Proportions

Confidence Intervals

Margin of Error

Significance Test

Errors and Powers

Difference in Proportion

100

Conditions for creating a confidence interval

Random, Independent, and Normal

100

As this gets larger, the Margin of Error gets smaller

Sample size

100

Significance level when C%=0.95

100

We fail to reject the null when we were supposed to reject it.

Type II Error

100

Combining variables from a normal distribution results in a ____.

Normal Distribution

200

The critical value for a 90% Confidence level

z*=1.645

200

As this decreases, the margin of error decreases and our interval gets narrower

Confidence level

200

The hypothesis when p is above or below the assumed population proportion

Alternative Hypothesis

200

The probability of rejecting a false null hypothesis

Power

200

Appropriate confidence interval for a difference between two proportions

two-sample z interval for a population proportion

300

Formula for the confidence interval

point estimate +/- (critical value)*(standard error)

300

Formula for margin of error

(critical value)*(standard error)

300

The amount of standard deviations the sample proportion is from the null value

test statistic

300

The higher the power, the ____ Type II error is

lower

300

The mean of the sampling distribution for a difference in proportions can be found through this formula

p₁-p₂

400

The phrasing of the confidence interval conclusion

We are C% confident that the true proportion of the population parameter is between...

400

Interpreting C% and factors affecting Margin of Error

In repeated sampling with the same size, approximately C% of "C%" confidence intervals will capture the population proportion

400

In a significance test of H0:p = 0.75 vs H0:p=/=0.75, a random sample of 90 obtained p̂= 0.82. What is the p-value in a one sample z test for proportions?

p-value = 0.1260

400

Two things that increase the power of a significance test

Sample size and significance level

400

Interpret the confidence interval for a difference in proportions

We are C% confident that the true difference between the proportion...

500

x=15, n=45, C%=.92

Assume all conditions are met. Construct a 92% confidence interval.

(0.2103, 0.4564)

500

x=180, n=400

If you want to create a confidence interval of 0.45 ± 0.04, what degree of confidence should you use?

normalcdf(−1.608, 1.608, 0, 1) = 89.2%

500

H₀: p = .8 x: 41

H_a: p < .8 n: 60

Assume all conditions are met. Construct a test at a 5% significance level. Find test statistic and p-value.

z = -2.26

p = 0.012

500

If a hypothesis test is found to have power = 0.70, then what is the probability that the test will result in a Type II error?

0.30

500

x₁=460, n₁=800

x₂=520, n₂=1000

Assume all conditions are met. Give a 99% confidence interval for the difference between the two proportions.

p-value = 0.00995

CI = (-0.0057, .11569)