8. In a random walk model, the mean-square migration distance in the one-dimensional space, (r2), is...
5) Consider an oligomer with N 3 bonds occupying four lattice sites on a two dimensional square lattice with lattice constant b. One end of the oligomer is fixed at the origin of the lattice. (a) How many different conformations would such an oligomer have it if can occupy the same lattice site many times (simple random walk)? (b) How many different conformation would such an oligomer have it it cannot occupy the same lattice site (self-avoiding walk)? (c) Find...
A random walk is a particular kind of probabilistic (pseudo-random) simulation that models certain statistical systems, such as Brownian motion of particles or molecules. Coin flipping is an example of a one-dimensional random walk--one dimensional because you only can go forward (when you flip heads) or backward (when you flip tails) along a straight line. Suppose you take a random walk of nsteps. How many steps away from your starting point would you expect to end up on average, if...
Consider a one-dimensional tight binding model of electrons hopping between atoms. Let the distance between atoms be called a, and here let us label the atomic orbital on atom n as In) for n-1,..N (you may assume orthonormality of orbitals, i.e, (n|m) -8nm) Suppose there is an on-site energy є and a hopping matrix element-t. In other words, suppose 〈nlH1m)=ε for n-mand (IH1m)=-t for n-m±1. (d) What is the density of states? Consider a one-dimensional tight binding model of electrons...
So, how do we describe diffusive motion? If a particular object moves a distance Ar from its original location (displacement) in a time Δ t, we cannot write down an equation that precisely relates dr and Δ, since the direction and distance moved by the object between collisions with the fluid particles is random and the time between collisions is also random. Because of these random effects, a particular object has very little chance of ever returning to the position...
CHEM 103 Homework 4 5. (15 points): The Bohr model was a one-dimensional model that used one quantum number describe the distribution of electrons in the atom. The only information that was important we the size of the orbit, which was described by the n quantum number. Schrodinger's moder allowed the electron to occupy three-dimensional space. It therefore required three coordinates, or three quantum numbers, to describe the orbitals in which electrons can be found. Based on Schrodinger's model answer...
Consider a one-dimensional tight binding model of electrons hopping between atoms. Let the distance between atoms be called a, and here let us label the atomic orbital on atom n as In) for n-1,..N (you may assume orthonormality of orbitals, i.e, (n|m) -8nm) Suppose there is an on-site energy є and a hopping matrix element-t. In other words, suppose 〈nlH1m)=ε for n-m and (IH1m)--t for n-m±1. (e) If each atom is monovalent (it donates a single electron) what is the...
Questions 1 - 5 deal with a particle in a one-dimensional infinite square well of width a where 0, 0 SX Sa V(x) = 100, Otherwise. The stationary states are Pn(x) = sin(**) with energies En = "forn = 1,2,3.. Question 1 (14 pts) Which of the following is correct? A. The Hilbert space for this system is one dimensional. B. The energy eigenstates of the system form a ID Hilbert space. C. Both A and B are correct. D....
You are standing a distance d (2m) directly in front of one of two identical speakers, being driven by the same signal generator, that are a distance h (5m) apart. You walk in the positive direction starting at y=0 m, along a line parallel to the line joining the two speakers. The speed of sound is 340 m/s and the frequency is 170 HZ. As you walk, how many times and where will you hear a maximum sound? PROBLEM You...
Consider a one-dimensional tight binding model of electrons hopping between atoms. Let the distance between atoms be called a, and here let us label the atomic orbital on atom ln) for n-1,..,N (you may assume orthonormality of orbitals, ie., (1m)- nm). n as Suppose there is an on-site energy e and a hopping matrix element -t. In other words, suppose (IH|m) = E for n-m and (1비m)=-t for n=m±1. (a) Derive and sketch the dispersion curve for electrons. (b) How...
Please only answer 4-8 please, thanks Question 1 Migration plays an important role in development and as a strategy for poverty reduction. Burkina Faso, whose conditions for agriculture are far from favorable, has a long history of migratory movement, and migration within West Africa has long taken place in response to drought and low agricultural productivity. In recent decades, migration to destinations outside the African continent and in particular to Western Europe has become more important for migrant:s from Burkina...