Download Probability and Statistics 6th Grade

Probability and Statistics
6th Grade
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1. 2 points: At Mead Elementary, of the students got a “Whinny Award” for at least expecting
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their best,
of the students got a Whinny for at least acting with kindness, and
got a
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Whinny for both. What portion of students did not receive a Whinny Award? Express
your answer as a reduced fraction.
2. 2 points: A sock drawer contains 3 blue socks, 6 red socks, 7 yellow socks, and some number
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of green socks. If there is currently a probability of drawing a sock that is not green, find
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the smallest number of green socks that must be added to the drawer such that there will be
at least a 75% chance of drawing a green sock.
3. 2 points: Suppose that A is the set of all prime numbers less than 30 and B is the set of all
two-digit positive integers that have a ones digit of 3. What is the positive difference between
the number of elements in A ∪ B and A ∩ B?
4. 3 points: In a list of seven different numbers, the average of the numbers less than the median
is 12, and the average of the numbers greater than the median is 27. If the average of all the
numbers in the list is 19, what is the median?
5. 3 points: On a given Sunday, suppose that the probability that the Raiders will win their
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, the probability that the 49ers will win is
, and the probability that
football game is
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the Seahawks will win is
(for these probabilities, assume that no two of these three teams
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are playing against each other). What is the probability that at least two teams will lose?
Express your answer as a reduced fraction.
6. 3 points: A student starts out with 5 coins. Each time a coin is placed in a special coin
machine, either 0, 1, 2, or 3 coins will come out, each with an equal probability of occurring.
If the student inserts one of her coins three times, what is the probability that she will end
with 6 coins? Express your answer as a reduced fraction.
7. 3 points: If the seven digits 3, 2, 5, 2, 4, 1, and 7, are randomly arranged into a seven-digit
number, what is the probability that it will be divisible by 4? Express your answer as a
reduced fraction.
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8. 4 points: Mr. Olsen is choosing an ultimate frisbee team of 5 players from a group of 7 players.
Mr. Demos is choosing an opposing team of 5 players from a different group of 8 players. How
many unique combined groups of 10 players out on the playing field are possible? Assume
that all 5 players on a team have the same role.
9. 4 points: All bored by himself, Owen Lee rolls a standard, fair six-sided die three times.
After the first roll, he moves right a number of steps equal to the number he rolled. After
the second roll, he moves left a number of steps equal to the number he rolled the second
time. Lastly, after the final roll, he moves right a number of steps equal to the number he
rolled on his final roll. If all the steps he took were of the same size, what is the probability
that he ends up in the same spot in which he began? Express your answer as a reduced
fraction.
10. 4 points: After studying the interactions of her teachers and classmates, and whether when
passing each other they would say “hello” to each other or not, Adele was able to collect
several statistics. She found that:
• 8% of the time, the student said hello and the teacher did not respond;
• 24% of the time, the teacher said hello and the student did not respond;
• 20% of the time, both said hello to each other;
• 48% of the time, neither said hello to each other.
Using the above data, given that a teacher says hello to a student, what is the probability
that the student will not say hello? Express your answer as a reduced fraction.