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1. |
Find the lower quartile for the quiz scores. |
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A. |
17 |
B. |
12 |
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C. |
13 |
D. |
3 |
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Hint |
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2. |
Which is the correct box-and-whisker plot for the quiz scores? |
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A. |
 |
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B. |
 |
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C. |
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D. |
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Hint |
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3. |
Suppose you are conducting a survey to determine whether the students in your school would prefer to go to the science museum or the art museum for the school field trip. Which method would produce a random sample? |
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A. |
asking the members of the after-school art club |
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B. |
asking 4 students from each homeroom class |
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C. |
asking your 3 best friends |
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D. |
asking the winners of the school science fair |
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Hint |
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4. |
Rosa conducted a survey of students' favorite types of music. The results are shown in the table. Of the 550 students in the whole school, how many would you expect to prefer Pop/Rock? |
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A. |
264 |
B. |
132 |
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C. |
154 |
D. |
396 |
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Hint |
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5. |
The following table shows the results of rolling a number cube twenty times. What is the experimental probability of rolling a 4? |
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A. |
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B. |
 , or  |
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C. |
 , or  |
D. |
 , or  |
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Hint |
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6. |
Use a tree diagram to help you find the probability of tossing a coin four times and getting 2 heads and 2 tails. |
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A. |
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B. |
 , or  |
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C. |
 , or  |
D. |
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Hint |
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7. |
Find the fair game. |
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A. |
Walter and Jerome each toss a number cube and add the numbers. Walter scores one point if the total is greater than 7. Jerome scores one point if the total is 7 or less. |
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B. |
Walter and Jerome each toss a number cube and add the numbers. Walter scores one point if the total is greater than 7. Jerome scores one point if the total is less than 7. |
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C. |
Walter and Jerome each toss a number cube and add the numbers. Walter scores one point if the total is 7 or greater. Jerome scores one point if the total is less than 7. |
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D. |
Walter and Jerome each toss a number cube and add the numbers. Walter scores two points if the total is 7 or greater. Jerome scores three points if the total is less than 7. |
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Hint |
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8. |
Suppose you have a bag filled with 6 blocks numbered from 1–6. You consecutively choose three blocks, without replacement to form a three-digit number. You choose the first number and put it in either the hundreds, tens, or ones place. You choose the next number and put it in one of the remaining places, and so on. The object of the game is to create the greatest three-digit number. What is the probability of getting a higher number in the third draw (than the second draw) if a 5 is in the tens place and the second draw is a 2? |
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A. |
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B. |
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C. |
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D. |
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Hint |
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