3. Suppose we have to biased coins. We know that one coin has probability of heads when flipped equal to P₁ = 0.6 while the other coin has probability of heads when flipped equal to Po=0.3. It is not possible to identify which coin is which so we pick up one coin at random and flip it repeatedly. We observe the number of flips it takes to observe 5 heads. Define the hypothesis to having picked up the coin with Pr{heads} = 0.6 Define the hypothesis H to having picked up the coin with Pr{heads}=0.3. The observation is a (discrete) random variable z , where conditioned on hypothesis H₁, it is Pascal (5, P) and conditioned on hypothesis Ho, it is Pascal (5, P.). a) Develop the likelihood ratio (which will be a ratio of PMFs rather than PDFs because the observation model is discrete) to implement a MAP decision test in order to decide between the two hypotheses. Since the coin to be flipped is picked up at random, it is equally likely that we pick up one or the other, therefore Pr{H} = Pr{H} = 0.5 b) Obtain the probability of error of the test. This will require MATLAB computation of the sums.) c) If z=10, what decision results from the test?
3. Suppose we have to biased coins. We know that one coin has probability of heads when flipped equal to P₁ = 0.6 while the other coin has probability of heads when flipped equal to Po=0.3. It is not possible to identify which coin is which so we pick up one coin at random and flip it repeatedly. We observe the number of flips it takes to observe 5 heads. Define the hypothesis to having picked up the coin with Pr{heads} = 0.6 Define the hypothesis H to having picked up the coin with Pr{heads}=0.3. The observation is a (discrete) random variable z , where conditioned on hypothesis H₁, it is Pascal (5, P) and conditioned on hypothesis Ho, it is Pascal (5, P.). a) Develop the likelihood ratio (which will be a ratio of PMFs rather than PDFs because the observation model is discrete) to implement a MAP decision test in order to decide between the two hypotheses. Since the coin to be flipped is picked up at random, it is equally likely that we pick up one or the other, therefore Pr{H} = Pr{H} = 0.5 b) Obtain the probability of error of the test. This will require MATLAB computation of the sums.) c) If z=10, what decision results from the test?
A First Course in Probability (10th Edition)
10th Edition
ISBN:9780134753119
Author:Sheldon Ross
Publisher:Sheldon Ross
Chapter1: Combinatorial Analysis
Section: Chapter Questions
Problem 1.1P: a. How many different 7-place license plates are possible if the first 2 places are for letters and...
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Do not require matlab
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