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MATHCOUNTS 2007 National Competition Countdown Round 1-25
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MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Mar 26, 2015

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Page 1: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

MATHCOUNTS

2007 National Competition

Countdown Round 1-25

Page 2: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Eighty percent of adults drink coffee and 70% drink tea. What is the smallest possible percent of adults who drink both coffee and tea?

Page 3: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 50 (percent)

Page 4: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

A pyramid with volume 40 cubic inches has a rectangular base. If the length of the base is doubled, the width tripled and the height increased by 50%, what is the volume of the new pyramid, in cubic inches?

Page 5: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 360 (cubic inches)

Page 6: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

For positive integers x and y, what is the least possible value of x if x3 = y2 + 2?

Page 7: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 3

Page 8: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Cory has 3 apples, 2 oranges and 2 bananas. If Cory eats one piece of his fruit per day for a week and the pieces of fruit within each category are indistinguishable, in how many orders can Cory eat the fruit? One such order is AAAOOBB.

Page 9: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 210 (orders)

Page 10: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

If A:B:C = 2:1:4, what is the value of (3A + 2B) (4C – A)? Express your answer as a common fraction.

Page 11: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer:4

7

Page 12: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Define the operation $ as a $ b = (a)(b) – a. What is the value of (3 $ 5) $ (5 $ 3)?

Page 13: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 108

Page 14: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

What is the least possible product obtained from multiplying three distinct members of the set { , 9, 5, 12, } ? 1

2

1

3

Page 15: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 54

Page 16: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

A set of five integers has unique mode 7, median 9, and arithmetic mean 11. What is the greatest possible value in the set?

Page 17: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 22

Page 18: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Each of four students hands in a homework paper. Later the teacher hands back the graded papers randomly, one to each of the students. In how many ways can the papers be handed back such that every student receives someone else’s paper? The order in which the students receive their papers is irrelevant.

Page 19: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 9 (ways)

Page 20: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Given that x, , y, , z and are all integers, how many distinct values of x + y + z are possible?

1

x

1

y1

z

Page 21: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 4 (values)

Page 22: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

A 1 x 1 x 1 wire frame cube is to be made by gluing together pieces of wire. The wire can be bent to form corners of the cube. If exactly 12 units of wire is used to make the frame, what is the fewest number of pieces of wire that can be used to make the frame?

Page 23: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 4 (pieces)

Page 24: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

A family of five has Momma, Poppa and three children. Each child generates 2 loads of laundry per week while each parent generates 1.5 loads per week. How many loads of laundry are generated by this family in 52 weeks?

Page 25: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 468 (loads)

Page 26: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Jane and her brother each spin this spinner once. The spinner has five congruent sectors. If the non-negative difference of their numbers is less than 3, Jane wins. Otherwise, her brother wins. What is the probability that Jane wins? Express your answer as a common fraction.

1

23

4

5

Page 27: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer:19

25

Page 28: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

What is the ordered pair of real numbers (x, y) which satisfies the equation x + y – 7 + 4x – y + 12 = 0 ?

Page 29: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: (1, 8)

Page 30: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

In the figure, the visible gray area within the larger circle is equal to three times the area of the white circular region. What is the ratio of the radius of the small circle to the radius of the large circle? Express your answer as a common fraction.

Page 31: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer:1

2

Page 32: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

How many integers are there in the solution set of x – 2 5.6?

Page 33: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 11 (integers)

Page 34: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

The three-digit positive integer N has a ones digit of 3. What is the probability that N is divisible by 3? Express your answer as a common fraction.

Page 35: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 1

3

Page 36: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Pizzas are sized by diameter. What percent increase in area results if Chantel’s pizza increases from a 10-inch pizza to a 12-inch pizza?

Page 37: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 44 (percent)

Page 38: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Figure A is made from three unit squares, and will be called “a trio.” Figure B is a 4 by 4 grid of unit squares. Without overlap, what is the maximum number of trios that can be placed on the grid such that each trio covers exactly three of the unit squares in the grid?

Figure A

Figure B

Page 39: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 5 (trios)

Page 40: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

While standing in line to buy concert tickets, Kit moved 60 feet closer to the ticket window over a period of 30 minutes. At this rate, how many minutes will it take her to move the remaining 70 yards to the ticket window?

Page 41: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 105 (minutes)

Page 42: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

On a number line, what is the coordinate of the point that is between point A at and point B at and is one-third the distance from A to B? Express your answer as a common fraction in terms of x.

3

x7

2x

Page 43: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 19

6x

Page 44: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Sue has 122 crates of the same size. Each crate contains at least 90 apples and at most 100 apples. Crates containing the same number of apples are stacked one on top of another in their own stack. Not all of the stacks have the same number of crates. What is the least possible number of crates in the tallest stack of crates?

Page 45: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 12 (crates)

Page 46: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Here are two functions:f(x) = 3x2 – 2x + 4g(x) = x2 – kx – 6

If f(10) – g(10) = 10, what is the value of k?

Page 47: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 18

Page 48: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

All positive integers whose digits add up to 11 are listed in increasing order: 29, 38, 47, … . What is the eleventh number in that list?

Page 49: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 137

Page 50: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

How many subsets of {1, 2, 3, 4, 5} with two or more elements have the property that the sum of their elements is a positive, even number?

Page 51: MATHCOUNTS 2007 National Competition Countdown Round 1-25.

Answer: 13 (subsets)