2015 AIME II 考试答案
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All of the real AMC 8, AMC 10, AMC 12, and AIME problems in our complete solution collection are used with official legal permission of the Mathematical Association of America (MAA).
1.
Let be the least positive integer that is both percent less than one integer and percent greater than another integer. Find the remainder when is divided by
Difficulty rating: 2050
Solution:
The conditions say and for some integers and Since the first equation forces so is a multiple of since the second forces so is a multiple of
The least positive integer divisible by both is achieved with and The remainder upon division by is
2.
In a new school percent of the students are freshmen, percent are sophomores, percent are juniors, and percent are seniors. All freshmen are required to take Latin, and percent of the sophomores, percent of the juniors, and percent of the seniors elect to take Latin. The probability that a randomly chosen Latin student is a sophomore is where and are relatively prime positive integers. Find
Difficulty rating: 1750
Solution:
Assume the school has students. The Latin students are then freshmen, sophomores, juniors, and seniors, for a total of
The probability that a random Latin student is a sophomore is so
3.
Let be the least positive integer divisible by whose digits sum to Find
Difficulty rating: 2070
Solution:
Every number is congruent to its digit sum modulo so must satisfy that is which gives
Checking the candidates in increasing order: give with digit sums each, but gives with digit sum So
4.
In an isosceles trapezoid, the parallel bases have lengths and and the altitude to these bases has length The perimeter of the trapezoid can be written in the form where and are positive integers. Find
Difficulty rating: 2170
Solution:
Dropping altitudes from the ends of the short base, each leg is the hypotenuse of a right triangle whose legs are the altitude and half the difference of the bases, By the -- ratio, each leg has length
The perimeter is so
5.
Two unit squares are selected at random without replacement from an grid of unit squares. Find the least positive integer such that the probability that the two selected squares are horizontally or vertically adjacent is less than
Difficulty rating: 2270
Solution:
Each of the rows contains horizontally adjacent pairs, so there are horizontal pairs and likewise vertical pairs. Out of equally likely pairs, the probability of adjacency is
We need Since and the least such is
6.
Steve says to Jon, "I am thinking of a polynomial whose roots are all positive integers. The polynomial has the form for some positive integers and Can you tell me the values of and "
After some calculations, Jon says, "There is more than one such polynomial."
Steve says, "You're right. Here is the value of " He writes down a positive integer and asks, "Can you tell me the value of "
Jon says, "There are still two possible values of "
Find the sum of the two possible values of
Difficulty rating: 2500
Solution:
Dividing by the roots satisfy and Therefore
The triples of positive integers whose squares sum to are and with equal to and Since knowing still left Jon two choices, and the two polynomials come from and
The corresponding values of are and with sum
7.
Triangle has side lengths and Rectangle has vertex on vertex on and vertices and on In terms of the side length the area of can be expressed as the quadratic polynomial Then the coefficient where and are relatively prime positive integers. Find
Difficulty rating: 2470
Solution:
By Heron's formula with the area of is so the altitude from to has length
Since triangle is similar to with ratio so the distance from down to line is and the rectangle's height is The area is
Thus and
8.
Let and be positive integers satisfying The maximum possible value of is where and are relatively prime positive integers. Find
Difficulty rating: 2650
Solution:
If or then So assume Clearing denominators, the hypothesis says and multiplying by and rearranging gives
For both factors are positive odd integers, so up to symmetry the only options are and (both of which do satisfy the original inequality, while gives the product ).
The values are for and for The larger is so
9.
A cylindrical barrel with radius feet and height feet is full of water. A solid cube with side length feet is set into the barrel so that the diagonal of the cube is vertical. The volume of water thus displaced is cubic feet. Find
Difficulty rating: 2760
Solution:
The displaced volume equals the volume of the part of the cube lying below the plane of the barrel's rim. By symmetry that region is a tetrahedron cut from the bottom corner of the cube: three mutually perpendicular edges of equal length along the cube's edges, capped by an equilateral triangle in the rim plane. The equilateral cross-section is inscribed in the rim circle of radius so its side length is and therefore
Taking one of the right isosceles faces as the base, the volume is
Thus and
10.
Call a permutation of the integers quasi-increasing if for each For example, and are quasi-increasing permutations of the integers but is not. Find the number of quasi-increasing permutations of the integers
Difficulty rating: 2890
Solution:
Let be the number of quasi-increasing permutations of Insert into a quasi-increasing permutation of the entry following must be at least so can go immediately before immediately before or at the very end — exactly positions, and each insertion keeps every other adjacent condition intact.
Conversely, deleting from a quasi-increasing permutation of leaves a quasi-increasing permutation of since the entries around the deleted satisfy when So for
Since we get
11.
The circumcircle of acute has center The line passing through point perpendicular to intersects lines and at and respectively. Also and where and are relatively prime positive integers. Find
Difficulty rating: 3060
Solution:
The central angle over is and makes triangle isosceles, so In triangle the angle at is hence
Triangles and share the angle at and have so they are similar, giving Therefore and
12.
There are possible -letter strings in which each letter is either an A or a B. Find the number of such strings that do not have more than adjacent letters that are identical.
Difficulty rating: 2890
Solution:
The condition says every maximal run of identical letters has length at most Let count the valid strings of length whose first letter is A; by symmetry the answer is Removing the first run (of length or ) leaves a valid shorter string beginning with B, so
Starting from the sequence runs so
The number of valid strings is
13.
Define the sequence by where represents radian measure. Find the index of the th term for which
Difficulty rating: 3270
Solution:
Multiplying each term by and using the sum telescopes:
So exactly when which happens exactly when is within of a multiple of Each interval has length and contains exactly one integer, namely
Hence the th negative term has index Since we have so the index is
14.
Let and be real numbers satisfying and Evaluate
Difficulty rating: 3160
Solution:
The equations factor as and With and using they become and Dividing,
Substituting into gives so which means Then and
Finally
15.
Circles and have radii and respectively, and are externally tangent at point Point is on and point is on so that line is a common external tangent of the two circles. A line through intersects again at and intersects again at Points and lie on the same side of and the areas of and are equal. This common area is where and are relatively prime positive integers. Find
Difficulty rating: 3500
Solution:
Place line on the -axis, so the centers are and (their distance is ), with and the tangency point The homothety centered at with ratio carries to and to so Since and the equal-area condition is with and on the same side of
Write as Its signed values at and are and so the same-side ratio- condition reads giving i.e. Taking the line is
Then and the center is at distance from so the chord gives The common area is so