amcdrill | AMC8 AMC10 AMC12 Practice

Q1

A bakery owner turns on his doughnut machine at 8:30 am. At 11:10 am the machine has completed one third of the day’s job. At what time will the doughnut machine complete the job?

一位面包店老板在上午8:30开启他的甜甜圈机器。到上午11:10时，机器已完成当天任务的三分之一。甜甜圈机器将在何时完成任务？

(A) 1:50 pm 下午1:50 (B) 3:00 pm 下午3:00 (C) 3:30 pm 下午3:30 (D) 4:30 pm 下午4:30 (E) 5:50 pm 下午5:50

Q2

A square is drawn inside a rectangle. The ratio of the width of the rectangle to a side of the square is 2:1. The ratio of the rectangle’s length to its width is 2:1. What percent of the rectangle’s area is inside the square?

在一个矩形内画一个正方形。矩形宽度与正方形边长的比为2:1。矩形长与宽的比为2:1。正方形占矩形面积的百分之多少？

(A) 12.5 12.5 (B) 25 25 (C) 50 50 (D) 75 75 (E) 87.5 87.5

Q3

For the positive integer $n$, let $\langle n\rangle$ denote the sum of all the positive divisors of $n$ with the exception of $n$ itself. For example, $\langle 4\rangle = 1 + 2 = 3$ and $\langle 12\rangle = 1 + 2 + 3 + 4 + 6 = 16$. What is $\langle\langle\langle 6\rangle\rangle\rangle$?

对于正整数$n$，令$\langle n\rangle$表示$n$本身以外的所有正因数之和。例如，$\langle 4\rangle = 1 + 2 = 3$，$\langle 12\rangle = 1 + 2 + 3 + 4 + 6 = 16$。求$\langle\langle\langle 6\rangle\rangle\rangle$。

(A) 6 6 (B) 12 12 (C) 24 24 (D) 32 32 (E) 36 36

Q4

Suppose that $\frac{2}{3}$ of 10 bananas are worth as much as 8 oranges. How many oranges are worth as much as $\frac{1}{2}$ of 5 bananas?

假设10个香蕉的三分之二的价值等于8个橙子。那么多少个橙子等于5个香蕉的一半的价值？

(A) 2 2 (B) $\frac{5}{2}$ $\frac{5}{2}$ (C) 3 3 (D) $\frac{7}{2}$ $\frac{7}{2}$ (E) 4 4

Q5

Which of the following is equal to the product $\frac{8}{4} \cdot \frac{12}{8} \cdot \frac{16}{12} \cdots \frac{4n+4}{4n} \cdots \frac{2008}{2004}$?

下列表达式等于$\frac{8}{4} \cdot \frac{12}{8} \cdot \frac{16}{12} \cdots \frac{4n+4}{4n} \cdots \frac{2008}{2004}$的值是？

(A) 251 251 (B) 502 502 (C) 1004 1004 (D) 2008 2008 (E) 4016 4016

Q6

A triathlete competes in a triathlon in which the swimming, biking, and running segments are all of the same length. The triathlete swims at a rate of 3 kilometers per hour, bikes at a rate of 20 kilometers per hour, and runs at a rate of 10 kilometers per hour. Which of the following is closest to the triathlete’s average speed, in kilometers per hour, for the entire race?

一名铁人三项运动员参加了一场铁人三项比赛，其中游泳、骑行和跑步段的长度相同。该运动员游泳速度为3千米/小时，骑行速度为20千米/小时，跑步速度为10千米/小时。以下哪一项最接近该运动员整个比赛的平均速度（千米/小时）？

(A) 3 3 (B) 4 4 (C) 5 5 (D) 6 6 (E) 7 7

Q7

The fraction $\frac{(3^{2008})^2 - (3^{2006})^2}{(3^{2007})^2 - (3^{2005})^2}$ simplifies to which of the following?

分式$\frac{(3^{2008})^2 - (3^{2006})^2}{(3^{2007})^2 - (3^{2005})^2}$化简为以下哪一项？

(A) 1 1 (B) $\frac{9}{4}$ $\frac{9}{4}$ (C) 3 3 (D) $\frac{9}{2}$ $\frac{9}{2}$ (E) 9 9

Q8

Heather compares the price of a new computer at two different stores. Store A offers 15% off the sticker price followed by a $90 rebate, and store B offers 25% off the same sticker price with no rebate. Heather saves $15 by buying the computer at store A instead of store B. What is the sticker price of the computer, in dollars?

