Solution:
A irreducibly complex system is a system that "Would not work if one of its part was removed"
Hence 2nd option is correct.
A irreducibly complex system is a system that is infinite. would not work if one of...
Functionalism holds that society is a complex system whose various parts work together to produce stability and solidarity. Shade more light on this assertion.
Problem #1: Take a two-bus system. Bus #1 is represented as an infinite bus with a constant voltage of 120 per unit. Bus #2 is represented as a load / PQ bus with a constant complex power draw (consuming power from system) of 125MW and-55MVAR. The power base for this system is 100MVA. The transmission line between buses #1 and #2 is represented by the pi-model. The series admittance between the buses is Y12-5-12.5pu. The shunt admittance at either end...
3. Suppose there exists an infinite one-dimensions system satisfying the following dispersive wave equation ψ U2 ψ', et 2 ยู่ "" 0 where u and I are parameters with dine nsions of velocity and length respectively. This wave equation has running wave solutions of the forin ψ(z,t) = R(Aei(kztu (k))} where A is a complex constant and w(k) = Vu2k2-(2t,2k4
4. A parallel system functions whenever at least one of its components works. Suppose you have two separate parallel systems, A and B, each consisting of n identical components that work independently with probability p. a) Consider parallel system A. Given that the system is functioning, what is conditional probability that component 1 works? (This has nothing to do with B yet.) Suppose system B breaks down (all n of its components fail), but system A remains functional. To get...
Suppose that a system requires 2 parts in order to work. Based on past similar systems, you assume that after 1 year the probability the first part will still be working is .75, .50 for the second part, and .85 that at least one of the parts will still be working. What is the probability that you would estimate that the system still works after 1 year? Show work.
A particle in an infinite one-dimensional system was described by the wavefunction . Normalize this function. U= Ner2/21
Solve the system -3y + 4z o Exactly one solution:Preview Invalid notation. Infinite solutions No solution
1-r' Problem 16.12 (30 pts) This chapter examines the two-state system but consider instead the infinite-state system consisting of N non-interacting particles. Each particle i can be in one of an infinite number of states designated by an integer, n; = 0,1,2, .... The energy of particle i is given by a = en; where e is a constant. Note: you may need the series sum Li-ori = a) If the particles are distinguishable, compute QIT,N) and A(T,N) for this...
1- One engineer is studying a specific mathematical modeling for one of his projects and came up with the following system of differential equations: y' = -10a + 81. But the system above does not produce an oscillatory behavior as he expected. (a) Solve the system (1) to make sure the engineer did not make any mistake (b) After realizing the system did not produce the desired output, he decided to study the effect of one of its components and...
organization development I feel like this answer should be complex adaptive system but i cant find this in my resources 41. A computer company currently has separate divisions for customer support and process engineering. As part of restructuring, the company wants to combine customer support and process engineering into one division. Through team building and feedback loops, the company ensures that the process team understands what process elements are working well or not working well, and the support teams are...