f Standard deviation = ¦ fx ¦f 2 § ¦ fx · ¸ ¨ ¨¦f ¸ © ¹ 2 1E Math P1 2017 EOY Need a home tutor? Visit smiletutor.sg 199 3 1 The numbers 540 and 7056, written as a product of their prime factors, are 540 2 2 u 3a u 5 and 7056 2 4 u 32 u 7 2 . Find the value of a, .s g (a) 2 7056 . Answer ...............................................[1] m Factorise completely 4ax 12by 16ay 3bx . S 2 ile T ut (b) or Answer a = ........................................ [1] Answer ............................................... [2] [Turn over 1E Math P1 2017 EOY Need a home tutor? Visit smiletutor.sg 200 4 3 (a) Express 23 % as a decimal. 100 Answer .............................................. [1] Arrange the following in ascending order. 1 4 0.4 2 44% or 0.4 .s g (b) A Singapore twenty-cents coin has a diameter of 21 mm. A British five-pence coin has a diameter of 18 mm. Shannon placed one row of twenty-cent coins and one row of five-pence coins on the table as shown below. . . . . . . . . S m ile T 4 ut Answer ......... . .......... , ......... , ......... [2] smallest largest Finding the minimum number of coins in each row such that the two rows are of the same length. Answer ............... twenty-cents coins .................. five-pence coins [3] 1E Math P1 2017 EOY Need a home tutor? Visit smiletutor.sg 201 5 Keith keeps track of his monthly business profits and losses over a period of five months given in the table below. Month April May June July August Find his total losses from April to August. or (a) Profit í$2800 í$1200 $900 $1500 $1000 .s g 5 Answer $.............................................[1] ut If he makes a total profit of $2000 from April to September, what is his profit for September? 6 ile T (b) Answer $.............................................[2] Mr Tan is presently 4 times as old as his son Kenneth. If Kenneth is x years old now, write down Mr Tan’s age in terms of x. S m (a) (b) Answer .............................. years old [1] In 20 years’ time, Mr Tan will be 2 times as old as Kenneth. Form an equation in x, and hence find Mr Tan’s age in 20 years’ time? Answer .............................. years old [2] [Turn over 1E Math P1 2017 EOY Need a home tutor? Visit smiletutor.sg 202 6 7 The figure below shows a trapezium PQST. 14 cm O Q 2 cm T R A B PT is the diameter of a circle with centre O. PT = 14 cm, QA = BS = 2 cm. S or 22 . 7 2 cm S m ile T ut Find the area of the shaded region. Take S .s g P Answer ...................................... cm2 [3] 1E Math P1 2017 EOY Need a home tutor? Visit smiletutor.sg 203 7 1 h to cycle from her house to the library at a speed of 12 km/h. 3 Upon reaching the library, she suddenly remembered that she has forgotten to feed her cat. She rushed home at double the speed which she cycled from her house to the library. Emilia took (a) Find the distance between Emilia’s house and the library. .s g 8 Answer ....................................... km [1] Find the average speed for Emilia’s entire journey. ut or (b) Solve the inequality 3 x 16 t 5 x 24 . ile (a) m 9 T Answer .................................... km/h [2] S Answer .............................................. [2] (b) Hence, write down (i) the smallest odd number, Answer .............................................. [1] (ii) the smallest prime number. Answer .............................................. [1] [Turn over 1E Math P1 2017 EOY Need a home tutor? Visit smiletutor.sg 204 8 10 At a bakery, the prices of a plain waffle and a peanut butter waffle are in the ratio 5 : 6. Given that the prices of a plain waffle and a chocolate waffle are in the ratio 3 : 4, find the ratio of the price of a peanut butter waffle to the price of a chocolate waffle. Give your answer in the simplest form. ut or .s g (a) Answer ..................... : ...................... [2] The difference in price between the plain waffle and the peanut butter waffle is $0.30. T (b) S m ile Find the price of a peanut butter waffle. Answer $.............................................[2] 1E Math P1 2017 EOY Need a home tutor? Visit smiletutor.sg 205 9 (a) Solve the equation 4 x 5 3(3 2 x) . 3n m 2n m . 4 3 T Simplify Answer x = ........................................ [2] S m ile (b) ut or .s g 11 Answer .............................................. [2] [Turn over 1E Math P1 2017 EOY Need a home tutor? Visit smiletutor.sg 206 10 12 (a) Find the value of x in the diagram shown below. x° 100° 135° .s g 85° or 70° Answer x = ........................................ [2] In the diagram, lines AB, DE and FCG are parallel. ABC 84q and BCD 39q . C T F ut (b) ile 39° A G D 84° 3x° E S m B Find the value of x, stating all reasons clearly. Answer x = ........................................ [3] 1E Math P1 2017 EOY Need a home tutor? Visit smiletutor.sg 207 11 The birth weight of a newborn baby girl is 2 800 g. During the first year, her weight increases by 480 g every month. (a) Write down her weight when she is (i) 1 month old, .s g 13 Answer ........................................... g [1] 2 months old. or (ii) Answer ........................................... g [1] ut Find an expression for her weight when she is n months old. Answer ........................................... g [1] If the girl weighs 8.0 kg when she is m months old, find the value of m. S m (c) ile T (b) Answer m = ....................................... [1] (d) Explain why the expression in (b) is not used to find the weight of the girl when she is 10 years old. Answer............................................................................................................................... ............................................................................................................................ [1] 1E Math P1 2017 MYE Need a home tutor? Visit smiletutor.sg 208 12 14 In the diagram below, the points A and B DUH í DQG UHVSHFWLYHO\ Answer (b) and (c) y .s g 6 B 4 0 2 4 6 ut 2 or 2 x T A 2 AB Find the gradient of the line AB. m (a) ile 4 Answer .............................................. [1] On the same diagram, draw the lines y = 2 and x = 6. (c) Point C is the point of intersection between the lines y = 2 and x = 6. S (b) Mark and label point C on the diagram. (d) [2] [1] Hence, calculate the area of triangle ABC . End of Paper Answer ..................................... unit2 [2] 1E Math P1 2017 EOY Need a home tutor? Visit smiletutor.sg 209 JUNYUAN SECONDARY SCHOOL END OF YEAR EXAMINATION 2017 SECONDARY ONE EXPRESS CANDIDATE NAME INDEX NUMBER .s g CLASS MATHEMATICS 4048/02 Paper 2 13 October 2017 Additional Materials: Writing paper (6 sheets) Graph paper (1 sheet) 1 String ut READ THESE INSTRUCTIONS FIRST or 1 hour 30 minutes T Write your name, class and index number on all the work you hand in. Write in dark blue or black pen on both sides of the paper. You may use an HB pencil for any diagrams or graphs. Do not use paper clips, highlighters, glue or correction fluid. m ile Answer all questions. If working is needed for any question it must be shown with the answer. Omission of essential working will result in loss of marks. The use of an approved scientific calculator is expected, where appropriate. If the degree of accuracy is not specified in the question, and if the answer is not exact, give the answer to three significant figures. Give answers in degrees to one decimal place. For S, use either your calculator value or 3.142, unless the question requires the answer in terms of S. S At the end of the examination, fasten all your work securely together. The number of marks is given in brackets [ ] at the end of each question or part question. The total number of marks for this paper is 50. Hand in your question paper and answer scripts SEPARATELY. This document consists of 6 printed pages (including the Cover Sheet). [Turn Over Need a home tutor? Visit smiletutor.sg 210 2 Mathematical Formulae Compound interest r · § Total amount = P¨1 ¸ © 100 ¹ n Mensuration .s g Curved surface area of a cone = Srl Surface area of a sphere = 4Sr2 Volume of a cone = 1 2 Sr h 3 4 3 Sr 3 or Volume of a sphere = 1 ab sin C 2 ut Area of triangle ABC = Arc length = Uș, where ș is in radians 1 2 r T , where ș is in radians 2 ile Trigonometry T Sector area = a sin A m a2 b sin B c sin C b 2 c 2 2bc cos A S Statistics Mean = ¦ fx ¦f Standard deviation = 1E Math P2 2017 EOY ¦ fx 2 § ¦ fx · ¸¸ ¨¨ ¦f ©¦f ¹ 2 Need a home tutor? Visit smiletutor.sg 211 3 2 (a) Express 1296 as a product of its prime factors. [1] (b) Find the largest integer, which is both a factor of 1296 and 672. [2] The diagram below shows a 5-sided polygon. AB is parallel to DE, and AE is parallel to BC. BAE 4 xq , BCD 134q and CDE (5 x 18)q . Find the value of x. B [3] C (5x + 18)° D 4x° The diagram shows a sequence of figures formed by matchsticks, where n is the figure number. S m 3 E ile T A ut or 134° .s g 1 n=1 n=2 n=3 (a) Draw the figure for n = 4. [1] (b) If Tn is the number of matchsticks in the nth figure, state T1 , T2 , T3 and T4 . [2] (c) Hence, or otherwise, find the general term Tn in terms of n. [1] (d) Explain why 99 could not be a possible number for Tn . [1] Need a home tutor? Visit [Turn smiletutor.sg Over 1E Math P2 2017 EOY 212 4 4 2 , b 1 and c 2 27 , evaluate b 2 3a 3 3 c . 