We need at least 10 more requests to produce the answer.
0 / 10 have requested this problem solution
The more requests, the faster the answer.
20 pts) Find the solution to the initial value problem { x(0) = (–) xı' =...
Find the solution to the initial value problem X1 1 -2 [] X1 (0) X2(0) X2 6
(1 point) Consider the Initial Value Problem xi(0) 6 = 10xi-4x2 (a) Find the eigenvalues and eigenvectors for the coefficient matrix. ,V2- and 12 (b) Solve the initial value problem. Give your solution in real form x1F X2= (1 point) Consider the Initial Value Problem xi(0) 6 = 10xi-4x2 (a) Find the eigenvalues and eigenvectors for the coefficient matrix. ,V2- and 12 (b) Solve the initial value problem. Give your solution in real form x1F X2=
3. (20 points) Find the solution y = y(x) of the initial value problem y 0 − y x = cos2 (y/x) , y(1) = π 3 3. (20 points) Find the solution y = y(x) of the initial value problem 37 - = cos”(y/2),y(1) = 5
5. (20 pts). Solve the following initial-value problem: Ut + 2uuz - 0<x<, 0 <t<oo 0 1 <1 > 1 u(t,0) = Then draw the solution for different values of time.
Can you do this on MATLAB please? Thanks. (1) [20 pts] Find the exact solution to the Initial Boundary- Value problem utV x E (0,1), t>0, a(0, t)=0, a(i, t) = 0, t>0, t 20. Write the scheme and a code (forward in time, center in space) to approximate the solution of this prob- lem for u = 1/6. Take ΔⅡ 0.1 and compare your results with the exact solution at t = 0.01, 0.1, 1, 10 with At0.01 (1)...
Question 1: (20 points) Find the solution of the initial value problem a = cos? x – sin x – 2y cos x + y2 , y(0) = given that yi(2) = cos x is a solution of the differential equation.
Find the solution to the initial value problem [2]=[ ][:] [:O] = [1] X1(0) 22 (0)
Find a formula for the solution of the initial value problem for for t>0, -oc < x < oo ut = uzz-u a(1:0) = g(z) -x < 1 < x where g is continuous and bounded.( Hint: use v(x, t) = et u(z. t).) Find a formula for the solution of the initial value problem for for t>0, -oc
Find the solution to the initial value problem z"(x) + z(x) = 3e-*, z(0) = 0, z'(0) = 0
Find an implicit and an explicit solution of the given initial-value problem. (Use x for x(t).) dx 4(x2 + 1), (3/4) = 1 dt implicit tan?(x) = 4t+ 311 4. X