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Chapter 3 Probability Distribution Normal Distribution Normal Distribution • Numerous continuous variables have distribution closely resemble the normal distribution. • The normal distribution can be used to approximate various discrete probability distribution. A continuous random variable X is said to have a normal distribution with parameters and 2 , where and 2 0, if the pdf of X is f ( x) 1 2 e 1 x 2 2 x X is denoted by X ~ N ( , 2 ) with E X and V X 2 CHARACTERISTICS OF NORMAL DISTRIBUTION •‘Bell Shaped’ • Symmetrical • Mean, Median and Mode are Equal Location is determined by the mean, μ Spread is determined by the standard deviation, σ The random variable has an infinite theoretical range: + to f(X) σ X μ Mean = Median = Mode Many Normal Distributions By varying the parameters μ and σ, we obtain different normal distributions The Standard Normal Distribution Any normal distribution (with any mean and standard deviation combination) can be transformed into the standard normal distribution (Z) Need to transform X units into Z units using X Z The standardized normal distribution (Z) has a mean of , 0 and a standard deviation of 1, 2 1 Z is denoted by Z ~ N (0,1) Thus, its density function becomes Calculating Probabilities for a General Normal Random Variable • Mostly, the probabilities involved x, a normal random variable with mean, μ and standard deviation, σ • Then, you have to standardized the interval of interest, writing it in terms of z, the standard normal random variable. • Once this is done, the probability of interest is the area that you find using the standard normal probability distribution. • Normal probability distribution, X~N ( μ, σ2 ) • Need to transform x to z using Z X Patterns for Finding Areas under the Standard Normal Curve Example Example a) Find the area under the standard normal curve of P (0 Z 1) a) Find the area under the standard normal curve of P(2.34 Z 0) Exercise 3.1 Determine the probability or area for the portions of the Normal distribution described. a) P (0 Z 0.45) b) P ( 2.02 Z 0) c) P ( Z 0.87) d) P ( 2.1 Z 3.11) e) P (1.5 Z 2.55) Answer : a) 0.1736, b) 0.4783, c) 0.8078, d) 0.9812, e) 0.0614 Upper tail probabilities or areas of the distribution of Z have also been tabulated. An entry in the table specifies a value of Zα such that an area lies to its right. In other word, P(Z>Z α) Example 3.2 (a) P Z Z 0.16 (b) P Z Z 0.48 (c) P( Z Z ) 0.80 (d ) P Z Z 0.95 Exercise 3.2 Determine Z such that a) P( Z Z ) 0.25 b) P( Z Z ) 0.36 c) P( Z Z ) 0.983 d) P( Z Z ) 0.89 Answers: a) P( Z Z ) 0.25; Z 0.6745 b) P( Z Z ) 0.36; Z 0.3585 c) P( Z Z ) 0.983; d) P( Z Z ) 0.89; Z 2.1201 Z 1.2265 Example 3.3 Suppose X is a normal distribution N(25,25). Find a) P(24 X 35) b) P( X 20) Z Any normal distribution can be transformed into the standard normal distribution (Z) X Example Exercise 3.3: 1. A normal random variable x has mean, 10, and standard deviation, 2. Find the probabilities below: (a) P X 13.5 (b) P X 8.2 (c) P 9.4 X 10.6 2. Hupper Corporation produces many types of soft drinks including Orange Cola. It has been observed that the net amount of soda in such a can has a normal distribution with a mean of 12 ounces and a standard deviation of 0.015 ounce. What Is the probability that a randomly selected can of Orange Cola contains between 11.97 and 11.99 ounces of soda? 3. The random variable X is normally distributed. Given μ=54 and P ( X > 80 ) = 0.02. Find the value of σ. Normal Approximation of the Binomial Distribution When the number of observations or trials n in a binomial experiment is relatively large, the normal probability distribution can be used to approximate binomial probabilities. A convenient rule is that such approximation is acceptable when n 30, and both np 5 and nq 5. Given a random variable X b(n, p), if n 30 and both np 5 and nq 5, then X N (np, npq) with np and 2 npq Continuous Correction Factor The continuous correction factor needs to be made when a continuous curve is being used to approximate discrete probability distributions. 0.5 is added or subtracted as a continuous correction factor according to the form of the probability statement as follows: c .c a) P ( X x) P ( x 0.5 X x 0.5) c .c b) P ( X x) P ( X x 0.5) c .c c) P ( X x) P ( X x 0.5) c .c d) P ( X x) P ( X x 0.5) c .c e) P ( X x) P ( X x 0.5) c.c continuous correction factor How do calculate Binomial Probabilities Using the Normal Approximation? • Find the necessary values of n and p. Calculate μ = np and npq • Write the probability you need in terms of X. • Correct the value of x with appropriate continuous correction factor (ccf). • Convert the necessary x-values to z-values using z xccf np npq • Use Standard Normal Table to calculate the approximate probability. Example 3.5 In a certain country, 45% of registered voters are male. If 300 registered voters from that country are selected at random, find the probability that at least 155 are males. Exercise 3.5 Suppose that 5% of the population over 70 years old has disease A. Suppose a random sample of 9600 people over 70 is taken. What is the probability that less than 500 of them have disease A? Answer: 0.8186 Normal Approximation of the Poisson Distribution When the mean of a Poisson distribution is relatively large, the normal probability distribution can be used to approximate Poisson probabilities. A convenient rule is that such approximation is acceptable when 10. Given a random variable X then X N ( , ) Po ( ), if 10, Example 3.6 A grocery store has an ATM machine inside. An average of 5 customers per hour comes to use the machine. What is the probability that more than 30 customers come to use the machine between 8.00 am and 5.00 pm? Solution: Exercise 3.6 The average number of accidental drowning in United States per year is 3.0 per 100000 population. Find the probability that in a city of population 400000 there will be less than 10 accidental drowning per year. Answer : 0.2358 Extra exercise 1) A certain type of storage battery lasts, on average, 3.0 years with a variance of 0.25 year. Assuming that the battery lives are normally distributed, find the probability that a given battery will last less than 2.3 years. 2) An electrical firm manufactures light bulbs that have a life, before burn-out, that is normally distributed with mean equal to 800 hours and a standard deviation of 40 hours. Find the probability that a bulb burns between 778 and 834 hours. 3) The probability that a patient recovers from a rare blood disease is 0.4. If 100 people are known to have contracted this disease, what is the probability that less than 30 survive? 4) Assume that the number of asbestos particles in a squared meter of dust on a surface follows a Poisson distribution with a mean of 1000. If a squared meter of dust is analyzed, what is the probability that 950 or fewer particles are found? 5) A process yields 10% defective items. If 100 items are randomly selected from the process, what is the probability that the number of defectives exceeds 13?