Answer:
a) [tex]m_{w}[/tex] = 72.75 kg , b) V = 0.07275 m³ , c) ρ₂ = 1030.9 km / m³ , d) ρ₂= 996 kg / m³ float
Explanation:
This is an exercise that we must solve using the Archimedes principle, where the thrust is
B = ρ g V
a) Let's use Newton's second law
F = B - W
F = ρ g V - mg
The force is the apparent weight (m₂ = 2.25 kg) is directed downwards so it is negative
F = m₂ g
-m₂ g = ρ g V - m g
-m₂ g = [tex]m_{w}[/tex] g - mg
[tex]m_{w}[/tex] = -m₂ + m
[tex]m_{w}[/tex] = -2.25 + 75.0
[tex]m_{w}[/tex] = 72.75 kg
b) let's use the definition of density
ρ = m / V
V = m /ρ
V = 72.75 / 1000
V = 0.07275 m³
c) the density of man is
ρ₂ = m / V
ρ₂ = 75.0 / 0.07275
ρ₂ = 1030.9 km / m³
d) the volume of man increases because the lungs are full of air, as they are half full, with a capacity of 2.5 liters and two lungs the volume is
V’= ½ 2.5 2
V’= 2.5 liters
V’= 2.5 10⁻³ m³
The total volume of man is
Vt = 0.07275 + 0.0025
Vt = 0.07525
Let's calculate the density
ρ₂ = 75.0 / 0.07525
ρ₂= 996 kg / m³
As this is less than the density of water (1000 kg / m3) man must float
