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

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...

1. A normal distribution has a mean of 105.0 and a standard deviation of 18.0. Calculate...

1. A normal distribution has a mean of 105.0 and a standard deviation of 18.0. Calculate the Z score that you would use in order to find the probability P(X>111.0) 2. A statistical experiment involves recording the number of times a light blinks during intervals of varied durations. Historically, the light blinks at a rate of 5.1 times per minute on average. Calculate the probability that in a randomly selected 5.5-minute interval, the light blinks 31 times. 3. Consider a...

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: P(B\Ac)= P(D\B)=

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...

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)

An urn contains 10 red balls, 7 green balls, and 3 yellow balls. Draw 5 balls....

An urn contains 10 red balls, 7 green balls, and 3 yellow balls. Draw 5 balls. What's the probability that you draw 2 red, 2 green, and 1 yellow? (Same experiment as above) What's the probability that you draw 2 red, 1 green, and 2 yellow?

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.

Box I contains 7 red and 3 black balls; Box II contains 4 red and 5...

Box I contains 7 red and 3 black balls; Box II contains 4 red and 5 black balls. After a randomly selected ball is transferred from Box I to Box II, 2 balls are drawn from Box II without replacement. Given that the two balls are red, what is the probability a black ball was transferred?

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

In a box of 6 red and 4 green balls, 3 balls are selected at random...

In a box of 6 red and 4 green balls, 3 balls are selected at random without replacement. Find the probability distribution of the number of red balls. *