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2016IMAS First Round Junior Division Full Solutions

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Solution to

Sixth International Mathematics Assessment for Schools

Round 1 of Junior Division

1. What is the value of ( 20)− 2 +162 −152?

(A)−19 (B)11 (C)21 (D)51 (E)61

【Solution】

2 2 2

( 20)− +16 −15 =20 256 225 51+ − = .

Answer:(D)

2. The table below summarizes the results of a test in a certain class. What is the total score of this class?

Summary of the results of a test

No. of students The highest score The lowest score The average score

42 100 16 84.5

(A)672 (B)3528 (C)3549 (D)4200 (E)4872

【Solution】

The total score of this class is 84.5 42× =3549.

Answer:(C)

3. A three-digit number is not divisible by 24. When divided by 24, the quotient is a

and the remainder is b. What is the minimum value of a+b?

(A)5 (B)6 (C)7 (D)8 (E)9

【Solution】

Observe that 100 4 24 4= × + . When the dividend increases, the quotient a≥4. If a=4, then the remainder b≥4 and hence a+ ≥b 8. If a≥5, then b≥1 since the three-digit is not a multiple of 24. Thus a+ ≥b 6. When the three-digit number is 121, we have a=5, b =1 and a+ =b 6.

Answer:(B)

4. In the trapezium ABCD, AB is parallel to CD. E and F are points on AD and BC respectively such that EF is also parallel to AB. The area, in cm2 , of triangles BAF, CDF and BCE are 8, 7 and 18 respectively. What is the area, in cm2 , of ABCD?

(A)30 (B)32 (C)33

(D)35 (E)36

【Solution】

The area of triangle BAE is equal to the area of triangle BAF since EF//AB. And the area of triangle CDE is equal to the area of triangle CDF since EF//CD. So the area of trapezium ABCD is equal to the sum of the areas of triangle BAE, CDE and BCE, which is 8 7 18 33+ + = cm2. Answer:(C) B A F E D C

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5. What is the value of the negative number x which satisfies |x− =3 | | 3 | 1x + ? (A)−2 (B)−1 (C) 2 3 − (D) 1 2 − (E) 1 4 − 【Solution】

Since x is a negative number, x− <3 0 and 3x<0. Thus the original equation can be simplified to 3− = − +x 3x 1. So x= −1.

Answer:(B)

6. The radius of each wheel of Rick's bicycle is 25 cm. He rides to school at a constant speed and arrives after 10 minutes. During this time, each wheel makes 160 revolutions per minute. Of the following five distances, which is closest to that between Rick's home and school?

(A)1 km (B)1.5 km (C)1.8 km (D)2 km (E)2.5 km

【Solution】

In order to estimate the distance between Rick's home and school, take

π

=3.14. When the wheel of Rick's bicycle is turned one round, Rick's bicycle goes ahead about 2 3.14 25 157× × = cm. So the distance between Rick's home and school is

157 160 10× × =251200cm= 2512m, which is about 2.5 km.

Answer:(E)

7. How many 2-digit numbers are there such that at least one digit is divisible by 3?

(A)48 (B)54 (C)60 (D)66 (E)80

【Solution 1】

If the tens-digit is one of 3, 6 and 9, then such a two-digit number satisfies the condition. There are 30 such two-digit numbers.

If the tens-digit is one of 1, 2, 4, 5, 7 and 8, then the units-digit must be one of 0, 3, 6 and 9. There are 6 4× =24 such two-digit numbers.

So there are totally 30 24 54+ = two-digit numbers satisfying the condition. 【Solution 2】

Observe that the two digits of the two-digit numbers which don’t satisfy the condition are both one of 1, 2, 4, 5, 7 and 8. So there are 6 6× =36 such two-digit numbers. Since there are totally 90 two-digit numbers, there are totally 90 36 54− = two-digit numbers satisfying the condition.

Answer:(B)

8. The chart below shows the sale figures of a certain merchandise in 2014 and 2015 by the season. How many more items were sold in 2015 than in 2014?

(A)23 (B)48 (C)85 (D)90 (E)110

1st Quarter

Sales charts of a merchandise

2nd Quarter 3rd Quarter 4th Quarter

2014 2015 Sales items 50 100 150 200 250 134 180 233 210 157 205 270 235

(4)

【Solution 1】

157+235+270+205=867 items were sold in 2014 and 134+210+

233 180+ =757 in 2015. So 867−757 110= more items were sold in 2015 than in 2014.

