| Consider the unit ball in n dimension. Consider the "volume" of this ball. What happens to this as n gets large?
In this talk we will answer this question by classical analysis and also using probability theory. Some generalisations will be indicated. Another interesting problem. If you take two employees at random in ISI and
denote their annual income as X and Y what can you say about the mean value of X/Y? Will show that it is greater than one. So everybody should be happy. One more. For each positive integer k find k positive distinct integers such that the parial sum over all subsets of {1,2,...,k} of these equals the set {1,2, ....,n} for some n.Last one. Is it good for you to invest in mutual funds even if the market is fair? The answer depends on how rich you are. |