amcdrill | AMC8 AMC10 AMC12 Practice

Q1

What is the value of\[2^{1+2+3}-(2^1+2^2+2^3)?\]

求\[2^{1+2+3}-(2^1+2^2+2^3)\]的值。

(A) 0 0 (B) 50 50 (C) 52 52 (D) 54 54 (E) 57 57

Q2

Under what conditions is $\sqrt{a^2+b^2}=a+b$ true, where $a$ and $b$ are real numbers?

对于实数$a$和$b$，在什么条件下$\sqrt{a^2+b^2}=a+b$成立？

(A) It is never true. It is never true. (B) It is true if and only if $ab=0$. It is true if and only if $ab=0$. (C) It is true if and only if $a+b\ge 0$. It is true if and only if $a+b\ge 0$. (D) It is true if and only if $ab=0$ and $a+b\ge 0$. It is true if and only if $ab=0$ and $a+b\ge 0$. (E) It is always true. It is always true.

Q3

The sum of two natural numbers is $17{,}402$. One of the two numbers is divisible by $10$. If the units digit of that number is erased, the other number is obtained. What is the difference of these two numbers?

两个自然数的和是$17{,}402$。其中一个数能被$10$整除。如果擦除该数的个位数字，就得到另一个数。这两个数的差是多少？

(A) 10{,}272 10{,}272 (B) 11{,}700 11{,}700 (C) 13{,}362 13{,}362 (D) 14{,}238 14{,}238 (E) 15{,}426 15{,}426

Q4

Tom has a collection of $13$ snakes, $4$ of which are purple and $5$ of which are happy. He observes that Which of these conclusions can be drawn about Tom's snakes?

Tom有$13$条蛇，其中$4$条是紫色的，$5$条是快乐的。他观察到关于Tom的蛇，能得出以下哪个结论？

(A) Purple snakes can add. Purple snakes can add. (B) Purple snakes are happy. Purple snakes are happy. (C) Snakes that can add are purple. Snakes that can add are purple. (D) Happy snakes are not purple. Happy snakes are not purple. (E) Happy snakes can't subtract. Happy snakes can't subtract.

Q5

When a student multiplied the number $66$ by the repeating decimal, \[\underline{1}.\underline{a} \ \underline{b} \ \underline{a} \ \underline{b}\ldots=\underline{1}.\overline{\underline{a} \ \underline{b}},\] where $a$ and $b$ are digits, he did not notice the notation and just multiplied $66$ times $\underline{1}.\underline{a} \ \underline{b}.$ Later he found that his answer is $0.5$ less than the correct answer. What is the $2$-digit number $\underline{a} \ \underline{b}?$

当一名学生将数字$66$乘以循环小数， \[\underline{1}.\underline{a} \ \underline{b} \ \underline{a} \ \underline{b}\ldots=\underline{1}.\overline{\underline{a} \ \underline{b}},\] 其中$a$和$b$是数字时，他没有注意到记号，就将$66$乘以$\underline{1}.\underline{a} \ \underline{b}$。后来他发现自己的答案比正确答案少$0.5$。$\underline{a} \ \underline{b}$这个两位数是多少？

(A) 15 15 (B) 30 30 (C) 45 45 (D) 60 60 (E) 75 75

Q6

A deck of cards has only red cards and black cards. The probability of a randomly chosen card being red is $\frac13$. When $4$ black cards are added to the deck, the probability of choosing red becomes $\frac14$. How many cards were in the deck originally?

一副牌只有红牌和黑牌。随机抽取一张牌是红牌的概率为 $\frac13$。当向牌堆中加入 $4$ 张黑牌后，选择红牌的概率变为 $\frac14$。原牌堆中有多少张牌？

(A) 6 6 (B) 9 9 (C) 12 12 (D) 15 15 (E) 18 18

Q7

What is the least possible value of $(xy-1)^2+(x+y)^2$ for real numbers $x$ and $y$?