【Solution 2】

157 134− =23 more items were sold in the first quarter of 2015 than in the first quarter of 2014, 235−210=25 more items were sold in the second quarter of 2015 than in the second quarter of 2014, 270−233=37 more items were sold in the third quarter of 2015 than in the third quarter of 2014 and 205 180− =25 more items were sold in the fourth quarter of 2015 than in the fourth quarter of 2014. So

23+25 37+ +25 110= more items were sold in 2015 than in 2014.

Answer:(E)

9. ABC is an equilateral triangle. D is a point inside such that BCD is a right isosceles triangle. The altitude BE of ABC intersects CD at F. What is the measure, in degrees, of ∠CFE?

(A)75° (B)70° (C)65° (D)60° (E)55° 【Solution】 180 90 45 2 BCD ° − ° ∠ = = ° since BD=CD and

BDCD. Because triangle ABC is an equilateral triangle, BCA= °60 . Thus 60 45 15

DCA

∠ = ° − ° = °. Now, since BEAC, ∠CFE= ° − ° = °90 15 75 .

Answer:(A)

10. In how many ways can 36 be expressed as the sum of two prime numbers, the first larger than the second?

(A)1 (B)2 (C)3 (D)4 (E)5

【Solution】

Observe that the larger prime number should be between 18 and 35. So the larger prime number is 19, 23, 29 or 31 and the other prime number is 17, 13, 7 or 5, respectively. There are totally 4 ways.

Answer:(D)

11. Every student in a class is either in the mathematics club or the language club, and one third of them are in both. If there are 22 students in the language club, 4 less than the number of students in the mathematics club, how many students are there in this class?

(A)12 (B)18 (C)24 (D)30 (E)36

【Solution 1】

From the conditions, there are 22+ =4 26 students in the mathematics club. Since one third of them are in both clubs, the sum of the numbers of students in the

mathematics club and in the language club is equal to four third of the number of students in this class. So there are (22 26) 4 36

3

+ ÷ = students in this class.

B A F E D C

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【Solution 2】

From the conditions, there are 22+ =4 26 students in the mathematics club. Suppose there are x students in the mathematics club and the language club, then there are 3x students in this class. So 22+26− =x 3x. Thus x=12 and hence there are 12 3× =36 students in this class.

Answer:(E)

12. The average of a group of numbers is 5. A second group contains twice as many numbers and its average is 11. What is the average when the two groups are combined?

(A)6 (B)7 (C)8 (D)9 (E)10

【Solution 1】

Since the number of the second group is twice the number of the first group, we can assume there are 2 numbers in the second group and 1 number in the first group. Thus the average when the two groups are combined is 5 11 2 9

1 2

+ × =

+ .

【Solution 2】

Suppose there are k numbers in the first group and 2k numbers in the second group. Then the sum of the first group is 5k and the sum of the second group is 11 2× k =22k. Thus the average when the two groups are combined is 5 22 9

2 k k k k + = + . Answer:(D)

13. What is the value of x if y x− +1 1− + =x y 2016?

(A)2015 (B)2016 (C) 1

2016 (D)1 (E)0

【Solution】

Observe that x−1 and 1 x− are both non-negative numbers, otherwise x−1 or

1 x− are meaningless. Since x−1 is the additive inverse of 1 x− , x− = − =1 1 x 0.

So x=1 and hence y =2016. Thus 2016

1 1

y

x = = .

Answer:(D)

14. Each of A and B goes to the gymnasium 3 or 4 times a week. After n weeks, A has been there 57 times while B has been there only 47 times. What is the value of n?

(A)15 (B)16 (C)17 (D)18 (E)19

【Solution】

From the conditions, we can conclude 3n≤47 and 4n≥57, so 141 152 4 ≤ ≤n 3.

Since n is a positive integer, n=15.

Answer:(A)

15. D is a point on AB such thatAD =1 and BD=2. How many points C are there in the plane such that both ACD and BCD are isosceles triangles?

(6)

【Solution】

Observe that ∠ADC and ∠BDC are

supplementary angles, so one of them is not an acute angle and it must be a vertex angle of an isosceles triangle.

