Question: Consider the ode: y^' = 1 y + 1 (a) For what initial conditions are we guaranteed that a unique solution exists? Show on the

Consider the ode: y^' = 1 y + 1 (a) For what initial conditions are we guaranteed that a unique solution exists? Show on the ty plane where all these values are located by shading in the region(s). (b) Consider the initial condition y(2) = 2. What is the biggest (open) rectangle you can find that satisfies the conditions for existence and uniqueness for the nonlinear first-order differential equation that contains the initial condition?

it's continous in R besides -1 and C= -2 but how to draw the graphs? im so confused

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