2016 AMC 12B 考试题目

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1.

What is the value of

2a1+a12a \frac{2a^{-1}+\frac{a^{-1}}{2}}{a}

when a=12?a=\tfrac12?

11

22

52\dfrac52

1010

2020

Answer: D
Concepts:exponentorder of operations

Difficulty rating: 920

Solution:

With a=12,a=\tfrac12, we have a1=2.a^{-1}=2. The numerator is 22+22=4+1=5,2\cdot2+\dfrac{2}{2}=4+1=5, and dividing by a=12a=\tfrac12 gives 51/2=10.\dfrac{5}{1/2}=10.

Thus, the correct answer is D.

2.

The harmonic mean of two numbers can be computed as twice their product divided by their sum. The harmonic mean of 11 and 20162016 is closest to which integer?

22

4545

504504

10081008

20152015

Answer: A

Difficulty rating: 1020

Solution:

The harmonic mean is 2120161+2016=40322017.\dfrac{2\cdot1\cdot2016}{1+2016}=\dfrac{4032}{2017}. Since 20162017\dfrac{2016}{2017} is very close to 1,1, this is just under 2,2, so the closest integer is 2.2.

Thus, the correct answer is A.

3.

Let x=2016.x=-2016. What is the value of

  xxx  x? \Big|\;\big|\,|x|-x\,\big|-|x|\;\Big|-x?

2016-2016

00

20162016

40324032

60486048

Answer: D

Difficulty rating: 1130

Solution:

Since x=2016,x=-2016, x=2016.|x|=2016. The innermost expression is xx=2016+2016=4032.|x|-x=2016+2016=4032. Then 4032x=40322016=2016,\big|4032\big|-|x|=4032-2016=2016, and the outer absolute value leaves 2016.2016. Finally subtracting xx gives 2016(2016)=4032.2016-(-2016)=4032.

Thus, the correct answer is D.

4.

The ratio of the measures of two acute angles is 5:4,5:4, and the complement of one of these two angles is twice as large as the complement of the other. What is the sum of the degree measures of the two angles?

7575

9090

135135

150150

270270

Answer: C

Difficulty rating: 1200

Solution:

Let the angles be α<β\alpha\lt\beta with β=54α.\beta=\tfrac54\alpha. The larger complement belongs to the smaller angle, so 90α=2(90β)=18052α.90-\alpha=2(90-\beta)=180-\tfrac52\alpha. This gives 32α=90,\tfrac32\alpha=90, so α=60\alpha=60^\circ and β=75.\beta=75^\circ. The sum is 135.135^\circ.

Thus, the correct answer is C.

5.

The War of 1812 started with a declaration of war on Thursday, June 18, 1812. The peace treaty to end the war was signed 919919 days later, on December 24, 1814. On what day of the week was the treaty signed?

Friday

Saturday

Sunday

Monday

Tuesday

Answer: B

Difficulty rating: 1200

Solution:

Because 919=7131+2,919=7\cdot131+2, the treaty was signed 131131 full weeks plus 22 days after Thursday. Two days beyond Thursday is Saturday.

Thus, the correct answer is B.

6.

All three vertices of ABC\triangle ABC lie on the parabola defined by y=x2,y=x^2, with AA at the origin and BC\overline{BC} parallel to the xx-axis. The area of the triangle is 64.64. What is the length of BC?BC?

44

66

88

1010

1616

Answer: C

Difficulty rating: 1350

Solution:

Let the vertex in the first quadrant be (x,x2).(x,x^2). By symmetry the base is BC=2xBC=2x and the height is x2,x^2, so 122xx2=x3=64.\tfrac12\cdot2x\cdot x^2=x^3=64. Thus x=4x=4 and BC=2x=8.BC=2x=8.

Thus, the correct answer is C.

7.

