Question

The total number of outcomes for 2 rolls of a 7-sided die is: ? please leave...

The total number of outcomes for 2 rolls of a 7-sided die is: ?
please leave an explanation as i do not understand this question

Homework Answers

Answer #1

TOPIC:Outcomes of the given experiment.

Know the answer?
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Not the answer you're looking for?
Ask your own homework help question
Similar Questions
1) A 10-sided die is rolled infinitely many times. Let X be the number of rolls...
1) A 10-sided die is rolled infinitely many times. Let X be the number of rolls up to and including the first roll that comes up 2. What is Var(X)? Answer: 90.0 2) A 14-sided die is rolled infinitely many times. Let X be the sum of the first 75 rolls. What is Var(X)? Answer: 1218.75 3) A 17-sided die is rolled infinitely many times. Let X be the average of the first 61 die rolls. What is Var(X)? Answer:...
If x is the maximum of the numerical outcomes of two rolls of a die, and...
If x is the maximum of the numerical outcomes of two rolls of a die, and y I’d the number of tails in one coin toss. What is the joint probability density function of x and y?
Suppose you roll a fair 100-sided die. What is the expected number of rolls you would...
Suppose you roll a fair 100-sided die. What is the expected number of rolls you would have to make to roll a 100? What is the expected number of rolls you would have to make to have rolled a 98, 99, and 100?
A 7 -sided die with faces labeled 1 to 7 will be rolled once. The 7...
A 7 -sided die with faces labeled 1 to 7 will be rolled once. The 7 possible outcomes are listed below. Note that each outcome has the same probability.Complete parts (a) through (c). Write the probabilities as fractions. (a) Check the outcomes for each event below. Then, enter the probability of the event. Outcomes Probability 1 2 3 4 5 6 7 Event A: Rolling a number from 5 to 6 Event B: Rolling an even number Event A and...
20. Consider the experiment where one randomly rolls two die and the sums of the total...
20. Consider the experiment where one randomly rolls two die and the sums of the total number of dots. Provide a list of all possible outcomes and three examples of events.
Rihanna rolls a 4 sided fair die, then she selects at random, without replacement, as many...
Rihanna rolls a 4 sided fair die, then she selects at random, without replacement, as many cards from the deck as the number shown on the die. What is the probability that she gets at least one Queen? (In your solution, define the corresponding events and write down the given probabilities in terms of them. You do not need to simply your final answer.) Recall: There are 52 cards in a deck, 4 different suits (Clubs, Spades, etc.) and 13...
If you roll an eight sided die and x is the outcomes, the probability distribution of...
If you roll an eight sided die and x is the outcomes, the probability distribution of x is x P(x) 1 1/8 2 1/8 3 4 5 6 7 8 Mean = x.p(x) = Variance = x2.px-μ2 = Standard deviation =
Whenever a standard six-sided die is rolled, one of the following six possible outcomes will occur...
Whenever a standard six-sided die is rolled, one of the following six possible outcomes will occur by chance: , , , , , and . These random outcomes are represented by the population data values: 1, 2, 3, 4, 5, and 6. At the beginning of Week 4, take a random sample of size n = 9 from this population by actually rolling a standard six-sided die 9 separate times and recording your results. If you do not have access...
A game involves rolling a fair six-sided die. If the number obtained on the die is...
A game involves rolling a fair six-sided die. If the number obtained on the die is a multiple of three, the player wins an amount equal to the number on the die times $20. If the number is not a multiple of three, the player gets nothing. How will you model the simulation for the roll of a die? A. Use the numbers 1–20 to represent the numbers rolled when a player wins. B. Use the numbers 1–6 to represent...
Assume we roll a fair four-sided die marked with 1, 2, 3 and 4. (a) Find...
Assume we roll a fair four-sided die marked with 1, 2, 3 and 4. (a) Find the probability that the outcome 1 is first observed after 5 rolls. (b) Find the expected number of rolls until outcomes 1 and 2 are both observed. (c) Find the expected number of rolls until the outcome 3 is observed three times. (d) Find the probability that the outcome 3 is observed exactly three times in 10 rolls given that it is first observed...