Answer:
a. Time = 16.11 s
b. Gauge Pressure = 1009400 Pa = 1 MPa Ā
c. Absolute Pressure = 1110725 Pa + 1.11 MPa
d. Force = 2.22 MN
Explanation:
a.
For the accelerated part of motion of submarine we can use equations of motion.
Using 1st equation of motion:
Vf = Vi + atā
tā = (Vf - Vi)/a
where,
tā = time taken during accelerated motion = ?
Vf = final velocity = 4 m/s
Vi = Initial Velocity = 0 m/s Ā (Since, it starts from rest)
a = acceleration = 0.3 m/sĀ²
Therefore,
tā = (4 m/s - 0 m/s)/(0.3 m/sĀ²)
tā = 13.33 s
Now, using 2nd equation of motion:
dā = (Vi)(tā) + (0.5)(a)(tā)Ā²
where,
dā = the depth covered during accelerated motion
Therefore,
dā = (0 m/s)(13.33 s) + (0.5)(0.3 m/sĀ²)(13.33 s)Ā²
dā = 88.89 m
Hence,
dā = d - dā
where,
dā = depth covered during constant speed Ā motion
d = total depth = 100 m
Therefoe,
dā = 100 m - 88.89 m
dā = 11.11 m
So, for uniform motion:
sā = vtā
where,
v = constant speed = 4 m/s
tā = time taken during constant speed Ā motion
11.11 m = (4 m/s)tā
tā = 2.78 s
Therefore, total time taken by submarine to move down 100 m is:
t = tā + tā
t = 13.33 s + 2.78 s
t = 16.11 s
b.
The gauge pressure on submarine can be calculated by the formula:
Pg = Ļgh
where,
Pg = Gauge Pressure = ?
Ļ = density of salt water = 1030 kg/mĀ³
g = 9.8 m/sĀ²
h = depth = 100 m
Therefore,
Pg = (1030 kg/mĀ³)(9.8 m/sĀ²)(100 m)
Pg = 1009400 Pa = 1 MPa
c.
The absolute pressure is given as:
P = Pg + Atmospheric Pressure
where,
P = Absolute Pressure = ?
Atmospheric Pressure = 101325 Pa
Therefore,
P = 1009400 Pa + 101325 Pa
P = 1110725 Pa + 1.11 MPa
d.
Since, the force to open the door must be equal to the force applied to the door by pressure externally.
Therefore, the Ā force required to open the door can be found out by the formula of pressure:
P = F/A
F = PA
where,
P = Absolute Pressure on Door = 1110725 Pa
A = Area of door = 2 mĀ²
F = Force Required to Open the Door = ?
Therefore,
F = (1.11 MPa)(2 mĀ²)
F = 2.22 MN
