Assuming 0 <1, solve Equation 4.20 -sto 1 s22wnsw? !-J = (1)a S Oz )a s2...
QUESTION 8 The velocity of a particle is v-1 9 i + (3-2) j m/s, where t is in seconds. If r:0 when particle in the y direction during the interval t 1 sto t 4 s 0, determine the displacement of the
QUESTION 8 The velocity of a particle is v-1 9 i + (3-2) j m/s, where t is in seconds. If r:0 when particle in the y direction during the interval t 1 sto t 4 s...
You are given the equation used to solve a problem. 1/2(1500kg)(5.0m/s)2+(1500kg)(9.80m/s2)(10m)=1/2(1500kg)v2i+(1500kg)(9.80m/s2)(0m) vi = m/s
solve with matlab
FOUR-Matlab Solve the following equation of motion using Matlab ODE45: 4 -m 6(0) 6(0)-0.1 (0) 0.2 0(0)-1 Assume that: m-0.1 kg, g-10 m/s, L-1 m, r-0.5 m. Plot θ vs 1 and θ vs θ
FOUR-Matlab Solve the following equation of motion using Matlab ODE45: 4 -m 6(0) 6(0)-0.1 (0) 0.2 0(0)-1 Assume that: m-0.1 kg, g-10 m/s, L-1 m, r-0.5 m. Plot θ vs 1 and θ vs θ
a V 43.3 m/s2 s. This answer agrees with the one obtained above using Equation [1]. Guided Problem A race car starting from rest accelerates at a constant rate of 5.20 m/s?. After how much time has the car traveled 28.5 m along the x-axis? Part 1 of 6 Identify the known and unknown quantities. The car starts from rest so its initial velocity is vo 0. During the time interval of interest, the car travels 28.5 m at constant...
Solve the matrix-eigenvalue equation Question 1 (6) That is, solve 1 1 0 20 -1 0-0 /2 and -1/2. to find the eigenstates of §, and show that the eigenvalues are s Question 2: Solve the matrix form of the Schrödinger equation Hu E/ to find the eigenstates and energy levels of the Hamiltonian matrix ви Во ( 1 0 А -и- В %3 -8иBos. (7) 0 2
Solve the matrix-eigenvalue equation Question 1 (6) That is, solve 1 1...
Solve the heat equation 4,0 < x < 3,1 > 0 kou det u(0, 1) = 0, u(3,t) = 0,1 > 0 S2, 0<x< } u(x,0) = { 10, { <x<3 are the eigenfunctions You will need to apply separation of variables to obtain a family of product solutions un(x, t) = x (x)Ty(t) where X of a Sturm-Liouville problem with eigenvalues an (as in Section 12.1). Using the explicit expressions for un(x, t) gives (8,0) = ŠA, n=0 Then...
Let a >0 Solve the following Laplace's equation in the disk: with the boundary conditions Assume that is a given periodic function with satisfying f (0) = f (2π) and Moreover, u(r,0 is bounded for r s a Which of the following is the (general) solution Select one: A. where for B. where )cos(n)de and for C. where and 2m for n- 1,2,3, D. where Co E R f(0) cos(n0)de and for
Let a >0 Solve the following Laplace's equation...
Calculate the error in acceleration in this equation, assuming vo=0 m/s, Δx ± δx and t ± δt. x=v0t+1/2at^2
At a particular instant, charge q1 = 4.20×10−6 C is at the point (0, 0.250 m, 0) and has velocity υ⃗ 1=(9.20×105m/s)ι^. Charge q2 = −3.30×10−6 C is at the point (0.150 m, 0, 0) and has velocity υ⃗ 2=(−5.30×105m/s)j^. At this instant, what is the magnetic force that q1 exerts on q2?
o 4-13 Exercise: 4.20 The volume current density in medium1 (x 0, er1= 1, and o1 = 20 uS/m) is J1 = 100dx + 20ay 50a A/m2. Obtain the volume current density in medium2 (x 0, Er2= 5, 0280 u S/m). Also compute 01, 02, and ps at the interface. What are the E and D fields on both sides of the interface? N , E)
o 4-13 Exercise: 4.20 The volume current density in medium1 (x 0, er1= 1,...