对于实数 $x$ 和 $y$，$(xy-1)^2+(x+y)^2$ 的最小可能值是多少？

(A) 0 0 (B) \frac{1}{4} \frac{1}{4} (C) \frac{1}{2} \frac{1}{2} (D) 1 1 (E) 2 2

Q8

A sequence of numbers is defined by $D_0=0,D_1=0,D_2=1$ and $D_n=D_{n-1}+D_{n-3}$ for $n\ge 3$. What are the parities (evenness or oddness) of the triple of numbers $(D_{2021},D_{2022},D_{2023})$, where $E$ denotes even and $O$ denotes odd?

一个数列由 $D_0=0,D_1=0,D_2=1$ 和 $D_n=D_{n-1}+D_{n-3}$（$n\ge 3$）定义。求三元组 $(D_{2021},D_{2022},D_{2023})$ 的奇偶性，其中 $E$ 表示偶数，$O$ 表示奇数。

(A) (O,E,O) (O,E,O) (B) (E,E,O) (E,E,O) (C) (E,O,E) (E,O,E) (D) (O,O,E) (O,O,E) (E) (O,O,O) (O,O,O)

Q9

Which of the following is equivalent to \[(2+3)(2^2+3^2)(2^4+3^4)(2^8+3^8)(2^{16}+3^{16})(2^{32}+3^{32})(2^{64}+3^{64})?\]

下列哪一项等价于 \[(2+3)(2^2+3^2)(2^4+3^4)(2^8+3^8)(2^{16}+3^{16})(2^{32}+3^{32})(2^{64}+3^{64})?\]

(A) 3^{127} + 2^{127} 3^{127} + 2^{127} (B) 3^{127} + 2^{127} + 2 \cdot 3^{63} + 3 \cdot 2^{63} 3^{127} + 2^{127} + 2 \cdot 3^{63} + 3 \cdot 2^{63} (C) 3^{128}-2^{128} 3^{128}-2^{128} (D) 3^{128} + 2^{128} 3^{128} + 2^{128} (E) 5^{127} 5^{127}

Q10

Two right circular cones with vertices facing down as shown in the figure below contain the same amount of liquid. The radii of the tops of the liquid surfaces are $3$ cm and $6$ cm. Into each cone is dropped a spherical marble of radius $1$ cm, which sinks to the bottom and is completely submerged without spilling any liquid. What is the ratio of the rise of the liquid level in the narrow cone to the rise of the liquid level in the wide cone?

如图所示，两个顶点朝下的右圆锥含有相同量的液体。液体表面的顶面半径分别为 $3$ cm 和 $6$ cm。在每个圆锥中放入一颗半径 $1$ cm 的球形弹珠，该弹珠沉到底部，完全浸没且不溢出液体。求窄锥中液面上升高度与宽锥中液面上升高度的比值。

(A) 1:1 1:1 (B) 47:43 47:43 (C) 2:1 2:1 (D) 40:13 40:13 (E) 4:1 4:1

Q11

A laser is placed at the point $(3,5)$. The laser beam travels in a straight line. Larry wants the beam to hit and bounce off the $y$-axis, then hit and bounce off the $x$-axis, then hit the point $(7,5)$. What is the total distance the beam will travel along this path?

激光器放置在点$(3,5)$处。激光束沿直线传播。Larry希望光束先击中$y$轴并反弹，然后击中$x$轴并反弹，然后击中点$(7,5)$。这条路径上光束的总行进距离是多少？

(A) 2\sqrt{10} 2\sqrt{10} (B) 5\sqrt2 5\sqrt2 (C) 10\sqrt2 10\sqrt2 (D) 15\sqrt2 15\sqrt2 (E) 10\sqrt5 10\sqrt5

Q12

All the roots of the polynomial $z^6-10z^5+Az^4+Bz^3+Cz^2+Dz+16$ are positive integers, possibly repeated. What is the value of $B$?

