A box contains one yellow, two red, and three green balls. Two balls are randomly chosen...

A box contains one yellow, two red, and three green balls. Two balls are randomly chosen...

A box contains one yellow, two red, and three green balls. Two balls are randomly chosen without replacement. Define the following events: A: \{ One of the balls is yellow \} B: \{ At least one ball is red \} C: \{ Both balls are green \} D: \{ Both balls are of the same color \} Find the following conditional probabilities: (a) P(B|D^c) (b) P(D|C) (c) P(A|B)

Box 1 contains 4 red balls, 5 green balls and 1 yellow ball. Box 2 contains...

Box 1 contains 4 red balls, 5 green balls and 1 yellow ball. Box 2 contains 3 red balls, 5 green balls and 2 yellow balls. Box 3 contains 2 red balls, 5 green balls and 3 yellow balls. Box 4 contains 1 red ball, 5 green balls and 4 yellow balls. Which of the following variables have a binomial distribution? (I) Randomly select three balls from Box 1 with replacement. X = number of red balls selected (II) Randomly...

Conditional Probability Problem: An urn contains 5 red balls, 4 green balls, and 4 yellow balls...

Conditional Probability Problem: An urn contains 5 red balls, 4 green balls, and 4 yellow balls for a total of 13 balls. If 5 balls are randomly selected without replacement, what is the probability of selecting at least two red balls given that at least one yellow ball is selected? Please show all steps.

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.

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.

A box contains 22 ​red, 22 white and 33 green balls. Two balls are drawn out...

A box contains 22 ​red, 22 white and 33 green balls. Two balls are drawn out of the box in succession without replacement. What is the probability that both balls are the same​ color?

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.)

2. Box A contains 10 red balls, and 15 green balls. Box B contains 12 red...

2. Box A contains 10 red balls, and 15 green balls. Box B contains 12 red balls and 17 balls green. A ball is taken randomly from box A and then returned to box B. From box B a random ball is drawn. a) Determine the chance that two green balls are taken. b) Determine the chance that 1 red ball is drawn and 1 green ball is taken

A bag contains three balls: one red, one yellow, and one blue. Suppose you select two...

A bag contains three balls: one red, one yellow, and one blue. Suppose you select two balls with replacement. Write the sample space for this procedure by listing out all the possible outcomes that could result. What is the probability that both balls you select are the same color? ________ What is the probability you select at least one yellow ball? ________

One ball is chosen at random from a bag containing 12 red balls, 3 yellow balls,...

One ball is chosen at random from a bag containing 12 red balls, 3 yellow balls, and 5 green balls. i. If 1000 trials are completed (with replacement), about how many times would you expect to select a red ball? ii. If two balls are selected at random without replacement, what is the probability that they are both red? Write your answer as a decimal rounded to 3 decimal places.