Math  /  Data & Statistics

QuestionHomework \# 4: 7(1,2,3,4)8(2,3,4)7(1,2,3,4) 8(2,3,4) Question 21 of 40 (1 point) I Question Attempt: 1 of 3 Jonatha 12\checkmark 12 13 14\checkmark 14 15 16 18 19 20 21\equiv 21 22\checkmark 22
Student loans: The Institute for College Access and Success reported that 65%65 \% of college students in a recent year graduated with student loan debt. A random sample of 90 graduates is drawn. Round your answers to at least four decimal places if necessary.
Part 1 of 6 (a) Find the mean μp^\mu_{\hat{p}}.
The mean μp\mu_{p} is 0.65 .
Part: 1 / 6
Part 2 of 6 (b) Find the standard deviation σp^\sigma \hat{p}.
The standard deviation σp^\sigma \hat{p} is \square Save For Later Subm

Studdy Solution

STEP 1

What is this asking? We're looking at a bunch of graduates and want to figure out, on average, what proportion of them have student loans, and how much that proportion varies from sample to sample. Watch out! Don't mix up the proportion of *all* students with loans and the proportion of a *sample* with loans.
Also, remember the difference between *standard deviation* and *variance*.

STEP 2

1. Find the mean proportion.
2. Calculate the standard deviation.

STEP 3

The problem tells us that **65%** of college students graduate with student loan debt.
This is our *population proportion*, which we write as p=0.65p = 0.65.
When we take a random sample of graduates, we expect the sample proportion (p^\hat{p}) to be the same as the population proportion, on average.

STEP 4

So, the *mean* of the sample proportion (μp^\mu_{\hat{p}}) is simply equal to the population proportion: μp^=p=0.65 \mu_{\hat{p}} = p = \mathbf{0.65} This means that if we took tons of samples of graduates, the average of the proportions with loans in each sample would be around **0.65**.

STEP 5

The *standard deviation* of the sample proportion (σp^\sigma_{\hat{p}}) tells us how spread out the sample proportions are likely to be.
The formula for this is: σp^=p(1p)n \sigma_{\hat{p}} = \sqrt{\frac{p \cdot (1-p)}{n}} where pp is the population proportion, and nn is the sample size.

STEP 6

We know that p=0.65p = 0.65 and our sample size is n=90n = 90.
Let's plug these values into the formula: σp^=0.65(10.65)90 \sigma_{\hat{p}} = \sqrt{\frac{0.65 \cdot (1-0.65)}{90}}

STEP 7

First, let's calculate 10.65=0.351 - 0.65 = 0.35.
This represents the proportion of students *without* loans.
Then, we multiply this by 0.650.65 to get 0.650.35=0.22750.65 \cdot 0.35 = 0.2275.

STEP 8

Next, we divide this by our sample size of 90: 0.2275900.00252778 \frac{0.2275}{90} \approx 0.00252778

STEP 9

Finally, we take the square root of this result: 0.002527780.050277 \sqrt{0.00252778} \approx \mathbf{0.050277} So, the standard deviation of the sample proportion is approximately **0.0503** when rounded to four decimal places.

STEP 10

The mean of the sample proportion (μp^\mu_{\hat{p}}) is **0.65**.
The standard deviation of the sample proportion (σp^\sigma_{\hat{p}}) is approximately **0.0503**.

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