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Important facts

Important facts. Review. Reading pages: P330-P337 (6 th ), or P346-359 (7 th ). Chi-square distribution. Definition If Xi are k independent , normally distributed random variables with mean 0 and variance 1, then the random variable

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Important facts

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  1. Important facts

  2. Review • Reading pages: P330-P337 (6th), or P346-359 (7th)

  3. Chi-square distribution Definition If Xi are kindependent, normally distributed random variables with mean 0 and variance 1, then the random variable is distributed according to the chi-square distribution with k degrees of freedom. This is usually written The chi-square distribution has one parameter: k - a positive integer that specifies the number of degrees of freedom (i.e. the number of Xi) The chi-square distribution is a special case of the gamma distribution.

  4. Degree of Freedom Estimates of parameters can be based upon different amounts of information. The number of independent pieces of information that go into the estimate of a parameter is called the degrees of freedom (df). In general, the degrees of freedom of an estimate is equal to the number of independent scores that go into the estimate minus the number of parameters estimated as intermediate steps in the estimation of the parameter itself. For example, if the variance, σ², is to be estimated from a random sample of N independent scores, then the degrees of freedom is equal to the number of independent scores (N) minus the number of parameters estimated as intermediate steps (one, μ estimated by sample mean) and is therefore equal to N-1.

  5. Probability density function • A probability density function of the chi-square distribution is where Γ denotes the Gamma function. • In mathematics, the Gamma function (represented by the capitalized Greek letter Γ) is an extension of the factorialfunction to real and complex numbers. For a complex number z with positive real part the Gamma function is defined by • If n is a positive integer, then

  6. t-distribution • Student's t-distribution is the probability distribution of the ratio Where (i) Z is normally distributed with expected value 0 and variance 1; (ii) V has a chi-square distribution with ν degrees of freedom; (iii) Z and V are independent.

  7. Probability density function • Student's t-distribution has the probability density function where ν is the number of degrees of freedom and Γ is the Gamma function.

  8. Density of the t-distribution (red and green) for 1, 2, 3, 5, 10, and 30 df compared to normal distribution (blue)

  9. F-distribution • A random variate of the F-distribution arises as the ratio of two chi-squared variates: where (i) U1 and U2 have chi-square distributions with d1 and d2 degrees of freedom respectively, and; (ii) U1 and U2 are independent.

  10. Probability density function • The probability density function of an F(d1, d2) distributed random variable is given by for realx ≥ 0, where d1 and d2 are positive integers, and B is the beta function.

  11. Beta function • In mathematics, the beta function is a special function defined by for x>0, and y>0.

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