2024年1月24日发(作者:达州2015中考数学试卷)
Mathematics
PartⅠ: Questions 1 to 10, 10 marks each
1. At the right is shown a 4 × 4 grid. We wish to fill in the grid such that each row, each
column, and each 2 × 2 square outlined by the thick lines contains the digits 1
through 4. Some grids have already been filled in. Find the number of ways we can
complete the rest of the grid.
Answer:
2. The areas of the faces of a cuboid are 84 cm2, 70 cm2
and 30 cm2. Find the volume of
the cuboid in cm3.
Answer:
3. The fraction
3331313311113331331
2
3
4
can be wrritten in the form
n where the greatest common
mdivisor of m and n is 1, Find m+n.
Answer:
4. Find the sum of all the integers N > 1 with the properties that the each prime factor of N is either 2, 3, 5 or 7,
and N is not divisible by any perfect cube greater than 1.
Answer:
5. A large fresh water reservoir has two types of drainage system, small pipes and large pipes. 6 large pipes, on
their own, can drain the reservoir in 12 hours. 3 large pipes and 9 small pipes, at the same time, can drain the
reservoir in 8 hours. How long will 5 small pipes, on their own, take to drain the reservoir?
Answer: minutes
6. At a local village gala, the entire population turned up, 500 people. The event raised £3,000. Tickets were
priced as follows: £7.48 per man, £7.12 per woman and £0.45 per child. How many children were there?
Answer:
P U R P L E
C O ME T
7. Each of the distinct letters in the following addition problem represents a
M E E T
different digit. If A=4, find the number represented by the word “MEET”.
12
+
8
A A A A A A
Answer:
8. Let two 8×12 rectangles share a common corner and overlap. The
distance from the bottom right corner of one rectangle to the intersection
7
point along the right edge of that rectangle is 7. What is the area of the
8
shaded region?
12
Answer:
9. A spy had to send the 4-digit code
abcd to headquarters. For security reasons, he sent
instead the 9 separate 4-digit codes shown. In each of the 9 codes, at least one of the
digits a, b, c, and d occurs in its correct position. What is the value of
abcd?
Answer:
10. In how many ways can one arrange the numbers 21, 31, 41, 51, 61, 71 and 81 such that
the sum of every four consecutive numbers is divisible by 3?
Answer:
PartⅡ: Questions 11 to 14, 20 marks each
11. Town A and town B are connected by a highway, with a service station at the midpoint. Mike and Sam start
from A to B at the same time. When Mike reaches the service station, Sam is 16 km behind. Mike reduces
speed by 25% after he passes through the service station. When Sam reaches the service station, Mike is 15
km ahead of Sam. What’s the distance between A and B?
Answer:
A D
12. Given: ABCD is a trapezoid, AD∥BC, AD:BC=1:2,
SAOF:SDOE1:3,
F
SBEF24cm2, Find the area of
AOF.
O
E
C
Answer:
B
13. In how many different ways can the seven empty circles in the diagram on
the right be filled in with the numbers 2 through 8 such that each number is used
once, and each number is either greater than both its neighbors, or less than both its
neighbors.
Answer:
14. How many rectangles are there in the diagram on the right such that the sum of the
numbers within the rectangle is a multiple of 4?
Answer:
题号
答案
1
2
2
420
3
310
4
80
5
1296
6
259
7
9221
8
54
9
8326
10
144
11
160
1
5
9
13
2
6
10
14
3
7
11
4
8
12
15
16
12
6
13
272
14
28
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