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1. Let c be a positive number. a differential equation of the form
dy/dx=ky^(1+c)
Determine the solution that satisfies the initial condition y(0)=y(subzero)
The solution is y(subzero)=(1)/((ckT)^(1/c))
but I can't understand how to find it. ok when i integrate
dy/y^(1+c)=kdt, I get y^(-c)/(-c)=kt+C and I don't know what do from there.
dy/dx=ky^(1+c)
Determine the solution that satisfies the initial condition y(0)=y(subzero)
The solution is y(subzero)=(1)/((ckT)^(1/c))
but I can't understand how to find it. ok when i integrate
dy/y^(1+c)=kdt, I get y^(-c)/(-c)=kt+C and I don't know what do from there.