show all work and answer fully. will give a good rating for a good answer
Show all work and answer fully. will give a good rating for a good answer
show all work and answer fully! will give a good rating for a good solution 3. Let P be a transition matrix of an irreducible Markov chain with n states. Prove that for each two states iメj there exists k-n-1 such that P > 0. 3. Let P be a transition matrix of an irreducible Markov chain with n states. Prove that for each two states iメj there exists k-n-1 such that P > 0.
show all work and answer fully. will give a good rating for a good answer 5. Let {h}n=o be a stochastic process and T be a random variable whose values are non-negative integers. Suppose that a random variable T is such that for each n the event (T 2 n) depends only on Yo, Y,...,Yn. Is T necessarily a Markov time with respect to (Y,)? 5. Let {h}n=o be a stochastic process and T be a random variable whose values...
Show all work and answer fully! will give a good rating for a good solution 2. Let {y,/-1 be a sequence of independent identically distributed random = k) = ak for variables with values in the set S {0,1, ali n E N and k E S. Let Xo = 0 and ,9), where P( x, = Yǐ + . . . + Y,, (mod 10). Show that XJn-o is a Markov chain, and find its transition probabilities in terms...
Answer fully please and show work! Thank you will give good rating! 6. Consider a company that manufactures a digital wristwatch. The company's total cost, C, is a function of the quantity of units manufactured, q, i.e. C = f(q). Interpret each statement below with a complete sentence. pts) a) C(300) = 5000 b) C'(300) = 12.75
Please show all work and give correct answer. Will give a thumbs up and good rating :) 3. The circumference of a sphere was measured to be 84 cm with a possible error of .5 cm. Use differentials to estimate the maximum error in the calculated volume. Then find the relative error (C = 27r; V= #r3, relative error "Y). You may leave the maximum error in terms of 3 TT.
Will give thumbs up for good answers! 6. Show that the sums S-Xi + +X, of independent random variables X, with zero mean form a martingale. Assume UxkJく00 for k-1, 2, . …
please show all work, will give good rating. (1 point) Solve the system 5x1-6x2 +2x3 +2x4= 41-5x2 +4x3 44- 2x1 -2x2-4x3-44 aC ac T3 C4
ANSWER ALL QUESTIONS AND SHOW YOUR WORK Good review if it is accurate and fully answered! QUESTION 8 Consider a Solow growth model where n=0, s=0.2, d=0.1, and F(K,N)=K^0.3*N^0.7. Suppose that initially at time t=0 the total factor productiviy is z=1 and the economy is in a steady state. What is steady state investment per capita? 10 points QUESTION 9 Consider a Solow growth model where n=0, s=0.2, d=0.1, and F(K,N)=K^0.3*N^0.7. Suppose that initially at time t=0 the total...
please solve step by step. Show formulas, and all work. thanks. I'll give good feedback. y | For the given shaded area, determine the moment of inertia with respect to x-axis (Lx) When: a=28 inch b= 20 inch r= 9 inch k a ** b *
Please answer the question fully! Show all your work and write neatly. If you don’t know how to answer it then do not answer! If you copy someone else’s work I will downvote and report. a) Find the radius of convergence of the power series Σ000 sin(ntor". for which the radius Give an example of a power series Σ k of convergence R satisfies 4 k linninfl의くR<lin.sup는! ak+1 kak+1