amcdrill | AMC8 AMC10 AMC12 Practice

Q1

What is $10\cdot\left(\tfrac{1}{2}+\tfrac{1}{5}+\tfrac{1}{10}\right)^{-1}?$

$10\cdot\left(\tfrac{1}{2}+\tfrac{1}{5}+\tfrac{1}{10}\right)^{-1}$ 等于多少？

(A) 3 3 (B) 8 8 (C) \ \frac{25}{2} \ \frac{25}{2} (D) \ \frac{170}{3} \ \frac{170}{3} (E) 170 170

Q2

At the theater children get in for half price. The price for $5$ adult tickets and $4$ child tickets is $\$24.50$. How much would $8$ adult tickets and $6$ child tickets cost?

剧院儿童票半价。5张成人票和4张儿童票的价格是$24.50$。8张成人票和6张儿童票需要多少钱？

(A) \$35 \$35 (B) \$38.50 \$38.50 (C) \$40 \$40 (D) \$42 \$42 (E) \$42.50 \$42.50

Q3

Walking down Jane Street, Ralph passed four houses in a row, each painted a different color. He passed the orange house before the red house, and he passed the blue house before the yellow house. The blue house was not next to the yellow house. How many orderings of the colored houses are possible?

走在简街上，拉尔夫经过了四栋连续的房子，每栋房子漆成不同的颜色。他经过橙色房子在红色房子之前，经过蓝色房子在黄色房子之前。蓝色房子不紧邻黄色房子。彩色房子的可能排列有多少种？

(A) 2 2 (B) 3 3 (C) 4 4 (D) 5 5 (E) 6 6

Q4

Suppose that $a$ cows give $b$ gallons of milk in $c$ days. At this rate, how many gallons of milk will $d$ cows give in $e$ days?

假设$a$头奶牛在$c$天产$b$加仑牛奶。以此速率，$d$头奶牛在$e$天产多少加仑牛奶？

(A) \ \frac{bde}{ac} \ \frac{bde}{ac} (B) \ \frac{ac}{bde} \ \frac{ac}{bde} (C) \ \frac{abde}{c} \ \frac{abde}{c} (D) \ \frac{bcde}{a} \ \frac{bcde}{a} (E) \ \frac{abc}{de} \ \frac{abc}{de}

Q5

On an algebra quiz, $10\%$ of the students scored $70$ points, $35\%$ scored $80$ points, $30\%$ scored $90$ points, and the rest scored $100$ points. What is the difference between the mean and median score of the students' scores on this quiz?

在一张代数测验中，$10\%$的学生得分$70$分，$35\%$得分$80$分，$30\%$得分$90$分，其余得分$100$分。学生成绩的平均分与中位数的差是多少？

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

Q6

The difference between a two-digit number and the number obtained by reversing its digits is $5$ times the sum of the digits of either number. What is the sum of the two digit number and its reverse?

一个两位数与其数字反转后的数的差，是该数两位数字之和的5倍。两位数与其反转数之和是多少？

(A) 44 44 (B) 55 55 (C) 77 77 (D) 99 99 (E) 110 110

Q7

The first three terms of a geometric progression are $\sqrt 3$, $\sqrt[3]3$, and $\sqrt[6]3$. What is the fourth term?

一个几何级数的头三项是$\sqrt 3$、$\sqrt[3]3$和$\sqrt[6]3$。第四项是多少？

(A) 1 1 (B) \sqrt[7]3 \sqrt[7]3 (C) \sqrt[8]3 \sqrt[8]3 (D) \sqrt[9]3 \sqrt[9]3 (E) \sqrt[10]3\qquad \sqrt[10]3\qquad

Q8

A customer who intends to purchase an appliance has three coupons, only one of which may be used: Coupon 1: $10\%$ off the listed price if the listed price is at least $\$50$ Coupon 2: $\$ 20$ off the listed price if the listed price is at least $\$100$ Coupon 3: $18\%$ off the amount by which the listed price exceeds $\$100$ For which of the following listed prices will coupon $1$ offer a greater price reduction than either coupon $2$ or coupon $3$?

一位顾客打算购买一件电器，有三个优惠券，只能使用其中一个：优惠券1：标价至少$\$50$时，标价9折（10\% off）。优惠券2：标价至少$\$100$时，减$\$ 20$。优惠券3：标价超过$\$100$的部分的18\%折扣。对于下列哪个标价，优惠券1提供的折扣大于优惠券2或3？

(A) \$179.95 \$179.95 (B) \$199.95 \$199.95 (C) \$219.95 \$219.95 (D) \$239.95 \$239.95 (E) \$259.95 \$259.95

Q9

Five positive consecutive integers starting with $a$ have average $b$. What is the average of $5$ consecutive integers that start with $b$?

以$a$开始的5个连续正整数的平均数是$b$。以$b$开始的5个连续整数的平均数是多少？

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

Q10

Three congruent isosceles triangles are constructed with their bases on the sides of an equilateral triangle of side length $1$. The sum of the areas of the three isosceles triangles is the same as the area of the equilateral triangle. What is the length of one of the two congruent sides of one of the isosceles triangles?

