Suppose that you are offered the following "deal." You roll a six sided die. If you...

Suppose that you are offered the following "deal." You roll a six sided die. If you...

Suppose that you are offered the following "deal." You roll a six sided die. If you roll a 6, you win $7. If you roll a 4 or 5, you win $1. Otherwise, you pay $8. a. Complete the PDF Table. List the X values, where X is the profit, from smallest to largest. Round to 4 decimal places where appropriate. Probability Distribution Table X P(X) b. Find the expected profit. $ (Round to the nearest cent) c. Interpret the...

Suppose that you are offered the following "deal." You roll a six sided die. If you...

Suppose that you are offered the following "deal." You roll a six sided die. If you roll a 6, you win $17. If you roll a 4 or 5, you win $2. Otherwise, you pay $10. a. Complete the PDF Table. List the X values, where X is the profit, from smallest to largest. Round to 4 decimal places where appropriate. Probability Distribution Table X P(X) b. Find the expected profit. $ (Round to the nearest cent) c. Interpret the...

Suppose that you are offered the following "deal." You roll a six sided die. If you...

Suppose that you are offered the following "deal." You roll a six sided die. If you roll a 6, you win $12. If you roll a 2, 3, 4 or 5, you win $1. Otherwise, you pay $10. a. Complete the PDF Table. List the X values, where X is the profit, from smallest to largest. Round to 4 decimal places where appropriate. Probability Distribution Table X P(X) b. Find the expected profit. $ (Round to the nearest cent) c....

Suppose that you are offered the following "deal." You roll a six sided die. If you...

Suppose that you are offered the following "deal." You roll a six sided die. If you roll a 6, you win $9. If you roll a 2, 3, 4 or 5, you win $1. Otherwise, you pay $6 a. Complete the PDF Table. List the X values, where X is the profit, from smallest to largest. Round to 4 decimal places where appropriate. Probability Distribution Table    X P(X)    b. Find the expected profit. $ (Round to the nearest...

Suppose that you are offered the following "deal." You roll a six sided die. If you...

Suppose that you are offered the following "deal." You roll a six sided die. If you roll a 6, you win $13. If you roll a 4 or 5, you win $5. Otherwise, you pay $6. a. Complete the PDF Table. List the X values, where X is the profit, from smallest to largest. Round to 4 decimal places where appropriate. Probability Distribution Table X P(X) b. Find the expected profit. $ ____ (Round to the nearest cent) c. Interpret...

PROBLEM #2 Suppose you play a game in which a fair 6 sided die is rolled...

PROBLEM #2 Suppose you play a game in which a fair 6 sided die is rolled once. If the outcome of the roll (the number of dots on the side facing upward) is less than or equal to 4, you are paid as many dollars as the number you have rolled. Otherwise, you lose as many dollars as the number you have rolled. Let X be the profit from the game (or the amount of money won or lost per...

Suppose you are offered the following "deal." You roll a die. If you roll a six,...

Suppose you are offered the following "deal." You roll a die. If you roll a six, you win $10. If you roll a four or five, you win $5. If you roll a one, two, or three, you pay $6. Based on numerical values, should you take the deal? Explain your decision. Consider the following questions as you make your decision: -What are you ultimately interested in here (the value of the roll or the money you win)? -In words,...

Suppose someone gives you 4 to 1 odds that you cannot roll two even numbers with...

Suppose someone gives you 4 to 1 odds that you cannot roll two even numbers with the roll of two fair dice. This means you win ​$4 if you succeed and you lose ​$1 if you fail. What is the expected value of this game to​ you? Should you expect to win or lose the expected value in the first​ game? What can you expect if you play 200 ​times? Explain.​ (The table will be helpful in finding the required​...

You play a gambling game with a friend in which you roll a die. If a...

You play a gambling game with a friend in which you roll a die. If a 1 or 2 comes up, you win $8. How much should you lose on any other outcome in order to make this a fair game?

I dont understand question 1 part A to D and please write clear. 1) Suppose you...

I dont understand question 1 part A to D and please write clear. 1) Suppose you play a die rolling game in which a fair 6-sided die is rolled once. If the outcome of the roll (the number of dots on the side facing upward) is at least five, you win $10, otherwise you lose $5.50. Let ? be the profit of the game or the amount of money won or lost per roll. Negative profit corresponds to lost money....