Answer:
After 2 seconds
Step-by-step explanation:
First step is find an equation of velocity:
h(t)=-16t2+64t+112. The velocity function is derivated from position function, so we should do that.
v(t)= h´(t)= -16*2*t+64 ⇒ v(t)= -32t+64.
Now we know the arrow reach the maximun height when this velocity is equal to zero when t>0.
0=-32t+64 ⇒ 32t=64, split each member for 32 ⇒ [tex]\frac{32t}{32}[/tex]=[tex]\frac{64}{32}[/tex]
t=2. That means after 2 sec. the arrow reach the maximum height
Answer:
The arrow reach it maximum height after 2 seconds.
Step-by-step explanation:
Chris shoots an arrow up into the air. The height (in feet) of the arrow is given by the function
[tex]h(t)=-16t^2+64t+112[/tex]
where t is the time in seconds.
In the given quadratic function, the leading coefficient is negative. It means it is a downward parabola. Vertex of a downward parabola is the point of maxima.
If a parabola is defined by [tex]f(x)=ax^2+bx+c[/tex], then the vertex of the parabola is
[tex]Vertex=(\dfrac{-b}{2a},f(\dfrac{-b}{2a}))[/tex]
In the given function [tex]a=-16,b=24, c=112[/tex].
[tex]\dfrac{-b}{2a}=\dfrac{-(64)}{2(-16)}=2[/tex]
x-coordinate of vertex is 2. It means the arrow reach it maximum height after 2 seconds.
Substitute t=2 in the given function.
[tex]h(2)=-16(2)^2+64(2)+112=176[/tex]
After 2 seconds the maximum height of the arrow is 176.
