2017 AMC 12B 考试题目
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1.
Kymbrea's comic book collection currently has comic books in it, and she is adding to her collection at the rate of comic books per month. LaShawn's collection currently has comic books in it, and he is adding to his collection at the rate of comic books per month. After how many months will LaShawn's collection have twice as many comic books as Kymbrea's?
Answer: E
Difficulty rating: 920
Solution:
After months, Kymbrea has comic books and LaShawn has Setting gives so and
Thus, the correct answer is E.
2.
Real numbers and satisfy the inequalities
Which of the following numbers is necessarily positive?
Answer: E
Difficulty rating: 1020
Solution:
Adding and gives so is always positive. Each of the other four choices can be made negative: with every one of and is negative.
Thus, the correct answer is E.
3.
Suppose that and are nonzero real numbers such that
What is the value of
Answer: D
Difficulty rating: 1130
Solution:
The equation gives so meaning Then
Thus, the correct answer is D.
4.
Samia set off on her bicycle to visit her friend, traveling at an average speed of kilometers per hour. When she had gone half the distance to her friend's house, a tire went flat, and she walked the rest of the way at kilometers per hour. In all it took her minutes to reach her friend's house. In kilometers rounded to the nearest tenth, how far did Samia walk?
Answer: C
Difficulty rating: 1270
Solution:
Let be the total distance, so she biked at km/h and walked at km/h. The total time in hours is Combining the left side gives so She walked about kilometers.
Thus, the correct answer is C.
5.
The data set has median first quartile and third quartile An outlier in a data set is a value that is more than times the interquartile range below the first quartile or more than times the interquartile range above the third quartile where the interquartile range is defined as How many outliers does this data set have?
Answer: B
Difficulty rating: 1130
Solution:
The interquartile range is so times it is Outliers are values less than or greater than Only falls below and nothing exceeds so there is exactly outlier.
Thus, the correct answer is B.
6.
The circle having and as the endpoints of a diameter intersects the -axis at a second point. What is the -coordinate of this point?
Answer: D
Difficulty rating: 1350
Solution:
The center is the midpoint of the diameter, and the radius is The circle is Setting gives so or The second intersection with the -axis is at
Thus, the correct answer is D.
7.
The functions and are periodic with least period What is the least period of the function
It's not periodic.
Answer: B
Difficulty rating: 1500
Solution:
Since the function has period It cannot be smaller: exactly when which happens only at integer multiples of so the maxima are spaced apart. The least period is
Thus, the correct answer is B.
8.
The ratio of the short side of a certain rectangle to the long side is equal to the ratio of the long side to the diagonal. What is the square of the ratio of the short side to the long side of this rectangle?
Answer: C
Difficulty rating: 1440
Solution:
Let and be the short and long sides, so the diagonal is and Writing the right side is so giving The positive root is
Thus, the correct answer is C.
9.
A circle has center and radius Another circle has center and radius The line passing through the two points of intersection of the two circles has equation What is
Answer: A
Difficulty rating: 1410
Solution:
The circles are and Expanding and subtracting the second from the first cancels the and terms and simplifies to Any intersection point satisfies this, so it is the line through both, and
Thus, the correct answer is A.
10.
At Typico High School, of the students like dancing, and the rest dislike it. Of those who like dancing, say that they like it, and the rest say that they dislike it. Of those who dislike dancing, say that they dislike it, and the rest say that they like it. What fraction of students who say they dislike dancing actually like it?
Answer: D
Difficulty rating: 1440
Solution:
Students who like dancing but say they dislike it make up of all students. Students who dislike dancing and say so make up Among everyone who says they dislike dancing, the fraction who actually like it is
Thus, the correct answer is D.
11.
Call a positive integer monotonous if it is a one-digit number or its digits, when read from left to right, form either a strictly increasing or a strictly decreasing sequence. For example, and are monotonous, but and are not. How many monotonous positive integers are there?
Answer: B
Difficulty rating: 1590
Solution:
Strictly increasing monotonous numbers correspond to nonempty subsets of giving Strictly decreasing ones correspond to subsets of other than and (a leading is not allowed), giving The nine single-digit numbers are counted in both, so the total is
Thus, the correct answer is B.
12.
What is the sum of the roots of that have a positive real part?
Answer: D
Difficulty rating: 1630
Solution:
The roots of lie on the circle of radius at angles that are multiples of Those with positive real part are at angles Their imaginary parts cancel, so the sum is
Thus, the correct answer is D.
13.
In the figure below, of the disks are to be painted blue, are to be painted red, and is to be painted green. Two paintings that can be obtained from one another by a rotation or a reflection of the entire figure are considered the same. How many different paintings are possible?
Answer: D
Solution:
The figure has corner disks and non-corner disks, with the symmetry group of a triangle. Fix the green disk's type. If green is a corner, the two red disks can be arranged so that both, one, or neither is adjacent to green, giving distinct paintings. If green is a non-corner, the two reds can have both, one, or neither in a corner, again paintings. The blue disks fill the rest, so the total is
Thus, the correct answer is D.
14.
An ice-cream novelty item consists of a cup in the shape of a -inch-tall frustum of a right circular cone, with a -inch-diameter base at the bottom and a -inch-diameter base at the top, packed solid with ice cream, together with a solid cone of ice cream of height inches, whose base, at the bottom, is the top base of the frustum. What is the total volume of the ice cream, in cubic inches?
Answer: E
Difficulty rating: 1530
Solution:
Extending the frustum's sides to a point, similar triangles show the frustum equals a cone of radius and height minus a cone of radius and height The top cone of radius and height adds The total is
Thus, the correct answer is E.
15.
