1. 35 Solexes (motorized bicycles) are available at a bike rental. Each Solex has a 0.05 probability of being found to be dysfunctional. At a certain time, a group of 32 people want to go on a Solex tour. What is the probability that they can do this?
2. At the start of the month, there are 750 units of a given
product in stock. Sales per month follow a normal distribution
where μ = 700 and σ = 25 (what we in fact have is a discrete
distribution; the normal distribution should therefore be viewed as
an approximation).
a. Calculate the probability that the stock will be used up by the
end of the month
b. The supplier wants to reduce the risk of running out of stock to
0.5%.
What level of stock should he maintain at the start of the
month?
c. halfway through the month, there are still 400 units in stock.
What is now the
probability of running out of stock at the end of the
month?
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