Standard Distribution Flashcards
Standard Deviation
- Used to measure the amount of variation in a process.
- This is one of the most common measures of variability in a data set or population
- Two Types of Equations:
- Sample
- Population
What is the difference between Population and Sample?
-
Population refers to ALL of a set
- If we want to know a truth of a whole population, we use the Population equation
-
Sample is a subset
- We most often have a sample and are trying to infer something about the whole group.
Use Population When:
- You have the entire population
- You have a sample of a larger population, but you are only interested in this sample and do not with to generalize your findings to the population
Use Sample When (Most Often)
- If all you have is a sample, but you wish to make a statement about the population standard deviation from which the sample is drawn, you need to use the sample standard deviation (SD)
* Remember: It is possible to have a negative standard deviation
How to Measure the Standard Deviation for a Sample (s)
Standard Deviation for a Sample (s)
- Calculate the mean of the data set (x-bar)
- Subtract the mean from each value in the data set
- Square the difference found in step 2
- Add up the squared differences found in step 3
- Divide the total from step 4 by (n-1) for sample data
- Take the square root of the result from step 5 to get the SD
How to Measure the Standard Deviation for a Population (σ)
Standard Deviation for a Population (σ)
- Calculate the mean of the data set (μ)
- Subtract the mean from each value in the data set
- Square the difference found in step 2
- Add up the squared differences found in step 3
- Divide the total from step 4 by N (for population data)
- (Note: At this point you have the variance of the data)
- Take the square root of the result from step 5 to get the SD
Standard Deviation and Variance
Variance is Std Dev ^2
Std Dev = Sqrt(variance)
The Uniform Distribution
- The Uniform Distribution is a continuous probability distribution
- It describes the condition where all possible outcomes of a random experiment are equally likely to occur
- For the Uniform Distribution:
- Probability density function f(x) is constant over the possible values of x
The formula for Mean and Standard Deviation of Uniform Distribution
Uniform Distribution Question
The number of mobile phones sold by Beta stores is uniformly distributed between 6 and 20 per day. Then find
- Mean
- Standard deviation
- Probability that the daily sales fall between 10 and 12
- Probability that the Beta stores will sell at least 16
Let X be the number of mobiles sold daily by beta stores, X follows the uniform distribution over (6,30). Thus the probability density function is…EXAMPLE ATTACHED
