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1、 http:/2017 AMC 8 考题及答案Problem 1Which of the following values is largest?Problem 2Alicia, Brenda, and Colby were the candidates in a recent election for student president. The pie chart below shows how the votes were distributed among the three candidates. If Brenda received 36 votes, then how many
2、votes were cast all together? Problem 3What is the value of the expression ? Problem 4When 0. is multiplied by 7,928,564 the product is closest to which of the following? Problem 5What is the value of the expression ? Problem 6If the degree measures of the angles of a triangle are in the ratio , wha
3、t is the degree measure of the largest angle of the triangle? Problem 7Let be a 6-digit positive integer, such as , whose first three digits are the same as its last three digits taken in the same order. Which of the following numbers must also be a factor of ? Problem 8Malcolm wants to visit Isabel
4、la after school today and knows the street where she lives but doesnt know her house number. She tells him, My house number has two digits, and exactly three of the following four statements about it are true.(1) It is prime.(2) It is even.(3) It is divisible by 7.(4) One of its digits is 9.This inf
5、ormation allows Malcolm to determine Isabellas house number. What is its units digit? Problem 9All of Marcys marbles are blue, red, green, or yellow. One third of her marbles are blue, one fourth of them are red, and six of them are green. What is the smallest number of yellow marbles that Marcy cou
6、ld have? Problem 10A box contains five cards, numbered 1, 2, 3, 4, and 5. Three cards are selected randomly without replacement from the box. What is the probability that 4 is the largest value selected? Problem 11A square-shaped floor is covered with congruent square tiles. If the total number of t
7、iles that lie on the two diagonals is 37, how many tiles cover the floor? Problem 12The smallest positive integer greater than 1 that leaves a remainder of 1 when divided by 4, 5, and 6 lies between which of the following pairs of numbers? Problem 13Peter, Emma, and Kyler played chess with each othe
8、r. Peter won 4 games and lost 2 games. Emma won 3 games and lost 3 games. If Kyler lost 3 games, how many games did he win? Problem 14Chloe and Zoe are both students in Ms. Demeanors math class. Last night they each solved half of the problems in their homework assignment alone and then solved the o
9、ther half together. Chloe had correct answers to only of the problems she solved alone, but overall of her answers were correct. Zoe had correct answers to of the problems she solved alone. What was Zoes overall percentage of correct answers? Problem 15In the arrangement of letters and numerals belo
10、w, by how many different paths can one spell AMC8? Beginning at the A in the middle, a path allows only moves from one letter to an adjacent (above, below, left, or right, but not diagonal) letter. One example of such a path is traced in the picture. Problem 16In the figure below, choose point on so
11、 that and have equal perimeters. What is the area of ? Problem 17Starting with some gold coins and some empty treasure chests, I tried to put 9 gold coins in each treasure chest, but that left 2 treasure chests empty. So instead I put 6 gold coins in each treasure chest, but then I had 3 gold coins
12、left over. How many gold coins did I have? Problem 18In the non-convex quadrilateral shown below, is a right angle, , , , and .What is the area of quadrilateral ? Problem 19For any positive integer , the notation denotes the product of the integers through . What is the largest integer for which is
13、a factor of the sum ? Problem 20An integer between and , inclusive, is chosen at random. What is the probability that it is an odd integer whose digits are all distinct? Problem 21Suppose , , and are nonzero real numbers, and . What are the possible value(s) for ? Problem 22In the right triangle , ,
14、 , and angle is a right angle. A semicircle is inscribed in the triangle as shown. What is the radius of the semicircle? Problem 23Each day for four days, Linda traveled for one hour at a speed that resulted in her traveling one mile in an integer number of minutes. Each day after the first, her spe
15、ed decreased so that the number of minutes to travel one mile increased by 5 minutes over the preceding day. Each of the four days, her distance traveled was also an integer number of miles. What was the total number of miles for the four trips? Problem 24Mrs. Sanders has three grandchildren, who call her regularly. One calls her every three days, one calls her every four days, and one calls her every five days. All three called her on December 31, 2016. On how many days during the next year did she not rec
