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Answer to Question #244106 in Real Analysis for saduni

Question #244106

Let 𝑓 be differentiable. Show that if lim(π‘₯β†’βˆž) 𝑓(π‘₯) = 𝐿 ∈ ℝ then lim(π‘₯β†’βˆž) 𝑓 β€² (π‘₯) = 0. Provided that the latter limit is existing. Give an example where the converse is not true. Also give an example for which the limit of 𝑓 β€² is not existing even though the limit of 𝑓 is the same as given


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