Sample Size Determination for Confidence Intervals
... data in hand. In order to use this result we need to plug in a “best guess” for p. This guess might come from: Pilot study where p̂ = sample proportion is calculated Prior studies Use the worst case scenario by noting that p(1 p) .25 and is equal to .25 when p=.50. Using p = .50 simplifies ...
... data in hand. In order to use this result we need to plug in a “best guess” for p. This guess might come from: Pilot study where p̂ = sample proportion is calculated Prior studies Use the worst case scenario by noting that p(1 p) .25 and is equal to .25 when p=.50. Using p = .50 simplifies ...
Statistics 11.1
... The t statistic is used when we don’t know the standard deviation of the population, and instead we use the standard deviation of the ...
... The t statistic is used when we don’t know the standard deviation of the population, and instead we use the standard deviation of the ...
Statistics 50 Exam 1 Formulas
... The Median is the center number of a set of numbers. The pth percentile (p between 0 and 100) of a set of numbers is a number with the properties that at least p% of the numbers are less than or equal to the pth percentile and at least (1-p)% of the numbers are greater than or equal to the pth perce ...
... The Median is the center number of a set of numbers. The pth percentile (p between 0 and 100) of a set of numbers is a number with the properties that at least p% of the numbers are less than or equal to the pth percentile and at least (1-p)% of the numbers are greater than or equal to the pth perce ...
9.3
... Top: Distribution for all 1815 stocks. Mean return is -3.5%, wide spread Bottom: Distribution of returns for all possible portfolios that invested equal amounts in each of 5 stocks (graph shows the average of each set of 5 stocks). Mean return still 3.5%, but spread is smaller. ...
... Top: Distribution for all 1815 stocks. Mean return is -3.5%, wide spread Bottom: Distribution of returns for all possible portfolios that invested equal amounts in each of 5 stocks (graph shows the average of each set of 5 stocks). Mean return still 3.5%, but spread is smaller. ...
outline
... Testing; how to calculate P-values from the statistical tables; when to use the t-Distribution or normal Distribution function, how to calculate the t or z statistic; how to carry out the Tests for population means and proportions in a single sample. ...
... Testing; how to calculate P-values from the statistical tables; when to use the t-Distribution or normal Distribution function, how to calculate the t or z statistic; how to carry out the Tests for population means and proportions in a single sample. ...
Statistics 1: tests and linear models
... – If xn is numeric variable, then increment of xn with one unit increases the value of Y with bn – If xn is a factor, then parameter bn gets different value for each factor level, so that Y increases with the value bn corresponding to the level of xn • Note, reference level of x is included to the i ...
... – If xn is numeric variable, then increment of xn with one unit increases the value of Y with bn – If xn is a factor, then parameter bn gets different value for each factor level, so that Y increases with the value bn corresponding to the level of xn • Note, reference level of x is included to the i ...
Final Exam Questions
... 15. Suppose it is known that the ages of all employees working for Saudi Hollandi Bank is normally distributed with a mean of 35.3 and standard deviation of 6.5 years. Which of the following describes what the sampling distribution for x looks like? x will be distributed a. normally with mean x = 3 ...
... 15. Suppose it is known that the ages of all employees working for Saudi Hollandi Bank is normally distributed with a mean of 35.3 and standard deviation of 6.5 years. Which of the following describes what the sampling distribution for x looks like? x will be distributed a. normally with mean x = 3 ...
Section 1
... Statistic – a number that can be computed from the sample data without making use of any unknown parameters • μ (Greek letter mu) – symbol used for the mean of a population • x̄ (x-bar) – symbol used for the mean of the sample • Sampling Distribution (of a statistic) – the distribution of values tak ...
... Statistic – a number that can be computed from the sample data without making use of any unknown parameters • μ (Greek letter mu) – symbol used for the mean of a population • x̄ (x-bar) – symbol used for the mean of the sample • Sampling Distribution (of a statistic) – the distribution of values tak ...
Bootstrapping (statistics)
In statistics, bootstrapping can refer to any test or metric that relies on random sampling with replacement. Bootstrapping allows assigning measures of accuracy (defined in terms of bias, variance, confidence intervals, prediction error or some other such measure) to sample estimates. This technique allows estimation of the sampling distribution of almost any statistic using random sampling methods. Generally, it falls in the broader class of resampling methods.Bootstrapping is the practice of estimating properties of an estimator (such as its variance) by measuring those properties when sampling from an approximating distribution. One standard choice for an approximating distribution is the empirical distribution function of the observed data. In the case where a set of observations can be assumed to be from an independent and identically distributed population, this can be implemented by constructing a number of resamples with replacement, of the observed dataset (and of equal size to the observed dataset).It may also be used for constructing hypothesis tests. It is often used as an alternative to statistical inference based on the assumption of a parametric model when that assumption is in doubt, or where parametric inference is impossible or requires complicated formulas for the calculation of standard errors.