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Continuous Probability Distributions In this chapter, we’ll be looking at continuous probability distributions. A density curve (or probability distribution function) is a graph of a continuous probability distribution. It must satisfy these properties: 1.The total area under the curve must equal 1 2.Every point on the curve must have a vertical height (y-value) that is 0 or greater.
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Uniform Distribution A Uniform Distribution (where every outcome is equally likely) has a density curve that looks like a rectangle.
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Now, suppose that the time it takes me to do the dishes is uniformly distributed between 10.0 and 15.0 minutes. Notice that the area under the curve is 1.
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Area and Probability There is a correspondence between probability and area. To find the probability that it will take me longer than 13 minutes to do the dishes, we find an area: Area = 2. 0.2 = 0.4 P(13 or more) = 0.4
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Normal Distribution The normal distribution has a bell shaped curve. It’s a bit harder to find areas, but still: area under the curve corresponds to a probability.
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Standard Normal Distribution The Standard Normal Distribution is a normal probability distribution with a mean of 0 and a standard deviation of 1.
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Probabilities from z-Scores z-Score is the location on the horizontal axis Probability comes from the area under the curve. Note: We can only find probabilities for a range of z-scores (so we get an area).
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Let’s find: P(z less than 1.47) = P(z < 1.47) P(z greater than –0.45) = P(z > -0.45) P(z between –1.12 and 0.74) = P(-1.12 < z < 0.74) 95 th percentile
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Homework 5.2: 9, 13, 17, 29, 33, 37 For more practice: 9 - 41odds
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