the height, h (in feet) of a model rocket launched from the roof of a building at t seconds is given by h = s(t)= - 16(t + 2)(t - 6)
a. expand s(t)= - 16(t + 2)(t - 6) to write it in the form s(t)=at^2 + bt + c.
s(t)= - 16t^2+64t + 192
b. what is the height of the rocket at t = 0?
the inital height is feet

Question

the height, h (in feet) of a model rocket launched from the roof of a building at t seconds is given by h = s(t)= - 16(t + 2)(t - 6)
a. expand s(t)= - 16(t + 2)(t - 6) to write it in the form s(t)=at^2 + bt + c.
s(t)= - 16t^2+64t + 192
b. what is the height of the rocket at t = 0?
the inital height is  feet

Accepted Answer

# Explanation:
## Step1: Expand the expression
First, expand $(t + 2)(t - 6)$ using FOIL method: $(t+2)(t - 6)=t^{2}-6t + 2t-12=t^{2}-4t - 12$. Then multiply by - 16: $s(t)=-16(t^{2}-4t - 12)=-16t^{2}+64t + 192$.
## Step2: Find the initial height
Substitute $t = 0$ into $s(t)=-16t^{2}+64t + 192$. We get $s(0)=-16\times0^{2}+64\times0 + 192=192$.
# Answer:
b. 192

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Explanation:

Step1: Expand the expression

Step2: Find the initial height

Answer: