Back to Exercise: Understand statistics as a process for inference

Exercises: Understand Statistics as a Process for Making Inferences

Work through each section in order. For each scenario, read carefully and use the correct vocabulary (population, parameter, sample, statistic) and notation. Explain your reasoning where a written response is asked for.

Grade 10·21 problems·~40 min·Common Core Math - HS Statistics and Probability·group·hss-ic-a-1
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A

Recall / Warm-Up

1.

A school district wants to know the true average number of hours of sleep per night for all 8,000 of its students. Which of these is the population?

2.

In a survey, 39 of 60 randomly chosen Lincoln High students said they would re-enroll in an elective, giving p^=39/60=0.65\hat{p} = 39/60 = 0.65. The value 0.650.65 is best described as a:

3.

A random sample of 80 workers has a mean commute time of xˉ=27\bar{x} = 27 minutes. A student concludes, "So the mean commute time for all 50,000 workers is exactly 27 minutes." What is wrong with this conclusion?

4.

Which procedure produces a genuinely random sample of a school's students?

B

Fluency Practice

1.

A nutritionist wants to know the true mean daily sugar intake of all 2,000 students at a high school. She randomly selects 50 students and finds their mean intake is 68 grams.

Identify each of the following and give the correct symbol where one applies (μ\mu, xˉ\bar{x}, pp, or p^\hat{p}):
(a) the population
(b) the parameter
(c) the sample
(d) the statistic

2.

A researcher poses the question "What proportion of all town voters support the new park?", randomly polls 400 voters, finds 220 in favor, and concludes the town proportion is "around 0.55." In the four-step inference process, computing 220/400=0.55220/400 = 0.55 corresponds to which step?

3.

A problem states: "A bag contains 60% red marbles. If you draw 20 marbles, how many do you expect to be red?" Compared with statistical inference, which direction does this reasoning run?

4.

Poll X surveys 1,000,000 people who chose to call in to a radio show. Poll Y surveys 600 people selected by a random-number draw. Which poll's result should be trusted more as an estimate of the true population opinion, and why?

5.

Three different random samples of 60 students are drawn from the same Lincoln High population. They give p^=0.62\hat{p} = 0.62, p^=0.68\hat{p} = 0.68, and p^=0.65\hat{p} = 0.65. The true proportion pp for the whole school did not change between samples.

(a) Why do the three samples give three different values?
(b) What is this sample-to-sample variation called?

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