2012 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.
Rachelle uses 3 pounds of meat to make 8 hamburgers for her family. How many pounds of meat does she need to make 24 hamburgers for a neighbourhood picnic?
Answer: E
Solution:
If we have hamburgers, we have of the hamburgers. This means we have of the meat when we have pounds. The total amount of meat is therefore
Thus, the answer is E.
2.
In the country of East Westmore, statisticians estimate there is a baby born every hours and a death every day. To the nearest hundred, how many people are added to the population of East Westmore each year?
Answer: B
Solution:
Since we have birth every hours, we have births every hours. Therefore, we have births a day and death a day. The ner change in population every day should be on average Since we have days in a year and added to the population every year, the net change in population should be around This is approximately
Thus, the answer is B.
3.
On February 13 The Oshkosh Northwester listed the length of daylight as hours and minutes, the sunrise was and the sunset as The length of daylight and sunrise were correct, but the sunset was wrong. When did the sun really set?
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:
:
:
:
Answer: B
Solution:
Since hours after is we can then say hours and minutes after sunrise is We then have more minutes until sunset, so sunset is
Thus, the answer is B.
4.
Peter's family ordered a 12-slice pizza for dinner. Peter ate one slice and shared another slice equally with his brother Paul. What fraction of the pizza did Peter eat?
Answer: C
Solution:
Peter ate full slice, and he ate of the slice that he split.
Therefore, he ate of the pizza, which is equivalent to
Thus, the answer is C.
5.
In the diagram, all angles are right angles and the lengths of the sides are given in centimeters. Note the diagram is not drawn to scale. What is , in centimeters?
Answer: E
Solution:
First, we can find the height of the object by getting the sum of the heights on the right. Therefore, the height is
Next, we can find the height of the object by getting the sum of the heights on the left. Therefore, the height is
Since the heights are the same, we know so
Thus, the answer is E.
6.
A rectangular photograph is placed in a frame that forms a border two inches wide on all sides of the photograph. The photograph measures inches high and inches wide. What is the area of the border, in square inches?
Answer: E
Solution:
If we add inches on each side, we add inches total on both sides. This means that the dimensions of outer part of the frame is The area of this is
However, we must take out the area of the inner part of the frame which has area
Therefore, the total area is
Thus, the answer is E.
7.
Isabella must take four 100-point tests in her math class. Her goal is to achieve an average grade of 95 on the tests. Her first two test scores were 97 and 91. After seeing her score on the third test, she realized she can still reach her goal. What is the lowest possible score she could have made on the third test?
Answer: B
Solution:
If the average is then the sum of the tests are Since we have the first two tests, the sum of the last two tests is minus the first two scores.
This makes the sum of the last two scores equal to Her last two scores therefore hace a sum of
Given the sum of the tests we try to minimize one score, then we must maximize the other test. Therefore, we maximize the fourth test by making it This would make the third test equal to
Thus, the answer is B.
8.
A shop advertises everything is "half price in today's sale." In addition, a coupon gives a 20% discount on sale prices. Using the coupon, the price today represents what percentage off the original price?
Answer: D
Solution:
Let be the original price. If everything is half off, we have the new price as
Having a discount makes it such that we keep of the price, so the price is
This would have off, so we get a discount of which is
Thus, the answer is D.
9.
The Fort Worth Zoo has a number of two-legged birds and a number of four-legged mammals. On one visit to the zoo, Margie counted 200 heads and 522 legs. How many of the animals that Margie counted were two-legged birds?
Answer: C
Solution:
Let be the number of animals with legs and let be the number of animals with legs.
Counting the number of legs yields and counting the number of heads yields This means and subtracting the first equation from the second yields This means therer are two-legged birds.
Thus, the answer is C.
10.
How many 4-digit numbers greater than 1000 are there that use the four digits of 2012?
Answer: D
Solution:
First, we can't have the in the thousands position. Therefore, we have spots we can put it. Then, we have avaiable positions for the and then the two s are placed. This makes it such that we have combinations.
Thus, the answer is D.
11.
The mean, median, and unique mode of the positive integers and are all equal. What is the value of
Answer: D
Solution:
Every value except shown has appears once while appears twice. If any of the other values are chosen, then we have two modes, which means we don't have unique modes. Otherwise, the only value that shows up more than once is making that the unique mode. This also means is the mean. Since there are elements, the sum of the elements is The sum is also so
Thus, the answer is D.
12.
What is the units digit of
Answer: A
Solution:
We have to find The following is true:
This means has the same units digit as so the units digit of is
Thus, the answer is A.
13.
Jamar bought some pencils costing more than a penny each at the school bookstore and paid Sharona bought some of the same pencils and paid How many more pencils did Sharona buy than Jamar?
Answer: C
Solution:
Let be the price of pencils in cents. Then, is divisible by and This means is divisible by Since the cost is more than a penny and the only divisors of are and the cost must be cents. Since Sharona paid more cents than Jamal and pencils are cents, she buys more pencils.
Thus, the answer is C.
14.
In the BIG N, a middle school football conference, each team plays every other team exactly once. If a total of 21 conference games were played during the 2012 season, how many teams were members of the BIG N conference?
Answer: B
Solution:
Each of the teams play games. However, teams play each game, so multiplying and would be twice the number of games. Therefore, we know This leads to Which implies In turn, this suggests:
Thus, the answer is B.
