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BBy Bot
Nov 03'24

Exercise

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Assume that [math]a \gt 1[/math].

  • lab{5.4.11a} Using the definition of [math]a^x[/math], show that
    [[math]] \lim_{x\goesto\infty} a^x = \infty . [[/math]]
  • lab{5.4.11b} Using the result of \ref{ex5.4.11a}, prove that
    [[math]] \lim_{x\goesto-\infty} a^x = 0 . [[/math]]
  • lab{5.4.11c} Using \ref{ex5.4.11a}, show that
    [[math]] \lim_{x\goesto\infty} \frac{d}{dx} a^x = \infty . [[/math]]
  • lab{5.4.11d} Using \ref{ex5.4.11b}, show that
    [[math]] \lim_{x\goesto-\infty} \frac{d}{dx} a^x = 0 . [[/math]]
  • What do \ref{ex5.4.11a}, \ref{ex5.4.11b}, \ref{ex5.4.11c}, and \ref{ex5.4.11d} say geometrically about the graph of the function [math]a^x[/math]?