If ∠BDC is a vertex angle of an isosceles triangle, then DC=2. Since the sum of the lengths of any two sides of a triangle must be greater than the length of the third side and the difference of the lengths of any two sides of a triangle must be less than the length of the third side, 1<AC<3 and hence AC=DC=2. There are two such points,

1

C and C2 as shown in the figure.

If ∠ADC is a vertex angle of an isosceles triangle, then DC=1. Since the sum of the lengths of any

two sides of a triangle must be greater than the length of the third side and the

difference of the lengths of any two sides of a triangle must be less than the length of the third side, 1<BC<3 and hence BC =DB=2. There are two such points, C3

and C4 as shown in the figure.

So there are 4 points satisfying the conditions.

Answer:(B)

16. From a 5 5× square piece of paper, two 2 4× rectangles are cut off along the grid lines. In how many different ways can this be done?

(A)6 (B)9 (C)12 (D)18 (E)24

【Solution】

Observe that both of the two rectangles should be 2 4× or 4 2× . Consider both of them are 2 4× first. If one of them lies on the first and second rows, then the other one should lie on third and fourth rows, or fourth and fifth rows. If one of them lies on the second and third rows, then the other one should lie on fourth and fifth rows. So there are 3 different situations. In each situation, there are 2 locations for each rectangle. So there are 3 2 2 12× × = different ways. By symmetry, we know there are also 12 different ways if both of the two rectangles are 4 2× . Thus there are totally 12 12+ =24 different ways.

Answer:(E)

17. The number a is 5 more than its reciprocal. What is the value of (a2 −1)2 −125a?

(A)5 (B)25 (C)125 D1 21 2 + (E)5 21 【Solution】 Observe that a 1 5 a − = . Since a is not 0, 2 1 5 a − = a, i.e., 2 5 1 aa = . So 2 2 2 2 (a −1) −125a=(5 )a −125a=25(a −5 )a =25. Answer:(B) B A D 1 C 4 C 3 C 2 C

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18. With each vertex of a parallelogram ABCD as centre, a circle is drawn. Exterior common tangents are then drawn, as shown in the diagram below. If the perimeter of ABCD is 36 cm and the radius of each circle is 2 cm, what is the maximum area, in cm2 , of the figure enclosed by the circular arcs and tangents?

(A)117+4

π

(B)144+4

π

(C)153 4+

π

(D)144 12+

π

(E)153 12+

π

【Solution】

For each circle, draw the segments from the center to tangent point, as shown in the figure. Thus the figure enclosed by the circular arcs and tangents is divided into the original parallelogram, four rectangles and four sectors. Since the center of a circle is the vertex of a right angle of each of two rectangles, the vertex of an interior angle of the original parallelogram and the center of a sector, the central angle of the sector and the interior angle of the original parallelogram in the same circle are

supplementary angles. Thus we can conclude that the sum of the areas of four sectors is equal to the area of a circle, which is 4

π

cm2 because the sum of the angles of the interior angles of a parallelogram is 360°. Observe that the sum of the areas of four rectangles is equal to the radius of a circle multiplied by the perimeter of the

parallelogram, which is 2 36 72× = cm2. When we fixed the perimeter of the parallelogram, the maximum area of the parallelogram will occur as the parallelogram is exactly a square and the maximum value is

2 36 81 4   =     cm 2 . Thus the maximum area of the figure enclosed by the circular arcs and tangents is

4

π

+ + =72 81 153 4+

π

cm2. Answer:(C) B A D C B A D C

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19. What is the smallest positive integer with 12 positive divisors such that it is relatively prime to (20163−2016)? (A)7007 (B)9163 (C)26741 (D)39083 (E)52877 【Solution】 3 2 5 2 2016 −2016=2016 (2016× − =1) 2015 2016 2017× × = × × × × × ×2 3 5 7 13 31 2017, so the prime factors of the positive integer which satisfy the conditions should be 11, 17, 19, …, 29, 37, …, 2011, 2027, …. Since the positive integer has 12 positive divisors, it is of the form p11, p q5 , p q3 2 or p qr2 , where p, q and r are different prime numbers. It is obviously that the first three forms are all greater than 5

10 and the smallest value of the last one is 112× × =17 19 39083 10< 5.

