In discussing the velocity distribution of molecules of an ideal gas, a functionF(x, y, z) = f(x)f(y)f(z) is needed such that d(ln F) = 0 when φ = x2 + y2 + z2 =const. Then by the Lagrange multiplier method d(ln F + λφ) = 0. Use this to show that F(x, y, z) = Ae−(λ/2)(x2+y2+z2).

In discussing the velocity distribution of molecules of an ideal gas, a functionF(x, y, z) = f(x)f(y)f(z) is needed such that d(ln F) = 0 when φ = x2 + y2 + z2 =const. Then by the Lagrange multiplier method d(ln F + λφ) = 0. Use this to show that F(x, y, z) = Ae−(λ/2)(x2+y2+z2).

Related questions

Q: Verify Divergence Theorem for the function F = yi + xj + z? k over the region bounded by x + y? = 9,…

Q: Let ƒ(x, y) = x² + 4y² and let C be the line segment from (0, 0) to (2, 2). You are going to compute…

A: Given: f(x,y)=x2+4y2 We need to find the line integral in two different ways.

Q: Consider the Laplace's equation u t uyy =0 in the square 00 find the associated eigenfunctions X,(x)…

A: Given; Laplace's equation,uxx+uyy=0 0<x<π;0<y<π(a.) Boundary…

Q: Consider a system of N identical free particles of mass m confined in a 3-dimensional box of volume…

A: Since you have posted a question with multiple sub-parts, we will solve the first three sub-parts…

Q: Find the Miller Indices of a plane whose intercepts are (2,1,3).

A: Given intercepts are (p,q,r)= (2,1,3) The Miller indices of a plane is h,k,l=1p,1q,1r…

Q: Use the method of separation of variables to construct the energy eigenfunctions for the particle…

A: Given equation, −ℏ −ℏ22m[∂2ϕ(x,y)∂x2 +∂2ϕ(x,y)∂y2] =Eϕ(x,y) ---------(1)To apply seperation…

Q: Let T:V to V be linear with finite dimV=n, if f(x)=(-1)^n (x-λ_1)^α_1...(x-λ_r)^α_r Let W be a…

A: Its given That f(x)=(-1)n (x-λ1)α1...(x-λr)αr

Q: Consider a system of two Einstein solids, A and B, each containing10 oscillators, sharing a total of…

A: To solve this problem, we are going to use the formula for the number of microstates of each…

Q: Is the following total differential exact? df(g,h) = 7g(g^3+ h^2)jdg + 2h^4(3g^2 + 7h^2)jdh. Could…

Q: A system with charge (number of electrons) is placed in an electric field with potential E (volts).…

Q: Evaluate the following integral: Answer: Check [ ∞ x³8(x + - 2)dx =

Q: frequently interesting to know how a system behaves under some disturbance. These disturbances are…

A: Here the system is associated with 1D in potential well, The wave function related to this system is…

Q: In terms of the totally antisymmetric E-symbol (Levi-Civita tensor) with €123 = +1, the vector…

A: The objective of the question is to prove several properties of the vector product and the…

Q: V(r) = { -Vo, rsa r > a 0, Calculate the total scattering cross section for low energy particles.…

Q: We have a potential V = 1, where k is a constant and r is the distance to the potential focus, which…

Q: Consider the gaussian distribution p(x) = A[e^L (x-a)^2] where A, a, and L are positive real…

A: Gaussian distribution function is also called as the probability distribution function which is used…

Q: has the following no

Q: Consider a system of two Einstein solids, A and B, each containing10 oscillators, sharing a total of…

A: The Einstein system is the one that can store any number of energy units of equal size. This system…

Q: 2. Find T, N, and x, the center of the osculating circle, the equations of the osculating,…

A: Given that:The equation of the plane curve r(t)=2t3i-3t2j+6tk at t=1. It is required to find the…

Q: Starting from the definition of the partition function, Z = Ei e-Bei, prove the following: a) (E): =…

A: We know that expextation value of a physical quantity is average value of that physical quantity…

Q: Let X and Y be random variables such that E[X] = E[Y] = 0 and Var (X), Var(Y) Var(Y) then P(|X| >…

A: Solution: Let X and Y be random variables, such that E(X)=E(Y)=0 and Var(X)<∞, Var(Y)<∞

Q: PROBLEM 3. Using the variational method, calculate the ground s ergy Eo of a particle in the…

A: Given: The potential of the triangular well is as follows. The trial function is Cxexp(-ax).…

Q: Write down the equations and the associated boundary conditions for solving particle in a 1-D box of…

Q: 2.21. Plot the following curves, locate any fixed points, and obtain asymp- totic expansions to…

A: Given: 2y2k+1-5yk+1yk+2y2k=2 Let the variable yk+1=y and yk=x.…

Q: Use the facts that det(E3E2E1E0A) = 1 and Eo is a scale matrix (-949,: → A9,:) E₁ is a swap matrix…

Q: Consider a system with Lagrangian L(q.4) = km²q* + amậ²V (q) + BV(q)² %3D where a and B are…

Q: Prove that the free energy of a semi-classical ideal gas is given by the following relationship F =…

Q: please provide detailed solution for a to c, thank you

A: thank you

Q: Consider a classical particle of mass m moving in one spatial dimension with position x and momentum…

Q: Suppose that you have the Lagrangian L = (;2 + 0ʻr²) + 420 for a 2D 20 system in plane polar…

A: Conjugate momenta Pq corresponding to conjugate variable q is given by Where L = Lagrangian of the…

Q: 14. Recalling that the spectral radius of a square matrix A is p(A) = max; A;. build the Hilbert…

A: The power method is a numerical technique used to compute the largest eigenvalue of a square matrix.…

Q: matrix element of p² be

Q: U = PV P = AT2 Find F0(U,V,N) and F1(U,V,N) After that use, Gibbs-Duhem to prove dF2=0 and…

A: We need to express F0 and F1 in terms of the extensive variables (U, V, and N) and the intensive…

Q: Check if the following operators with the corresponding functions could form an eigen value…

A: Operators form an eigenvalue equation with function, if the function is an eigenvector of the…

Q: #1: Find the time depended wave functions V(x, t) = ?

Q: Consider a Maxwellian distribution: f(v) = (a) Find (vx) (b) Find (v²) (c) Find (mv²/2) 1 (PEA VE) 1…

A: We have given Maxwell's distribution

Q: Sketch f(y) versus y. Show that y is increasing as a function of t for y < 1 and also for y >…

Q: The Poisson bracket {IF\,\P} has the value

Q: Evaluate the transmission coefficient for a rectangular barrier with a potential given by Vo, (-a <x…

Q: Consider a system with l = 1. Use a three-component basis, |m>, which are the simultaneous…

A: Solution: For l = 1, the allowed m values are 1, 0, -1 and the joint eigenstates are |1,1>,…

Q: Let f(z)= u(xx)+ i V(x>Y) be analytic Find the Cauchy-Reimann eguations polar Coordinate& ? function…

A: The necessary conditions for a function f(z)=u+iv to be analytic at all the points in a region R…

Q: Claim: For any function † (q,p,t), df Proof: df = dt af {f, H} + (4.62) Ət af af af Ət - %+%*+% = dt…

Question

In discussing the velocity distribution of molecules of an ideal gas, a function
F(x, y, z) = f(x)f(y)f(z) is needed such that d(ln F) = 0 when φ = x² + y² + z² =
const. Then by the Lagrange multiplier method d(ln F + λφ) = 0. Use this to show that F(x, y, z) = Ae−(λ/2)(x²+y²+z²).

Expert Solution