Heather在两家不同的商店比较了一台新电脑的价格。A店先打85折（15% off），再返现90美元；B店直接打75折（25% off），无返现。Heather在A店比B店节省了15美元。电脑的标价是多少美元？

(A) 750 750 (B) 900 900 (C) 1000 1000 (D) 1050 1050 (E) 1500 1500

Q9

Suppose that $\frac{2x}{3} - \frac{x}{6}$ is an integer. Which of the following statements must be true about $x$?

假设$\frac{2x}{3} - \frac{x}{6}$是一个整数。以下哪项关于$x$的陈述一定是真的？

(A) It is negative. 它是负数。 (B) It is even, but not necessarily a multiple of 3. 它是偶数，但不一定是3的倍数。 (C) It is a multiple of 3, but not necessarily even. 它是3的倍数，但不一定是偶数。 (D) It is a multiple of 6, but not necessarily a multiple of 12. 它是6的倍数，但不一定是12的倍数。 (E) It is a multiple of 12. 它是12的倍数。

Q10

Each of the sides of a square $S_1$ with area 16 is bisected, and a smaller square $S_2$ is constructed using the bisection points as vertices. The same process is carried out on $S_2$ to construct an even smaller square $S_3$. What is the area of $S_3$?

正方形$S_1$的面积为16，每条边被二等分，利用这些二等分点作为顶点构造一个更小的正方形$S_2$。对$S_2$重复相同过程构造更小的正方形$S_3$。$S_3$的面积是多少？

(A) $\frac{1}{2}$ $\frac{1}{2}$ (B) 1 1 (C) 2 2 (D) 3 3 (E) 4 4

Q11

While Steve and LeRoy are fishing 1 mile from shore, their boat springs a leak, and water comes in at a constant rate of 10 gallons per minute. The boat will sink if it takes in more than 30 gallons of water. Steve starts rowing toward the shore at a constant rate of 4 miles per hour while LeRoy bails water out of the boat. What is the slowest rate, in gallons per minute, at which LeRoy can bail if they are to reach the shore without sinking?

当史蒂夫和勒罗伊在离岸1英里的地方钓鱼时，他们的船漏水了，水以每分钟10加仑的恒定速率进入船内。如果船内进水超过30加仑，船就会沉没。史蒂夫开始以每小时4英里的恒定速率向岸边划船，同时勒罗伊从船中舀水。他们到达岸边而不沉没，勒罗伊舀水的速率最慢是多少加仑每分钟？

(A) 2 2 (B) 4 4 (C) 6 6 (D) 8 8 (E) 10 10

Q12

In a collection of red, blue, and green marbles, there are 25% more red marbles than blue marbles, and there are 60% more green marbles than red marbles. Suppose that there are $r$ red marbles. What is the total number of marbles in the collection?

在一组红、蓝、绿弹珠中，红弹珠比蓝弹珠多25%，绿弹珠比红弹珠多60%。假设有$r$个红弹珠。集合中弹珠总数是多少？

(A) 2.85$r$ 2.85$r$ (B) 3$r$ 3$r$ (C) 3.4$r$ 3.4$r$ (D) 3.85$r$ 3.85$r$ (E) 4.25$r$ 4.25$r$

Q13

Doug can paint a room in 5 hours. Dave can paint the same room in 7 hours. Doug and Dave paint the room together and take a one-hour break for lunch. Let $t$ be the total time, in hours, required for them to complete the job working together, including lunch. Which of the following equations is satisfied by $t$?

道格一人可以5小时粉刷一间屋子。戴夫可以7小时粉刷同一间屋子。道格和戴夫一起粉刷这间屋子，并中途休息1小时吃午饭。设$t$为他们完成工作所需总时间（小时），包括午饭。下列哪个方程由$t$满足？

(A) $\left(\frac{1}{5} + \frac{1}{7}\right)(t+1) = 1$ $\left(\frac{1}{5} + \frac{1}{7}\right)(t+1) = 1$ (B) $\left(\frac{1}{5} + \frac{1}{7}\right)t + 1 = 1$ $\left(\frac{1}{5} + \frac{1}{7}\right)t + 1 = 1$ (C) $\left(\frac{1}{5} + \frac{1}{7}\right)t = 1$ $\left(\frac{1}{5} + \frac{1}{7}\right)t = 1$ (D) $\left(\frac{1}{5} + \frac{1}{7}\right)(t-1) = 1$ $\left(\frac{1}{5} + \frac{1}{7}\right)(t-1) = 1$ (E) $(5+7)t = 1$ $(5+7)t = 1$

Q14

Older television screens have an aspect ratio of 4:3. That is, the ratio of the width to the height is 4:3. The aspect ratio of many movies is not 4:3, so they are sometimes shown on a television screen by "letterboxing" — darkening strips of equal height at the top and bottom of the screen, as shown. Suppose a movie has an aspect ratio of 2:1 and is shown on an older television screen with a 27-inch diagonal. What is the height, in inches, of each darkened strip?

