Use the following chart of accounts to prepare the entry

Chart of Accounts: Cash (101), Accounts Receivable (102), Merchandise Inventory (103), Equipment (110), Accounts Payable (201), Capital (301), Sales (401), Sales Discounts and Allowances (402), Cost of Goods sold (501), Misc. Expenses (503)

On March 12, Klein Company sold merchandise in the amount of $7,800 to Babson Company, with credit terms of 2/10, n/30. The cost of the items sold is $4,500. Prepare the March 12 journal entries for Klein.

Clearly explain the accounts and amounts to be debited or credited. This question is eligible for partial credit

1: Find the matrix that diagonalizes A = 10 1.1: Find eigenvalues of the matrix A. (10 points) 1.2: Find eigenvectors for each eigenvalue of A. (10 points) 1.3: Diagonalize the matrix A . That is, find an invertible matrix S and a diagonal matrix D such that S" AS = D. (10 points) Solution 1.1:Answer ALL questions: Question 1: Discuss the differences between a supply chain and supply chain management. Question 2: What are four key attributes of supply chain management? Question 3: What is the difference between a lean supply chain and an agile supply chain? Under which circumstances is each an appropriate supply chain approach to pursue? Question 4: What is the difference between relational and transactional exchanges? Give two examples of each Question 5: Discuss the role and function of Supply Chain Management in relation to the organization's objectives?Consider three urns, one colored red, one white, and one blue. The red urn contains 1 red and 4 blue balls; the white urn contains 3 white balls, 2 red balls, and 2 blue balls; the blue urn contains 4 white balls, 3 red balls, and 2 blue balls. At the initial stage, a ball is randomly selected from the urn whose color is the same as that of the ball previously selected and is then returned to that urn. Let X,, be the color of the ball in the ath draw. (a) What is the state space? (b) Construct the transition matrix P for the Markov chain. (c) Is the Markove chain irreducible? Aperiodic? (d) Compute the limiting distribution of the Markov chain. (Use your computer) (e) Find the stationary distribution for the Markov chain. (f) In the long run, what proportion of the selected balls are red? What proportion are white? What proportion are blue?SOLVE ALL QUESTIONS CORRECT AND CLEAR I GONNA VOTE UP 1. Give and draw the pdf and cdf of a uniform random variable X. Find the mean and the variance of X. 2. Give the pdf and cdf of an exponential random variable X. 3. Give the pdf, cdf, and Q function of a standart Gaussian random variable X. (unit variance, mean zero) 4. Give the Markove and Chebyshev inequalities. 5. Give the moment generating function and characteristic function of a random variable X. How can the moments be found from the moment generating function and characteristic function