多项式$z^6-10z^5+Az^4+Bz^3+Cz^2+Dz+16$的所有根都是正整数，可能有重根。$B$的值是多少？

(A) {-}88 {-}88 (B) {-}80 {-}80 (C) {-}64 {-}64 (D) {-}41 {-}41 (E) {-}40 {-}40

Q13

Of the following complex numbers $z$, which one has the property that $z^5$ has the greatest real part?

下列复数$z$中，哪一个使得$z^5$的实部最大？

(A) {-}2 {-}2 (B) {-}\sqrt3+i {-}\sqrt3+i (C) {-}\sqrt2+\sqrt2 i {-}\sqrt2+\sqrt2 i (D) {-}1+\sqrt3 i {-}1+\sqrt3 i (E) 2i 2i

Q14

What is the value of \[\left(\sum_{k=1}^{20} \log_{5^k} 3^{k^2}\right)\cdot\left(\sum_{k=1}^{100} \log_{9^k} 25^k\right)?\]

求\[\left(\sum_{k=1}^{20} \log_{5^k} 3^{k^2}\right)\cdot\left(\sum_{k=1}^{100} \log_{9^k} 25^k\right)\]的值。

(A) 21 21 (B) 100\log_5 3 100\log_5 3 (C) 200\log_3 5 200\log_3 5 (D) 2{,}200 2{,}200 (E) 21{,}000 21{,}000

Q15

A choir director must select a group of singers from among his $6$ tenors and $8$ basses. The only requirements are that the difference between the number of tenors and basses must be a multiple of $4$, and the group must have at least one singer. Let $N$ be the number of different groups that could be selected. What is the remainder when $N$ is divided by $100$?

合唱团指挥必须从$6$名男高音和$8$名男低音中选出一组歌手。唯一要求是男高音和男低音的数量之差必须是$4$的倍数，且组中至少有一名歌手。设$N$是可以选出的不同组的数量。$N$除以$100$的余数是多少？

(A) 47 47 (B) 48 48 (C) 83 83 (D) 95 95 (E) 96\qquad 96\qquad

Q16

In the following list of numbers, the integer $n$ appears $n$ times in the list for $1 \leq n \leq 200$.\[1, 2, 2, 3, 3, 3, 4, 4, 4, 4, \ldots, 200, 200, \ldots , 200\]What is the median of the numbers in this list?

在以下数字列表中，整数 $n$ 在列表中出现 $n$ 次，其中 $1 \leq n \leq 200$。 \[1, 2, 2, 3, 3, 3, 4, 4, 4, 4, \ldots, 200, 200, \ldots , 200\] 这个列表中数字的中位数是多少？

(A) 100.5 100.5 (B) 134 134 (C) 142 142 (D) 150.5 150.5 (E) 167 167

Q17

Trapezoid $ABCD$ has $\overline{AB}\parallel\overline{CD},BC=CD=43$, and $\overline{AD}\perp\overline{BD}$. Let $O$ be the intersection of the diagonals $\overline{AC}$ and $\overline{BD}$, and let $P$ be the midpoint of $\overline{BD}$. Given that $OP=11$, the length of $AD$ can be written in the form $m\sqrt{n}$, where $m$ and $n$ are positive integers and $n$ is not divisible by the square of any prime. What is $m+n$?

梯形 $ABCD$ 有 $\overline{AB}\parallel\overline{CD}$，$BC=CD=43$，且 $\overline{AD}\perp\overline{BD}$。令 $O$ 为对角线 $\overline{AC}$ 和 $\overline{BD}$ 的交点，$P$ 为 $\overline{BD}$ 的中点。已知 $OP=11$，$AD$ 的长度可以写成 $m\sqrt{n}$ 的形式，其中 $m$ 和 $n$ 是正整数，且 $n$ 没有被任何质数的平方整除。求 $m+n$？

(A) 65 65 (B) 132 132 (C) 157 157 (D) 194 194 (E) 215 215

Q18

Let $f$ be a function defined on the set of positive rational numbers with the property that $f(a\cdot b)=f(a)+f(b)$ for all positive rational numbers $a$ and $b$. Suppose that $f$ also has the property that $f(p)=p$ for every prime number $p$. For which of the following numbers $x$ is $f(x)<0$?

