X axis is 2 to 12
help please Consider the probability experiment of rolling two 6-sided dice, and the associated random variable...
Please Explain 2. If rolling two 6-sided dice, find the probability of obtaining a sum of 7. 2. If rolling two 6-sided dice, find the probability of obtaining a sum of 7.
2. If rolling two 6-sided dice, find the probability of obtaining a sum of 7.
Imagine rolling two fair 6 sided dice. What is the probability the sum of the rolls is 10?
Can someone help me to solve it by Matlab? ) Many dice games use two 6-sided dice, where each side faces up with equal probability, each turn consists of rolling both dice, and where the SUM of the two dice values is the outcome used in the game. Figure out how to simulate 3600 such die rolls, and then to make a nicely designed histogram displaying the outcomes as a PERCENT of the total rolls
If two six sided dice are rolled, what is the probability of rolling a 5 on at least one of the dice? a) I/36 b) 10/36 c) 12/36 d) 11/36
QUESTION 4 Consider the experiment that consists of rolling a 10-sided dice and writing down the result. The events A and B are defined as A-the number is even) B-the number is greater than 6) How many outcomes does AUB have? a-5 b. 2 C. 7 d- 9 4 QUESTION5 Consider the experiment that consists of rolling a 10-sided dice and writing down the result. The events A and B are defined as A -the number is even ) B-the...
Consider the experiment of rolling six 6-sided dice. The sample space S is all length-6 sequences made up of integers 1 to 6, with replacement. (a) Find the probability of all dice yielding the same number. (b) Find the probability that all the numbers are distinct.
Say you have two 7-sided dice. What is the probability of rolling these dice together, and having the two dice add up to either a 4 or a 6? Hint: You may want to write out the sample space.
Consider the experiment of rolling six six-sided dice. Let Yi each be random variables given by the following functions of the outcomes in the experiment described above. For each of these new random variables Yi given below, describe (1) the new sample space associated with Yi (i.e., SYi = Yi(S)) and (2) the Probability function P (Yi = k) for value of k in SYi . (a) Y1 is the number of even integers in the sequence. (b) Y2 is...
Consider three six-sided dice, and let random variable Y = the value of the face for each. The probability mass of function of Y is given by the following table: y 1 2 3 4 5 6 otherwise P(Y=y) 0.35 0.30 0.25 0.05 0.03 0.02 0 Roll the three dice and let random variable X = sum of the three faces. Repeat this experiment 50000 times. Find the simulated probability mass function (pmf) of random variable X. Find the simulated...