5.06 Comparing linear and exponential functions
Interactive practice questions
Consider the two functions shown in the graph below:
State the negative interval(s) of function $f$f, using inequality notation.
State the negative interval(s) of function $g$g, using inequality notation.
Fill in the blanks to describe the end behavior of function $f$f:
As $x\to\infty$x→∞, $f\left(x\right)\to$f(x)→$\editable{}$
As $x\to-\infty$x→−∞, $f\left(x\right)\to$f(x)→$\editable{}$
Fill in the blanks to describe the end behavior of function $g$g:
As $x\to\infty$x→∞, $g\left(x\right)\to$g(x)→$\editable{}$
As $x\to-\infty$x→−∞, $g\left(x\right)\to$g(x)→$\editable{}$
Determine whether each function is linear or nonlinear.
$f$f is a linear function, while $g$g is a nonlinear function
$f$f is a nonlinear function, while $g$g is a linear function
Both functions are linear
Both functions are nonlinear
Consider the two functions shown in the graph below:
Function $f$f is given by the equation $f\left(x\right)=2x-0.4$f(x)=2x−0.4. Function $g$g is shown in the graph below.
Function $f$f is given by the equation $f\left(x\right)=-4$f(x)=−4. Function $g$g is shown in the graph below.