设 $f$ 是定义在正有理数集上的函数，具有性质 $f(a\cdot b)=f(a)+f(b)$，对所有正有理数 $a$ 和 $b$。假设 $f$ 还具有性质 $f(p)=p$，对每个质数 $p$。对于下列哪个数 $x$ 有 $f(x)<0$？

(A) \frac{17}{32} \frac{17}{32} (B) \frac{11}{16} \frac{11}{16} (C) \frac79 \frac79 (D) \frac76 \frac76 (E) \frac{25}{11} \frac{25}{11}

Q19

How many solutions does the equation $\sin \left( \frac{\pi}2 \cos x\right)=\cos \left( \frac{\pi}2 \sin x\right)$ have in the closed interval $[0,\pi]$?

方程 $\sin \left( \frac{\pi}2 \cos x\right)=\cos \left( \frac{\pi}2 \sin x\right)$ 在闭区间 $[0,\pi]$ 中有多少个解？

(A) 0 0 (B) 1 1 (C) 2 2 (D) 3 3 (E) 4 4

Q20

Suppose that on a parabola with vertex $V$ and a focus $F$ there exists a point $A$ such that $AF=20$ and $AV=21$. What is the sum of all possible values of the length $FV?$

假设在抛物线上有顶点 $V$ 和焦点 $F$，存在点 $A$ 使得 $AF=20$ 且 $AV=21$。所有可能 $FV$ 长度的和是多少？

(A) 13 13 (B) \frac{40}3 \frac{40}3 (C) \frac{41}3 \frac{41}3 (D) 14 14 (E) \frac{43}3 \frac{43}3

Q21

The five solutions to the equation\[(z-1)(z^2+2z+4)(z^2+4z+6)=0\] may be written in the form $x_k+y_ki$ for $1\le k\le 5,$ where $x_k$ and $y_k$ are real. Let $\mathcal E$ be the unique ellipse that passes through the points $(x_1,y_1),(x_2,y_2),(x_3,y_3),(x_4,y_4),$ and $(x_5,y_5)$. The eccentricity of $\mathcal E$ can be written in the form $\sqrt{\frac mn}$, where $m$ and $n$ are relatively prime positive integers. What is $m+n$? (Recall that the eccentricity of an ellipse $\mathcal E$ is the ratio $\frac ca$, where $2a$ is the length of the major axis of $\mathcal E$ and $2c$ is the is the distance between its two foci.)

方程 \[(z-1)(z^2+2z+4)(z^2+4z+6)=0\] 的五个解可以写成形式 $x_k+y_ki$，其中 $1\le k\le 5$，$x_k$ 和 $y_k$ 是实数。令 $\mathcal E$ 是通过点 $(x_1,y_1),(x_2,y_2),(x_3,y_3),(x_4,y_4)$ 和 $(x_5,y_5)$ 的唯一椭圆。$\mathcal E$ 的离心率可以写成 $\sqrt{\frac mn}$ 的形式，其中 $m$ 和 $n$ 是互质的正整数。求 $m+n$？（回忆椭圆 $\mathcal E$ 的离心率是 $\frac ca$，其中 $2a$ 是 $\mathcal E$ 的长轴长度，$2c$ 是其两个焦点间的距离。）

(A) 7 7 (B) 9 9 (C) 11 11 (D) 13 13 (E) 15 15

Q22

Suppose that the roots of the polynomial $P(x)=x^3+ax^2+bx+c$ are $\cos \frac{2\pi}7,\cos \frac{4\pi}7,$ and $\cos \frac{6\pi}7$, where angles are in radians. What is $abc$?

