Answer:
Maximum height=9.8 ft and Time taken by soccer ball will be 0.8 secs
Step-by-step explanation:
Since, the ball kicked will take the motion of projectile, therefore using the equation: h(t)= [tex]at^{2} +vt+d[/tex], where h(t) is the height of the soccer ball, a is the acceleration whose value is -16 ft/sec^2 and v= 35 feet and d is the starting height which is equal to zero.
Therefore, h(t)=[tex]at^{2} +vt+d[/tex] (1)
Differentiating this equation with respect to t,
[tex]h^{'}(t)[/tex]= [tex]2at+v[/tex]
[tex]0[/tex] =[tex]2(-16)t+25[/tex]
[tex]32t[/tex]=[tex]25[/tex]
[tex]t= 0.781sec[/tex]
Substituting the value of t in equation (1),
[tex]h(t)=-16(0.781)^{2} +25(0.781)[/tex]
=[tex](-16)(0.609)+19.525[/tex]
=[tex]9.766[/tex]
≈9.8ft
Hence, option C is correct.
Now, In order to determine the time taken until the soccer ball hits the ground, we take the equation:
[tex]h(t)= at^{2} +vt+d[/tex]
Since, when the ball hits the ground, the height will become equal to zero, therefore we have, h(t)=0
Now, [tex]h(t)= at^{2} +vt+d[/tex]
[tex]0= -32.174t^{2} +25t[/tex]
[tex]0=t(-32.174t+25)[/tex]
Then, one solution is t=0 and the other is: [tex]0=-32.174t+25[/tex]
[tex]32t=25[/tex]
[tex]t=\frac{25}{32.174}[/tex]
[tex]t=0.777 sec[/tex]
[tex]t[/tex]≈[tex]0.8 sec[/tex]
Hence, option B is correct.
