Chapter 7,8,9 Statistics
Type I error
incorrectly convicting the defendant when he is innocent
The smaller the margin of error the larger the sampling required. The higher the level of confidence the larger the sample size required.
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a 100% confidence interval is not possible unless either the entire population is sampled or an absurdly wide interval of estimates is provided
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increasing there sample size by a factor of 4, decreases the standard error by a factor of 2. Changing the standard error doubles the magnitude of the standardized z-value
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level of significance
size of rejection region
sampling distribtution of proportion
follows the binomial distribution when sampling with replacement
when sample standard deviation
always assume normal distribution
hypothesis
claim about a population parameter
sampling distribution
distribution of all of the possible values of a sample statistic for a given sample size selected from a population
sampling distribution of the mean
distribution of all possible sample means if you select all possible samples of a given size
central limit theorem
even if population is not normal, sample mean from population will be applicable normal as long as the sample size is large enough. Large enough=30
if standard deviation is known
have a normal distribution is given or sample size is large.
Type II error
incorrectly failing to convict the defendant when he is guilty
unbiased
meaning the mean of all possible sample means is equal to the pop. mean
degrees of freedom
n-1
confidence interval estimate
range of numbers called an interval constructed around the point estimate
point estimate
value of a single sample statistic, such as a sample mean
standard error of mean
value of the standard deviation of all possible sample means, which expresses how the sample means varies from sample to sample
sampling error
variation that occurs due to selecting a single sample from the population
