A= 3 green , 2red , and 1yellow we have 3 bags A,Band C p(A)=1/3 1)p(G/A)=...

A= 3 green , 2red , and 1yellow we have 3 bags A,Band C p(A)=1/3 1)p(G/A)=...

A= 3 green , 2red , and 1yellow we have 3 bags A,Band C p(A)=1/3 1)p(G/A)= n(G/A)/n(A) = 3/6 2)p(R/A) = n(R/A)/n(A) v2/6 3) p(Y/A) = n(Y/A)/n(A) = 1/6 a) find out the frequency of G/A ,R/A, and Y/A b) Experimental probability of G/ A, R/A ,and Y/A c) Theoretical probability of G/A, R/A, and Y/ A

Suppose that you have 9 cards. 6 are green and 3 are yellow. The 6 green...

Suppose that you have 9 cards. 6 are green and 3 are yellow. The 6 green cards are numbered 1, 2, 3, 4, 5, and 6. The 3 yellow cards are numbered 1, 2, and 3. The cards are well shuffled. You randomly draw one card. • G = card drawn is green • Y = card drawn is yellow • E = card drawn is even-numbered a. List the sample space. (Type your answer using letter/number combinations separated by...

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...

There are six red balls and three green balls in a box. If we randomly select...

There are six red balls and three green balls in a box. If we randomly select 3 balls from the box with replacement, and let X be number of green balls selected. So, X ~ Binomial [n=3, p=1/3] Use R to find the following probabilities and answers. A) How likely do we observe exactly one green ball? B) Find P[X<=2]. C) Find the second Decile (the 20th percentile). D) Generating 30 random observations from Bin(n,p) distribution, where n=3 & p=1/3....

There are six red balls and three green balls in a box. If we randomly select...

There are six red balls and three green balls in a box. If we randomly select 3 balls from the box with replacement, and let X be number of green balls selected. So, X ~ Binomial [n=3, p=1/3] Use R to find the following probabilities and answers. A) How likely do we observe exactly one green ball? B) Find P[X<=2]. C) Find the second Decile (the 20th percentile). D) Generating 30 random observations from Bin(n,p) distribution, where n=3 & p=1/3....

Suppose g: P → Q and f: Q → R where P = {1, 2, 3,...

Suppose g: P → Q and f: Q → R where P = {1, 2, 3, 4}, Q = {a, b, c}, R = {2, 7, 10}, and f and g are defined by f = {(a, 10), (b, 7), (c, 2)} and g = {(1, b), (2, a), (3, a), (4, b)}. (a) Is Function f and g invertible? If yes find f −1 and    g −1 or if not why? (b) Find f o g and g o...

We have three colored fair dies with faces labeled: - (R)ed die: 1, 1, 2, 3,...

We have three colored fair dies with faces labeled: - (R)ed die: 1, 1, 2, 3, 3, 3 - (G)reen die: 1, 1, 1, 1, 2, 3 - (B)lue die:     1, 1, 2, 2, 3, 3 A random experiment involves the following two steps: Step 1: One ball is picked randomly from a bag that contains 11 (R)ed balls, 4 (G)reen balls, and 6 (B)lue balls. Step 2: Based on the color of the picked ball, the die with...

5. J and K are independent events. P(J | K) = 0.7. Find P(J). 6. Suppose...

5. J and K are independent events. P(J | K) = 0.7. Find P(J). 6. Suppose that you have 10 cards. 6 are green and 4 are yellow. The 6 green cards are numbered 1, 2, 3, 4, 5, and 6. The 4 yellow cards are numbered 1, 2, 3, and 4. The cards are well shuffled. You randomly draw one card. • G = card drawn is green • Y = card drawn is yellow • E = card...

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.

We have 3 bowls, 1) The first bowl contains 3 red and 2 green balls 2)...

We have 3 bowls, 1) The first bowl contains 3 red and 2 green balls 2) the second bowl contains 2 red and 1 white balls 3) the third one contains 1 red and 3 green balls One bowl by the random is selected and then 2 balls will be drawn. what is the probability that both of these balls will be red?