Josh writes the numbers 1,2,3,,99,100.1,2,3,\ldots,99,100. He marks out 1,1, skips the next number (2),(2), marks out 3,3, and continues skipping and marking out the next number to the end of his list. Then he goes back to the start of his list, marks out the first remaining number (2),(2), skips the next number (4),(4), marks out 6,6, skips 8,8, marks out 10,10, and so on to the end. Josh continues in this manner until only one number remains. What is that number?

1313

3232

5656

6464

9696

Answer: D

Difficulty rating: 1440

Solution:

The first pass removes the odd numbers, leaving the multiples of 2.2. The second pass removes 2,6,10,,2,6,10,\ldots, leaving the multiples of 4.4. In general, after the nnth pass only the multiples of 2n2^n remain. The surviving number is the highest power of 22 not exceeding 100,100, which is 26=64.2^6=64.

Thus, the correct answer is D.

8.

A thin piece of wood of uniform density in the shape of an equilateral triangle with side length 33 inches weighs 1212 ounces. A second piece of the same type of wood, with the same thickness, also in the shape of an equilateral triangle, has side length 55 inches. Which of the following is closest to the weight, in ounces, of the second piece?

14.014.0

16.016.0

20.020.0

33.333.3

55.655.6

Answer: D
Solution:

Weight is proportional to area, and area scales with the square of the side length. The second side is 53\tfrac53 times the first, so its weight is 12(53)2=100333.312\cdot\left(\dfrac53\right)^2=\dfrac{100}{3}\approx33.3 ounces.

Thus, the correct answer is D.

9.

Carl decided to fence in his rectangular garden. He bought 2020 fence posts, placed one on each of the four corners, and spaced out the rest evenly along the edges of the garden, leaving exactly 44 yards between neighboring posts. The longer side of his garden, including the corners, has twice as many posts as the shorter side, including the corners. What is the area, in square yards, of Carl's garden?

256256

336336

384384

448448

512512

Answer: B
Solution:

Let the shorter side have xx posts, so the longer side has 2x.2x. Counting all posts and subtracting the four corners counted twice, 2x+2(2x)4=20,2x+2(2x)-4=20, giving x=4.x=4. The shorter side has 44 posts, or (41)4=12(4-1)\cdot4=12 yards, and the longer side has 88 posts, or (81)4=28(8-1)\cdot4=28 yards. The area is 1228=336.12\cdot28=336.

Thus, the correct answer is B.

10.

A quadrilateral has vertices P(a,b),P(a,b), Q(b,a),Q(b,a), R(a,b),R(-a,-b), and S(b,a),S(-b,-a), where aa and bb are integers with a>b>0.a\gt b\gt0. The area of PQRSPQRS is 16.16. What is a+b?a+b?

44

55

66

1212

1313

Answer: A
Solution:

The sides PQ\overline{PQ} and RS\overline{RS} have slope 1,-1, and QR\overline{QR} and PS\overline{PS} have slope 1,1, so PQRSPQRS is a rectangle with sides (ab)2(a-b)\sqrt2 and (a+b)2.(a+b)\sqrt2. Its area is 2(ab)(a+b)=2(a2b2)=16,2(a-b)(a+b)=2(a^2-b^2)=16, so a2b2=8.a^2-b^2=8. The only perfect squares differing by 88 are 99 and 1,1, giving a=3,a=3, b=1,b=1, and a+b=4.a+b=4.

Thus, the correct answer is A.

11.

How many squares whose sides are parallel to the axes and whose vertices have coordinates that are integers lie entirely within the region bounded by the line y=πx,y=\pi x, the line y=0.1,y=-0.1, and the line x=5.1?x=5.1?

3030

4141

4545

5050

5757

Answer: D

Difficulty rating: 1630

Solution:

A unit square in the strip kxk+1k\le x\le k+1 fits below y=πxy=\pi x up to height πk.\lfloor\pi k\rfloor. Counting 1×11\times1 squares in the strips 1x51\le x\le5 gives 3+6+9+12=30.3+6+9+12=30. The 2×22\times2 squares give 2+5+8=15,2+5+8=15, and the 3×33\times3 squares give 1+4=5.1+4=5. There are no larger squares, so the total is 30+15+5=50.30+15+5=50.

