Answer:
1) Consider a (MM3) GDikjoo) queucing system with k -4, an arrival rate 2 3, and a service rate μ...
helpp 1) Consider a (MMI3GDk(oo) queueing system with k-4, an arrival rate 2 -3, and a service rate a) Nicely draw the rate diagram for this queueing system (similar to Figures 9 and 10, page 1065, in b) Explicitly write the system of differential equations for the birth-death process corresponding to μ = 3/2· your textbook). this queueing system (see your class notes). You need to write k+1 differential equations, one for each the states of the system. c) Solve...
Consider a single-server queueing system with arrival and service details as: Interarrival times: 3, 2, 6, 2, 4, 5 Service times: 2, 5, 5, 8, 4, 5 Prepare a table show below for the given data. Stop simulation when the clock reaches 20. Write a Java program, to implement this single-server queueing system, print out the table shown below: You should create a future event list in your Java code, and print out the contents of FE list in each...
PROBLEM 4 Suppose that a system is shown in Figure 4. There are three controllers that might be incorporated into this system. 1. Ge (s)-K (proportional (P) controller) 2. GS)K/s (integral (I) controller) 3. G (s)K(1+1/s) (proportional, integral (PI) controller) The system requirements are T, < 10 seconds and P0 10% for a unit step response. (a) For the (P) controller, write a piece of MATLAB code to plot root locus for 0<K<,and find the K value so that the...
1. (20 marks) This question is about the system of differential equations dY (3 1 (a) Consider the case k 0 i. Determine the type of equilibrium at (0,0) (e.g., sink, spiral source). i. Write down the general solution. ili Sketch a phase portrait for the system. (b) Now consider the case k -3. (-1+iv ) i. In this case, the matrix has an eigenvalue 2+i/2 with eigenvector and an eigenvalue 2-W2 with eigenvector Determine the type of equilibrium at...
Differntial Equations Forced Spring Motion 1. A 1 kg mass is attached to a spring of spring constant k = 4kg/82, The spring-mass system is attached to a machine that supplies an external driving force of f(t) = 4 cos(wt). The systern is started from equilibrium i.e. 2(0) = 0 and z'(0) = 0. There is no damping. (a) Find the position x(t) of the mass as a function of time (b) write your answer in the form r(t)-1 sin(6t)...
Exercises 1. Verify equation (3) 2. Use the techniques of Section 13.7 and the fact that P(0) = 10 to solve equation (5). 3. The carrying capacity of Atlantic harp seals has been estimated to be C = 10 million seals. Let 1 = 0 correspond to the year 1980 when this seal population was estimated to be about 2 mil- lion. (Data from: Fisheries and Oceans Canada.) (a) Use a logistic growth model = kP(C - P) with k...
Page 1 and 2 are instructions. Please help me solve K for page 3 and page 4 and please check the other work on Page 3. Thanyou very much. Will Rate! CHM 112 Electrochemical Cells and Thermodynamics Section A. Constructing a Small-Scale Electrochemical Cell Woodbridge Campus Objective To construct a small-scale electrochemical cell using a redox system, to measure the cell potential and derive thermodynamic quantities. Procedures 1. Connect the red and black alligator clips to the multimeter to read...
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