2007 AMC 8 Exam Problems
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All of the real AMC 8 and AMC 10 problems in our complete solution collection are used with official permission of the Mathematical Association of America (MAA).
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1.
Theresa's parents have agreed to buy her tickets to see her favorite band if she spends an average of hours per week helping around the house for weeks. For the first weeks she helps around the house for and hours. How many hours must she work for the final week to earn the tickets?
Answer: D
Solution:
During the first weeks, Theresa works for a total of hours.
She, however, promised to work for hours.
This means that she has to work hours during the final work to earn the tickets.
Thus, D is the correct answer.
2.
students were surveyed about their pasta preferences. The choices were lasagna, manicotti, ravioli and spaghetti. The results of the survey are displayed in the bar graph. What is the ratio of the number of students who preferred spaghetti to the number of students who preferred manicotti?
Answer: E
Solution:
There are students who preferred spaghetti and that preferred manicotti.
The ratio is therefore
Thus, E is the correct answer.
3.
What is the sum of the two smallest prime factors of
Answer: C
Solution:
We can prime factorize to get From this, we can see that only has two prime factors: and The sum of these is
Thus, C is the correct answer.
4.
A haunted house has six windows. In how many ways can Georgie the Ghost enter the house by one window and leave by a different window?
Answer: D
Solution:
Georgie has options for which window he enters through. He, however, only has options for the exit since it must be different from the entrance.
The total number of paths is therefore
Thus, D is the correct answer.
5.
Chandler wants to buy a dollar mountain bike. For his birthday, his grandparents send him dollars, his aunt sends him dollars and his cousin gives him dollars. He earns dollars per week for his paper route. He will use all of his birthday money and all of the money he earns from his paper route. In how many weeks will he be able to buy the mountain bike?
Answer: B
Solution:
The total amount of money that Chandler got from his birthday is dollars. Therefore, he only needs to raise more dollars.
This can be achieved in weeks through his paper route.
Thus, B is the correct answer
6.
The average cost of a long-distance call in the USA in was cents per minute, and the average cost of a long-distance call in the USA in was cents per minute. Find the approximate percent decrease in the cost per minute of a long-distance call.
Answer: E
Solution:
The difference in the costs is cents. The approximate percent decrease is therefore
Thus, E is the correct answer.
7.
The average age of people in a room is years. An -year-old person leaves the room. What is the average age of the four remaining people?
Answer: D
Solution:
Initially, the total age of everyone in the room is years.
After the person leaves, the total age is With people remaining, the average age becomes
Thus, D is the correct answer.
8.
In trapezoid is perpendicular to and In addition, is on and is parallel to Find the area of
Answer: B
Solution:
We know that We also know that Therefore, the area of is
Thus, B is the correct answer.
9.
To complete the grid below, each of the digits through must occur once in each row and once in each column. What number will occupy the lower right-hand square?
Answer: B
Solution:
Consider the last element in the second row. This has to be a since cannot be in that column.
Then, the number in the top right square must be since it cannot be
This forces the to be in the bottom right square.
Thus, B is the correct answer.
10.
For any positive integer define to be the sum of the positive factors of For example, Find
Answer: D
Solution:
First, we find that since is prime. Then we need to find The factors of are Adding these yields
Thus, D is the correct answer.
11.
Tiles and are translated so one tile coincides with each of the rectangles and In the final arrangement, the two numbers on any side common to two adjacent tiles must be the same. Which of the tiles is translated to Rectangle
Answer: D
Solution:
Note that only Tile has the number of This forces it to be either or This tile also is the only one with This makes sure that Tile is
The only tile that can match with on Tile is Tile Therefore, Tile is
Similarly, we get that Tile is and Tile is
Thus, the correct answer is D
12.
A unit hexagram is composed of a regular hexagon of side length and its equilateral triangular extensions, as shown in the diagram. What is the ratio of the area of the extensions to the area of the original hexagon?
Answer: A
Solution:
Note that we can split the hexagon into congruent equilateral triangles as follows.
Since each of them share an edge with an exterior triangle, all the triangles are congruent. Therefore, the ratio of areas is
Thus, A is the correct answer.
13.
Sets and shown in the Venn diagram, have the same number of elements. Their union has elements and their intersection has elements. Find the number of elements in
Answer: C
Solution:
Let be the number of elements in each and Also let be the number of elements in their intersection.
The conditions give us that and Plugging into the first equation yields
Thus, C is the correct answer.
14.
The base of isosceles is and its area is What is the length of one of the congruent sides?
Answer: C
Solution:
Construct as the altitude from to
Then which gives us that
From this, we apply the Pythagorean Theorem on This gives us that
Thus, C is the correct answer.