Thus, the correct answer is D.

12.

All the numbers 1,2,3,4,5,6,7,8,91,2,3,4,5,6,7,8,9 are written in a 3×33\times3 array of squares, one number in each square, in such a way that if two numbers are consecutive then they occupy squares that share an edge. The numbers in the four corners add up to 18.18. What number is in the center?

55

66

77

88

99

Answer: C

Difficulty rating: 1590

Solution:

Color the grid like a checkerboard so the four corners and the center share one color. Since consecutive numbers occupy adjacent (opposite colored) squares, the numbers alternate parity along the chain, so the five same-colored cells contain the five odd numbers 1,3,5,7,9,1,3,5,7,9, which sum to 25.25. The four corners add to 18,18, so the center is 2518=7.25-18=7.

Thus, the correct answer is C.

13.

Alice and Bob live 1010 miles apart. One day Alice looks due north from her house and sees an airplane. At the same time Bob looks due west from his house and sees the same airplane. The angle of elevation of the airplane is 3030^\circ from Alice's position and 6060^\circ from Bob's position. Which of the following is closest to the airplane's altitude, in miles?

3.53.5

44

4.54.5

55

5.55.5

Answer: E
Solution:

Let the airplane be at C,C, directly above point DD on the ground at altitude h.h. Triangles ACDACD and BCDBCD are 3030-6060-9090 right triangles, so AD=3hAD=\sqrt3\,h and BD=h3.BD=\dfrac{h}{\sqrt3}. Since Alice looks north and Bob looks west, ADB=90,\angle ADB=90^\circ, so AD2+BD2=AB2=100.AD^2+BD^2=AB^2=100. Then 3h2+h23=10h23=100,3h^2+\dfrac{h^2}{3}=\dfrac{10h^2}{3}=100, giving h=305.48,h=\sqrt{30}\approx5.48, closest to 5.5.5.5.

Thus, the correct answer is E.

14.

The sum of an infinite geometric series is a positive number S,S, and the second term in the series is 1.1. What is the smallest possible value of S?S?

1+52\dfrac{1+\sqrt5}{2}

22

5\sqrt5

33

44

Answer: E

Difficulty rating: 1730

Solution:

Let rr be the common ratio. Since the second term is 1,1, the first term is 1r,\dfrac1r, so S=1/r1r=1rr2.S=\dfrac{1/r}{1-r}=\dfrac{1}{r-r^2}. Because S>0,S\gt0, it is smallest when rr2r-r^2 is largest. The parabola rr2r-r^2 peaks at r=12,r=\tfrac12, where it equals 14,\tfrac14, so the smallest value of SS is 11/4=4.\dfrac{1}{1/4}=4.

Thus, the correct answer is E.

15.

All the numbers 2,3,4,5,6,72,3,4,5,6,7 are assigned to the six faces of a cube, one number to each face. For each of the eight vertices of the cube, a product of three numbers is computed, where the three numbers are the numbers assigned to the three faces that include that vertex. What is the greatest possible value of the sum of these eight products?

312312

343343

625625

729729

16801680

Answer: D

Difficulty rating: 1800

Solution:

Pair the opposite faces as (a,b),(c,d),(e,f).(a,b),(c,d),(e,f). Each vertex product uses one face from each pair, so the sum of all eight products factors as (a+b)(c+d)(e+f).(a+b)(c+d)(e+f). The three factors have fixed total 2+3+4+5+6+7=27,2+3+4+5+6+7=27, and a product with fixed sum is largest when the factors are equal, at 99 each. This balance is achievable with (2,7),(3,6),(4,5),(2,7),(3,6),(4,5), giving 999=729.9\cdot9\cdot9=729.

Thus, the correct answer is D.

16.

In how many ways can 345345 be written as the sum of an increasing sequence of two or more consecutive positive integers?