在一个边长为1的正三角形的三边上，各构造一个全等等腰三角形。这三个等腰三角形的面积之和等于正三角形的面积。其中一个等腰三角形的两条全等边的长度是多少？

(A) \dfrac{\sqrt3}4 \dfrac{\sqrt3}4 (B) \dfrac{\sqrt3}3 \dfrac{\sqrt3}3 (C) \dfrac23 \dfrac23 (D) \dfrac{\sqrt2}2 \dfrac{\sqrt2}2 (E) \dfrac{\sqrt3}2 \dfrac{\sqrt3}2

Q11

David drives from his home to the airport to catch a flight. He drives $35$ miles in the first hour, but realizes that he will be $1$ hour late if he continues at this speed. He increases his speed by $15$ miles per hour for the rest of the way to the airport and arrives $30$ minutes early. How many miles is the airport from his home?

David 从家开车去机场赶飞机。第一小时他开了 $35$ 英里，但意识到如果继续以这个速度，他将迟到 $1$ 小时。他将速度增加 $15$ 英里每小时，继续前往机场，并提前 $30$ 分钟到达。机场离他家多少英里？

(A) 140 140 (B) 175 175 (C) 210 210 (D) 245 245 (E) 280\qquad 280\qquad

Q12

Two circles intersect at points $A$ and $B$. The minor arcs $AB$ measure $30^\circ$ on one circle and $60^\circ$ on the other circle. What is the ratio of the area of the larger circle to the area of the smaller circle?

两个圆相交于点 $A$ 和 $B$。在其中一个圆上，次弧 $AB$ 测 $30^\circ$，在另一个圆上测 $60^\circ$。较大圆的面积与较小圆的面积之比是多少？

(A) 2 2 (B) 1+\sqrt3 1+\sqrt3 (C) 3 3 (D) 2+\sqrt3 2+\sqrt3 (E) 4\qquad 4\qquad

Q13

A fancy bed and breakfast inn has $5$ rooms, each with a distinctive color-coded decor. One day $5$ friends arrive to spend the night. There are no other guests that night. The friends can room in any combination they wish, but with no more than $2$ friends per room. In how many ways can the innkeeper assign the guests to the rooms?

一家高档床和早餐旅馆有 $5$ 个房间，每个房间都有独特的颜色装饰。有一天，$5$ 个朋友前来过夜。那天晚上没有其他客人。朋友们可以任意组合入住，但每个房间最多 $2$ 个朋友。旅馆老板可以有多少种方式分配客人到房间？

(A) 2100 2100 (B) 2220 2220 (C) 3000 3000 (D) 3120 3120 (E) 3125\qquad 3125\qquad

Q14

Let $a<b<c$ be three integers such that $a,b,c$ is an arithmetic progression and $a,c,b$ is a geometric progression. What is the smallest possible value of $c$?

设 $a<b<c$ 是三个整数，使得 $a,b,c$ 是等差数列，且 $a,c,b$ 是等比数列。$c$ 的最小可能值是多少？

(A) -2 -2 (B) 1 1 (C) 2 2 (D) 4 4 (E) 6\qquad 6\qquad

Q15

A five-digit palindrome is a positive integer with respective digits $abcba$, where $a$ is non-zero. Let $S$ be the sum of all five-digit palindromes. What is the sum of the digits of $S$?

五位回文数是一个正整数，其各位数字分别为 $abcba$，其中 $a$ 非零。设 $S$ 为所有五位回文数之和。$S$ 的各位数字之和是多少？

(A) 9 9 (B) 18 18 (C) 27 27 (D) 36 36 (E) 45\qquad 45\qquad

Q16

The product $(8)(888\dots8)$, where the second factor has $k$ digits, is an integer whose digits have a sum of $1000$. What is $k$?

$(8)(888\dots8)$的乘积，其中第二个因子有$k$个数字，是一个各位数字之和为$1000$的整数。$k$是多少？

(A) 901 901 (B) 911 911 (C) 919 919 (D) 991 991 (E) 999 999

Q17

A $4\times 4\times h$ rectangular box contains a sphere of radius $2$ and eight smaller spheres of radius $1$. The smaller spheres are each tangent to three sides of the box, and the larger sphere is tangent to each of the smaller spheres. What is $h$?

一个$4\times 4\times h$的长方体盒子内有一个半径为$2$的球体和八个半径为$1$的小球。小球各自与盒子的三个面相切，大球与每个小球相切。$h$是多少？

(A) 2+2\sqrt 7 2+2\sqrt 7 (B) 3+2\sqrt 5 3+2\sqrt 5 (C) 4+2\sqrt 7 4+2\sqrt 7 (D) 4\sqrt 5 4\sqrt 5 (E) 4\sqrt 7\qquad 4\sqrt 7\qquad

Q18

The domain of the function $f(x)=\log_{\frac12}(\log_4(\log_{\frac14}(\log_{16}(\log_{\frac1{16}}x))))$ is an interval of length $\tfrac mn$, where $m$ and $n$ are relatively prime positive integers. What is $m+n$?

