An experiment consists of tossing 5 fair​ (not weighted)​ coins, except one of the 5 coins...

an experiment consists of tossing 7 fair (not weighted coins) except one of the 7 has...

an experiment consists of tossing 7 fair (not weighted coins) except one of the 7 has heads on both sides. Compute the probability of obtaining exactly 5 heads.

Suppose your experiment consists of repeatedly throwing two fair coins, with "success" when both coins come...

Suppose your experiment consists of repeatedly throwing two fair coins, with "success" when both coins come up "heads". What is the probability of having exactly 2 successes out of 8 trials?

An experiment consists of tossing four coins in the air and observing how many land "heads"...

An experiment consists of tossing four coins in the air and observing how many land "heads" side up. Complete the probability distribution table below. Enter your answers rounded to the fourth decimal place (#.####). Number of "heads" Probability 0 1 2 3 4

A magician has 20 coins in his pocket. Twelve of these coins are normal fair coins...

A magician has 20 coins in his pocket. Twelve of these coins are normal fair coins (with one head and one tail) and eight are defective coins with heads on both sides. The magician randomly draws a coin from his pocket and flips it. Given that the flipped coin shows a head, what is the probability that it is defective? Select one: 4/7 8/20 1 1/2

In tossing 5 coins what's the probability of obtaining fewer than 3 heads?

In tossing 5 coins what's the probability of obtaining fewer than 3 heads?

1. what is a “random variable”. 2. An experiment consists of flipping 5 fair coins. Let...

1. what is a “random variable”. 2. An experiment consists of flipping 5 fair coins. Let X be the random variable that counts the number of coins that land heads up. (a) If the experiment ends with the outcome (HTHHT) then what is the value of X? (b) What is P(X = 1)? (c) What are all the possible values/outputs of X?

An experiment consists of tossing a coin three times and record the outcomes. a. Draw a...

An experiment consists of tossing a coin three times and record the outcomes. a. Draw a probability tree illustrating all the possible outcomes of this experiment. b.What is the probability of at least one tail when tossing three coins?

Alice and Bob play the following game. They toss 5 fair coins. If all tosses are...

Alice and Bob play the following game. They toss 5 fair coins. If all tosses are Heads,Bob wins. If the number of Heads tosses is zero or one, Alice wins. Otherwise they repeat,tossing five coins on each round, until the game is decided. (a) Compute the expectednumber of coin tosses needed to decide the game. (b) Compute the probability that Alicewins.

Consider an experiment of tossing two coins three times. Coin A is fair but coin B...

Consider an experiment of tossing two coins three times. Coin A is fair but coin B is not with P(H)= 1/4 and P(T)= 3/4. Consider a bivariate random variable (X,Y) where X denotes the number of heads resulting from coin A and Y denotes the number of heads resulting from coin B. (a) Find the range of (X,Y) (b) Find the joint probability mass function of (X,Y). (c) Find P(X=Y), P(X>Y), P(X+Y<=4). (d) Find the marginal distributions of X and...

Using R, simulate tossing 4 coins as above, and compute the random variable X(the outcome of...

Using R, simulate tossing 4 coins as above, and compute the random variable X(the outcome of tossing a fair coin 4 times & X = num of heads - num of tails.). Estimate the probability mass function you computed by simulating 1000 times and averaging.