I need to prove that the DE y' = |y| ,y(0)=0 is an example at which the states of the theorem of existence and uniqueness are not true but the problem has unique solution
That for a DE y'= f(x,y) if :
•f is continuous
•fy is continuous
The problem y'=f(x,y) with initial condition y(x0) = y0 has a unique solution in the (x0-h,x0+h)
I need to prove that the DE y' = |y| ,y(0)=0 is an example at which the states of the theorem of existence and uniqueness are not true but the problem has unique solution
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