How do you use ode45( ) when the equation is not in dy/dt form?

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ssmith il 19 Nov 2021

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Commentato: Star Strider il 23 Nov 2021

I have an equation that I need to approximate the solution for using ode45( ) with initial values y(0) = 1 and y'(0) = 0 on interval of 0 < t < 150 and then plot x(t)

So far I have this for the equation y" + 4y = sin(1.9t)

syms y(t) 
eqn = diff(y,2) + 4*y == sin(1.9*t)
V = odeToVectorField(eqn) 

I know if the equation was in the form of dy/dt = sin(1.9t) - 4y then it would be

k = @(t,y) sin(1.9*t)-4*y;
[t,y] = oder45(k,[0,150])
plot(t,y)

But I do not know know how to write it for the form that my equation is in at this moment

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Paul il 19 Nov 2021

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https://it.mathworks.com/matlabcentral/answers/1591094-how-do-you-use-ode45-when-the-equation-is-not-in-dy-dt-form#answer_835959

Check out this link ....

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ssmith il 19 Nov 2021

@Paul Do you have an example that shows how to apply initial conditions?

Paul il 19 Nov 2021

It's shown on the the doc page at that link. Or check

doc ode45

to see how to specifcy the initial conditions

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Star Strider il 19 Nov 2021

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Since the equation as written involves the second derivative, it is also necessary to define the first derivative as a separate element of the resulting system of first-order differential equatiions.

The odeToVectorField function does this (I added the second ‘substitutions’ output to illustrate what the function actually does) —

syms y(t)

eqn = diff(y,2) + 4*y == sin(1.9*t)

eqn(t) =