# Difference between revisions of "User talk:Aray10"

Problem 1 Ike and Mike go into a sandwich shop with a total of $30.00$ to spend. Sandwiches cost $4.50$ each, and soft drinks cost $1.00$ each. Ike and Mike plan to buy as many sandwiches as they can, and use the remaining money to buy soft drinks. Counting both the sandwiches and soft drinks, how many items did they buy?

Problem 2 Three identical rectangles are put together to form rectangle ABCD, as shown in the figure below. Given the length of the shorter side of each of the rectangles is 5 feet, what is the area in square feet of rectangle ABCD?

Problem 3 Which of the following is the correct order of the fractions 15/11, 19/15, and 17/13, from least to greatest?

Problem 4 Quadrilateral ABCD is a rhombus with perimeter 52 meters. The length of diagonal AC is 24 meters. What is the area in square meters of rhombus ABCD?

Problem 5 A tortoise challenges a hare to a race. The hare eagerly agrees and quickly runs ahead, leaving the slow-moving tortoise behind. Confident that he will win, the hare stops to take a nap. Meanwhile, the tortoise walks at a slow steady pace for the entire race. The hare awakes and runs to the finish line, only to find the tortoise already there. Which of the following graphs matches the description of the race, showing the distance d traveled by the two animals over time t from start to finish?

Problem 6 There are 81 grid points (uniformly spaced) in the square shown in the diagram below, including the points on the edges. Point P is the center of the square. Given that point Q is randomly chosen from among the other 80 points, what is the probability that line PQ is a line of symmetry for the square?

Problem 7 Shauna takes 5 tests, each worth a maximum of a 100 points. Her scores on the first three tests were 76, 94, and 87. In order to average an 81 on all five tests, what is the lowest score she could earn on one of the two tests?

Problem 8 Gilda has a bag of marbles. She gives 20% of them to her friend Pedro. The, Gilda gives 10% of what is left to her other friend, Ebony. Finally, Gilda gives 25% of what is left in the bag to her brother. What percentage of her original bag does she have left?

Problem 9 Alex and Felicia each have cats as pets. Alex buys cat food in cylindrical cans that are 6 cm in diameter and 12 cm high. Felicia buys cat food in cylindrical cans that are 12 cm in diameter and 6 cm high. What is the ratio of the volume of one of Alex's cans to the volume of one of Felicia's cans?

Problem 10 The diagram shows the number of students at soccer practice each weekday during last week. After computing the mean and median values, Coach discovers that there were actually 21 participants on Wednesday. Which of the following statements describes the change in the mean and median after the correction is made?

Problem 11 The eighth grade class at Lincoln Middle School has 93 students. Each student takes a math class or a foreign language class or both. There are 70 eighth graders taking a math class, and there are 54 eighth graders taking a foreign language class. How many eighth graders take only a math class and not a foreign language class?

Problem 12 The faces of a cube are painted in six different colors: red (R), white (W), green (G), brown (B), aqua (A), and purple (P). Three views of the cube are shown below. What is the color of the face opposite the aqua face?

Problem 13 A palindrome is a number that has the same value when read from left to right or from right to left. (For example, 12321 is a palindrome). Let N be the least three-digit integer which is not a palindrome but which is the sum of three distinct two-digit palindromes. What is the sum of the digits of N?

Problem 14 Isabella has 6 coupons that can be redeemed for free ice cream cones at Pete's Sweet Treats. In order to make the coupons last, she decides that she will redeem one every 10 days until she has used them all. She knows that Pete's is closed on Sundays, but as she circles the 6 dates on her calendar, she realizes that no circled date falls on a Sunday. On what day of the week does Isabella redeem her first coupon?

Problem 15 On a beach 50 people are wearing sunglasses and 35 people are wearing caps. Some people are wearing both sunglasses and caps. If one of the people wearing a cap is selected at random, the probability that this person is also wearing sunglasses is 2/5. If instead, someone wearing sunglasses is selected at random, what is the probability that this person is also wearing a cap?

Problem 16 Qiang drives home at an average speed of 30 miles per hour. How many additional miles will he have to drive at 55 miles per hour to average 50 miles per hour for the entire trip

Problem 17 What is the value of the product $(\frac{1\cdot3}{2\cdot2})(\frac{2\cdot4}{3\cdot3})(\frac{3\cdot5}{4\cdot4})…(\frac{97\cdot99}{98\cdot98})(\frac{98\cdot100}{99\cdot99})?$

Problem 18 The faces on each of two fair dice are numbered 1, 2, 3, 5, 7, and 8. When the two dice are tossed, what is the probability that their sum will be an even number?

Problem 19 In a tournament there are six teams that play each other twice. A team earns 3 points for a win, 1 point for a draw, and 0 points for a loss. After all the games have been played it turns out that the top three teams earned the same number of total points. What is the greatest possible number of total points for each of the top three teams?

Problem 21 What is the area of the triangle formed by the lines y = 5, y = 1 + x, and y = 1 - x?

Problem 22 A store increased the original price of a shirt by a certain percent and then decreased the new price by the same percent. Given that the resulting price was 84% of the original price, by what percent was the price increased and decreased?

Problem 23 After Euclid High School's last basketball game, it was determined that 1/4 of the team's points were scored by Alexa and 2/7 were scored by Brittany. Chelsea scored 15 points. None of the other 7 team members scored more than 2 points. What was the total number of points scored by the other 7 team members?

Problem 24 In triangle ABC, point D divides side AC so that AD:DC = 1:2. Let E be the midpoint of BD and F be the point of intersection of line BC and line AE. Given that the area of ABC is 360, what is the area of EBF?

Problem 25 Alice has 24 apples. In how many ways can she share them with Becky and Chris so that each of the people has at least 2 apples?