Suppose you have a big vat of balls and that 60% of the balls are green...

Suppose you have a box with 10 red balls, 4 green balls, and 6 blue balls....

Suppose you have a box with 10 red balls, 4 green balls, and 6 blue balls. Answer the following questions. Think about the questions below. They look similar, but how are they different? a) You randomly select two balls from the box. What is the probability of selecting two red balls? b) Suppose you are asked to draw a ball, return whatever you picked, and draw another ball. This is called sampling with replacement. What is the probability of selecting...

An urn contains 4 red balls and 6 green balls. Three balls are chosen randomly from...

An urn contains 4 red balls and 6 green balls. Three balls are chosen randomly from the urn, without replacement. (a) What is the probability that all three balls are red? (Round your answer to four decimal places.) (b) Suppose that you win $50 for each red ball drawn and you lose $25 for each green ball drawn. Compute the expected value of your winnings.

An urn contains 6 green ball, 7 blue balls and 5 yellow balls. You are asked...

An urn contains 6 green ball, 7 blue balls and 5 yellow balls. You are asked to draw 3 balls, one at a time (without replacement). Find the probability that a green is pulled first, then another green ball then a blue ball.

An urn contains 10 balls, 2 red, 5 blue, and 3 green balls. Take out 3...

An urn contains 10 balls, 2 red, 5 blue, and 3 green balls. Take out 3 balls at a random, without replacement. You win $2 for each green ball you select and lose $3 for each red ball you select. Let the random variable X denote the amount you win, determine the probability mass function of X.

An urn contains five blue, six green and seven red balls. You choose five balls at...

An urn contains five blue, six green and seven red balls. You choose five balls at random from the urn, without replacement (so you do not put a ball back in the urn after you pick it), what is the probability that you chose at least one ball of each color?(Hint: Consider the events: B, G, and R, denoting respectively that there are no blue, no green and no red balls chosen.)

A box contains 4 red balls, 3 yellow balls, and 3 green balls. You will reach...

A box contains 4 red balls, 3 yellow balls, and 3 green balls. You will reach into the box and blindly select a ball, take it out, and then place it to one side. You will then repeat the experiment, without putting the first ball back. Calculate the probability that the two balls you selected include a yellow one and a green one.

A basket contains 3 green and 2 yellow balls. One ball will be selected at random...

A basket contains 3 green and 2 yellow balls. One ball will be selected at random and then not replaced. Then a second ball will be randomly selected from the basket. G= # of green balls observed during the experiment. 16a) Draw a tree diagram with probabilities written on the branches. At the end of each branch, identify each outcome of the Sample Space and its probability. 16b) Write the pmf (probability mass function) of in column format, identifying its...

I have two bags. Bag 1 contains 3 green balls, while bag 2 contains 2 green...

I have two bags. Bag 1 contains 3 green balls, while bag 2 contains 2 green balls. I pick one of the bags at random, and throw 5 red balls in it. Then I shake the bag and choose 4 balls (without replacement) at random from the bag. (a) If bag 1 is picked, what is the probability that there are exactly 2 red balls among the 4 chosen balls? (b) If bag 2 is picked, what is the probability...

Suppose that there are two bags, each containing n − 1 red balls and one green...

Suppose that there are two bags, each containing n − 1 red balls and one green ball. You choose k balls at random from the first bag and put them into the second. You then choose k balls from the second bag and put them into the first. Find the probability (in terms of n and k) that both green balls end up in the same bag.

An urn has n − 3 green balls and 3 red balls. Draw balls with replacement....

An urn has n − 3 green balls and 3 red balls. Draw balls with replacement. Let B denote the event that a red ball is seen at least once. Find P(B) using the following methods .(a) Use inclusion-exclusion with the events Ai = {ith draw is red}. Hint. Use the general inclusion-exclusion formula from Fact 1.26 and the binomial theorem from Fact D.2. (b) Decompose the event by considering the events of seeing a red ball exactly k times,...