函数$f(x)=\log_{\frac12}(\log_4(\log_{\frac14}(\log_{16}(\log_{\frac1{16}}x))))$的定义域是一个长度为$\tfrac mn$的区间，其中$m$和$n$互质正整数。$m+n$是多少？

(A) 19 19 (B) 31 31 (C) 271 271 (D) 319 319 (E) 511\qquad 511\qquad

Q19

There are exactly $N$ distinct rational numbers $k$ such that $|k|<200$ and \[5x^2+kx+12=0\] has at least one integer solution for $x$. What is $N$?

恰有$N$个不同的有理数$k$使得$|k|<200$且\[5x^2+kx+12=0\]至少有一个整数解$x$。$N$是多少？

(A) 6 6 (B) 12 12 (C) 24 24 (D) 48 48 (E) 78\qquad 78\qquad

Q20

In $\triangle BAC$, $\angle BAC=40^\circ$, $AB=10$, and $AC=6$. Points $D$ and $E$ lie on $\overline{AB}$ and $\overline{AC}$ respectively. What is the minimum possible value of $BE+DE+CD$?

在$\triangle BAC$中，$\angle BAC=40^\circ$，$AB=10$，$AC=6$。点$D$和$E$分别在$\overline{AB}$和$\overline{AC}$上。$BE+DE+CD$的最小可能值是多少？

(A) 6\sqrt 3+3 6\sqrt 3+3 (B) \dfrac{27}2 \dfrac{27}2 (C) 8\sqrt 3 8\sqrt 3 (D) 14 14 (E) 3\sqrt 3+9\qquad 3\sqrt 3+9\qquad

Q21

For every real number $x$, let $\lfloor x\rfloor$ denote the greatest integer not exceeding $x$, and let \[f(x)=\lfloor x\rfloor(2014^{x-\lfloor x\rfloor}-1).\] The set of all numbers $x$ such that $1\leq x<2014$ and $f(x)\leq 1$ is a union of disjoint intervals. What is the sum of the lengths of those intervals?

对于每个实数 $x$，令 $\lfloor x\rfloor$ 表示不超过 $x$ 的最大整数，并令 \[f(x)=\lfloor x\rfloor(2014^{x-\lfloor x\rfloor}-1).\] 所有满足 $1\leq x<2014$ 且 $f(x)\leq 1$ 的数的集合是若干不相交区间的并集。这些区间的长度之和是多少？

(A) 1 1 (B) \dfrac{\log 2015}{\log 2014} \dfrac{\log 2015}{\log 2014} (C) \dfrac{\log 2014}{\log 2013} \dfrac{\log 2014}{\log 2013} (D) \dfrac{2014}{2013} \dfrac{2014}{2013} (E) 2014^{\frac1{2014}}\qquad 2014^{\frac1{2014}}\qquad

Q22

The number $5^{867}$ is between $2^{2013}$ and $2^{2014}$. How many pairs of integers $(m,n)$ are there such that $1\leq m\leq 2012$ and \[5^n<2^m<2^{m+2}<5^{n+1}?\]

数 $5^{867}$ 位于 $2^{2013}$ 和 $2^{2014}$ 之间。有多少对整数 $(m,n)$ 满足 $1\leq m\leq 2012$ 且 \[5^n<2^m<2^{m+2}<5^{n+1}?\]

(A) 278 278 (B) 279 279 (C) 280 280 (D) 281 281 (E) 282\qquad 282\qquad

Q23

The fraction \[\dfrac1{99^2}=0.\overline{b_{n-1}b_{n-2}\ldots b_2b_1b_0},\] where $n$ is the length of the period of the repeating decimal expansion. What is the sum $b_0+b_1+\cdots+b_{n-1}$?

小数 \[\dfrac1{99^2}=0.\overline{b_{n-1}b_{n-2}\ldots b_2b_1b_0},\] 其中 $n$ 是循环小数展开的周期长度。求 $b_0+b_1+\cdots+b_{n-1}$ 的值？

(A) 874 874 (B) 883 883 (C) 887 887 (D) 891 891 (E) 892\qquad 892\qquad

Q24

Let $f_0(x)=x+|x-100|-|x+100|$, and for $n\geq 1$, let $f_n(x)=|f_{n-1}(x)|-1$. For how many values of $x$ is $f_{100}(x)=0$?

令 $f_0(x)=x+|x-100|-|x+100|$，对于 $n\geq 1$，令 $f_n(x)=|f_{n-1}(x)|-1$。有几个 $x$ 使得 $f_{100}(x)=0$？

(A) 299 299 (B) 300 300 (C) 301 301 (D) 302 302 (E) 303\qquad 303\qquad

Q25

The parabola $P$ has focus $(0,0)$ and goes through the points $(4,3)$ and $(-4,-3)$. For how many points $(x,y)\in P$ with integer coordinates is it true that $|4x+3y|\leq 1000$?

抛物线 $P$ 的焦点为 $(0,0)$，并经过点 $(4,3)$ 和 $(-4,-3)$。有几个点 $(x,y)\in P$ 满足整数坐标且 $|4x+3y|\leq 1000$？

(A) 38 38 (B) 40 40 (C) 42 42 (D) 44 44 (E) 46\qquad 46\qquad

AMC12 2014 A