question 1 - 1 point\nthe position in feet of an object moving in a straight line after t seconds is given…

question 1 - 1 point\nthe position in feet of an object moving in a straight line after t seconds is given by s(t)= - 4t^2 - 4. find its instantaneous velocity at t = 1 second.\nprovide your answer below:\nv(1)=□
Answer
Explanation:
Step1: Recall velocity - position relation
The velocity function $v(t)$ is the derivative of the position function $s(t)$. Given $s(t)=-4t^{2}-4$, we use the power - rule for differentiation. The power - rule states that if $y = ax^{n}$, then $y^\prime=anx^{n - 1}$.
Step2: Differentiate $s(t)$
For $s(t)=-4t^{2}-4$, the derivative of $-4t^{2}$ is $-4\times2t=-8t$ (using the power - rule with $a=-4$ and $n = 2$), and the derivative of the constant $-4$ is $0$. So, $v(t)=s^\prime(t)=-8t$.
Step3: Evaluate $v(t)$ at $t = 1$
Substitute $t = 1$ into $v(t)$. We get $v(1)=-8\times1=-8$.
Answer:
$-8$