A) in a simple 1-d tight binding model with the nearest neighbor coupling t1 and the...

Part 1: Implement findknn Implement the function findknn, which should find the ?k nearest neighbors of...

Part 1: Implement findknn Implement the function findknn, which should find the ?k nearest neighbors of a set of vectors within a given training data set. The call of: [I,D]=findknn(xTr,xTe,k); should result in two matrices ?I and ?D, both of dimensions ?×?k×n, where ?n is the number of input vectors in xTe. The matrix ?(?,?)I(i,j) is the index of the ??ℎith nearest neighbor of the vector ???(?,:)xTe(j,:). So, for example, if we set i=I(1,3), then xTr(i,:) is the first nearest...

In this problem, you will model the mixing energy of a mixture in a relatively simple...

In this problem, you will model the mixing energy of a mixture in a relatively simple way, in order to relate the existence of a solubility gap to molecular behavior. Consider a mixture of A and B molecules that is ideal in every way but one: the potential energy due to the interaction of neighboring molecules depends upon whether the molecules are alike or different. Let n be the average number of nearest neighbors of any given molecule (perhaps 6...

Question 1 In this question we undertake the Hydrogen Atom Model, developed in 1913 by Niels...

Question 1 In this question we undertake the Hydrogen Atom Model, developed in 1913 by Niels Bohr. a) Write the electric force reigning between the proton and the electron, in the hydrogen atom, in CGS system. Then equate this force, with the force expressed in terms of mass and acceleration, to come up with Bohr's equation of motion. Suppose that the electron orbit, around the proton, is circular. Use the following symbols, throughout. e: proton's or electron's charge intensity(4.8x 10-8...

Simple harmonic wave, with phase velocity of 141ms^-1, propagates in the positive x-direction along a taut...

Simple harmonic wave, with phase velocity of 141ms^-1, propagates in the positive x-direction along a taut string that has a linear mass density of 5gm^-1. The maximum amplitude of the wave is 5cm and the wavelength is 75cm. a) determine the frequency of the wave b) write the wave function down the amplitude at time t = 0 and x = 0 is 2.5 cm. c) calculate the maximum magnitude of the transverse velocity (of a particle on the string)....

In this problem you will model the mixing energy of a mixture in a relatively simple...

In this problem you will model the mixing energy of a mixture in a relatively simple way, in order to relate the existence of a solubility gap to molecular behavior. Consider a mixture of A and B molecules that is ideal in every way but one: The potential energy due to the interaction of neighboring molecules depends upon whether the molecules are like or unlike. Let n be the average number of nearest neighbors of any given molecule (perhaps 6...

#1: A mass of 6 kg is attached to a spring with k = 1500 N/m....

#1: A mass of 6 kg is attached to a spring with k = 1500 N/m. It is stretched a distance of 0.5 m and is released so that it oscillates in simple harmonic motion. A) What is the frequency? B) What is the energy of the oscillator? C) What is the maximum velocity for the oscillator? #2:  When at x = 0.3 m a simple harmonic oscillator (k = 2000 N/m and m = 2 kg) has a velocity of...

A mass on a spring undergoes simple harmonic motion. At t = 0 its displacement is...

A mass on a spring undergoes simple harmonic motion. At t = 0 its displacement is 1m and its velocity is 1m/s towards the equilibrium position. What single piece of information allows you to determine the displacement at time t = 1 s? A. mass B. spring constant (k) C. kinetic energy at t = 0 D. acceleration at t = 0 E. force at t = 0

Calculate the ground state energy of the following in J using the 1-D PIAB model: (a)...

Calculate the ground state energy of the following in J using the 1-D PIAB model: (a) an electron in a box of size 1 ˚A(approximately the diameter of the first Bohr orbit in the hydrogen atom); (b) a proton in a box of size 1 ˚A; and (c) a proton in a box of size 10−14 m (approximate size of an atomic nucleus). (d) Comment on these numbers in the light of typical energies of electronic transitions, vibrational transitions, and...

1. An object-spring system moving with simple harmonic motion (SHM) has an amplitude A. (a) What...

1. An object-spring system moving with simple harmonic motion (SHM) has an amplitude A. (a) What is the total energy of the system in terms of k and A only? (b) Suppose at a certain instant the kinetic energy is twice the elastic potential energy, KE = 2PE. Re-write this equation by using only the variables for the mass, m, velocity, v, spring constant, k, and position, x. (c) Using the results of (a) and (b) and conservation of energy,...

Question 1) Clearly solve: * A 0.50 kg mass attached to a spring undergoes a simple...

Question 1) Clearly solve: * A 0.50 kg mass attached to a spring undergoes a simple harmonic movement with an amplitude of 0.40 m and a period of 3.0 s. Find (a) the total energy of this oscillator (b) the maximum speed of the dough (c) the speed when the mass is at x = +0.20 m from the equilibrium position (d) the elastic potential energy stored in the spring when the mass moves at half its maximum speed