Answer:(D)

20. At most how many right triangles can be formed by five lines on the plane?

(A)4 (B)5 (C)6 (D)7 (E)8

【Solution】

Let the five lines are a, b, c, d and e. If two of them are perpendicular to each other, then the two lines and one of the other three lines can form a right triangle. Thus we can at most 3 right triangles. So if there are one pair or two pairs of perpendicular lines, then we can have at most 6 right triangles. If there are at least three pairs of perpendicular lines, then there exist two lines. Assume the two lines are a and b, perpendicular to the same line and hence the two lines, a and b, are parallel to each other. Thus a and any two of c, d and e can form a

right triangle and hence we can get at most 3 right triangles. b and any two of c, d and e can form a right triangle and hence we can also get at most 3 right triangles. c, d and e can also form a right triangle, so there are at most 3 3 1 7+ + = right triangles which can be formed by five lines on the plane.

Answer:(D)

21. The International Article Number has 13 digits ABCDEFGHIJKLM. Here M is a check digit. Let S = +A 3B+ +C 3D+ +E 3F + +G 3H + +I 3J + +K 3L. If S

is a multiple of 10, then M is chosen to be 0. Otherwise it is chosen to be 10

M = −t where t is the remainder obtained when S is divided by 10. The Code for a certain Article Number is 6901020□09017. What is the missing digit?

【Solution】

From the conditions, we have

6 3 9 0 3 1 0 3 2 0 3 0 3 9 0 3 1 72 3

(9)

Since M =7, 10− =7 3 is the remainder obtained when 72 3+ ×□ is divided by 10. Thus the unit digit of 3×□ is 1. So □=7.

Answer:007 【Note】

The International Article Number is a code so that

3 3 3 3 3 3

A+ B+ +C D+ +E F + +G H + +I J + +K L+M is divisible by 10.

22. What is the largest three-digit number which can be expressed as the sum of the cubes of three different positive integers?

【Solution】

Observe that 103 =1000, so we need to find three of 13 =1, 23 =8, 33 =27,

3

4 =64, 53 =125, 63 =216, 73 =343, 83 =512 and 93 =729 so that the sum of the three numbers is less than 1000 and as close to 1000 as possible.

If neither 8 nor 3 9 is one of the three numbers, then the maximum sum of the 3 three numbers is 53+63 +73 =684.

If 9 is one of the three numbers, then neither 3 8 nor 3 7 is not one of the three 3 numbers. As 6 is one of the three numbers, we have 729 216 9453 + = and hence the largest number we can pick is 3 so that the sum is 973. As 3 6 is not one of the 3 three numbers, the maximum sum of the three numbers is 43+ +53 93 =918.

If 8 is one of the three numbers, then the maximum sum of the three numbers is 3

3 3 3

5 + + =7 8 980 since 3 3 3

6 +7 + =8 1071 1000> . So the largest three-digit number is 980.

Answer:980

23. The diagram shows a quadrilateral ABCD with CDA=150°. The bisector of DAB

∠ is perpendicular to BC and the bisector of ABC is perpendicular to

CD. What is the measure, in degrees, of BCD?

【Solution 1】

Let the bisector of ∠DAB intersect BC at X,

the bisector of ∠ABC intersect CD at Y and AX

intersect BY at O. Since BCD+ ∠XOY =180°, 1

( )

2

BCD XOB DAB ABC

∠ = ∠ = ∠ + ∠ , i.e.,

2

DAB ABC BCD

∠ + ∠ = ∠ . Since the sum of

interior angles of a quadrilateral is 360°, we have

3 60

150

3 DAB ABC BCD CDA

BCD ∠ + ∠ + ∠ + ∠ = ∠ + ° = ° Thus ∠BCD= °70 . 【Solution 2】

Assume ∠ABC= °2x . Since the bisector of ∠ABC is perpendicular to CD,

90

BCD x

∠ = ° − °. And since the bisector of ∠DAB is perpendicular to BC,

2(90 2 ) DAB x ∠ = ° − ° . Now we have 360° =150° + ° + ° − ° +2x 90 x 2(90° − °2x ) B A D C X Y O

(10)

because the sum of interior angles of a quadrilateral is 360°. Thus 3x° = °60 and hence x=20. So ∠BCD= ° − ° = °90 20 70 .