64 (a) Given that a (b) (i) Solve the inequality 3x 1 d (ii) Illustrate your solution in (b)(i) on a number line. [1] 3x 7 . 2 [3] [1] (iii) Find the smallest value of x 2 . .s g A stack of ten $1 coins forms a cylinder of base diameter x cm and height 2.5 cm. or 5 [1] ut 2.5 cm x cm If the volume of the stack is 11.9 cm3, find x. (b) Find the total surface area of the stack. (c) If six more of the identical $1 coins are added to the stack, find the percentage increase of the total surface area of the stack. [3] T [2] ile [2] m In a chemical reaction, the volume V cm3 of a crystal at time t minutes is given by the function 4V 3t 8 for 0 d t d 8 . The table below shows some corresponding values of t and V. t / min 0 1 2 3 4 5 6 7 8 V / cm3 2 2.75 3.5 4.25 5 5.75 6.5 7.25 8 S 6 (a) (a) Using a scale of 2 cm to 1 unit on both t- and V-axes, draw the graph of 4V for 0 d t d 8 . (b) Using your graph, find the time that the volume of the crystal is 5.5 cm3. [1] (c) (i) Find the gradient of the graph. [2] (ii) Suggest a physical meaning of the gradient in this graph. [1] (d) Suggest what the V-intercept represents in this graph. 3t 8 [2] [1] Need a home tutor? Visit smiletutor.sg 1E Math P2 2017 EOY 213 5 7 The picture below shows the national flag of Bahamas. ABCD is a rectangle, CDRQ and ABPS are identical trapeziums and ADT is an equilateral triangle. D C R Q T P S B The ratio of AB to BC is 3 : 2, BP = It is given that AB = 54 cm. .s g A 4 1 BC and QR = CD. 3 5 Find the lengths of BC, BP and QR. (b) Find the area of CDRQ. (c) Find the ratio of the area of CDRQ to the area of the flag. [2] (d) If the area of PQRTS is 216 cm2, find the height of the triangle ADT. [2] [3] [1] S m ile T ut or (a) Need a home tutor? Visit [Turn smiletutor.sg Over 1E Math P2 2017 EOY 214 6 The table below shows the pricing of three taxi companies in Singapore. GrabCar Economy Basic fare: $3.00 Every kilometer or less: $0.80 Uber X Basic fare: $3.00 Every kilometer or less: $0.45 Per minute: $0.20 (a) 1km or less: $3.20 Every 400 m thereafter or less up to 10 km: $0.22 Every 300 m thereafter or less up to 10 km: $0.22 Every 45 seconds of waiting or less: $0.22 or ComfortDelGro .s g 8 Mrs Lim travels from home to work every morning. The distance between her home and work is 6.4 km. Michael leaves his house at 0837 and travels by Uber X to Changi Airport, which is 15.5 km away from his house. (ii) Find how much Michael has to pay for his trip. [1] ComfortDelGro imposes peak period surcharges as follows. S m (c) If he arrives at the airport at 0902, find the average speed at which Michael [2] travels, in km/h. ile (i) T (b) ut Find how much Mrs Lim pays every morning if she were to travel by GrabCar [1] Economy. Monday to Friday 0600 – 0929 Monday to Sunday & Public Holidays 1600 – 2359 25 % of metered fare Find how much Michael in (b) has to pay if he were to travel by ComfortDelGro to Changi Airport. [2] (d) (e) Khairul wishes to travel from Tampines MRT to ION Orchard, which is 16 km away. The average speed a taxi travels is 80 km/h during non-peak period. Find which taxi company Khairul should choose for the cheapest fare. [4] State any assumption(s) made in your calculations in (d). [1] End of Paper Need a home tutor? Visit smiletutor.sg 1E Math P2 2017 EOY 215 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 216 Junyuan Secondary Secondary School End of Year 2017 Secondary 1 Express Marking Scheme 3 (a) a=3 22×3×7 = 84 4ax 16ay 12by 3bx 4ax 3bx 16ay 12by 4a( x 4 y ) 3b(4 y x) or x(4a 3b) 4 y (4a 3b) 4a( x 4 y ) 3b( x 4 y ) ( x 4 y )(4 )(4a 3b) ( x 4 y )(4 )(4a 3b) 0.0023 (b) 1 0.4 44% 4 21 = 3×7 18 = 2×32 LCM = 2×32×7 = 126 126 6 twenty cents coins 21 126 7 five pence coins 18 0.4 2 (a) 2800 (1200) 900 15 15000 10 11000 00 $60 6000 Total To ota t l loss = $600 2000 (600) $2600 Profit for Se S Sep p = $260 $2600 00 4x m (b) T (a) ile 5 6 (a) S (b) 7 M1 A1 M1 A1 B22 B ut 4 B1 B1 .s g 2 (a) (b) (a) or 1 20 2( x 20 20) 4 x 20 20 2 x 40 4 x 20 20 2 x 20 x 100 ? 