11

33

55

66

77

Answer: E

Difficulty rating: 1800

Solution:

A sum of consecutive integers equals the count times the median. For an odd number of terms, the median is an integer divisor of 345,345, giving runs of 33 (median 115115), 55 (median 6969), 1515 (median 2323), and 2323 (median 1515) terms. For an even number of terms 2k,2k, the median is a half-integer, giving runs of 2,2, 6,6, and 1010 terms. Longer runs would force negative terms. This gives 4+3=74+3=7 ways.

Thus, the correct answer is E.

17.

In ABC\triangle ABC shown in the figure, AB=7,AB=7, BC=8,BC=8, CA=9,CA=9, and AH\overline{AH} is an altitude. Points DD and EE lie on sides AC\overline{AC} and AB,\overline{AB}, respectively, so that BD\overline{BD} and CE\overline{CE} are angle bisectors, intersecting AH\overline{AH} at QQ and P,P, respectively. What is PQ?PQ?

11

583\dfrac58\sqrt3

452\dfrac45\sqrt2

8155\dfrac{8}{15}\sqrt5

65\dfrac65

Answer: D
Solution:

Let x=BH.x=BH. Then CH=8x,CH=8-x, and from the two right triangles AH2=72x2=92(8x)2.AH^2=7^2-x^2=9^2-(8-x)^2. This gives x=2x=2 and AH=45.AH=\sqrt{45}. By the angle bisector theorem in ACH,\triangle ACH, APPH=CACH=96,\dfrac{AP}{PH}=\dfrac{CA}{CH}=\dfrac96, so AP=35AH.AP=\dfrac35 AH. Similarly in ABH,\triangle ABH, AQQH=BABH=72,\dfrac{AQ}{QH}=\dfrac{BA}{BH}=\dfrac72, so AQ=79AH.AQ=\dfrac79 AH. Then PQ=AQAP=(7935)AH=84545=8155.PQ=AQ-AP=\left(\dfrac79-\dfrac35\right)AH=\dfrac{8}{45}\sqrt{45} =\dfrac{8}{15}\sqrt5.

Thus, the correct answer is D.

18.

What is the area of the region enclosed by the graph of the equation x2+y2=x+y?x^2+y^2=|x|+|y|?

π+2\pi+\sqrt2

π+2\pi+2

π+22\pi+2\sqrt2

2π+22\pi+\sqrt2

2π+222\pi+2\sqrt2

Answer: B

Difficulty rating: 1990

Solution:

By symmetry, consider the first quadrant, where the equation is x2+y2=x+y,x^2+y^2=x+y, or (x12)2+(y12)2=12.\left(x-\tfrac12\right)^2+\left(y-\tfrac12\right)^2=\tfrac12. This is a circle centered at (12,12)\left(\tfrac12,\tfrac12\right) passing through (1,0)(1,0) and (0,1);(0,1); since the center is the midpoint of that chord, the enclosed first-quadrant region is the right triangle with legs to (1,0)(1,0) and (0,1)(0,1) (area 12\tfrac12) plus a semicircle of radius 22\dfrac{\sqrt2}{2} (area π4\dfrac\pi4). Multiplying by 44 for all quadrants gives 4(12+π4)=π+2.4\left(\tfrac12+\tfrac\pi4\right)=\pi+2.

Thus, the correct answer is B.

19.

Tom, Dick, and Harry are playing a game. Starting at the same time, each of them flips a fair coin repeatedly until he gets his first head, at which point he stops. What is the probability that all three flip their coins the same number of times?

18\dfrac18

17\dfrac17

16\dfrac16

14\dfrac14

13\dfrac13

Answer: B

Difficulty rating: 1910

Solution:

A player's first head comes on flip nn with probability (12)n.\left(\tfrac12\right)^n. All three stopping on the same flip nn has probability ((12)n)3=(18)n.\left(\left(\tfrac12\right)^n\right)^3=\left(\tfrac18\right)^n. Summing over n1,n\ge1, n=1(18)n=1/811/8=17.\displaystyle\sum_{n=1}^\infty\left(\tfrac18\right)^n =\frac{1/8}{1-1/8}=\frac17.

