solution with matlab only please 
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Problem 2: Use the shooting method to solve d T _-10-7 (T +273)' + 4(150-7): 0 With the boundary ...
Set up and solve a boundary value problem using the shooting method using Matlab
Set up and solve a boundary value problem using the shooting
method using Matlab
A heated rod with a uniform heat source may be modeled with Poisson equation. The boundary conditions are T(x = 0) = 40 and T(x = 10) = 200 dTf(x) Use the guess values shown below. zg linspace (-200,100,1000); xin-0:0.01:10 a) Solve using the shooting method with f(x) = 25 . Name your final solution "TA" b) Solve using the shooting method with f(x)-0.12x3-2.4x2 + 12x....
Question 12) Solve the boundary value problem using a program/script that applied the shooting me...
Please provide the program in Matlab.
Question 12) Solve the boundary value problem using a program/script that applied the shooting method. (t) + y()-8 with the boundary conditions of y(0)-0 and y(10-0. Use ΔΧ-1. Plot on the same axis your solution and the exact solution dt2 t 4 4 dt
Question 12) Solve the boundary value problem using a program/script that applied the shooting method. (t) + y()-8 with the boundary conditions of y(0)-0 and y(10-0. Use ΔΧ-1. Plot on...
In Matlab please da? Solve the boundary value problem: 0.1-0.057 subject to the conditions:y(0)=0 and y(10)=100....
In Matlab please
da? Solve the boundary value problem: 0.1-0.057 subject to the conditions:y(0)=0 and y(10)=100. Find the maximum value of y over this region using the shooting method. Round your answer to TWO decimal points rounding up for 5 or more.
2. Use an RK4 shooting method with a step size of h - 0.01 to find the unique negative solution t...
2. Use an RK4 shooting method with a step size of h - 0.01 to find the unique negative solution to the boundary value problem non ul") -u)- 05 x 1 u(0)0, u(1) - 1 1 + x Hi Then give the approximate value of u(0.5
2. Use an RK4 shooting method with a step size of h - 0.01 to find the unique negative solution to the boundary value problem non ul") -u)- 05 x 1 u(0)0, u(1) -...
please use matlab to solve Problem # 3 P-3 Flow between two paralle plates is described by the following equation dith boundary conditons given as u,-0 & u,-o Calculate the velocity profile u...
please use matlab to solve
Problem # 3 P-3 Flow between two paralle plates is described by the following equation dith boundary conditons given as u,-0 & u,-o Calculate the velocity profile using the shooting method for solving the given BVP and compare your results by plotting the numerical solution over the plot of the analytical solution described by: (y-F )where ğr--0000025.H-О75 and h,30 Hint: use 1.75 for the first initial slope, and the other one is 0.45 to 0.5....
(1 point) Solve the heat problem with non-homogeneous boundary conditions v (2,t) = (2,t), 0<=<4, t>0...
(1 point) Solve the heat problem with non-homogeneous boundary conditions v (2,t) = (2,t), 0<=<4, t>0 u(0,t) =0, u(4,t) = 2, t>0, ulz,0) = , 0 <I<4. Recall that we find h(2), set u(2,t) = u(2,t) – h(2), solve a heat problem for v(, t) and write u(2,t) = v(2,t) +h(2) Find h() (2) = The solution (I, t) can be written as uz, t) =h(2) + (,t), where (2,t) = »=Ecseh (a) v2,t) = Finally, find limu,t) = t-o
4. Solve the initial, boundary value problem by the Fourier integral method. u (0,t)0, u(r,t) bounded as-00 4. Solve the initial, boundary value problem by the Fourier integral method. u (0,t...
4. Solve the initial, boundary value problem by the Fourier integral method. u (0,t)0, u(r,t) bounded as-00
4. Solve the initial, boundary value problem by the Fourier integral method. u (0,t)0, u(r,t) bounded as-00
Given the following non-linear boundary value problem Use the shooting method to approximate solution Use finite...