老式电视屏幕的宽高比是4:3，即宽度与高度之比为4:3。许多电影的宽高比不是4:3，因此有时通过“画中画”方式在电视屏幕上显示——在屏幕顶部和底部加等高的黑色条带，如图所示。假设一部电影宽高比为2:1，在对角线为27英寸的老式电视屏幕上播放。每条黑色条带的高度是多少英寸？

(A) 2 2 (B) 2.25 2.25 (C) 2.5 2.5 (D) 2.7 2.7 (E) 3 3

Q15

Yesterday Han drove 1 hour longer than Ian at an average speed 5 miles per hour faster than Ian. Jan drove 2 hours longer than Ian at an average speed 10 miles per hour faster than Ian. Han drove 70 miles more than Ian. How many more miles did Jan drive than Ian?

昨天汉比伊恩多开1小时，平均速度比伊恩快5英里每小时。简比伊恩多开2小时，平均速度比伊恩快10英里每小时。汉比伊恩多开70英里。简比伊恩多开多少英里？

(A) 120 120 (B) 130 130 (C) 140 140 (D) 150 150 (E) 160 160

Q16

Points $A$ and $B$ lie on a circle centered at $O$, and $\angle AOB = 60^\circ$. A second circle is internally tangent to the first and tangent to both $\overline{OA}$ and $\overline{OB}$. What is the ratio of the area of the smaller circle to that of the larger circle?

点 $A$ 和 $B$ 位于以 $O$ 为圆心的大圆上，且 $\angle AOB = 60^\circ$。有一个小圆内切于大圆并同时与 $\overline{OA}$ 和 $\overline{OB}$ 相切。小圆与大圆面积之比是多少？

(A) $\frac{1}{16}$ $\frac{1}{16}$ (B) $\frac{1}{9}$ $\frac{1}{9}$ (C) $\frac{1}{8}$ $\frac{1}{8}$ (D) $\frac{1}{6}$ $\frac{1}{6}$ (E) $\frac{1}{4}$ $\frac{1}{4}$

Q17

An equilateral triangle has side length 6. What is the area of the region containing all points that are outside the triangle and not more than 3 units from a point of the triangle?

一个边长为 6 的等边三角形。求三角形外部且距离三角形某点不超过 3 个单位的区域的面积。

(A) $36 + 24\sqrt{3}$ $36 + 24\sqrt{3}$ (B) $54 + 9\pi$ $54 + 9\pi$ (C) $54 + 18\sqrt{3} + 6\pi$ $54 + 18\sqrt{3} + 6\pi$ (D) $(2\sqrt{3} + 3)^2 \pi$ $(2\sqrt{3} + 3)^2 \pi$ (E) $9(\sqrt{3} + 1)^2 \pi$ $9(\sqrt{3} + 1)^2 \pi$

Q18

A right triangle has perimeter 32 and area 20. What is the length of its hypotenuse?

一个直角三角形的周长为 32，面积为 20。求其斜边长度。

(A) $\frac{57}{4}$ $\frac{57}{4}$ (B) $\frac{59}{4}$ $\frac{59}{4}$ (C) $\frac{61}{4}$ $\frac{61}{4}$ (D) $\frac{63}{4}$ $\frac{63}{4}$ (E) $\frac{65}{4}$ $\frac{65}{4}$

Q19

Rectangle $PQRS$ lies in a plane with $PQ = RS = 2$ and $QR = SP = 6$. The rectangle is rotated 90° clockwise about $R$, then rotated 90° clockwise about the point that $S$ moved to after the first rotation. What is the length of the path traveled by point $P$?

矩形 $PQRS$ 位于平面内，$PQ = RS = 2$，$QR = SP = 6$。矩形先绕 $R$ 顺时针旋转 $90^\circ$，然后绕第一次旋转后 $S$ 移动到的点顺时针旋转 $90^\circ$。求点 $P$ 所经过路径的长度。

(A) $(2\sqrt{3} + \sqrt{5})\pi$ $(2\sqrt{3} + \sqrt{5})\pi$ (B) $6\pi$ $6\pi$ (C) $(3 + \sqrt{10})\pi$ $(3 + \sqrt{10})\pi$ (D) $(\sqrt{3} + 2\sqrt{5})\pi$ $(\sqrt{3} + 2\sqrt{5})\pi$ (E) $2\sqrt{10}\pi$ $2\sqrt{10}\pi$

Q20

Trapezoid $ABCD$ has bases $\overline{AB}$ and $\overline{CD}$ and diagonals intersecting at $K$. Suppose that $AB = 9$, $DC = 12$, and the area of $\triangle AKD$ is 24. What is the area of trapezoid $ABCD$?

