Respuesta :
Answer:
a) I = 270.18 Kg*m/s
b) F = -3216.42N
Explanation:
a) We know that:
I = [tex]P_f -P_i[/tex]
Where I is the impulse, [tex]P_f[/tex] is the final momentum and [tex]P_i[/tex] the initial momentum.
so:
I = [tex]MV_f -MV_i[/tex]
where M is the mass, [tex]V_f[/tex] is the final velocity and [tex]V_i[/tex] is the initial velocity.
First we have to find the [tex]V_i[/tex]. So, using the conservation of energy.
[tex]Mgh = \frac{1}{2}MV_i^2[/tex]
where g the gravity and h the altitude. Replacing values, we get:
[tex](79kg)(9.8m/s)(0.6m) = \frac{1}{2}(79kg)V_i^2[/tex]
solving for [tex]V_i[/tex]:
[tex]V_i[/tex]= 3.42 m/s
Now, replacing in the previus equation:
I = [tex]MV_f -MV_i[/tex]
I = [tex](79kg)(0)-(79kg)(3.42m/s)[/tex]
I = -270.18 Kg*m/s
The impulse is negative becuase it is upward.
b) We know that:
Ft = I
where F is the force, t the time and I the impulse.
so, replacing values and solving for F, we get:
F(0.084s) = -270.18 Kg*m/s
F = -3216.42N
The force is negative becuase it is upward.