Answer:070

24. Let a and b be positive real numbers such that a2 =b b( +1) and b2 = +a 1. What is the value of 1 1

a +b? 【Solution】

Since b2 = +a 1, we have a=b2 −1. We can also conclude that a b( 2 − =1) b b( +1) because a2 =b b( +1). Thus (a b− =1) b and hence ab= +a b. Divide the equation by ab, we can get 1 1 a b 1

a b ab

+

+ = = .

Answer:001

25. Each blouse cost 40 dollars, each skirt 70 dollars and each pair of shoes 80 dollars. Fanny bought at least one item of each kind, and spent at most 800 dollars. A outfit consisted of one item of each kind, and two outfits were different if they differed in at least one item. At most how many different outfits could there be?

【Solution 1】

Suppose Fanny buys x blouses, y skirts and z pairs of shoes. Then we have 40x+70y+80z≤800 and want to find the maximum value of xyz. Divide the inequality by 40 to get 7 2 20

4

x+ y+ z ≤ . Now we will discuss the possible value of

y. Note that x, y and z are all positive integers, so 7 17

4 y≤ , i.e., y≤9.

As y =1, we have x+2z≤18. By the AM-GM inequality, 2 2 9 2 x z xz ≤ + ≤ and hence 2 9 1 40 2 2

xz≤ = . So the maximum value of xz is 40. Thus the maximum value of xyz is 40. It will occur when x=8 and z=5.

As y = 2, we have x+2z≤16. By the AM-GM inequality, 2 2 8 2 x z xz ≤ + ≤ and hence 2 8 32 2

xz≤ = . So the maximum value of xz is 32. Thus the maximum value of

xyz is 64. It will occur when x =8 and z =4.

As y =3, we have x+2z≤14. By the AM-GM inequality, 2 2 7 2 x z xz ≤ + ≤ and hence 2 7 1 24 2 2

xz≤ = . So the maximum value of xz is 24. Thus the maximum value of xyz is 72. It will occur when x=6 and z=4.

As y = 4, we have x+2z≤13. By the AM-GM inequality, 2 2 13

2 2

x z

(11)

hence

2

13 1

21

8 8

xz≤ = . So the maximum value of xz is 21. Thus the maximum value

of xyz is 84. It will occur when x=7 and z=3.

As y =5, we have x+2z≤11. By the AM-GM inequality, 2 2 11

2 2 x z xz ≤ + ≤ and hence 2 11 1 15 8 8

xz≤ = . So the maximum value of xz is 15. Thus the maximum value

of xyz is 75. It will occur when x=5 and z=3.

As y =6, we have x+ ≤2z 9. By the AM-GM inequality, 2 2 9

2 2 x z xz ≤ + ≤ and hence 2 9 1 10 8 8

xz≤ = . So the maximum value of xz is 10. Thus the maximum value of

xyz is 60. It will occur when x =5 and z =2.

As y =7, we have x+ ≤2z 7. By the AM-GM inequality, 2 2 7

2 2 x z xz ≤ + ≤ and hence 2 7 1 6 8 8

xz≤ = . So the maximum value of xz is 6. Thus the maximum value of

xyz is 42. It will occur when x =3 and z =2.

As y =8, we have x+ ≤2z 6. By the AM-GM inequality, 2 2 3

2 x z xz ≤ + ≤ and hence 2 3 1 4 2 2

xz≤ = . So the maximum value of xz is 4. Thus the maximum value of

xyz is 32. It will occur when x =2 and z =2.

As y =9, we have x+2z≤4. By the AM-GM inequality, 2 2 2 2 x z xz ≤ + ≤ and hence 2 2 2 2

xz≤ = . So the maximum value of xz is 2. Thus the maximum value of xyz is 18. It will occur when x =2 and z =1.

So there could be at most 84 different outfits when Fanny buys 7 blouses, 4 skirts and 3 pairs of shoes.

【Solution 2】

Suppose Fanny buys x blouses, y skirts and z pairs of shoes. Then we have

40x+70y+80z≤800 and want to find the maximum value of xyz. By the AM-GM inequality, 3 40 70 80 3 224000 40 70 80 800

3 3

x y z

x× y× z = xyz ≤ + + = . Cube the inequality and then get 224000 512000000

27

xyz≤ , i.e., 512000000 84127 27 224000 189

xyz≤ =

× .

So the maximum value of xyz is 84. It will occur when x =7, y=4 and z=3. Answer:084

參考文獻

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