Consider the graph of the function $f$ which is continuous for $x \in[-6.5,7]$. **With the graph as an aid, answer the questions below.**  $f(-4)$ is called a(n) [[☃ dropdown 1]] because $-4$ is in the open interval $I=(-6,-2)$ and $f(-4)\le f(x)$ for all $x\in I$. $f(-2)$ is called a(n) [[☃ dropdown 2]] because $-2$ is in the open interval $I=(-4,0)$ and $f(-2)\ge f(x)$ for all $x\in I$. $f(0)$ is called a(n) [[☃ dropdown 3]] because $0$ is in the open interval $I=(-2,2)$ and $f(0)\le f(x)$ for all $x\in I$. $f(-4)$ is called **the** [[☃ dropdown 4]] because $-4$ is in the **closed** interval $I=[-6.5,7]$ and $f(-4)\le f(x)$ for all $x\in I$. $f(5)$ is called **the** [[☃ dropdown 5]] because $5$ is in the **closed** interval $I=[-6.5,7]$ and $f(5)\ge f(x)$ for all $x\in I$.