20 years time 4(10) 20 60 years old Area of trapezium PQST 1 = u 14 18 u 7 2 = 112 cm². Area of semi-circle PRT 1 22 = u u 72 2 7 = 77 cm². Area of shaded region = 112 77 = 35 cm2 $Q\PLVWDNHíP $Q\ $Q \PL \ PLVVWDNHíP PL M1 M ((LCM) LCM) LC M A A1 A1 B1 M1 A1 Follow through from (a) B1 M1 A1 M1 M1 A1 Need a home tutor? Visit smiletutor.sg 217 8 (a) B1 1 Distance = 12 u = 4km 3 Return speed = 24 km/h (b) Time taken for return journey = 4u 2 1 1 6 3 = 16 km / h 4 1 hr = hr 24 6 M1 Speed = 10 (a) 11 (a) ile 2 x 14 x 7 S 12 (a) (b) 13 (a)(i) 2800 + 480 = 3280g (a)(ii) 3280 + 480 = 3760g (b) 2800 + 480n M1 M A1 A1 M M1 A1 A M1 A1 3n m 2n m 4 3 9n 3m 8n 4m = 12 nm = . 12 Sum of interior int nter erio iorr angles angl an gles of pentagon = (5 ( – 2)×180q 2)× )×18 1800q 540o = 540 135 13 35 100 100 85 8 70 180 x 540 540 0 570 x x = 30q BCG CG 84 q (alternate ( lt t angles, l parallel ll l li lines)) DCG 84 39 45 q CDE 180 45 (interior angles, parallel lines) = 135q 3x 135 360 (angles at a pt) x = 75 m (b) B1 B11 P : PB : C 5:6 :4 3 15 : 18 : 20 9 : 10 1 unit Æ $0.30 6 units Æ $1.80 4x 5 9 6x (b) .s g (b) (c) M1 A1 or 8x t 8 x t1 1 2 ut (a) T 9 A1 M1 A1 M1 A1 M1 D Deduct d t 1mark 1 k if any reason is not provided M1 A1 B1 B1 B1 Need a home tutor? Visit smiletutor.sg 218 (c) 2800 + 480(m) = 8000 m = 10.3 (3 s.f) The expression should only be used to find his weight for the first year. It is unrealistic to say that the weight of the girl still increases by 480 g every month at age of 10. (d) 14 (a) B1 B1 4 0 4 6 \ í [B [B1] 1] C ut í 2 or -22 .s g x=6 [B1] T By drawing a suitable triangle under the straight line. lliine ne. 6 gradient = 1 6 1 u 6 u 6 units 2 2 =18 units2 ile (d) -Correctly indicated B1 -C B -Cor orre r ctly in C B1 B 1 M1 S m A1 Need a home tutor? Visit smiletutor.sg 219 Junyuan Secondary School End-of-Year Examinations 2017 Mathematics Paper 2 Marking Key Secondary One Express (a) 1296 (b) 672 25 u 3 u 7 HCF 2 4 u 3 .s g [M1] or 48 ABC AED A (180 4 x )q (int. s, AB // DE, BC // AE) Sum of int. angles of pentagon (5 2) u 180q 540q 2(180 4 x ) 4 x 5 x 18 134 520 x 28q 2 (b) 6 11 16 21 5n 1 5n 1 999 n z in integer intege er S (d) 4 (a) (b)(i) 1 27 ( )2 3 3(( 2)3 3 2 64 3x 7 3x 1 d 2 6 x 2 d 3x 7 25 [M 1] [M1] [A1] [A A1] [B1] [B B1] [B2] [SC1] for 2 or 3 corre correct answers [M1] 3 x d 9 (b)(ii) [A1] [M1] [M 1] [B1] Accept Tn 6 5( n 1) [B1] Accept any logical reasoning for n must be an integer [B1] m (c) T1 T2 T3 T4 Tn ut (a) T 3 [B1] 2 4 u 34 ile 1 [A1] x d 3 [B1] 5 4 3 (b)(iii) 9 [B1] Need a home tutor? Visit smiletutor.sg 220 (b) (c) Sr h 11.9 r 1.2309 cm x ( 2)(1.2309) 2.46 cm (3 s.f.) surface area 2Sr 2 2Srh [M1] [A1] 2S (1.2309) 2 2S (1.2309)( 2.5) 9.52 19.335 [M1] 28.9 cm 2 [A1] 2.5 10 0.25 cm increase in surface area ( 2.4618)(S )(0.25)(6) height of one $1 coin 11.601 cm 2 11.601 u 100% 28.88 40.2% (3 s.f.) ut increase in percentage (a) [[M1] [M 1] [M1] 1] [A1] [ 1]] [A S m ile T 6 2 2 .s g (a) or 5 (b) (c)(i) By calculation: 4.67 min (3 s.f.) Therefore, accept 4.6, 4.65 and 4.7 min only. gradient [B1] [M1] Correct coordinates substituted into formula [A1] y 2 y1 x 2 x1 3 4 Need a home tutor? Visit smiletutor.sg 221 The initial volume of the crystal is 2 cm3. 2 ( )(54) 3 36 cm 1 BP ( )(36) 3 12 cm BC QR (b) (c) 4 ( )(54) 5 43.2 cm 1944 cm 2 (a) (b)(i) (b)(ii) (c) [B1] [B 1] [B1] [M1] [A1] 5561 61.6 cm 2 [M1] 1 u basee u height h ig he ght 561.6 561. 56 1.6 6 2 height 1123.2 3 u he 36 heig ight 11 1123 2 .2 heig he height ight h 31.2 cm $3.00 00 $0.8800(7) $8.60 0837 Æ 0902: 25 minutes 15.5 Speed 25/60 37.2 km/h $3.00 $0.45(16) $0.20( 25) S 8 [B1] [B 1] 583 83.2 : 1944 583.2 3 : 10 Area of ADT (54)(36) (583 8 .2)( 83 )( 2) 216 216 m (d) 1 ( 43.2 54)(12) 2 583.2 cm 2 (54)(36) ile CDRQ : flag [B1] Accept “initial volume of crystal”, “volume of crystal at the beginning/start”. [B1] Area of CDRQ Area of flag [B1] .s g (a) 3 cm3. 4 or 7 Every minute, the volume of the crystal increases by ut (d) 3 T (c)(ii) Fare without surcharge Fare with surcharge [A1] [B1] [M1] [A1] $15.20 $3.20 $0.22( $12.00 ($12.00)(1.25) $15.00 [B1] 4500 10000 ) ) $0.22( 300 400 [M1] [A1] Need a home tutor? Visit smiletutor.sg 222 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 223 4 GrabCar $3.00 (16)($0.80) $15.80 16 Time taken 80 0.2 h 12 min Uber X $3.00 (16)($0.45) (12)($0.20) $12.60 5100 10000 )($0.22) )($0.22) ( ComfortDelGro $3.20 ( 300 400 $12.44 From above, ComfortDelGro offers the cheapest fare. Assume there is smooth traffic / no jam / no waiting of traffic light. [B1] [B1] [B1] [B1] Accept any logical answer. S m ile T ut (e) or .s g (d) Accept answer t $15 if