Ninth Grade Test - Excellence in Mathematics Contest - 2004

Ninth Grade Test - Excellence in Mathematics Contest - 2004

1.To attend Zan’s graduation from Williams College, Rick drove of the 1260-mile drive on Monday and 60% of the remaining distance on Tuesday. To reach Williams College on Wednesday, how many miles must Rick drive?

A. 84B. 168C. 252D. 336E. 504

2.Which of the following is closest to the measure of angle A?

A. 75o B. 90o C. 105o D. 120o E. 135o

3.Kilroy incorrectly converted 4.35 minutes to 4 minutes and 35 seconds.

By how many seconds was he in error?

A. 0B. 2C. 5D. 14E. 15

4. If building a road costs $175 per square meter, what is the cost to construct a 40-kilometer stretch of this road that is 10 meters wide?

A. $70 thousand B. $700 thousand C. $7 million D. $70 million E. $700 million

5.Write any two-digit whole number. Create a four-digit number by writing one “9” in front of your number and one “9” behind your number. Add your two-digit and four-digit numbers and divide the sum by 11. From that answer, subtract your original two-digit number and then divide that result by 21.

What is the final answer?

A. 17B. 25 C. 39D. 52E. None of these

6.Given sets A = {2, 3, 4, 6}; B = {1, 2, 3} ; C = {3, 4, 5, 6},

place the elements into the correct regions of this Venn diagram.

What is the SUM of all numbers in the regions labeled P, Q, and R?

A. 8B. 10C. 13D. 14E. 19

7.In a 10-kilometer race, a runner averaged 3.5 minutes per km for the first 2 kilometers. She crossed the finish line with a total time of 41 minutes. For the final 8 km, how many minutes per km did she average?

A. 3.5B. 3.75C. 4D. 4.25E. 4.5

8.The Congressional Budget Office projects that total US debt will increase from 6.2 trillion dollars in 2002 to 8.9 trillion dollars in 2014. What is the projected average annual increase in debt for this 12-year period?

A. $22.5 billion B. $225 billion C. $2,250 billion D. $22.5 million E. $225 million

9.Anna walked along the two sides of a 30 m by 50 m rectangular field. Beth took a shortcut by walking along the diagonal of the field. Compared to Anna’s route, what percent shorter was Beth’s route? Round to the nearest percent.

A. 12%B. 18%C. 21%D. 24%E. 27%

10.The number of intersection points of a circle and a triangle CANNOT be:

A. 3 B. 4 C. 5 D. 6 E. All of these answers: 3, 4, 5, and 6, are possible.

11.At Perry’s Produce Packers, each parer pares a pair of pears every 6 minutes.

How many pears do two sets of triplets pare in a pair of hours?

A. 60B. 120C. 160D. 240E. 480

12.For the next seven years, the St. Louis Cardinals will pay Albert Pujols an average of 14.7 million dollars per year. Twenty-five $20-bills weigh 0.9 ounces. If Albert were to insist on being paid in $20-bills, how many pounds would the $14.7 million weigh? Round to the nearest pound.

A. 1,654B. 8,148C. 26,460D. 33,075E. 41,344

13.If , determine the sum of these three numbers: ; ; and .

A. –156B. –132C. –4D. 132E. 156

14.From the set , select three different numbers for A, B, and C. What is the greatest possible value of ?

A. 70B. 72C. 75D. 76E. 79

15.If , what is the value of ?

A. –5 B. –1C. 1D. 3E. 5

16.When this network of six squares is folded into a cube,

what is the sum of the numbers on all faces which include vertex V?

A. 19 B. 25 C. 37 D. 41 E. 49

17.A set consists of fifteen consecutive odd integers. The median of these fifteen numbers is N.

What is the greatest number in this set?

A. N+7B. N+13C. N+14D. N+15E. N+16

18.Evaluate

A. 2B. 1C. 0.5D. 0.25E. 0.125

19.If ABC is a right triangle and ,

what is the measure of angle CAB?

A. x– 90oB. 90o– xC. 180o– x

D. x + 90oE. x

20.How many whole numbers are between and ?

A. 16B. 17C. 42D. 43E. 716

21.The radioactivity of a polluted site decreases by 40% every three years. If the radioactivity was 500 μrem in 1989, what is its level in 2004? Round to the nearest hundredth.

A. 0.24 μrem B. 5.12 μrem C. 23.33 μrem D. 38.88 μrem E. 64. 8 μrem

22.An equilateral triangle and a regular hexagon have equal perimeters.

What is the ratio of the area of the hexagon to the area of the triangle?

A. 1B. C. 2D. E. 3

23.Write the equation of the line shown

in the form: ax + by = c.

Given that a, b, and c are integers; that there is no

factor common to a, b, and c; and that c is positive;

what is the sum a+b+c?

A. 52B. 58C. 62

D. 68E. 116

24.Six cups numbered 1 through 6 must be placed on the six squares

labeled 1 through 6, one per square, according to these rules:

• The number on a cup never matches the number in the square
• Cup #3 is on a square adjacent to and right of Cup #1
• Cup #6 is on a square adjacent to and below Cup #4

According to these rules, Cup #2 must be placed in which square?

