5. Consider the function f(x, y) = x²|y]. Then (i) Check if f satisfies a Lipschitz condition on the rectangle |2| < 1, lyl < 1. (ii) Show that af/ay fails to exist at many points of the rectangle. (iii) What is your conclusion about the existence of solution for the IVP

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4. Consider the following problem: du sin do 1 d + 6u = 0, u(0) = 1. sin ø dø Find the solution which should be bounded as o → nn for all n. (You may think of the substitution x = cos ø.) 5. Consider the function f(x, y) = x²|y|. Then (i) Check if f satisfies a Lipschitz condition on the rectangle |x| < 1, \y| < 1. (ii) Show that df/dy fails to exist at many points of the rectangle. (iii) What is your conclusion about the existence of solution for the IVP y' = x²|y\, y(0) = 1/2?