1 / 6

Sample Proportion

Sample Proportion.

nevan
Download Presentation

Sample Proportion

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Sample Proportion

  2. Say there is a huge company with a boat load of employees. If we could talk to all the employees we could ask each one whether or not they participated in a management training program with the company. We would then be able to calculate the population proportion (or percentage) that said yes. But, remember we usually do not do a census (talk to everyone), we do a sample and try to learn about the population based on the sample. From the sample we could calculate a sample proportion, called p. In a theoretical sense, p will vary from sample to sample and thus has a distribution.

  3. It turns out that experts have figured out the properties of the distribution of p. It is similar to the central limit theorem we saw with the sampling distribution of sample means. The sampling distribution of p 1. Is a normal distribution 2. Has expected value (mean) equal to the population proportion π, 3. Has standard deviation, what is called the standard error of the proportion, equal to the square root of some formula. That formula is [π(1 – π)]/n, where π is the population proportion.

  4. Let’s say we are told that the population proportion is .4 in a certain situation. (You would think we could quit if we know about the population – we really could but we are trying to learn some patterns of thinking.) Say a sample of 200 is taken. The sample proportion could be calculated – that is not what this problem is about. What is the probability that the sample proportion will be within + or - .03 of the population proportion? In other words, what is the probability of being in the neighborhood from .37 to .43? To answer this we have to use the three properties I mentioned before. We will use the normal distribution, with mean =.4 and standard error = square root of {[.4(.6)]/200} = square root(.0012) = .0346

  5. At this stage we can go use Excel with the NORMSDIST function which is based on z values, or we could use NORMDIST, which is based on the value of interest, the mean,and the standard error. .37 has a z = (.37 - .4)/.0346 = -.87. .43 has a z = .87 This is the area we want and this is my sketch of the answer. From the table we have .8078 - .1922 = .6156 Sampling dist. of p .37 .4 .43

  6. Problem 12 page 218 a. p = 15/50 = .30 b. Standard error = sqrt[.4(.6)/50] = .0693

More Related