a) Let 3,1,3,0,3,2,2,0, 1, 2 be ten independent observations from a binomial experiment of four independent trials each with probability of a success ß and PMF f(x,B). i) If = 0.35, derive an approximate standard error of B. ii) Compute a 95% confidence interval for B.

a) Let 3,1,3,0,3,2,2,0, 1, 2 be ten independent observations from a binomial experiment of four independent trials each with probability of a success ß and PMF f(x,B). i) If = 0.35, derive an approximate standard error of B. ii) Compute a 95% confidence interval for B.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter10: Sequences, Series, And Probability

Section10.8: Probability

Problem 19E

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Question

a) Let 3,1,3,0,3,2,2,0, 1, 2 be ten independent observations from a binomial experiment of four
independent trials each with probability of a success ß and PMF f(x,B).
i) If = 0.35, derive an approximate standard error of B.
ii) Compute a 95% confidence interval for B.
b) Suppose that a random variable X has a probability density function given as
(2(ß-x)
B2
0,
0<x<B
elsewhere
i) Use an appropriate method to show that Wis a pivotal quantity.
ii) Construct a 90% upper confidence limit for ß, using part i) of Question 4 b).
f(x; B) =

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