

   TThhee GGeeoommeettrriicc DDiissttrriibbuuttiioonn

        dgeom(x, prob)
        pgeom(q, prob)
        qgeom(p, prob)
        rgeom(n, prob)

   AArrgguummeennttss::

        x,q: vector of quantiles representing the number of
             failures in a sequence of Bernoulli trials before
             success occurs.

          p: vector of probabilities.

          n: number of observations to generate.

       prob: probability of success in each trial.

   VVaalluuee::

        These functions provide information about the geometric
        distribution with parameter `prob'.  `dgeom' gives the
        density, `pgeom' gives the distribution function,
        `qgeom' gives the quantile function, and `rgeom' gener-
        ates random deviates.

        The geometric distribution with `prob' = p has density

                           p(x) = p (1-p)^x

        for x = 0, 1, 2, ...

   SSeeee AAllssoo::

        `dnbinom' for the negative binomial which generalizes
        the geometric distribution.

   EExxaammpplleess::

        pp <- sort(c((1:9)/10, 1 - .2^(2:8)))
        print(qg <- qgeom(pp, prob = .2))
        for(i in 1:2) print(qg <- qgeom(pgeom(qg, prob=.2), prob =.2))
        Ni <- rgeom(20, prob = 1/4); table(factor(Ni, 0:max(Ni)))

