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§6.1–Introducing Normally Distributed Variables Tom Lewis Fall Term 2009 Tom Lewis () §6.1–Introducing Normally Distributed Variables Fall Term 2009 1/7 Outline 1 The standard normal curve 2 Normal curves 3 Standardizing Tom Lewis () §6.1–Introducing Normally Distributed Variables Fall Term 2009 2/7 The standard normal curve The standard normal curve The standard normal curve is the bell-shaped curve given by 1 2 φ(x) = √ e −x /2 . 2π The total area trapped between the curve and the x-axis is 1. 0.4 0.3 0.2 0.1 -4 Tom Lewis () -2 2 §6.1–Introducing Normally Distributed Variables 4 Fall Term 2009 3/7 The standard normal curve Standard normal random variables A variable x is said to have a standard normal distribution if the probability that it lies within a specified range is the area under the standard normal curve over that same range. Tom Lewis () §6.1–Introducing Normally Distributed Variables Fall Term 2009 4/7 The standard normal curve Standard normal random variables A variable x is said to have a standard normal distribution if the probability that it lies within a specified range is the area under the standard normal curve over that same range. Example The probability that a normal random variable has a value between 1 and 2 is the area under the normal curve between 1 and 2, as pictured below. 0.4 0.3 0.2 0.1 -4 Tom Lewis () -2 2 §6.1–Introducing Normally Distributed Variables 4 Fall Term 2009 4/7 Normal curves Normal curves A normal curve is any bell-shaped curve given by 1 2 φ(x) = √ e −(x−µ) /(2σ) . σ 2π µ is called the mean parameter and σ is called the standard deviation parameter. The total area trapped between the curve and the x-axis is 1. Tom Lewis () §6.1–Introducing Normally Distributed Variables Fall Term 2009 5/7 Normal curves Normal curves A normal curve is any bell-shaped curve given by 1 2 φ(x) = √ e −(x−µ) /(2σ) . σ 2π µ is called the mean parameter and σ is called the standard deviation parameter. The total area trapped between the curve and the x-axis is 1. Problem Study the effects of σ and µ on the shape of a normal curve. Tom Lewis () §6.1–Introducing Normally Distributed Variables Fall Term 2009 5/7 Normal curves Normal curves A normal curve is any bell-shaped curve given by 1 2 φ(x) = √ e −(x−µ) /(2σ) . σ 2π µ is called the mean parameter and σ is called the standard deviation parameter. The total area trapped between the curve and the x-axis is 1. Problem Study the effects of σ and µ on the shape of a normal curve. Normal random variables A variable x is said to have a normal distribution (with mean µ and standard deviation σ) if the probability that it lies within a specified range is the area under the corresponding normal curve over that same range. Tom Lewis () §6.1–Introducing Normally Distributed Variables Fall Term 2009 5/7 Standardizing Standardizing If x has a normal distribution with mean µ and standard deviation σ, then the standardized variable x −µ z= σ is a standard normal random variable. Tom Lewis () §6.1–Introducing Normally Distributed Variables Fall Term 2009 6/7 Standardizing Standardizing If x has a normal distribution with mean µ and standard deviation σ, then the standardized variable x −µ z= σ is a standard normal random variable. The equal area principle The area trapped beneath a normal curve with mean µ and standard deviation σ over the interval [a, b] is the same as the area trapped beneath the standard normal curve over the interval [(a − µ)/σ, (b − µ)/σ]. Tom Lewis () §6.1–Introducing Normally Distributed Variables Fall Term 2009 6/7 Standardizing Problem Scores on the SAT (math) test are normally distributed with a mean of 500 and a standard deviation of 100. Tom Lewis () §6.1–Introducing Normally Distributed Variables Fall Term 2009 7/7 Standardizing Problem Scores on the SAT (math) test are normally distributed with a mean of 500 and a standard deviation of 100. Represent the probability of that a randomly selected student will score between 550 and 650 as an area under a normal curve with µ = 500 and σ = 100. Tom Lewis () §6.1–Introducing Normally Distributed Variables Fall Term 2009 7/7 Standardizing Problem Scores on the SAT (math) test are normally distributed with a mean of 500 and a standard deviation of 100. Represent the probability of that a randomly selected student will score between 550 and 650 as an area under a normal curve with µ = 500 and σ = 100. Represent the probability of that a randomly selected student will score between 550 and 650 as an area under a standard normal curve. Tom Lewis () §6.1–Introducing Normally Distributed Variables Fall Term 2009 7/7
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