Answer:
t=7.14s
v=-69.972 m/s
Explanation:
Position function
[tex]s(t)=-4.9*t^{2}+250[/tex]
Velocity is the derivative of position function
[tex]V(t)=\frac{dx}{dt}\\V(t)=-2*4.9*t\\V(t)=-9.8*t[/tex]
The time the object hit the ground can be find by the given function know that the position is going to be 0m
[tex]s(t)=-4.9*t^{2}+250[/tex]
[tex]s(t)=0\\0=-4.9*t^{2} +250\\t=\sqrt{\frac{250}{4.9}}\\t=7.14s[/tex]
Check:
[tex]s(7.14)=-4.9*(7.14s)^{2}+250\\ s(7.14)=-250+250\\s(7.14)=0m[/tex]
So the velocity can be find using the time discovery before and using the same function but with the derivate
[tex]V(t)=-2*4.9*t\\V(7.14)=-2*4.9*(7.14)\\V(7.14)=-69.972 \frac{m}{s}[/tex]
The velocity is negative because the object is moving downward
