If p and r in are y' + p(x)y = r(x) are continuous for all x in
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If p and r in are y' + p(x)y = r(x) are continuous for all x in an interval |x - x0| < show that in this ODE satisfies the conditions of our present theorems, so that a corresponding initial value problem has a unique solution. Do you actually need these theorems for this ODE?
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For a first approximation we can use the following forms of the ODE to solve it The above two equ...View the full answer
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