Mathematics, 14.10.2019 20:30 crystaldewar55C
Suppose that y is a random variable with a geometric distribution. show that a y p(y) = ∞ y=1 qy−1 p = 1. b p(y) p(y − 1) = q, for y = 2, 3, . . this ratio is less than 1, implying that the geometric probabilities are monotonically decreasing as a function of y. if y has a geometric distribution, what value of y is the most likely (has the highest probability)?
Answers: 1
Mathematics, 21.06.2019 15:40
Each of the walls of a room with square dimensions has been built with two pieces of sheetrock, a smaller one and a larger one. the length of all the smaller ones is the same and is stored in the variable small. similarly, the length of all the larger ones is the same and is stored in the variable large. write a single expression whose value is the total area of this room. do not use any method invocations.
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[15 points, algebra 2]simplify the complex fraction and find the restrictions.
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Mathematics, 21.06.2019 21:00
To finance her community college education, sarah takes out a loan for $2900. after a year sarah decides to pay off the interest, which is 4% of $2900. how much will she pay
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Suppose that y is a random variable with a geometric distribution. show that a y p(y) = ∞ y=1 qy−1 p...
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