student consider waiting time at $0.22 per minute. [B1] Need a home tutor? Visit smiletutor.sg 224 REGENT SECONDARY SCHOOL END OF YEAR EXAMINATION (SA2) 2017 SECONDARY ONE (EXPRESS) NAME: _______________________________________ INDEX NUMBER: ________ CLASS: ________ SETTER : Ms Jacintha _________________________________________________________________________ MATHEMATICS 4048/01 .s g 9th October 2017 READ THESE INSTRUCTIONS FIRST or Paper 1 1 hour 15 mins Candidates answer on the Question Paper. _________________________________________________________________________ ut Write your class, index number and name on all the work you hand in. Write in dark blue or black pen. You may use a pencil for any diagrams or graphs. Do not use staples, paper clips, highlighters, glue or correction fluid. ile T Answer all questions. If working is needed for any question it must be shown with the answer. Omission of essential working will result in loss of marks. The use of an approved scientific calculator is expected, where appropriate. If the degree of accuracy is not specified in the question, and if the answer is not exact, give the answer to three significant figures. Give your answers in degrees to one decimal place. For ʌ , use either your calculator value or 3.142, unless the question requires the answer in terms of ʌ . m At the end of the examination, fasten all your work securely together. The number of marks is given in brackets [ ] at the end of each question or part question. The total of the marks for this paper is 50. S TARGET 50 PARENT’S SIGNATURE _________________________________________________________________________ This document consists of 10 printed pages. Need a home tutor? Visit smiletutor.sg 246 2 For Examiner’s Use Answer all questions. 1 Express (a) For Examiner’s Use 33% as a fraction in its lowest terms, Answer (a)………………………………….. 15 1 as a percentage. 4 .s g (b) [1] or Answer (b)………………………………….. [1] 56.89 104.2 . 3 61.76 3.99 Answer ………………………………….. [2] Consider the following numbers, m 3 ile T ut 2 By rounding off each term to 1 significant figure,estimate the value of 3 x x x 125 , 0. 51 6 , 8 , S Write down all the (a) irrational number(s). 49 , S 7 Answer (a)………………………………….. [1] (b) integer(s). Answer (b)………………………………….. [1] (c) perfect cube(s). Answer (c)………………………………….. [1] Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 1 Need a home tutor? Visit smiletutor.sg 247 3 For Examiner’s Use 4 (a) Write a simplified algebraic expression for the statement “ Cube root of the product of w and x.’ Express b 5 2b 3 as a single fraction. 3 5 5 ile T ut or (b) .s g Answer (a) ……………….……….. [1] Answer (b) ………..……………….. [3] A sum of money was divided between Amy and Daniel in the ratio 5 : 12. After S m Amy spent $22, the ratio became 3 : 16. Find the amount of money Amy had at first. Answer $………………..……….. [3] Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 1 Need a home tutor? Visit smiletutor.sg 248 For Examiner’s Use 4 6 The number 1888 can be expressed as 2a × b, where a and b are integers. For Examiner’s Use (a) Find the value of a and of b. .s g For Examiner’s Use or Answer (a) a = …………………………. [1] b = …………………………. [1] m ile T ut (b) Given that x = 23 × 5 × 7, evaluate the highest common factor of 1888 and x. Answer (b) .………………………………….. [1] S (c) Find the smallest integer n such that 1888n is a perfect square. Answer (c) n = .………………………………….. Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 1 [1] Need a home tutor? Visit smiletutor.sg 249 5 7 A man ran 2.4 km in 16 minutes. He then walked a further 900 m at an average speed of 4 km/h. Calculate (a) his speed, in km/h, in the first 16 minutes, .s g For Examiner’s Use Answer (a)………………………..km/h [2] the time, in minutes, he took to walk, ut or (b) his average speed, in m/s, for the whole distance travelled. m ile (c) T Answer (b)……………………..minutes [2] S Answer (c)…………………………..m/s [2] 8 If a 2 1 and b 4 0.75 , find the ratio of a : b. Answer ….…………………………… [2] Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 1 Need a home tutor? Visit smiletutor.sg 250 For Examiner’s Use 6 9 (a) Factorise completely (i) For Examiner’s Use 6c 2 4cd .s g For Examiner’s Use Answer (a)(i) …..……………………….. [1] ile T ut or (ii) 4 pq 2 p 2 10 p m Answer (a)(ii) ……………………….. [2] S (b) Expand and simplify 3 (2 x 2 4) . Answer (b)……………………………….. [2] Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 1 Need a home tutor? Visit smiletutor.sg 251 7 10 Solve the following equations. For Examiner’s Use (a) x 3 2 x 1 . .s g For Examiner’s Use Answer x = ……………………….. 