ASSIGNMENT Let {5,} be an infinite sequence of i.i.d.Al(1, 1) random variables. define a new random sequence X, by subtracting 1 from the product of three conucutive Sk values, according to: X, = S„,S,S,_, —1. Let = be an estimate of &arrived at by passing X, through en LTI filter: S, […]
Suppose an urn contains 5 red balls, 3 white balls, and 2 yellow balls. We draw a ball from the urn at random, write down its color and return the ball to urn.
Probability (10 points) Question #1. Consider a random experiment where two fair six-sided dice are thrown. (a) (5 points) Define the sample space of this experiment. How many outcomes are possible? (b) (5 points) Show all the outcomes in the event ”the sum of both dice is 6”. What is the probability of this outcome? […]