A string of length 'L', that has been tightly stretched between two points at X-axis for t > 0, and satisfied one-dimensional wave equation of the following form: 82u 82u 4 8x2 Produce the wave function, u(x, t) using separation of variables method with given boundary and initial conditions below. и(0,г)- и (п,1)-0, u(x,0)= sin 5x t > 0 ди = 0 (at t=0) Ət
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- 8) Find the position vector r(t) for a particle with acceleration a(t) = (5t, 5 sin t, cos 6t), initial velocity (0) = (3, -3, 1) and initial position (0) = (5, 0, -2).Solve the inhomogeneous wave equation on the real lineUtt − c2Uxx = sin x, x ∈ RU(x, 0) = 0, Ut(x, 0) = 0.Explain what theory you are using and show your full computations.A particle is moving with velocity V(t) = ( pi cos (pi t), 3t2+ 1) m/s for 0 ≤ t ≤ 10 seconds. Given that the position of the particle at time t = 2s is r(2) = (3, -2), the position vector of the particle at t is?
- 2. The position vector of a particle is given by r(t)= (2 cos t sin t)i +(cos^2 t - sin^2 t)j + (3t)k If the particle begins its motion at t = 0 and ends at t = pi, find the difference between the length of the path traveled and the distance between start position and end position; (x.v) +(0,0) 0; (x.y) = (0,0) Given the hunclion aboue, fund the directional denvatue alongSuppose the position of a particle in motion at time is given by the vector parametric equation r(t)=<4(t-2)^2,9,2t^3-6t^2 Find the speed of the particle at time tFind the time(s) when the particle is stationary. If there is more than one correct answer, enter your answers as a comma separated list.
- At time t = 0, a particle is located at the point (1, 2, 3). It travels in a straight line to the point (4, 1, 4), has speed 2 at (1, 2, 3) and constant acceleration 3i - j + k. Find an equation for the posi-tion vector r(t) of the particle at time t.= Use variables separation method to solve the wave equation uxxutt. This function is defined on spatial domain 0 0. Subject to boundary conditions: ux(0, t) = u,(a, t) = 0 and initial conditions: u(x, 0) = 0 and u₁(x,0) = f(x)Find the approximation for the Green's function of the one-dimensional acoustic wave equation in the case where velocity is given by: c(x) = aebx , where a and b are real numbers and a > 0. Analyze each case, b 0, in detail.
- Show whether the following functions are wave functions or not. 1. У(х, t) еxp(ikx) = A- exp (i(ot-Ф)) кЗх3-0313-3kоxt(kx-ot)-iф)) 2 У(х, t) 3. y(x, t) Aexp(i(k³x³-w³t³-3kwxt(kx-wt)-ip)) Аехр (i(-kx? + оt))Q1:- Find the domain of the following vector functions:- (a) f (t) = (cos t)i – Ln(t)j + vt – 2k (b) f (t) = Ln|t – 1|i + e'j + vtk Q2:- Find the domain and the range of the following equations:- 1 -1 (1)W (2)W = sin x y (3)W x²+y2 ху 1 (4)W (5)W = /x² + y2 + z² (6) W = x – y x²+y2+z² (7)W = Ln(x² + y²) (8) W = xy (9) W = 4x² + 9y²A bee with a velocity vector r' (t) starts out at (7, -3, 7) at t = 0 and flies around for 6 seconds. Where is the bee located at time t = 6 if [°r' (Use symbolic notation and fractions where needed.) r' (u) du = 0 location: