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Do the following for each:
$f(x) = x+3$; label $2$ points (the $x$ and $y$-intercepts)
$f(x) = x-5$; label $2$ points (the $x$ and $y$-intercepts)
$f(x) = 2x$; label $2$ points (one of which is the $y$ intercept); does this function represent a vertical dilation or contraction?
$f(x) = \cfrac{x}{3}$; label $2$ points (one of which is the $y$-intercept)
$\displaystyle{f(x) = \left\{ \begin{array}{lll} -x & \textrm{ if } & x \gt 2\\ x & \textrm{ if } & x \le 2 \end{array} \right.}$;
Noting $2$ points (both at $x=2$, drawing one "filled-in" to indicate it's part of the domain and the other drawn "open" to indicate it's not part of the domain but there are points on the graph of $f$ that are arbitrarily close to it.)
$f(x)=x^3$; label $3$ points ($x=-1,1, \textrm{ and } 2$); state the corresponding limit fact for $\lim_{x \rightarrow -\infty} f(x)$ and $\lim_{x \rightarrow \infty} f(x)$
$f(x)=x^4$; label $3$ points ($x=-1,1, \textrm{ and } 2$); state the corresponding limit fact for $\lim_{x \rightarrow -\infty} f(x)$ and $\lim_{x \rightarrow \infty} f(x)$
$f(x)=x^5$; label $3$ points ($x=-1,1, \textrm{ and } 2$); state the corresponding limit fact for $\lim_{x \rightarrow -\infty} f(x)$ and $\lim_{x \rightarrow \infty} f(x)$
$f(x)=\sqrt[3]{x}$; label $3$ points ($x=-1,1, \textrm{ and } 8$)
$f(x)=\sqrt[4]{x}$; label $2$ points ($x=1$ and $x=16$)
$f(x)=\sqrt[5]{x}$; label $3$ points ($x=-1,1, \textrm{ and } 32$)
$f(x)=4^x$; label $3$ points (including $x=-1,0, \textrm{ and } 1$); identify any horizontal asymptotes by writing the corresponding statement involving limits.
$f(x)=(1/3)^x$; label $3$ points (including $x=-1,0, \textrm{ and } 1$); identify any horizontal asymptotes by writing the corresponding statement involving limits.
$f(x)=\log_3 x$ label $3$ points (including $x=\frac{1}{3}, 1, \textrm{ and } 3$)
$f(x)=\log_{\frac{1}{4}} x$ label $3$ points (including $x=\frac{1}{4}, 1, \textrm{ and } 4$)
Graph the following after thinking about the simpler functions that can be composed together (and the order in which they are composed) to form them. Then state the implicit domain and image/range of each.
$f(x) = 3x - 4$
$f(x) = -x^2 + 2$
$f(x) = -3|x| - 2$
$f(x) = |x^2 - 4|$
$f(x) = \cfrac{1}{x+2}$
$f(x) = |-x^3|$
$f(x) = 2^x - 1$
$f(x) = |\log_{1/2} x|$