BIOM301 Exam 3 True/False

Decreasing variability in population will cause length of CI to

Decrease

As sample size increases, the standard deviation of the population sampled will decrease

False

Beta represents probability of making a Type 1 error at end of study

False

Beta represents the probability that you made a type 1 error at end of study

False

Compare 95% CI for samples of size 10 and samples of size 30; increasing sample size leads to a larger percent of intervals that successfully include the true population mean

False

Decreasing sample size decreases length of a confidence interval

False

Histograms of all sampling distributions of sample means will be symmetrical

False

If our decision in a hypothesis test is to fail to reject the null, then we know the null must be true

False

If the p-value is less than the level of significance (alpha), then the decision must be not to reject null

False

If you reject the null hypothesis, the probability of a Type II error is less than alpha

False

If your test statistic falls in the critical region you will accept the null hypothesis

False

Sampling distribution of sample means will vary each time it is created

False

Statistical power of the test is the ability to reject the null hyp. when the null is really true in the population

False

only the t and not the z distribution varies with sample size

False

For n<100, the t-distribution will be more peaked and less spread out than the z-distribution

False (less peaked, more spread when n<100)

The underlying assumption of normality for a 1 pop z test for percent is met if your sample size is >30

False (n*p)>5

Underlying assumption for normality for a 1 pop. z test for percent is met if your sample size is >30

False (n*p>5)

If population is not normally distributed, the sampling distribution of sample means will appear normal if the sample size used is at least

Greater than 30

Decreasing the sample size will cause the length of the confidence interval to

Increase

Decreasing sample mean will cause CI to

Not change

Alpha represents the:

Probability of a Type 1 error

Difference between Point estimates and Interval estimates

Pt. Est.: 1 # that's the best guess of a population parameter (I.e. Sample mean) Int. Est. : range of values that could include population parameter (i.e. CI)

What value is always located at the center of a confidence interval for population mean?

Sample mean

For a 95% confidence interval, what are you 95% confident about?

That the true population parameter is located in the interval

All else equal, a 95% CI will have a larger interval length compared to a 90% CI

True

As sample size increases, a randomly selected sample will have a sample mean that is closer to the true population value

True

Both t and z distributions are always unimodal and symmetric

True

Correct decision we usually hope to make is a Type B because it represents a statistically significant outcome

True

If population is normally distributed, then the sampling distribution of sample means will also always be normally distributed

True

If we reject the null, the probability of a type one error is less than 5 percent (p< .05)

True

If you reject the null hypothesis you have a statistically significant result

True

If you reject the null you have a statistically significant result

True

Increasing sample mean will not change length of a confidence interval

True

Increasing your sample size increases the probability that the sampling distribution of sample means will be approximately normally distributed

True

Increasing your sample size results in sample means being closer to the true population mean

True

Population mean is equal to the mean of the SDSM even if population is not normally distributed

True

Population mean is equal to the mean of the sampling distribution of sample means even if the population is not normally distributed

True

Sample mean is a point estimate for population mean

True

Samples will have mean values that vary from the true population mean due to chance

True

Standard error is exactly equal to standard deviation of the sampling distribution of sample means

True

The risk of a Type 1 error is directly controlled in a hypothesis test by establishment a level for alpha

True

The standard error is equal to the std. dev. of the SDSM

True

Variability of sample mean values is estimated by the 'standard error'

True

When sample sizes are small, the t-distribution changes to require a greater level of statistical proof before you can reject null hyp.

True

As sample size increases, the SDSM will become more peaked and less spread out

True (= more normal)

Even if your t* value is in the t crit region, it is still possible that the null hypothesis is really true in the population

True (error)

You test the null hyp. that a ear infections as a child do not affect later hearing ability; you end up rejecting null hyp.; you could have made a

Type 1 error (rejecting null = possibility of type 1 error)

You have failed to reject the null when it is false, you have made a

Type 2 error