Question

Please describe what a sampling distribution is and how it relates to hypothesis testing.

Please describe what a sampling distribution is and how it relates to hypothesis testing.

Homework Answers

Answer #1

A sampling distribution is a probability distribution of a statistic obtained from a larger number of samples drawn from a specific population.

When we are performing the hypothesis test the 'sampling distribution' must be used, and the sampling distribution assumes that the 'null hypothesis' is true .., when compared to the obtained test statistics.

If you have any doubts please comment and please don't dislike.

PLEASE GIVE ME A LIKE. ITS VERY IMPORTANT FOR ME.

Know the answer?
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Not the answer you're looking for?
Ask your own homework help question
Similar Questions
How do we use the sampling distribution in significance testing?
How do we use the sampling distribution in significance testing?
In Chapters 7 and 8, you studied estimation and hypothesis testing. (a) What two sampling distributions...
In Chapters 7 and 8, you studied estimation and hypothesis testing. (a) What two sampling distributions are used in estimation and hypothesis testing of population means, proportions, paired differences, differences of means, and differences of proportions? (Select all that apply.) the Student's z distribution the standard t distribution the standard normal distribution the standard Student's distribution the Student's t distribution What are the criteria for determining the appropriate sampling distribution? (Select all that apply.) known or unknown σ known or...
how does sampling variation relate to concluding Ho or H1 when conducting a hypothesis testing?
how does sampling variation relate to concluding Ho or H1 when conducting a hypothesis testing?
3. Describe how the shape and standard deviation of a sampling distribution changes as sample size...
3. Describe how the shape and standard deviation of a sampling distribution changes as sample size increases. In other words, describe the changes that occur to a sampling distribution according to the Central Limit Theorem. Make sure you describe what a sampling distribution is in your answer. Generate pictures/diagrams to illustrate your thoughts if you would like.
Which of the following statements is not true for sampling distributions? a. A sampling distribution is...
Which of the following statements is not true for sampling distributions? a. A sampling distribution is necessary for making confidence statements about an unknown population parameter. b. A sampling distribution depends on the nature of the population being sampled. c. When sampling at random from a normal population, the sampling distribution for the sample average is a normal distribution. d. None of the above. AND TRUE or FALSE Assume a random sample of size n is from a normal population....
What are the assumptions underlying the use of the t distribution in testing hypothesis about the...
What are the assumptions underlying the use of the t distribution in testing hypothesis about the population mean?
What are the assumptions underlying the use of the t distribution in testing hypothesis about the...
What are the assumptions underlying the use of the t distribution in testing hypothesis about the population mean?
Describe sampling distribution of the ols estimator
Describe sampling distribution of the ols estimator
What is the aim of hypothesis testing? What does hypothesis testing achieve that could not be...
What is the aim of hypothesis testing? What does hypothesis testing achieve that could not be otherwise achieved? How does hypothesis testing help support the fields that employ the scientific method? Besides hypothesis testing, are there alternative ways to validate the research findings?
Please explain the following: (a) What is a sampling distribution? (b) Central Limit Theorem.
Please explain the following: (a) What is a sampling distribution? (b) Central Limit Theorem.