Deck 10: Statistical Inferences for Means and Proportions

An independent samples experiment is an experiment in which there is no relationship between the measurements in the different samples.

In testing the difference between the means of two normally distributed populations using independent random samples,the alternative hypothesis always indicates no differences between the two specified means.

In testing the difference between the means of two normally distributed populations using independent random samples,we can only use a two-sided test.

In testing the difference between the means of two normally distributed populations using large independent random samples,the sample sizes from the two populations must be equal.

When testing the difference between two proportions selected from populations with large independent samples,the z test statistic is used.

When we are testing a hypothesis about the difference in two population proportions based on large independent samples,we compute a combined (pooled)proportion from the two samples if we assume that there is no difference between the two proportions in our null hypothesis.

If the limits of the confidence interval of the difference between the means of two normally distributed populations were from −2.6 to 1.4 at the 95 percent confidence level,then we can conclude that we are 95 percent certain that there is a significant difference between the two population means.

In testing the difference between two means from two independent populations,the sample sizes do not have to be equal.

The controller of a chain of toy stores is interested in determining whether there is any difference in the weekly sales of store 1 and store 2.The weekly sales are normally distributed.This problem should be analyzed using an independent means method.

In forming a confidence interval for μ₁ − μ₂,only two assumptions are required: independent samples and sample sizes of at least 30.

When comparing two population means based on independent random samples,the pooled estimate of the variance is used when there is an assumption of equal population variances.

In testing the equality of population variances,two assumptions are required: independent samples and normally distributed populations.

Assume that we are constructing a confidence interval for the difference in the means of two populations based on independent random samples.If both sample sizes
and
=10,and the distributions of both populations are highly skewed,then a confidence interval for the difference in the means can be constructed using the t test statistic.

In testing the difference between two population variances,it is a common practice to compute the F statistic so that its value is always greater than or equal to one.

In testing the difference between the means of two independent populations,if neither population is normally distributed,then the sampling distribution of the difference in means will be approximately normal,provided that the sum of the sample sizes obtained from the two populations is at least 30.

If the limits of the confidence interval of the difference between the means of two normally distributed populations were 8.5 and 11.5 at the 95 percent confidence level,then we can conclude that we are 95 percent certain that there is a significant difference between the two population means.

In an experiment involving matched pairs,a sample of 12 pairs of observations is collected.The degrees of freedom for the t statistic is 10.

When comparing the variances of two normally distributed populations using independent random samples,if
,the calculated value of F will always be equal to one.

There are two types of machines,called type A and type B.Both type A and type B can be used to produce a certain product.The production manager wants to compare efficiency of the two machines.He assigns each of the 15 workers to both types of machines to compare their hourly production rate.In other words,each worker operates machine A and machine B for one hour each.These two samples are independent.
This is a paired sample because both machines have the same operators.

The exact shape of the curve of the F distribution depends on two parameters,df₁ and df₂.

The value of F_α in a particular situation depends on the size of the right-hand tail area and on the numerator degrees of freedom.

The F statistic can assume either a positive or a negative value.

Find a 95 percent confidence interval for μ₁ − μ₂,where n₁ = 15,n₂ = 10,
= 1.94,
= 1.04,s₁² = .2025,and s₂² = .0676.(Assume equal population variances. )

Using a 90 percent confidence interval of [−.0076,.0276] for the difference between the proportions of failures in factory 1 and factory 2,where
₁ = .05,
11ec8feb_23a3_8c8d_bdf7_a512f9d1bbd7_TB2569_11₂ = .04,n₁ = 500,and n₂ = 2000,can we reject the null hypothesis at α = .10?

Find a 98 percent confidence interval for the paired difference

Find a 95 percent confidence interval for μ₁ − μ₂,where n₁ = 50,n₂ = 75,
= 82,
= 76,s₁² = 8,and s₂² = 6.Assume unequal variances.