Thus, the correct answer is B.

20.

A set of teams held a round-robin tournament in which every team played every other team exactly once. Every team won 1010 games and lost 1010 games; there were no ties. How many sets of three teams {A,B,C}\{A,B,C\} were there in which AA beat B,B, BB beat C,C, and CC beat A?A?

385385

665665

945945

11401140

13301330

Answer: A

Difficulty rating: 2110

Solution:

Since each team won 1010 and lost 10,10, there are 2121 teams and (213)=1330\binom{21}{3}=1330 triples. A triple is not cyclic exactly when one team beats both others. Choosing that team (2121 ways) and 22 of the 1010 teams it beat gives 21(102)=2145=94521\cdot\binom{10}{2}=21\cdot45=945 non-cyclic triples. Thus the cyclic triples number 1330945=385.1330-945=385.

Thus, the correct answer is A.

21.

Let ABCDABCD be a unit square. Let Q1Q_1 be the midpoint of CD.\overline{CD}. For i=1,2,,i=1,2,\ldots, let PiP_i be the intersection of AQi\overline{AQ_i} and BD,\overline{BD}, and let Qi+1Q_{i+1} be the foot of the perpendicular from PiP_i to CD.\overline{CD}. What is

i=1Area of DQiPi? \sum_{i=1}^{\infty}\text{Area of }\triangle DQ_iP_i?

16\dfrac16

14\dfrac14

13\dfrac13

12\dfrac12

11

Answer: B

Difficulty rating: 2210

Solution:

Place D=(0,0),D=(0,0), C=(1,0),C=(1,0), B=(1,1),B=(1,1), A=(0,1),A=(0,1), and let qi=DQi.q_i=DQ_i. Intersecting line AQiAQ_i with BD\overline{BD} (the line y=xy=x) gives PiP_i with both coordinates qi1+qi,\dfrac{q_i}{1+q_i}, so qi+1=qi1+qi.q_{i+1}=\dfrac{q_i}{1+q_i}. From q1=12q_1=\tfrac12 this yields qi=1i+1.q_i=\dfrac{1}{i+1}. The base of DQiPi\triangle DQ_iP_i is DQi=1i+1DQ_i=\dfrac{1}{i+1} and its height is the yy-coordinate of Pi,P_i, which is qi+1=1i+2.q_{i+1}=\dfrac{1}{i+2}. Then Area of DQiPi=121i+11i+2=12(1i+11i+2). \text{Area of }\triangle DQ_iP_i=\tfrac12\cdot\dfrac{1}{i+1}\cdot \dfrac{1}{i+2}=\tfrac12\left(\dfrac{1}{i+1}-\dfrac{1}{i+2}\right). Summing telescopes to 1212=14.\tfrac12\cdot\tfrac12=\tfrac14.

Thus, the correct answer is B.

22.

For a certain positive integer nn less than 1000,1000, the decimal equivalent of 1n\dfrac1n is 0.abcdef,0.\overline{abcdef}, a repeating decimal of period 6,6, and the decimal equivalent of 1n+6\dfrac{1}{n+6} is 0.wxyz,0.\overline{wxyz}, a repeating decimal of period 4.4. In which interval does nn lie?

[1,200][1,200]

[201,400][201,400]

[401,600][401,600]

[601,800][601,800]

[801,999][801,999]

Answer: B
Solution:

Period 66 requires n1061=337111337.n\mid10^6-1=3^3\cdot7\cdot11\cdot13\cdot37. Period 44 requires n+61041=3211101n+6\mid10^4-1=3^2\cdot11\cdot101 but n+61021=3211n+6\nmid10^2-1=3^2\cdot11 (else the period would be 11 or 22). Hence 101n+6,101\mid n+6, so n=101k6.n=101k-6. For n<1000,n\lt1000, k{1,3,9},k\in\{1,3,9\}, giving n{95,297,903}.n\in\{95,297,903\}. Only 297=3311297=3^3\cdot11 divides 1061,10^6-1, so n=297,n=297, which lies in [201,400].[201,400].

