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A probability function is a function which assigns probabilities to the values of a random variable. Individual probability values may be denoted by the symbol P(X=x), in the discrete case, which indicates that the random variable can have various specific values. All the probabilities must be between 0 and 1; 0≤ P(X=x)≤ 1. The sum of the probabilities of the outcomes must be 1. ∑ P(X=x)=1 It may also be denoted by the symbol f(x), in the continuous, which indicates that a mathematical function is involved. Probability Distributions
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Continuous Probability Distributions Binomial Poisson Probability Distributions Discrete Probability Distributions Normal
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An experiment in which satisfied the following characteristic is called a binomial experiment: 1. The random experiment consists of n identical trials. 2. Each trial can result in one of two outcomes, which we denote by success, S or failure, F. 3. The trials are independent. 4. The probability of success is constant from trial to trial, we denote the probability of success by p and the probability of failure is equal to (1 - p) = q. Examples: 1. No. of getting a head in tossing a coin 10 times. 2. No. of getting a six in tossing 7 dice. 3. A firm bidding for contracts will either get a contract or not
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Check whether the distribution is a probability distribution. Solution # so the distribution is not a probability distribution. X01234 P(X=x)0.1250.3750.0250.3750.125
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A binomial experiment consist of n identical trial with probability of success, p in each trial. The probability of x success in n trials is given by The Mean and Variance of X if X ~ B(n,p) are Mean : Variance : Std Deviation : where n is the total number of trials, p is the probability of success and q is the probability of failure.
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Bin. table
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When the sample is relatively large, tables of Binomial are often used. Since the probabilities provided in the tables are in the cumulative form the following guidelines can be used:
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In a Binomial Distribution, n =12 and p = 0.3. Find the following probabilities. a) b) c) d) e) Bin. table
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In August 2009, David and Maria conducted a survey for Fortune magazine to examine CEO`s attitudes toward employee`s personal problems. 30% of the CEOs interviewed felt that personal problems were none of the company`s business. Assume that this result is true for the current population of CEOs. Using the Binomial distribution tables, in a random samples of 15, find the probability that (i) The number of CEOs who hold this view is 10. (ii) The number of CEOs who hold this view is between 9 to 12. (iii) The number of CEOs who hold this view is at most 7. (iv) Find the mean and standard deviation of binomial distribution.
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Poisson distribution is the probability distribution of the number of successes in a given space*. *space can be dimensions, place or time or combination of them Examples: 1. No. of cars passing a toll booth in one hour. 2. No. defects in a square meter of fabric 3. No. of network error experienced in a day.
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A random variable X has a Poisson distribution and it is referred to as a Poisson random variable if and only if its probability distribution is given by A random variable X having a Poisson distribution can also be written as
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Given that, fin 0.0307
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The Poisson distribution is suitable as an approximation of Binomial probabilities when n is large and p is small. Approximation can be made when, and either or Example: 0.9786
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1. Given that Find (ans: 0.36, 0.16, 1.0, 0.64, 0.8, 0.48). 2. In Kuala Lumpur, 30% of workers take public transportation. In a sample of 10 workers, i) what is the probability that exactly three workers take public transportation daily? (ans: 0.2668) ii) what is the probability that at least three workers take public transportation daily? (ans: 0.6172)
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3. Let Using Poisson distribution table, find i) (ans: 0.1550, 0.0655) ii) (ans: 0.9977, 0.9924) iii) (ans: 0.7697) 4. Last month ABC company sold 1000 new watches. Past experience indicates that the probability that a new watch will need repair during its warranty period is 0.002. Compute the probability that: i) At least 5 watches will need to warranty work. (ans: 0.0527) ii) At most than 3 watches will need warranty work. (ans: 0.8571) iii) Less than 7 watches will need warranty work. (ans: 0.9955)
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Numerous continuous variables have distribution closely resemble the normal distribution. The normal distribution can be used to approximate various discrete probability distribution.
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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 Mean = Median = Mode X f(X) μ σ
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By varying the parameters μ and σ, we obtain different normal distributions Many Normal Distributions
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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 The standardized normal distribution (Z) has a mean of 0, and a standard deviation of 1, Z is denoted by Thus, its density function becomes
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a) Find the area under the standard normal curve of a) Find the area under the standard normal curve of
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Z table
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Determine the probability or area for the portions of the Normal distribution described.
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Z table
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Suppose X is a normal distribution N(25,25). Find Solutions 0.5+0.3413 = 0.8413
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1. Suppose X is a normal distribution, N(70,4). Find a) b) 2. Suppose the test scores of 600 students are normally distributed with a mean of 76 and standard deviation of 8. The number of scoring is from 70 to 82.
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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
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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 :
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Example 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. Solutions:
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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 fewer than 500 of them have disease A? Answer:
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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
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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?
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1. Reported that the mean weekly income of a shift foreman in the glass industry is normally distributed with a mean of $1000 and standard deviation of $100. What is the probability of selecting a shift foreman in the glass industry whose income is a) Between $1000 and $1100. b) Between $790 and $1000. c) Between $840 and $1200.
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2. A study by Great Southern Home Insurance revealed that none of the stolen goods were recovered by the homeowners in 80 percent of reported thefts. a) During a period in which 200 thefts occurred, what is the probability that no stolen goods were recovered in 170 and more of the robberies? b) During a period in which 200 thefts occurred, what is the probability that no stolen goods were recovered in at least 150 of the robberies?
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