tigistamare03
13.08.2021 •
Mathematics
In Exercise 5.38, we assumed that Y1, the weight of a bulk item stocked by a supplier, had a uniform distribution over the interval (0, 1). The random variable Y2 denoted the weight of the item sold and was assumed to have a uniform distribution over the interval (0, y1), where y1 was a specific value of Y1. If the supplier stocked 3/4 ton, what amount could be expected to be sold during the week?
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Let Y1 denote the weight (in tons) of a bulk item stocked by a supplier at the beginning of a week and suppose that Y1 has a uniform distribution over the interval 0 ⤠y1 ⤠1. Let Y2 denote the amount (by weight) of this item sold by the supplier during the week and suppose that Y2 has a uniform distribution over the interval 0 ⤠y2 ⤠y1, where y1 is a specific value of Y1.
a. Find the joint density function for Y1 and Y2.
b. If the supplier stocks a half-ton of the item, what is the probability that she sells more than a quarter-ton?
c. If it is known that the supplier sold a quarter-ton of the item, what is the probability that she had stocked more than a half-ton?
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Ответ:
314.16 m
Step-by-step explanation:
The distance across the track is 100 metres. This means that the diameter is 100 m.
The track is circular, so, we need the circumference.
The circumference of a circle is given as:
C = πD
where D = diameter
Therefore, the circumference of the track is:
C = π * 100 = 314.16 m
She walked a distance of 314.16 m