(b) Taking as given the fact limoe-1/* = 0 for all n € N, prove that for any polynomial function q(x) q(x)e-1/2 = 0 n explaining the use of limit laws and the given assumption. (Don't do an e-d proof.) lim 2-0 (c) Explain why this can be used to show that 7(0) = 0, for ğ: R→ R given by {a(z) (g(x) x>0 x≤ 0. g(x)= =

Solve all parts

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(b) Taking as given the fact limoe-1/* = 0 for all n € N, prove that for any polynomial function q(x) q(x)e-1/2 = 0 lim 2-0 2n explaining the use of limit laws and the given assumption. (Don't do an e-d proof.) (c) Explain why this can be used to show that g'(0) = 0, for ğ: R→ R given by {a(z) (g(x) x>0 x≤ 0. g(x)= =

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The following question deals with my favourite function. (a) Prove that for all k € N, and for an arbitrary polynomial function p(x), the derivative of the function g: (0, ∞) → R given by g(x) = P(x)e-1/x xk is again a function of the same form.