Q2) Box1: 6 green balls, 2 red balls, 6 blue balls Box2: 1 green balls, 4...

Question 5 (1 point) Box1: 5 green balls, 4 red balls, 5 blue balls Box2: 0...

Question 5 (1 point) Box1: 5 green balls, 4 red balls, 5 blue balls Box2: 0 green balls, 4 red balls, 7 blue balls Experiment: Select one of the two boxes with uniform random probability, and draw two balls from the selected box. Record the box number as the r.v. i, and the colors of the two balls as b1, b2. Compute P(b1 = green ) [Round to 3 digits after decimal point] Your Answer:

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...

Assume that the box contains 6 balls: 2 blue, 2 red, and 2 green. Balls are...

Assume that the box contains 6 balls: 2 blue, 2 red, and 2 green. Balls are drawn in succession without replacement, and their colors are noted until a blue ball is drawn. (1) Which of the following is not a valid outcome for this experiment? A. GB B. B C. RRGB D. GGG (2) How many outcomes are there in the sample space?

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...

A box contains 5 blue balls, 8 red balls, 10 green balls. Ten balls are selected...

A box contains 5 blue balls, 8 red balls, 10 green balls. Ten balls are selected from the box simultaneously. Find the expected number of colors that appear on at least three of the ten balls. I have the answer but don't understand where it comes from.

There are 5 red, 4 blue, 6 green and 3 black balls in a box. Ahmed...

There are 5 red, 4 blue, 6 green and 3 black balls in a box. Ahmed draws 5 balls from the box at random. What is the probability that at least three of them are blue?

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. *

A box contains 11 red chips and 4 blue chips. We perform the following two-step experiment:...

A box contains 11 red chips and 4 blue chips. We perform the following two-step experiment: (a) First, a chip is selected at random from the first box and removed from box. (After this first step, there are 14 chips left in the box.) (b) Then, a chip is selected at random from the second box (that is, from the remaining 14 chips). Let B1 be the event that the chip removed from the box at the first step of...

Bag 1 contains six red balls, seven blue balls, and three green balls. Bag 2 contains...

Bag 1 contains six red balls, seven blue balls, and three green balls. Bag 2 contains eight red balls, eight blue balls, and two green balls. Bag 3 contains two red balls, nine blue balls, and eight green balls. Bag 4 contains four red balls, seven blue balls, and no green balls. Bag 1 is chosen with a probability of 0.15, bag 2 with a probability of 0.20, bag 3 with a probability of 0.35, and bag 4 with a...

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.