Respuesta :
As it is given that
total mass M= 280 kg
coefficient of kinetic friction = 0.080
acceleration a =0.65 m/s2
Initial speed = 0
cruising speed v = 15 km/h.
[tex]v = 15 \frac{1000m}{3600s} = 4.166m/s[/tex]
Part (A ).
For the team's maximum power output during the acceleration phase
Net force = Ma = Applied force - fricitonal force
[tex]Ma = F - \mu Mg[/tex]
From this
[tex]F = Ma +\muMg[/tex]
[tex]F = 280(0.65+(0.08x9.8))[/tex]
[tex]F = 401.52 N[/tex]
Now we have P = Fv
[tex]P = 401.52 \times 4.166 = 1,672.7 W[/tex]
Part (B)
Now after reaching the cruising speed
acceleration = 0
[tex]F - \mu mg = 0[/tex]
[tex]F = \mu m g = 0.08 \times 280 \times 9.8[/tex]
[tex]F = 219.52 N[/tex]
now power at cruising speed is given as
[tex]P = F.v[/tex]
[tex]P = 219.52 \times 4.166 = 914.5 W[/tex]
The power output during the acceleration phase is 1.69 KW. The power output during the cursing phase is 0.932 KW.
We have to convert the velocity to m/s as follows;
15 km/h × 1000/3600 = 4.16 m/s
We know that;
Net force = Applied force - frictional force
Net force = ma = 280 kg × 0.65 m/s2 = 182 N
Applied force = ?
Frictional force = μmg = 0.080 × 280 kg × 10m/s
Frictional force = 224 N
Applied force = Net force + frictional force
Applied force = 182 N + 224 N
Applied force = 406 N
Power output during acceleration phase = 406 N × 4.16 m/s = 1.69 KW
During the cruising phase, a = 0
Hence, Net force = 0
Applied force = Frictional force = 224 N
Power output = 224 N × 4.16 m/s = 0.932 KW
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