(a) Show that for arbitrary a yen 0, y ' y has infinitely many solutions that can be written y(t) e(t a) (b) Show that for arbitrary a yen 0, the IVP s ' 2S, s(0) 0, has infinitely many solutions (c) Sketch the similar graphs of the two families in (a) and (b) Explain in terms of uniqueness where and why they differ if t

Question: (a) Show that for arbitrary a ¥ 0, y' = y has infinitely many solutions that can be written y(t) = e(t-a) (b) Show that

(a) Show that for arbitrary a ‰¥ 0, y' = y has infinitely many solutions that can be written
y(t) = e(t-a)
(b) Show that for arbitrary a ‰¥ 0, the IVP s' = 2ˆšS, s(0) = 0, has infinitely many solutions

(c) Sketch the similar graphs of the two families in (a) and (b). Explain in terms of uniqueness where and why they differ.

if t

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