3 . x2 or 2 x ile T ut (b) [2] m x9 3 Answer x = ……………………….. [2] 3 . S (c) 2 Answer x = ………………………. [3] Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 1 Need a home tutor? Visit smiletutor.sg 252 8 11 (a) Solve 3q ! 6 and illustrate the solution on a number line in the space given below. .s g For Examiner’s Use or Answer (a) ………………………………….. [2] T ut (b) Find the smallest integer value q that satisfies the inequality 4q 1 ! 6 . In the diagram below, BCEF is a square with an area of 36 cm2 and GF = 4cm. Calculate the area of parallelogram BDEG. S m 12 ile Answer (b) ………………………………….. [2] Answer ……….……………………..cm2 [2] Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 1 Need a home tutor? Visit smiletutor.sg 253 For Examiner’s Use 9 For Examiner’s Use 13 Find the value of x in the figure below, showing your working clearly. State the properties and angles where possible. For Examiner’s Use x D C o B A P Q o 45 S m ile T ut or F .s g 275 o Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 1 Need a home tutor? Visit smiletutor.sg 254 10 Answer ……………………………….. [3] For Examiner’s Use 14 In the closed cylinder below, the diameter of the cross-section is 18 cm. Given that its total surface area is 702S cm2, calculate the height, h, of the cylinder. S m ile T ut or h cm .s g 18cm Answer h = ……………………………. [3] Have you checked your work? END OF PAPER Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 1 Need a home tutor? Visit smiletutor.sg 255 For Examiner’s Use REGENT SECONDARY SCHOOL END OF YEAR EXAMINATION (SA2) 2017 SECONDARY ONE (EXPRESS) NAME: _______________________________________ INDEX NUMBER: ________ CLASS: ________ SETTER: Ms Jacintha _________________________________________________________________________ MATHEMATICS .s g Additional Materials: 4048/02 10 October 2017 Paper 2 th 1 hour 30 minutes Answer Paper READ THESE INSTRUCTIONS FIRST or _________________________________________________________________________ ut Write your class, index number and name on all the work you hand in. Write in dark blue or black pen. You may use a pencil for any diagrams or graphs. Do not use staples, paper clips, highlighters, glue or correction fluid. m ile T Answer all questions. If working is needed for any question it must be shown with the answer. Omission of essential working will result in loss of marks. The use of an approved scientific calculator is expected, where appropriate. If the degree of accuracy is not specified in the question, and if the answer is not exact, give the answer to three significant figures. Give your answers in degrees to one decimal place. For ʌ , use either your calculator value or 3.142, unless the question requires the answer in terms of ʌ . S At the end of the examination, fasten all your work securely together. The number of marks is given in brackets [ ] at the end of each question or part question. The total of the marks for this paper is 50. TARGET 50 PARENT’S SIGNATURE _________________________________________________________________________ This document consists of 6 printed pages. Need a home tutor? Visit smiletutor.sg 256 2 Answer all questions. 1 (a) Find the sum of interior angles of a 12-sided polygon. (b) A polygon has 15 sides. Three of its exterior angles are 45D , 46 D and 29 D while [2] the twelve remaining exterior angles of the polygon are x D each. Find the value [2] The population of Brunei was 422 000 in 2016. This value has been rounded off to the nearest 1000. (b) What is the smallest possible value of the population of Brunei in 2016 ? (a) The price of a computer increases from $1300 to $1420. Find the percentage increase in its price. (b) The marked price of a paint art is $6750. There is a discount of 5% for members. ut 3 What is the largest possible value of the population of Brunei in 2016 ? or (a) Find the selling price for a member after the discount. ile (i) T 2 .s g of x. (ii) Given that there is a GST of 7%, find the total amount payable by the member, leaving your answer in the nearest cents. (b) 2 p 5 3q 1 7 4 [2] [1] [2] [2] Expand and simplify the following expression. 5 4a 5b 3 2a 7b (c) [1] Simplify the following expression. m (a) S 4 [1] [2] Factorise the following expression completely. 