梯形 $ABCD$ 的底边为 $\overline{AB}$ 和 $\overline{CD}$，对角线交于点 $K$。已知 $AB = 9$，$DC = 12$，且 $\triangle AKD$ 的面积为 24。求梯形 $ABCD$ 的面积。

(A) 92 92 (B) 94 94 (C) 96 96 (D) 98 98 (E) 100 100

Q21

A cube with side length 1 is sliced by a plane that passes through two diagonally opposite vertices $A$ and $C$ and the midpoints $B$ and $D$ of two opposite edges not containing $A$ or $C$, as shown. What is the area of quadrilateral $ABCD$?

一个边长为1的立方体被一个平面切割，该平面通过两个对角相对的顶点$A$和$C$，以及两条不包含$A$或$C$的对边中点$B$和$D$，如图所示。四边形$ABCD$的面积是多少？

(A) $\frac{\sqrt{6}}{2}$ $\frac{\sqrt{6}}{2}$ (B) $\frac{5}{4}$ $\frac{5}{4}$ (C) $\sqrt{2}$ $\sqrt{2}$ (D) $\frac{3}{2}$ $\frac{3}{2}$ (E) $\sqrt{3}$ $\sqrt{3}$

Q22

Jacob uses the following procedure to write down a sequence of numbers. First he chooses the first term to be 6. To generate each succeeding term, he flips a fair coin. If it comes up heads, he doubles the previous term and subtracts 1. If it comes up tails, he takes half of the previous term and subtracts 1. What is the probability that the fourth term in Jacob's sequence is an integer?

Jacob使用以下过程写下一个数字序列。首先他选择首项为6。为了生成每个后续项，他抛一枚公平硬币。如果正面，他将前一项加倍并减1。如果反面，他取前一项的一半并减1。Jacob序列的第四项是整数的概率是多少？

(A) $\frac{1}{6}$ $\frac{1}{6}$ (B) $\frac{1}{3}$ $\frac{1}{3}$ (C) $\frac{1}{2}$ $\frac{1}{2}$ (D) $\frac{5}{8}$ $\frac{5}{8}$ (E) $\frac{3}{4}$ $\frac{3}{4}$

Q23

Two subsets of the set $S = \{a, b, c, d, e\}$ are to be chosen so that their union is $S$ and their intersection contains exactly two elements. In how many ways can this be done, assuming that the order in which the subsets are chosen does not matter?

要从集合$S = \{a, b, c, d, e\}$中选择两个子集，使得它们的并集是$S$，且交集恰好包含两个元素。有多少种方法可以做到这一点，假设选择子集的顺序无关紧要？

(A) 20 20 (B) 40 40 (C) 60 60 (D) 160 160 (E) 320 320

Q24

Let $k = 2008^2 + 2^{2008}$. What is the units digit of $k^2 + 2^k$?

设$k = 2008^2 + 2^{2008}$。$k^2 + 2^k$的个位数是多少？

(A) 0 0 (B) 2 2 (C) 4 4 (D) 6 6 (E) 8 8

Q25

A round table has radius 4. Six rectangular place mats are placed on the table. Each place mat has width 1 and length $x$ as shown. They are positioned so that each mat has two corners on the edge of the table, these two corners being end points of the same side of length $x$. Further, the mats are positioned so that the inner corners each touch an inner corner of an adjacent mat. What is $x$?

一张半径为4的圆桌上有六个矩形餐垫放置。每张餐垫宽度为1，长度为$x$，如图所示。它们定位使得每张餐垫有两个角在桌边上，这两个角是长度为$x$的同一边的端点。此外，餐垫定位使得内角每个都接触相邻餐垫的一个内角。$x$是多少？

(A) $2\sqrt{5} - \sqrt{3}$ $2\sqrt{5} - \sqrt{3}$ (B) 3 3 (C) $\frac{3\sqrt{7} - \sqrt{5}}{2}$ $\frac{3\sqrt{7} - \sqrt{5}}{2}$ (D) $2\sqrt{3}$ $2\sqrt{3}$ (E) $\frac{5 + 2\sqrt{3}}{2}$ $\frac{5 + 2\sqrt{3}}{2}$

AMC10 2008 A