Unit 15: Normal Probability Distribution




               It is a bell shaped symmetrical curve about the ordinate at X.                   Notes
               The ordinate is maximum at X.

               It is unimodal curve and its tails extend infinitely in both directions.

               The curve is asymptotic to X-axis in both directions.
               The value of p(X) is always non-negative for all values of X, i.e., the whole curve lies
               above X-axis
               Since the distribution is symmetrical, all odd ordered central moments are zero.

               The area between the ordinates at       and   +   is 0.6826. This implies that for a normal
               distribution about 68% of the observations will lie between       and   +  .
               The area between the ordinates at     2  and   + 2  is 0.9544. This implies that for a
               normal distribution about 95% of the observations will lie between     2  and   + 2 .

               The area between the ordinates at     3  and   + 3  is 0.9974. This implies that for a
               normal distribution about 99% of the observations will lie between     3  and   + 3 .
               This  result  shows  that,  practically,  the  range  of  the  distribution  is  6   although,
               theoretically, the range is from    to  .
               Normal distribution can be used as an approximation to binomial distribution when n is
               large and neither p nor q is very small.

          15.8 Keywords

          Condition of homogeneity: The factors must be similar over the relevant population although,
          their incidence may vary from observation to observation.

          Condition of independence: The factors, affecting observations, must act independently of each
          other.
          Condition of symmetry: Various factors operate in such a way that the deviations of observations
          above and below mean are balanced with regard to their magnitude as well as their number.
          Fitting a Normal Curve: A normal curve is fitted to the observed data with the objectives (1) To
          provide  a  visual  device  to  judge  whether it  is a  good  fit  or  not.  (2)  Use  to  estimate  the
          characteristics of the population.

          Method of Areas: Under this method, the probabilities or the areas of the random variable lying
          in various  intervals are determined. These probabilities are then multiplied by N to get the
          expected frequencies.

          Method of Ordinates: In this method, the ordinate f(X) of the normal curve, for various values of
          the random variate X are obtained by using the table of ordinates for a standard normal variate.
          Normal  Approximation  to Poisson  Distribution:  Normal  distribution  can also be  used  to
          approximate a Poisson distribution when its parameter  m    10 .
          Normal Probability Distribution: The normal probability distribution occupies a place of central
          importance in Modern Statistical Theory. This distribution was first observed as the normal law
          of errors by the statisticians of the eighteenth century.






                                           LOVELY PROFESSIONAL UNIVERSITY                                   311