15.
Let and be numbers with Which of the following is impossible?
a + c < b
a \cdot b < c
a + b < c
a \cdot c < b
Answer: A
Solution:
We know that and Adding these two inequalities together yields This shows that A is impossible, and therefore the right answer.
To ensure that this is correct, we can show that the other options are possible.
B and C: and
D: and
E: and
Thus, A is the correct answer.
16.
Amanda Reckonwith draws five circles with radii and Then for each circle she plots the point where is its circumference and is its area. Which of the following could be her graph?
Answer: A
Solution:
The cirumferences of circles with radii through are Their respective areas are The only graph that shows these points is A, making it the correct answer.
This is the only graph showing a quadratic function.
Thus, A is the correct answer.
17.
A mixture of liters of paint is red tint, yellow tint and water. Five liters of yellow tint are added to the original mixture. What is the percent of yellow tint in the new mixture?
Answer: C
Solution:
The amount of yellow tint in the original mixture is liters. Adding liters results in a total of liters of yellow tint.
The new mixture has a total of liters, so the percent of yellow tint is
Thus, C is the correct answer.
18.
The product of the two -digit numbers and has thousands digit and units digit What is the sum of and
Answer: D
Solution:
We only care about the last digits, so we can calculate to find them (the thousands digit is for both numbers).
This gives us that and Therefore,
Thus, D is the correct answer.
19.
Pick two consecutive positive integers whose sum is less than Square both of those integers and then find the difference of the squares. Which of the following could be the difference?
Answer: C
Solution:
Let and the two integers, where The difference of the squares is
From this, we see that the desired difference is less than and is odd.
Thus, the correct answer is C.
20.
Before district play, the Unicorns had won of their basketball games. During district play, they won six more games and lost two, to finish the season having won half their games. How many games did the Unicorns play in all?
Answer: A
Solution:
Let be the number of games the Unicorns had played before district play. Then after the entire season, they won a total of games.
In total, they played games. The problem statement also tell us that Solving, Therefore, the Unicorns played a total of games.
Thus, A is the correct answer.
21.
Two cards are dealt from a deck of four red cards labeled and four green cards labeled A winning pair is two of the same color or two of the same letter. What is the probability of drawing a winning pair?
Answer: D
Solution:
After drawing the first card, there are left. of them have the same color, and of them has the same letter. Therefore, there are out of possibilities that result in a winning pair.
The probability of drawing a pair is then
Thus, D is the correct answer.
22.
A lemming sits at a corner of a square with side length meters. The lemming runs meters along a diagonal toward the opposite corner. It stops, makes a right turn and runs more meters. A scientist measures the shortest distance between the lemming and each side of the square. What is the average of these four distances in meters?
Answer: C
Solution:
Based on the lengths given in the problem, the lemming is still in the square after it stops.
Since the lemming is still in the square, the sum of the distances to the horizontal sides is meters and the same for the vertical sides. Therefore, the distances sum to meters, making the average meters.
Thus, C is the correct answer.
23.
What is the area of the shaded pinwheel shown in the grid?
Answer: B
Solution:
We can find the area of the shaded part by subtracting the area of the unshaded part from the whole area.
There are squares with side length contributing each to the unshaded area, for a total of
There are also triangles with base and height This contributes a total area of
The total unshaded area is therefore
The total area is and subtracting the unshaded area yields as the area of the shaded region.
Thus, B is the correct answer.
24.
A bag contains four pieces of paper, each labeled with one of the digits or with no repeats. Three of these pieces are drawn, one at a time without replacement, to construct a three-digit number. What is the probability that the three-digit number is a multiple of
Answer: C
Solution:
Recall that a number is divisible if the sum of its digits is divisible by
The only triples of distinct numbers that satisfy this condition are and
This means that the numbers form a three-digit number when either or is left in the bag.
Each of these events happens with chance, for a total probability of
Thus, C is the correct answer.
25.
On the dart board shown in the figure below, the outer circle has radius and the inner circle has radius Three radii divide each circle into three congruent regions, with point values shown. The probability that a dart will hit a given region is proportional to the area of the region. When two darts hit this board, the score is the sum of the point values of the regions hit. What is the probability that the score is odd?
Answer: B
Solution:
The area of the outer circle is and the area of the inner circle is Therefore, the area of the outer ring is
This means that the probability of hitting an outer segment is Similarly, the probability of hitting an inner segment is
Summing over all possibilities, the probability of hitting a is Similarly, the probability of hitting a is
The only way to get an odd score is to hit one and one
The probability of hitting these numbers in either order is
Thus, B is the correct answer.