Question: 1. What is the equation which minimizes the given functional: F[y]=][(y') + 2yy'-16y]dx? x 2. Find the solution of the derived equation subject to

1. What is the equation which minimizes the given functional: F[y]=][(y') + 2yy'-16y]dx? x 2. Find the solution of the derived equation subject to the boundary conditions y(0) = 0; y(pi/8) = 2 and present the solution in the explicit form. 1. What is the equation which minimizes the given functional: F[y]=][(y') + 2yy'-16y]dx? x 2. Find the solution of the derived equation subject to the boundary conditions y(0) = 0; y(pi/8) = 2 and present the solution in the explicit form. 1. What is the equation which minimizes the given functional: F[y]=][(y') + 2yy'-16y]dx? x 2. Find the solution of the derived equation subject to the boundary conditions y(0) = 0; y(pi/8) = 2 and present the solution in the explicit form.

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Gven F 8 6 y 0 0 y B 2 Here By applying 34 2 34 SIR 21 that 72 S 8 2xy 16 y dx 126 f x y y k ... View full answer

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