I could not understand the first and second questions. Can you please solve and provide a solution/answer? (neat handwriting plz!)
Thank you
I could not understand the first and second questions. Can you please solve and provide a...
Please help 3. 1/14 points | Previous Answers DevoreStat9 3.E.018. Notes O Ask Your T Two fair six-sided dice are tossed independently. Let M - the maximum of the two tosses (so M(1,5) - 5, M(3,3) 3, etc.). (a) What is the pmf of M? [Hint: First determine p(1), then p(2), and so on.] (Enter your answers as fractions.) p(m) (b) Determine the cdf of M. (Enter your answers as fractions.) 1 sm< 2 Graph the cdf of M. F(m)...
Please shoe your work for 1 & 2 I need to understand them well,, Include all work in a neat and well organized presentation. Grading is based on the quality, thoroughness, and correctness of the work provided. Two six-sided dice will be rolled once and the numbers (number of dots) on each dice is to be recorded. Define events E the sum of the two dice is i,i2,3...2. List all the outcomes in the Sample Space. a. b. Calculate the...
Can you please solve 3 and 4 with neat handwriting ? Could you explain each step so I can understand? Q3) Using the following data that relates to the formation of vacancy defects in a metallic sample. Determine the following: a) The energy for defect formation in (V) b) The equilibrium number of vacancy defects per cubic meter at 1000 C T°C] Nv/ ml 750 5.7 x 10 1000 ? 1500 5.8 x 1017 Q4) Draw a series of schematics...
I’m horrible with probabilities so please help me and also show work so I could understand them Part A Suppose you toss a coin and it lands flat on the table. There are two possible final states for the coin, it can land with heads up or tails up. Now consider tossing three coins, one after the other. How many different arrangements are possible? Hint: Four of the possible arrangements are shown below. H HT HTH THH Part B We...
Suppose you roll two 4 sided dice. Let the probabilities of the first die be represented by random variable X and those of the second die be represented by random variable Y. Let random variable Z be (X+Y). The range of Z will be from 2-8. 1.(2.5 points) Find E(Z). 2. (2.5 points) Find P(Z = 71Z > 5). 3.(2.5 points) What is the probability that you have to play the game 4 times before you roll Z=7? 4. (2.5...
Suppose you roll two 4 sided dice. Let the probabilities of the first die be represented by random variable X and those of the second die be represented by random variable Y. Let random variable Z be (X+Y). The range of Z will be from 2-8. 1.(2.5 points) Find E(Z). 2. (2.5 points) Find P(Z = 71Z > 5). 3.(2.5 points) What is the probability that you have to play the game 4 times before you roll Z=7? 4. (2.5...
Suppose you roll two 4 sided dice. Let the probabilities of the first die be represented by random variable X and those of the second die be represented by random variable Y. Let random variable Z be X-Y). The range of Z will be from 0 to 3. 1. (2.5 points) Find E(Z). 2. (2.5 points) Find P(Z = 21Z >1). 3. (2.5 points) What is the probability that you have to play the game 6 times before you roll...
Please show all steps so I can fully understand how to solve. Thank you 3. Utility maximization under constraint, substitution and income effect, CV and EV (20 points) Josh gets utility (satisfaction) from two goods, A and B, according to the utility function U(A,B) = 5A/B/. While Luke would like to consume as much as possible he is limited by his income. a. Maximize Josh's utility subject to the budget constraint using the Lagrangean method. b. Suppose PA increase. Show...
Suppose you roll two 4 sided dice. Let the probabilities of the first die be represented by random variable X and those of the second die be represented by random variable Y. Let random variable Z be (X-Y). The range of Z will be from -3 to 3. 1. (2.5 points) Find E(Z). 2. (2.5 points) Find P(Z =-1|Z < 1). 3. (2.5 points) What is the probability that you have to play the game 3 times before you roll...
Suppose you roll two 4 sided dice. Let the probabilities of the first die be represented by random variable X and those of the second die be represented by random variable Y. Let random variable Z be (X-Y). The range of Z will be from -3 to 3. 1. (2.5 points) Find E(Z). 2. (2.5 points) Find P(Z =-1|Z < 1). 3. (2.5 points) What is the probability that you have to play the game 3 times before you roll...