let X be the random variable that equals the number of tails minus the number of...

Let W be a random variable giving the number of tails minus the number of heads...

Let W be a random variable giving the number of tails minus the number of heads in three tosses of a coin. Assuming that a tail is half as likely to​ occur, find the probability distribution of the random variable W. Complete the following probability distribution of W.

let x and y be the random variables that count the number of heads and the...

let x and y be the random variables that count the number of heads and the number of tails that come up when two fair coins are flipped. Show that X and Y are not independent.

Let W be a random variable giving the number of heads minus the number of tails...

Let W be a random variable giving the number of heads minus the number of tails in three independent tosses of an unfair coin where p = P(H) = 1 3 , and q = P(T) = 2 3 . (a) List the elements of the sample space S for the three tosses of the coin and to each sample point assign a value of W. (b) Find P(−1 ≤ W < 1). (c) Draw a graph of the probability...

let X and Y be the random variables that count the number of heads and the...

let X and Y be the random variables that count the number of heads and the number of tails that come up when three fair coins are tossed. Determine whether X and Y are independent

A certain “unfair” coin is one where the probability of a head showing when flipped is...

A certain “unfair” coin is one where the probability of a head showing when flipped is 0.35 and the probability of a tail showing is 0.65. An experiment consists of flipping 8 of these “unfair” coins. Let the random variable x be the number of tails showing. Determine the probability of 3 of the 8 coins showing tails.

The random variable X is the number of tails obtained after tossing 4 coins. A) List...

The random variable X is the number of tails obtained after tossing 4 coins. A) List the all possible outcomes. How many possible outcomes? ARe they equally likely outcomes? B) Using a table, display the probability distribution of the number of tails. C) Calculate the probability of one tail or two tails. D) Calculate the probability of at least of one tail.

We have two coins whose heads are marked 2 and tails marked 1. One is a...

We have two coins whose heads are marked 2 and tails marked 1. One is a fair coin and the other is a biased coin whose probabilities of 'Head' are 1/2 and 1/4 respectively.Suppose we toss the two coins simultaneously. Let S and P be the sum and product of all the outcome numbers on the coins, respectively. 1. Compute the mean and variance of S. Calculate up to 3 decimal places (round the number at 4th place) if necessary....

Let X be the random variable representing the difference between the number of headsand the number...

Let X be the random variable representing the difference between the number of headsand the number of tails obtained when a fair coin is tossed 4 times. a) What are the possible values of X? b) Compute all the probability distribution of X? c) Draw the cumulative distribution function F(x) of the random variable X.

A probability experiment consists of flipping 4 biased coins that land heads only 25% of the...

A probability experiment consists of flipping 4 biased coins that land heads only 25% of the time. Let X be the random variable that counts    the number of coins that land heads. Complete the probability distribution for X below. Distribution of X X P (X = k) P (X ≤ k) 0 1 0.4219 2 3 0.0469 4 0.0039 a.Compute: (i) P (X ≤ 3) and (ii) P (X < 3) b.Compute: P (X > 1) c.Compute: P (X is...

A fair coin has been tossed four times. Let X be the number of heads minus...

A fair coin has been tossed four times. Let X be the number of heads minus the number of tails (out of four tosses). Find the probability mass function of X. Sketch the graph of the probability mass function and the distribution function, Find E[X] and Var(X).