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Fundamental Existence Theorem for Linear Differential Equations Given an IVP d"y d" y dy +ao(x)ygx) dx ... a1 (x)- + an-1 (x) dx" а, (х) dx"-1 yу-D (хо) — Уп-1 У(хо) %3D Уо, у (хо) — У1, ..., If the coefficients a,(x), ... , ao(x) and the right hand side of the equation g(x) are continuous on an interval I and if a,(x) 0 on I then the IVP has a unique solution for the point xo E I that exists on the whole interval I. Consider the IVP on the whole real line d3y ddy (x2 100) dx4 dy y sin(x) 1 + x4. + x2100 dx dx3 у(15) %3D - 22, у (15) 3D 10, у"(15) 3 8, у" (15) 3 8, The Fundamental Existence Theorem for Linear Differential Equations guarantees the existence of a unique solution on the interval

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