18 gh 9 g 27 gk Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 2 [2] Need a home tutor? Visit smiletutor.sg 257 3 A pattern was created using toothpicks. The first three figures are shown below. Figure 1 Figure 2 Figure 3 (a) How many toothpicks are used in Figure 5? .s g 5 or (b) Write down an expression, in terms of n, for the number of toothpicks in Figure n. [1] The following pictogram illustrates the number of cupcakes sold in a bakery in a particular week. MONDAY ile TUESDAY T 6 [1] ut (c) Calculate the number of toothpicks in Figure 250. [1] WEDNESDAY THURSDAY m FRIDAY SATURDAY S SUNDAY Each represents 6 cupcakes. (a) How many more cupcakes were sold on Monday as compared to Tuesday? [1] (b) If each cupcake was sold at $3.50, calculate the total sales amount from the cupcakes sold in that week. [2] (c) Express the ratio of cupcakes sold on weekends to that sold on weekdays. [1] Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 2 Need a home tutor? Visit smiletutor.sg 258 4 7 The diagram below shows trapezium ABCD where AD is parallel to BC. ABE is a straight line, CAB 90q , ADC 115q and ACB 43q . o 115 43 o .s g x z y or Stating the reasons clearly, find (a) x , (b) y , (a) Draw and label ' ABC such that BAC = 48° , AB = 7.9 cm and AC = 4.8 cm. T 8 ut (c) z. [2] [2] [1] [3] [1] (c) Construct the bisector of ABC. [1] ile (b) Construct the perpendicular bisector of AB. (d) Label the intersection point of the perpendicular bisector of AB and the angle [2] S m bisector of ABC as M. Measure the distance M from A. Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 2 Need a home tutor? Visit smiletutor.sg 259 5 9 The bar graph below shows the survey result of a group of Secondary One Students from Santa Secondary School on their preference of ice-cream flavour. ut or .s g No. of students Favourite Ice-Cream Flavour [1] How many more students prefer Mango flavour to Coffee flavour? (b) What fraction of the students chose Chocolate flavour as their favourite? [2] (c) What percentage of the students did not choose Vanilla as their favourite flavour? [2] (d) Jamie observed the bar graph and claimed that the number of students who ile T (a) m prefer Chocolate flavour is twice the number of students who prefer Vanilla [2] S flavour. State one way in which the bar graph is misleading Jamie. Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 2 Need a home tutor? Visit smiletutor.sg 260 6 10 The diagram below shows a solid prism. The prism has a cross-section of a rightangled triangle. AB = 6 cm, AC = 8 cm, EF = 10 cm and BE = 17 cm. E 10 cm .s g 17 cm D B F Calculate, C ut 8 cm A or 6 cm the area of the cross-section ABC, [1] (b) the volume of the prism, [1] (c) the total surface area of the prism. (d) A cylindrical container with radius 10 cm is filled with some water. T (a) ile [2] Ten such solid prisms were dropped into the container, causing the water level to m rise. Assuming that there is no water flowing out of the container, calculate the [3] S increase in the water level in the container. Have you checked your work? END OF PAPER Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 2 Need a home tutor? Visit smiletutor.sg 261 7 Answer x = ……………………….. x9 3 3 [1] ut or .s g (e) 2 ile T Answer x = ………………………. S m [2] Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 2 Need a home tutor? Visit smiletutor.sg 262 8 (a) Solve 3q ! 6 and illustrate the solution on a number line in the space given below. ut 10 S m ile T For Examiner’s Use or .s g [3] Answer (a) ………………………………….. [2] (b) Find the smallest integer value q that satisfies the inequality 4q 1 ! 6 . Answer (b) ………………………………….. [2] Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 2 Need a home tutor? Visit smiletutor.sg 263 For Examiner’s Use 9 In the diagram below, BCEF is a square with an area of 36 cm2. What is the area of parallelogram BDEG? Answer ……….……………………..cm2 [2] Find the value of x in the figure below. S m ile T 12 ut or .s g 11 Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 2 Need a home tutor? Visit smiletutor.sg 264 ut or .s g 10 o Answer ……………………………….. In the cylinder below, the diameter of the cross-section is 18 cm. Given that its total surface area is 702S cm2, calculate the height, h, of the cylinder. T 13 S m ile For Examiner’s Use [3] Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 2 Need a home tutor? Visit smiletutor.sg 265 For Examiner’s Use S m ile T ut or .s g 11 Answer …………………………………. [3] Have you checked your work? END OF PAPER Regent Secondary School 2017 End of Year Examination (SA2) Sec 1 Express Paper 2 Need a home tutor? Visit smiletutor.sg 266 