Let be an equilateral triangle. Extend side beyond to a point so that Similarly, extend side beyond to a point so that and extend side beyond to a point so that What is the ratio of the area of to the area of
Answer: E
Difficulty rating: 1660
Solution:
Let and draw segments and Triangle has base and the same altitude as from to line so its area is likewise and each have area Next, has times the base and the same height as so its area is similarly and each have area Thus so the ratio is
Thus, the correct answer is E.
16.
The number has over positive integer divisors. One of them is chosen at random. What is the probability that it is odd?
Answer: B
Difficulty rating: 1730
Solution:
The exponent of in is Every divisor has the form with and odd; it is odd exactly when So the fraction of odd divisors is
Thus, the correct answer is B.
17.
A coin is biased in such a way that on each toss the probability of heads is and the probability of tails is The outcomes of the tosses are independent. A player has the choice of playing Game A or Game B. In Game A she tosses the coin three times and wins if all three outcomes are the same. In Game B she tosses the coin four times and wins if both the outcomes of the first and second tosses are the same and the outcomes of the third and fourth tosses are the same. How do the chances of winning Game A compare to the chances of winning Game B?
The probability of winning Game A is less than the probability of winning Game B.
The probability of winning Game A is less than the probability of winning Game B.
The probabilities are the same.
The probability of winning Game A is greater than the probability of winning Game B.
The probability of winning Game A is greater than the probability of winning Game B.
Answer: D
Difficulty rating: 1800
Solution:
Let Game A is won when all three tosses match: Game B needs the first pair to match and the second pair to match, each with probability so the win probability is With Game A gives and Game B gives The difference is so Game A is more likely.
Thus, the correct answer is D.
18.
The diameter of a circle of radius is extended to a point outside the circle so that Point is chosen so that and line is perpendicular to line Segment intersects the circle at a point between and What is the area of
Answer: D
Difficulty rating: 1860
Solution:
Since is inscribed in a semicircle, it is a right angle, so (both right-angled and sharing angle ). Their areas are in ratio Here so and so The area of is Thus
Thus, the correct answer is D.
19.
Let be the -digit number that is formed by writing the integers from to in order, one after the other. What is the remainder when is divided by
Answer: C
Difficulty rating: 1910
Solution:
The last digit of is so For mod sum the digits: the numbers – contribute their digits, the tens digits of – and the units digits together sum to which is a multiple of so The number is then a multiple of and its last digit is so it is a multiple of hence is a multiple of Therefore
Thus, the correct answer is C.
20.
Real numbers and are chosen independently and uniformly at random from the interval What is the probability that where denotes the greatest integer less than or equal to the real number
Answer: D
Difficulty rating: 1990
Solution:
For each positive integer exactly when an interval of length The event that both floors equal is a square of area Summing over all the probability is
Thus, the correct answer is D.
21.
Last year Isabella took math tests and received different scores, each an integer between and inclusive. After each test she noticed that the average of her test scores was an integer. Her score on the seventh test was What was her score on the sixth test?
Answer: E
Difficulty rating: 2040
Solution:
Let be the sum of all seven scores. Then is a multiple of with so Since the average after six tests is an integer, is a multiple of which forces Then the first six scores sum to a multiple of the average after five tests is an integer, so the first five scores also sum to a multiple of making the sixth score a multiple of Since all scores differ and the seventh is the sixth must be
Thus, the correct answer is E.
22.
Abby, Bernardo, Carl, and Debra play a game in which each of them starts with four coins. The game consists of four rounds. In each round, four balls are placed in an urn—one green, one red, and two white. The players each draw a ball at random without replacement. Whoever gets the green ball gives one coin to whoever gets the red ball. What is the probability that, at the end of the fourth round, each of the players has four coins?
Answer: B
Difficulty rating: 2330
Solution:
Each round has equally likely (giver, receiver) pairs, so there are outcome sequences. Everyone ends with four coins exactly when the four transfers cancel. The favorable patterns are: a -cycle of gifts ( ways), two disjoint mutual exchanges (), one pair exchanging twice (), and one player both giving to and receiving from each of two others (). These total The probability is
Thus, the correct answer is B.
23.
The graph of where is a polynomial of degree contains points and Lines and intersect the graph again at points and respectively, and the sum of the -coordinates of and is What is
Answer: D
Difficulty rating: 2370
Solution:
The points lie on so has roots for some The coefficients of and in are and so by Vieta the three roots of (for any linear ) sum to The lines meet the cubic in triples so giving Then so
Thus, the correct answer is D.
24.
Quadrilateral has right angles at and and There is a point in the interior of such that and the area of is times the area of What is
Answer: D
Difficulty rating: 2550
Solution:
Set and The similarity with the right angles places the figure at Let with From we get and so The area of is and computing by the shoelace formula and setting simplifies to Then so
Thus, the correct answer is D.
25.
A set of people participate in an online video basketball tournament. Each person may be a member of any number of -player teams, but no two teams may have exactly the same members. The site statistics show a curious fact: The average, over all subsets of size of the set of participants, of the number of complete teams whose members are among those people is equal to the reciprocal of the average, over all subsets of size of the set of participants, of the number of complete teams whose members are among those people. How many values can be the number of participants?
Answer: D
Difficulty rating: 2650
Solution:
Let be the number of teams. Summing over size- subsets counts each team times and over size- subsets times. The averages are and setting the first equal to the reciprocal of the second and simplifying gives We need this to be a positive integer with Let as a product of five consecutive integers, is always divisible by Checking residues, and each hold for a fixed set of residues, giving solutions modulo So there are values in removing (which are below ) and adding (since ) gives valid values.
Thus, the correct answer is D.