Anna has a coin with P[H] 0.6 and Bob has a coin with P[H] 0.4. Anna...

A weighted coin has a probability of 0.6 of getting a head and 0.4 of getting...

A weighted coin has a probability of 0.6 of getting a head and 0.4 of getting a tail. (a) In a series of 30 independent tosses what is the probability of getting the same number of heads as tails? [2] (b) Find the probability of getting more than 7 heads in 10 tosses? [3] (c) Find the probability of 4 consecutive tails followed by 2 tails in the next 6 tosses. [2]

suppose you flip a biased coin ( P(H) = 0.4) three times. Let X denote the...

suppose you flip a biased coin ( P(H) = 0.4) three times. Let X denote the number of heads on the first two flips, and let Y denote the number of heads on the last two flips. (a) Give the joint probability mass function for X and Y (b) Are X and Y independent? Provide evidence. (c)what is Px|y(0|1)? (d) Find Px+y(1).

An unfair coin is such that on any given toss, the probability of getting heads is...

An unfair coin is such that on any given toss, the probability of getting heads is 0.6 and the probability of getting tails is 0.4. The coin is tossed 8 times. Let the random variable X be the number of times heads is tossed. 1. Find P(X=5). 2. Find P(X≥3). 3. What is the expected value for this random variable? E(X) = 4. What is the standard deviation for this random variable? (Give your answer to 3 decimal places) SD(X)...

You have a coin that has a probability p of coming up Heads. (Note that this...

You have a coin that has a probability p of coming up Heads. (Note that this may not be a fair coin, and p may be different from 1/2.) Suppose you toss this coin repeatedly until you observe 1 Head. What is the expected number of times you have to toss it?

hello Coin 1 is biased, with P(H)=0.2; Coin 2 is also biased, with P(H)=0.6; Coin 3...

hello Coin 1 is biased, with P(H)=0.2; Coin 2 is also biased, with P(H)=0.6; Coin 3 is fair. One of these coins is randomly selected, and then flipped. Calculate: a) P(result of the flip is T). b) P(coin selected was the fair one, if the result of the flip is H). c) Assuming now that one of the coins is randomly selected and then flipped 2 times, calculate P(coin selected was the fair one, if result of the flips is...

A coin with P[Heads]= p and P[Tails]= 1p is tossed repeatedly (the tosses are independent). Define...

A coin with P[Heads]= p and P[Tails]= 1p is tossed repeatedly (the tosses are independent). Define (X = number of the toss on which the first H appears, Y = number of the toss on which the second H appears. Clearly 1X<Y. (i) Are X and Y independent? Why or why not? (ii) What is the probability distribution of X? (iii) Find the probability distribution of Y . (iv) Let Z = Y X. Find the joint probability mass function

A coin with P[Heads]= p and P[Tails]= 1p is tossed repeatedly (the tosses are independent). Define...

A coin with P[Heads]= p and P[Tails]= 1p is tossed repeatedly (the tosses are independent). Define (X = number of the toss on which the first H appears, Y = number of the toss on which the second H appears. Clearly 1X<Y. (i) Are X and Y independent? Why or why not? (ii) What is the probability distribution of X? (iii) Find the probability distribution of Y . (iv) Let Z = Y X. Find the joint probability mass function

coin 1 has probability 0.7 of coming up heads, and coin 2 has probability of 0.6...

coin 1 has probability 0.7 of coming up heads, and coin 2 has probability of 0.6 of coming up heads. we flip a coin each day. if the coin flipped today comes up head, then we select coin 1 to flip tomorrow, and if it comes up tail, then we select coin 2 to flip tomorrow. find the following: a) the transition probability matrix P b) in a long run, what percentage of the results are heads? c) if the...

You repeatedly flip a coin, whose probability of heads is p = 0.6, until getting a...

You repeatedly flip a coin, whose probability of heads is p = 0.6, until getting a head immediately followed by a tail. Find the expected number of flips you need to do.

You have a coin (that we do not know is biased or not) that has a...

You have a coin (that we do not know is biased or not) that has a probability "p" of coming up Heads (which may be different than 1/2). Suppose you toss this coin repeatedly until you observe 1 Head. What is the expected number of times you have to toss it?