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 267 33 B Ma ks % B 60 100 M 3 a Wo ki g 50 4 60 4 = . A S 3 B 125 ,8, Ma ke s epo t Well do e Ma stude ts put . % i stead. Co o istake : Stude ts did ot esti ate a d o l ou ded off the fi al a s e to o ssf. f Badl do o e. Stude Sttud ude ts or Q a 7 MARKING SCHEME .s g E EOY PAPER 49 7 B 3 wx T a ut B ile b 5 2b 3 3 5 5(b 5) 3(2b 3) 15 15 5b 25 6b 9 15 b 16 15 M A m S : : = : = : M – = a M Majo o it it of stude ts got a ko l . istake : Co o b 5 2b 3 3 5 5(b 5) 3(2b 3) 15 15 5b 25 6b 9 15 b 34 15 Well do e. M u its Æ $ u it Æ $ u its Æ =$ = a= = A B B Well do e Need a home tutor? Visit smiletutor.sg 268 B B 2.4 16 ( ) 60 9km / h 900 y 1000 u 60 4 13.5 min s 2400 900 (16 u 60) (13.5 u 60) 1.86m / s 9 : 0.75 4 9:3 2 p (2 (2q p 5) M A M ut A B M m 3 2x 2 4 A 2 x 2 1 x 3 2x 1 2x x 3 1 x 2 M A S 2 3 x x2 3 x 2( 2( x 2) 3x 2 x 4 x 4 x9 2 3 3 6 x9 3 3 15 x 9 x 24 did . M A 3 (2 ( 2 x 2 4) a Badl do e. Ma ot di ide or A ile aii 3 :1 6c 2 4cd 2c(3c 2d ) or 2c(3c 2d ) A T ai M .s g a Ma stude ts left the a s e as Well do e. Stude ts ho got this o g did ot o e t the ti e to hou s. M Well do e. O e a k as gi e fo the p fa to ised out o e tl . Ma a aged to get 2 3 2 x 4 ut si plified it o gl . Well do e. Stude ts had a issue si plif i g afte ossultipli atio . A x9 5 3 15 x 9 x M 24 M Badl do e. Stude ts did ot ha ge the sig of afte aki g o o de o i ato o the left. A Need a home tutor? Visit smiletutor.sg 269 a q 2 B Badl do e. Stude ts e e a le to sol e the i e ualit ut ould ot illust ate it o the u e li e o e tl . Well do e. B - - 4q 1 ! 6 q ! 1.75 q 2 M A Le gth of s ua e = A ea = = 36 A 45q(corr s ) 360 275 85q(s at a pt p) XBC 85 45 40q M T ut ABX A ABC ile BCY 40q 40q(alt s ) x 180 40 220q 2(S u 9 u 9) 2 u S u 9 u h 162S 18 1 Sh Well do e.. or D a a li e BX th ough B P odu e the li e DC to Y M 6cm .s g - 7002S 702 ak fo a o e t easo s A M 702S M A S m 18Sh 540S h 30cm m A e age. P ese tatio of o ki g fo this uestio as do e adl . Ma e e e ed the fo ulas o gl . Need a home tutor? Visit smiletutor.sg 270 E EOY PAPER Wo ki g = i ii A B B M .s g 1420 1300 u 100 1300 3 9.23% or 9 % 13 6750 u 95 100 $6412.50 6412.50 u 107 100 $6861.38 M A A M A 2 p 5 3q 1 4 7 4(2 p 5) 7(3q 1) 28 8 p 20 2211q 7 2288 8 p 211q 13 2288 5 4a 5b 3 2a 7b 20a 25b 6a 21b 14a 46 14a 6b S A M A 18 gh 9 g 27 gk B 9 g (2h 1 3k ) a Well do e. M m a = T a + ile a = = + Ma ke s epo t Reaso a l do e. So e stude ts did ot e e e the fo ula. Reaso a l do e. So e stude ts e t to al ulate su of i te io a gles i stead. Mostl ell do e Mostl ell do e or + Ma ks M A ut Q a 7 MARKING SCHEME M a a ded fo fa to isi g o e fa to out o e tl . + Reaso a l do e. So e stude ts did ot e pa d the se o d pa t of the uestio o e tl . Not ell do e. e Stude ts a e ot fa ilia ith fa to isatio . OR B B Well do e Reaso a l do e. But a stude ts did ot si plif thei a s e s. Co o e os Need a home tutor? Visit smiletutor.sg 271 a .s g . . =$ : B M A x 180 115 43 M 22 43 65q(vert opp s ) m ile z T ut 22q(int s ) ABC A 180 90 43 47q(s in ') y 180 47 133q(s on strt line) or a B B M A i lude: + n – o n + n – . n– as pe alised fo p ese tatio . Well do e. No e f a a ded. Well do e. Well do e. Sa e p ese tatio e o fo so e stude ts ho e p essed a s e as $ . Well do e. Well do e. S a d 140 360 7 18 280 u 100 360 A Mi Mi us fo o easo i a of the pa ts B M A M 7 77.8% or 77 % 9 The a g aph is isleadi g as its e ti al a is sta ts f o i stead of , thus aki g the u e of stude ts ho p efe Cho olate fla ou look like it is t i e the A B Well do e. Stude ts ho ote opp. a gles e e pe alised. Vertically opposite is the ke o d to e a a ded a ks fo easo s. E f allo ed fo stude ts ho got a o g. Well do e Reaso a l do e. So e stude ts is al ulated total as . Reaso a l do e. So e stude ts e p essed a s e as e u i g de i al a d as a ked fo a u a . Badl do e. A fe stude ts i the hole oho t got full edit. as a a ded fo e tio i g that the g aph sta ted at , fo sho i g Need a home tutor? Visit smiletutor.sg 272 a u e of stude ts ho p efe Va illa fla ou he it is o l a diffe e e of . 1 u6u8 2 24cm 2 24 u 17 2 408cm Vol (24 u 2) (17 u 10) (17 u 6) (17 u 8) d 456cm Volume of 10 prisms 408 u 10 4080 S (10) 2 13.0cm((3 3sf ) A M A Reaso a l do e. Reaso a l do e. M 4080cm 3 or M A S m ile T ut Increase A .s g 2 e ide e of ot ha i g t i e the u e s. Reaso a l do e. Need a home tutor? Visit smiletutor.sg 273 .s g or ut T ile m S Need a home tutor? Visit smiletutor.sg 274
