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1、2015 AMC 12B竞赛真题Problem 1What is the value of ? Problem 2Marie does three equally time-consuming tasks in a row without taking breaks. She begins the first task at 1:00 PM and finishes the second task at 2:40 PM. When does she finish the third task? Problem 3Isaac has written down one integer two ti
2、mes and another integer three times. The sum of the five numbers is 100, and one of the numbers is 28. What is the other number? Problem 4David, Hikmet, Jack, Marta, Rand, and Todd were in a 12-person race with 6 other people. Rand finished 6 places ahead of Hikmet. Marta finished 1 place behind Jac
3、k. David finished 2 places behind Hikmet. Jack finished 2 places behind Todd. Todd finished 1 place behind Rand. Marta finished in 6th place. Who finished in 8th place? Problem 5The Tigers beat the Sharks 2 out of the 3 times they played. They then played more times, and the Sharks ended up winning
4、at least 95% of all the games played. What is the minimum possible value for ? Problem 6Back in 1930, Tillie had to memorize her multiplication facts from to . The multiplication table she was given had rows and columns labeled with the factors, and the products formed the body of the table. To the
5、nearest hundredth, what fraction of the numbers in the body of the table are odd? Problem 7A regular 15-gon has lines of symmetry, and the smallest positive angle for which it has rotational symmetry is degrees. What is ? Problem 8What is the value of ? Problem 9Larry and Julius are playing a game,
6、taking turns throwing a ball at a bottle sitting on a ledge. Larry throws first. The winner is the first person to knock the bottle off the ledge. At each turn the probability that a player knocks the bottle off the ledge is , independently of what has happened before. What is the probability that L
7、arry wins the game? Problem 10How many noncongruent integer-sided triangles with positive area and perimeter less than 15 are neither equilateral, isosceles, nor right triangles? Problem 11The line forms a triangle with the coordinate axes. What is the sum of the lengths of the altitudes of this tri
8、angle? Problem 12Let , , and be three distinct one-digit numbers. What is the maximum value of the sum of the roots of the equation ? Problem 13Quadrilateral is inscribed in a circle with and . What is ? Problem 14A circle of radius 2 is centered at . An equilateral triangle with side 4 has a vertex
9、 at . What is the difference between the area of the region that lies inside the circle but outside the triangle and the area of the region that lies inside the triangle but outside the circle? Problem 15At Rachelles school an A counts 4 points, a B 3 points, a C 2 points, and a D 1 point. Her GPA o
10、n the four classes she is taking is computed as the total sum of points divided by 4. She is certain that she will get As in both Mathematics and Science, and at least a C in each of English and History. She thinks she has a chance of getting an A in English, and a chance of getting a B. In History,
11、 she has a chance of getting an A, and a chance of getting a B, independently of what she gets in English. What is the probability that Rachelle will get a GPA of at least 3.5? Problem 16A regular hexagon with sides of length 6 has an isosceles triangle attached to each side. Each of these triangles
12、 has two sides of length 8. The isosceles triangles are folded to make a pyramid with the hexagon as the base of the pyramid. What is the volume of the pyramid? Problem 17An unfair coin lands on heads with a probability of . When tossed times, the probability of exactly two heads is the same as the
13、probability of exactly three heads. What is the value of ? Problem 18For every composite positive integer , define to be the sum of the factors in the prime factorization of . For example, because the prime factorization of is , and . What is the range of the function , ? Problem 19In , and . Square
14、s and are constructed outside of the triangle. The points , , , and lie on a circle. What is the perimeter of the triangle? Problem 20For every positive integer , let be the remainder obtained when is divided by 5. Define a function recursively as follows: What is ? Problem 21Cozy the Cat and Dash t
15、he Dog are going up a staircase with a certain number of steps. However, instead of walking up the steps one at a time, both Cozy and Dash jump. Cozy goes two steps up with each jump (though if necessary, he will just jump the last step). Dash goes five steps up with each jump (though if necessary,
16、he will just jump the last steps if there are fewer than 5 steps left). Suppose that Dash takes 19 fewer jumps than Cozy to reach the top of the staircase. Let denote the sum of all possible numbers of steps this staircase can have. What is the sum of the digits of ? Problem 22Six chairs are evenly spaced around a circular table. One person is seated