假设多项式 $P(x)=x^3+ax^2+bx+c$ 的根为 $\cos \frac{2\pi}7,\cos \frac{4\pi}7,$ 和 $\cos \frac{6\pi}7$，其中角度以弧度计。求 $abc$？

(A) {-}\frac{3}{49} {-}\frac{3}{49} (B) {-}\frac{1}{28} {-}\frac{1}{28} (C) \frac{\sqrt[3]7}{64} \frac{\sqrt[3]7}{64} (D) \frac{1}{32} \frac{1}{32} (E) \frac{1}{28} \frac{1}{28}

Q23

Frieda the frog begins a sequence of hops on a $3 \times 3$ grid of squares, moving one square on each hop and choosing at random the direction of each hop-up, down, left, or right. She does not hop diagonally. When the direction of a hop would take Frieda off the grid, she "wraps around" and jumps to the opposite edge. For example if Frieda begins in the center square and makes two hops "up", the first hop would place her in the top row middle square, and the second hop would cause Frieda to jump to the opposite edge, landing in the bottom row middle square. Suppose Frieda starts from the center square, makes at most four hops at random, and stops hopping if she lands on a corner square. What is the probability that she reaches a corner square on one of the four hops?

Frieda 青蛙在 $3 \times 3$ 的方格网格上开始一系列跳跃，每次跳跃移动一个方格，并随机选择每个跳跃的方向——上、下、左或右。她不斜向跳跃。当跳跃方向会使 Frieda 离开网格时，她“环绕”并跳到对边。例如，如果 Frieda 从中心方格开始并向上跳两次，第一次跳会让她到顶行中间方格，第二次跳会让她跳到对边，落在底行中间方格。假设 Frieda 从中心方格开始，随机进行至多四次跳跃，并在落在角落方格时停止跳跃。她在四次跳跃之一中到达角落方格的概率是多少？

(A) \frac{9}{16} \frac{9}{16} (B) \frac{5}{8} \frac{5}{8} (C) \frac{3}{4} \frac{3}{4} (D) \frac{25}{32} \frac{25}{32} (E) \frac{13}{16} \frac{13}{16}

Q24

Semicircle $\Gamma$ has diameter $\overline{AB}$ of length $14$. Circle $\Omega$ lies tangent to $\overline{AB}$ at a point $P$ and intersects $\Gamma$ at points $Q$ and $R$. If $QR=3\sqrt3$ and $\angle QPR=60^\circ$, then the area of $\triangle PQR$ equals $\tfrac{a\sqrt{b}}{c}$, where $a$ and $c$ are relatively prime positive integers, and $b$ is a positive integer not divisible by the square of any prime. What is $a+b+c$?

半圆 $\Gamma$ 有直径 $\overline{AB}$ 长度为 $14$。圆 $\Omega$ 在点 $P$ 与 $\overline{AB}$ 相切，并与 $\Gamma$ 相交于点 $Q$ 和 $R$。若 $QR=3\sqrt3$ 且 $\angle QPR=60^\circ$，则 $\triangle PQR$ 的面积等于 $\tfrac{a\sqrt{b}}{c}$，其中 $a$ 和 $c$ 是互质正整数，$b$ 是无平方因数的正整数。求 $a+b+c$？

(A) 110 110 (B) 114 114 (C) 118 118 (D) 122 122 (E) 126 126

Q25

Let $d(n)$ denote the number of positive integers that divide $n$, including $1$ and $n$. For example, $d(1)=1,d(2)=2,$ and $d(12)=6$. (This function is known as the divisor function.) Let\[f(n)=\frac{d(n)}{\sqrt [3]n}.\]There is a unique positive integer $N$ such that $f(N)>f(n)$ for all positive integers $n e N$. What is the sum of the digits of $N?$

令 $d(n)$ 表示正整数 $n$ 的正整数除数个数，包括 $1$ 和 $n$。例如，$d(1)=1$，$d(2)=2$，$d(12)=6$。（此函数称为除数函数。）令 \[f(n)=\frac{d(n)}{\sqrt [3]n}.\] 存在唯一的正整数 $N$，使得 $f(N)>f(n)$ 对于所有正整数 $n e N$。求 $N$ 的各位数字之和？

(A) 5 5 (B) 6 6 (C) 7 7 (D) 8 8 (E) 9 9

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