QUESTION IMAGE
Question
final milestone
consider the function $f(x) = -x^2 - 4x + 5$.
use it to find $f(2)$, $f(-3)$, and $f(a - 4)$.
$f(2)= - 7$
$f(-3)=8$
$f(a - 4)= - a^2+4a+5$
$f(2)= - 7$
$f(-3)=2$
$f(a - 4)= - a^2-4a+41$
$f(2)= - 7$
$f(-3)=8$
$f(a - 4)= - a^2+4a-15$
$f(2)= - 7$
$f(-3)=26$
Step1: Calculate $f(2)$
Substitute $x=2$ into $f(x)$:
$$\begin{align*}
f(2)&=-(2)^2 -4(2)+5\\
&=-4-8+5\\
&=-7
\end{align*}$$
Step2: Calculate $f(-3)$
Substitute $x=-3$ into $f(x)$:
$$\begin{align*}
f(-3)&=-(-3)^2 -4(-3)+5\\
&=-9+12+5\\
&=8
\end{align*}$$
Step3: Calculate $f(a-4)$
Substitute $x=a-4$ into $f(x)$:
$$\begin{align*}
f(a-4)&=-(a-4)^2 -4(a-4)+5\\
&=-(a^2-8a+16)-4a+16+5\\
&=-a^2+8a-16-4a+21\\
&=-a^2+4a+5
\end{align*}$$
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A. $f(2) = - 7$, $f(-3) = 8$, $f(a - 4) = -a^2 + 4a + 5$