Aim: What are confidence intervals for means that have unknown standard deviations and sample sizes less than 30? Quiz Friday
T distribution Used when sample size is less than 30 and the variable is normally or approximately normally distributed Important Characteristics: – It is a bell-shape – It is symmetric about the mean – The mean, median and mode are equal to 0 and are located at the center of the distribution – The curve never touches the x axis
How T distribution differs from standard normal distribution The variance is greater than 1 The t distribution is actually a family of curves based on the concept of degrees of freedom, which is related to sample size As the sample size increases, the t distribution approaches the standard normal distribution
Degrees of freedom Degrees of freedom: the number of values that are free to vary after a sample statistics has been computed – Tells the researcher which specific curve to sue when a distribution consists of a family of curves d.f. = n -1
The t family of Curves
Formula for a specific confidence interval for the mean Use this when standard deviation is unknown and n < 30 The values of t α/2 are found in table F. The top row of table F, labeled confidence intervals is used to get these values
Example 1.Find the t α/2 value of a 95% confidence interval when the sample size is 22. Solution: The d.f = 22-1 = 21. Find 21 in the left column and 95% in the row labeled confidence interval.
Using the F Table
Example Ten randomly selected automobiles were stopped and the tread depth of eh right front tire was measured. The mean was 0.32 inch, and the standard deviation was 0.08 inch. Find the 95% confidence interval of the mean depth. Assume the variable is approximately normally distributed.
Solution Since σ is unknown and s must replace it, the t distribution must be used for 95% confidence interval. Hence the d.f. = 9, t α/2 =2.262 (from table F).
Class Work 1.Find the values for each 1.t α/2 and n = 18 for the 99% confidence interval for the mean 2.t α/2 and n =20 for the 95% confidence interval for the mean 2.A recent study of 25 students showed that they spent an average of $18.53 for gasoline per week. The standard deviation of the sample was $3.00. Find the 95% confidence interval of the true mean. 3.The number of unhealthy days based on the Air Quality Index for a random sample of metropolitan areas is shown. Construct a 98% confidence interval based on the data