Find a 90 percent confidence interval for the difference between the proportions of failures in factory 1 and factory 2,where
₁ = .05,
11ec8feb_055f_e61c_bdf7_7733cc20d01e_TB2569_11₂ = .04,n₁ = 500,and n₂ = 2000.

When we test H₀: p₁ − p₂ £ .01,H_A: p₁ − p₂ > .01,at α = .05,where
₁ = .08,
11ec8fe3_f0fe_0507_bdf7_b1edfdb0dc11_TB2569_11₂ = .035,n₁ = 200,and n₂ = 400,what is the standard deviation used to calculate the test statistic?

A fast-food company uses two management-training methods.Method 1 is a traditional method of training,and Method 2 is a new and innovative method.The company has just hired 31 new management trainees.15 of the trainees are randomly selected and assigned to Method 1,and the remaining 16 trainees are assigned to Method 2.After three months of training,the management trainees take a standardized test.The test is designed to evaluate their performance and learning from the training.The sample mean score and sample standard deviation of the two methods are given below.Company management wants to determine whether the company should implement the new training method. Write the null and alternative hypotheses.

Let p₁ represent the population proportion of U.S.senatorial and congressional (House of Representatives)Democrats who are in favor of a new modest tax on junk food.Let p₂ represent the population proportion of U.S.senatorial and congressional Republicans who are in favor of a new modest tax on junk food.Out of the 265 Democratic senators and members of Congress,106 of them are in favor of a junk food tax.Out of the 285 Republican senators and members of Congress,only 57 are in favor of a junk food tax.Find a 95 percent confidence interval for the difference between proportions l and 2.

Find a 95 percent confidence interval for μ₁ − μ₂,where n₁ = 9,n₂ = 6,
= 64,
= 59,s₁² = 6,and s₂² = 3.(Assume equal population variances. )

Find a 95 percent confidence interval for the difference between the proportions of older and younger drivers who have tickets,where
₁ = .275,
11ec8feb_2f02_c5fe_bdf7_f3fa4a2a0dff_TB2569_11₂ = .25,n₁ = 1000,and n₂ = 1000.

Find a 95 percent confidence interval for the difference between means,where n₁ = 50,n₂ = 36,
= 80,
= 75,s₁² = 5,and s₂² = 3.Assume unequal variances.

Find a 99 percent confidence interval for the difference between means,given that n₁ = 49,n₂ = 49,
= 87,
= 92,s₁² = 13,and s₂² = 15.(Assume unequal variances. )

Find a 90 percent confidence interval for the difference between the proportions of group l and group 2.Let p₁ represent the population proportion of the people in group 1 who like a new mobile app,and let p₂represent the population proportion of the people in group 2 who like a new mobile app.
₁ = .21,
11ec8feb_7c62_5c33_bdf7_598f048dadf1_TB2569_11₂ = .13,n₁ = 300,and n₂ = 400.

When we test H₀: μ₁ − μ₂ £ 0,H_A: μ₁ − μ₂ > 0,
= 15.4,
= 14.5,s₁ = 2,s₂ = 2.28,n₁ = 35,and n₂ = 18 at α = .01,can we reject the null hypothesis? (Assume unequal variances. )

Calculate the t statistic for testing equality of means where
= 8.2,
= 11.3,s₁² = 5.4,s₂² = 5.2,n₁ = 6,and n₂ = 7.(Assume equal population variances. )

Let p₁ represent the population proportion of U.S.senatorial and congressional (House of Representatives)Democrats who are in favor of a new modest tax on junk food.Let p₂ represent the population proportion of U.S.senatorial and congressional Republicans who are in favor of a new modest tax on junk food.Out of the 265 Democratic senators and members of Congress,106 of them are in favor of a junk food tax.Out of the 285 Republican senators and members of Congress,only 57 are in favor a junk food tax.At α = .01,can we conclude that the proportion of Democrats who favor a junk food tax is more than 5 percent higher than the proportion of Republicans who favor the new tax (using critical value rules)?