Given the following non-linear boundary value problem Use the shooting method to approximate solution Use finite difference to approximate solution Plot the approximate solutions together with the exact solution y(t) = 1/3t2 and discuss your results with both methods
2. Use the method of separation of variables to solve the boundary value problem ( au...
2. Use the method of separation of variables to solve the boundary value problem ( au = karu 0<x<L t > 0 (0,t) = 0, > 0 (1.1) -0. > 0 (u(a,0) - (x) 0<x<L. Be sure to detail exactly how f(x) enters your solution E-
Consider the following problem Solve for y(t) in the ODE below (Van der Pol equation) for...
Consider the following problem Solve for y(t) in the ODE below (Van der Pol equation) for t ranging from O to 10 seconds with initial conditions yo) = 5 and y'(0) = 0 and mu = 5. Select the methods below that would be appropriate to use for a solution to this problem. More than one method may be applicable. Select all that apply. ? Shooting method Finite difference method MATLAB m-file euler.m from course notes MATLAB m-file odeRK4sys.m from...
Set up and solve a boundary value problem using the shooting
method using Matlab
A heated rod with a uniform heat source may be modeled with Poisson equation. The boundary conditions are T(x = 0) = 40 and T(x = 10) = 200 dTf(x) Use the guess values shown below. zg linspace (-200,100,1000); xin-0:0.01:10 a) Solve using the shooting method with f(x) = 25 . Name your final solution "TA" b) Solve using the shooting method with f(x)-0.12x3-2.4x2 + 12x....
Please provide the program in Matlab.
Question 12) Solve the boundary value problem using a program/script that applied the shooting method. (t) + y()-8 with the boundary conditions of y(0)-0 and y(10-0. Use ΔΧ-1. Plot on the same axis your solution and the exact solution dt2 t 4 4 dt
Question 12) Solve the boundary value problem using a program/script that applied the shooting method. (t) + y()-8 with the boundary conditions of y(0)-0 and y(10-0. Use ΔΧ-1. Plot on...
In Matlab please
da? Solve the boundary value problem: 0.1-0.057 subject to the conditions:y(0)=0 and y(10)=100. Find the maximum value of y over this region using the shooting method. Round your answer to TWO decimal points rounding up for 5 or more.
2. Use an RK4 shooting method with a step size of h - 0.01 to find the unique negative solution to the boundary value problem non ul") -u)- 05 x 1 u(0)0, u(1) - 1 1 + x Hi Then give the approximate value of u(0.5
2. Use an RK4 shooting method with a step size of h - 0.01 to find the unique negative solution to the boundary value problem non ul") -u)- 05 x 1 u(0)0, u(1) -...
please use matlab to solve
Problem # 3 P-3 Flow between two paralle plates is described by the following equation dith boundary conditons given as u,-0 & u,-o Calculate the velocity profile using the shooting method for solving the given BVP and compare your results by plotting the numerical solution over the plot of the analytical solution described by: (y-F )where ğr--0000025.H-О75 and h,30 Hint: use 1.75 for the first initial slope, and the other one is 0.45 to 0.5....
(1 point) Solve the heat problem with non-homogeneous boundary conditions v (2,t) = (2,t), 0<=<4, t>0 u(0,t) =0, u(4,t) = 2, t>0, ulz,0) = , 0 <I<4. Recall that we find h(2), set u(2,t) = u(2,t) – h(2), solve a heat problem for v(, t) and write u(2,t) = v(2,t) +h(2) Find h() (2) = The solution (I, t) can be written as uz, t) =h(2) + (,t), where (2,t) = »=Ecseh (a) v2,t) = Finally, find limu,t) = t-o
4. Solve the initial, boundary value problem by the Fourier integral method. u (0,t)0, u(r,t) bounded as-00
4. Solve the initial, boundary value problem by the Fourier integral method. u (0,t)0, u(r,t) bounded as-00
2. Use the method of separation of variables to solve the boundary value problem ( au = karu 0<x<L t > 0 (0,t) = 0, > 0 (1.1) -0. > 0 (u(a,0) - (x) 0<x<L. Be sure to detail exactly how f(x) enters your solution E-
Consider the following problem Solve for y(t) in the ODE below (Van der Pol equation) for t ranging from O to 10 seconds with initial conditions yo) = 5 and y'(0) = 0 and mu = 5. Select the methods below that would be appropriate to use for a solution to this problem. More than one method may be applicable. Select all that apply. ? Shooting method Finite difference method MATLAB m-file euler.m from course notes MATLAB m-file odeRK4sys.m from...
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