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Normal Distributions and Z-Scores Accelerated Math 3 Normal Distributions Last year we learned about normal distributions and the Empirical Rule. It would still be a good idea to have these probabilities memorized! Remember 68% – 95% – 99.7% Normal Distributions • The Empirical Rule tells us the probability that a certain range of data falls within one, two, or three standard deviations of the mean. • is the mean and is the standard deviation of the data set. x ( xi x ) n 2 Ex. 1: Word Problem • The data for the SAT is normally distributed with a mean of 1000 and standard deviation 180. What is the probability that a randomly selected student scored between a 640 and 1180? Normal Distributions and Z-Scores • What happens when a value doesn’t quite fit in exactly one, two or three standard deviations? • We can use z-scores and z-tables! • Z-scores tell us exactly how many standard deviations away a value is from the mean and the z-table gives us the probability a value is below that amount. Z-Scores • We can find Z-Scores by using the formula: z xx Example 2: • Looking back at our SAT example, lets find the probability that a student scores under 1200. Example 3: • What if I wanted to know the percent of test takers who score above a 1200? Example 4: • What if I wanted to know the z-score for a score between 900 and 1300? Ex 5: Working Backwards • You run a Tootsie Pop factory and want to make a guarantee that your Tootsie Pops will last a certain number of licks. If your mean is 964 licks with a standard deviation of 51 licks, how many licks should you guarantee your Tootsie Pops will last so that 90% last that long?