15.
The smallest number greater than 2 that leaves a remainder of 2 when divided by 3, 4, 5, or 6 lies between what numbers?
Answer: D
Solution:
Let the number be Since it leaves a remainder of when divided by we know is a multiple of This means is a multiple of which is Therefore, must be a multiple of The next number such that this occurs is when
Thus, the answer is D.
16.
Each of the digits 0, 1, 2, 3, 4, 5, 6, 7, 8, and 9 is used only once to make two five-digit numbers so that they have the largest possible sum. Which of the following could be one of the numbers?
Answer: C
Solution:
To construct two five digit numbers, first digits of the numbers from the left must be as great as possible. Therefore, the leftmost unused number must be either of the greatest two numbers. This means the first digit must be either of the second digit must be either of the third digit must be either of the fourth digit must ber either of and the last digit must be either of
The only of the given numbers that satisfy this is
Thus, the answer is C.
17.
A square with an integer side length is cut into 10 squares, all of which have integer side length and at least 8 of which have area 1. What is the smallest possible value of the length of the side of the original square?
Answer: B
Solution:
Since all the squares have integer side length, they each must have a side length greater than or equal ro This means the total area must be over Therefore, the square can't have a side length less than or equal to or else it would have an area less than
We can make a configuration with side length however with the following configuration.
Thus, the answer is B.
18.
What is the smallest positive integer that is neither prime nor square and that has no prime factor less than 50?
Answer: A
Solution:
Since our number isn't prime, it must be the product of at least numbers that aren't Moreover, these factors must not have prime factors less than so our number must be the product of primes greater than Also, our number is not a square, so it must be the product of distint primes.
This means our number is the product of distinct primes greater than The smallest primes greater than are and so our number is
Thus, our answer is A.
19.
In a jar of red, green, and blue marbles, all but 6 are red marbles, all but 8 are green, and all but 4 are blue. How many marbles are in the jar?
Answer: C
Solution:
Let be the number of red marbles, green marbles, and blue marbles respectively. We then know by the statements given. Adding these equations yields This would mean so Therefore, the sum of all of the marbles is
Therefore, the sum is C.
20.
What is the correct ordering of the three numbers and in increasing order?
\dfrac{9}{23} < \dfrac{7}{21} < \dfrac{5}{19}
\dfrac{5}{19} < \dfrac{7}{21} < \dfrac{9}{23}
\dfrac{9}{23} < \dfrac{5}{19} < \dfrac{7}{21}
\dfrac{5}{19} < \dfrac{9}{23} < \dfrac{7}{21}
\dfrac{7}{21} < \dfrac{5}{19} < \dfrac{9}{23}
Answer: B
Solution:
We can start with
Then, since we take the recipricol of positive numbers.
Then, multiplying by the negative constant yields since that switches the direction of the inequalities.
Adding one to each of them then yields
Thus, the answer is B.
21.
Marla has a large white cube that has an edge of 10 feet. She also has enough green paint to cover 300 square feet. Jenica uses all the paint to create a white square centered on each face, surrounded by a green border. What is the area of one of the white squares, in square feet?
Answer: D
Solution:
The total surface area is Therefore, square feet aren't covered. This would be square feet per face.
Thus, the answer is D.
22.
Let be a set of nine distinct integers. Six of the elements are and What is the number of possible values of the median of
Answer: D
Solution:
A number is the median if there are numbers in the set that are greater than it and numbers that are less than or equal to it. Note that since we have distinct integers, the condition is now that the median is the number with numbers greater than it and numbers less than it.
If we have a number greater than then it can't be the median as there is at least numbers less than it.
If we have a number less than then it can't be the median as there is at least numbers greater than it.
Every number from to can be either placed or have numbers placed around it such that there are numbers greater than it and numbers less than it. Therefore, they can all be medians. This makes us have medians.
Thus, the answer is D.
23.
An equilateral triangle and a regular hexagon have equal perimeters. If the triangle's area is 4, what is the area of the hexagon?
Answer: C
Solution:
Let the side length of the triangle be This means the perimeter is Therefore, the side length for the hexagon is
A hexagon can be made of equilateral triangles with side length as shown above. Each triangle is the original triangle scaled down by so the area is scaled down by Therefore, the area of each of these triangles is Since there are of them, the area is
Thus, the answer is C.
24.
A circle of radius 2 is cut into four congruent arcs. The four arcs are joined to form the star figure shown. What is the ratio of the area of the star figure to the area of the original circle?
Answer: A
Solution:
The total area of the circle is
Now, to find the area of the star, we can find the total area of both shapes combined. To do this, we split the as shown above. Then, we rearrange the partitions as done below.
This makes a square of side length so its area is Then, we take out the area of the circle, so the area of the star is This makes the ratio equal to
Thus the answer is A.
25.
A square with area 4 is inscribed in a square with area 5, with each vertex of the smaller square on a side of the larger square. A vertex of the smaller square divides a side of the larger square into two segments, one of length and the other of length What is the value of
Answer: C
Solution:
Since all the triangles can be made from each other by rotating them around, they are all congruent. Therefore, we can place the as we have. The total area of the triangles is so we have congruent triangles with a combined area of This means the area of each triangle is The area of each triangle is also so This means
Thus, the correct answer is C.