Thus, the correct answer is B.

23.

What is the volume of the region in three-dimensional space defined by the inequalities x+y+z1|x|+|y|+|z|\le1 and x+y+z11?|x|+|y|+|z-1|\le1?

16\dfrac16

13\dfrac13

12\dfrac12

23\dfrac23

11

Answer: A
Solution:

The region x+y+z1|x|+|y|+|z|\le1 is a regular octahedron with vertices at (±1,0,0),(0,±1,0),(0,0,±1),(\pm1,0,0),(0,\pm1,0),(0,0,\pm1), whose volume is 213(2)21=43.2\cdot\tfrac13\cdot(\sqrt2)^2\cdot1=\tfrac43. The second region is the same octahedron shifted up by 1.1. Their intersection is bounded by another regular octahedron with diagonals of length 1,1, half the linear dimensions of the first, so its volume is (12)343=16.\left(\tfrac12\right)^3\cdot\tfrac43=\tfrac16.

Thus, the correct answer is A.

24.

There are exactly 77,00077{,}000 ordered quadruples (a,b,c,d)(a,b,c,d) such that gcd(a,b,c,d)=77\gcd(a,b,c,d)=77 and lcm(a,b,c,d)=n.\text{lcm}(a,b,c,d)=n. What is the smallest possible value of n?n?

13,86013{,}860

20,79020{,}790

21,56021{,}560

27,72027{,}720

41,58041{,}580

Answer: D
Solution:

Writing each entry as 7777 times a reduced value, we need gcd=1\gcd=1 and lcm=m=n/77.\text{lcm}=m=n/77. For each prime pp dividing mm with maximum exponent M,M, the number of valid exponent quadruples is (M+1)42M4+(M1)4=2(6M2+1).(M+1)^4-2M^4+(M-1)^4=2(6M^2+1). The total over all primes must equal 77,000=2353711.77{,}000=2^3\cdot5^3\cdot7\cdot11. Since 2(6M2+1)2(6M^2+1) equals 14,14, 50,50, and 110110 for M=1,2,3,M=1,2,3, and 1450110=77,000,14\cdot50\cdot110=77{,}000, exactly three primes divide m,m, with maximum exponents 1,2,3.1,2,3. To minimize m=n/77,m=n/77, assign the largest exponent to the smallest prime: m=23325=360,m=2^3\cdot3^2\cdot5=360, so n=77360=27,720.n=77\cdot360=27{,}720.

Thus, the correct answer is D.

25.

The sequence (an)(a_n) is defined recursively by a0=1,a_0=1, a1=219,a_1=\sqrt[19]{2}, and an=an1an22a_n=a_{n-1}a_{n-2}^2 for n2.n\ge2. What is the smallest positive integer kk such that the product a1a2aka_1a_2\cdots a_k is an integer?

1717

1818

1919

2020

2121

Answer: A

Difficulty rating: 2650

Solution:

Write an=2bn/19.a_n=2^{b_n/19}. The recursion becomes b0=0,b_0=0, b1=1,b_1=1, bn=bn1+2bn2,b_n=b_{n-1}+2b_{n-2}, solved by bn=13(2n(1)n).b_n=\tfrac13\bigl(2^n-(-1)^n\bigr). The product a1aka_1\cdots a_k is an integer exactly when 19b1++bk.19\mid b_1+\cdots+b_k. For odd k,k, this sum equals 13(2k+11),\tfrac13(2^{k+1}-1), which is a multiple of 1919 exactly when 192k+11,19\mid2^{k+1}-1, i.e. when the order of 22 modulo 19,19, namely 18,18, divides k+1.k+1. The smallest such odd kk is k+1=18,k+1=18, so k=17.k=17.

Thus, the correct answer is A.