Let a e R and let H(x) be a function defined in a deleted neighbor- hood of a and satisfying lim, H(x) = LER. Let (,) be a sequence in dom(H) such that lim, In = a. Note that this implies in particular that a, + a for all n. Show that lim,» H(x,)= L.

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Question 16: Let a e R and let H(x) be a function defined in a deleted neighbor- hood of a and satisfying lim, , H(x) = LE R. Let (r,) be a sequence in dom(H) such that lim, In = a. Note that this implies in particular that an + a for all n. Show that lim, H(r„) = L. Question 17: Let J: (0, 1] R be a continuous function that does not take on any of its values twice. Suppose also that f(x) > f(0) for all z € (0, 1]. Show that f is strictly increasing on [0, 1].