A. 1B. 3C. 4D. 5E. 6

25.In the last time trial on the way to victory in the 2003 Tour de France, Lance Armstrong rode 30.4 miles in 54 minutes and 19 seconds.

To the nearest tenth, what was his average speed in miles per hour?

A. 24.7B. 26.4C. 28.9D. 31.2E. 33.6

26.ABDE is a rectangle and BCD is an equilateral triangle.

A robot, Automon, is programmed to move only in the

direction of its arrow and to rotate clockwise only as it makes a turn.

What is the minimum number of degrees that Automon must rotate

to travel from A to E, via B, C, and D?

A. 780oB. 810oC. 840o

D. 870oE. 900o

27.Fortunately, Big Guy stayed awake long enough for me

to complete this sketch.

How many triangles are in this drawing of Big Guy?

A. 13B. 14C. 15D. 16E. 18

28.Rectangle PQRS is divided into square A and rectangles B, C, and D as shown.

The area of rectangle B is twice the area of square A.

The area of rectangle D is three times the area of rectangle B.

If the area of A is x2, what is the perimeter of rectangle PQRS?

A. 7xB. 12x C. 13x D. 14x E. 16x

29.Two lifeguard stations on a long, straight beach are 4 km apart. Using radar, a boat’s captain determines that the boat is 7 km from one station and 9 km from the other. To the nearest tenth of a kilometer, how far is the boat from the beach?

A. 5.0B. 5.5C. 5.7D. 6.0E. 6.7

30.Point P is the center of a circle with radius 30 cm. Square ABCD has vertices A and B on the circle and point P on side CD. In square centimeters, what is the area of the square?

A. 720B. 840C. 900D. 1125E. 1200

31.Let N = 999,999,…,999,998 where N has fifty 9’s followed by one 8. What is the sum of the digits of N2 ?

A. 450B. 451C. 460D. 469E. 916

32.Line segment AB is one side of an n-sided regular polygon inscribed in circle C.

If angle B is six times as large as angle C, how many sides does the polygon have?

A. 8 B. 12 C. 20 D. 24 E. 26

33. As indicated, and are right angles.

If AC = 14 cm, what is the sum of the areas of the

four squares S1, S2, S3, and S4 ?

A. 380B. 392C. 400

D. 416E. 424

34. Four villages, A, B, C, and D lie at the corners of a square with AB = 20 miles. To connect the four villages by roads, an engineer suggests the design in Figure 1. Dr. Edwards, a mathematician, states that the Steiner design in Figure 2 will require the least total length of roads. In Figure 2, AE = EB = DF = FC and the measure of angles AEB and DFC is 120o. To the nearest tenth of a mile, how much shorter is the total length of roads in Dr. Edwards’ design than in the engineer’s design?

A. 0.5B. 0.7C. 1.1D. 1.6E. 1.9

35.In a game against the Detroit Red Wings, the St. Louis Blues have an equal chance of scoring 0, 1, or 2 goals. In that game, the Detroit Red Wings have an equal chance of scoring 0, 1, 2, or 3 goals. What is the probability that the St. Louis Blues will win the game? (Note: Tie games are allowed in hockey.)

A. B. C. D. E.

36.Let L(n) be the least common multiple of all natural numbers from 1 to n. For example, L(4) = 12 because 12 is the least common multiple of 1,2, 3, and 4. Calculate:

A. 9,676,800 B. 14,515,200C. 29,030,400

D. 58,060,800 E. 87,091,200

37. Let L(n) be the least common multiple of all natural numbers from 1 to n. If x is the least value of n such that L(x) = L(x+1) = L(x+2), what is the value of L(x)?

A. 2,520B. 27,720C. 55,440D. 360,360E. 720,720

38. The six faces of the triangular dipyramid, shown, are equilateral triangles.

The triangle BCD divides the shape into two congruent tetrahedra.

The network of six equilateral triangles, below, can be folded

into a triangular dipyramid. Of the following five choices

of sets of three vertices, which would form the triangle

that divides the shape into two congruent tetrahedra?

A. F, G, L B. H, I, M

C. G, H, I D. H, K, L

E. F, I, K

39.Scott’s seven math test scores are all whole numbers. After his first five tests, the arithmetic mean of his scores was 74 and the median was 73. The score on his 6th test was higher than any of his previous five scores and the score on his 7th test was two points higher than his score on the 6th test. After all seven tests, the arithmetic mean had risen to 76 and the median score was 75.

What is the lowest possible score on any of Scott’s seven tests?

A. 68B. 69C. 70D. 71E. 72

40.What is the maximum number of non-overlapping

1x2 rectangles that can be placed on the checkerboard shown?

(Note: the edges of the rectangles lie on the gridlines and

cannot protrude beyond the checkerboard.)

A. 19 B. 20C. 21

D. 22 E. 23

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