Answer:
7.72 Liters
Explanation:
normal body temperature = T_body =37° C
temperature of ice water = T_ice =0°c
specfic heat of water = c_{water} =4186J/kg.°C
if the person drink 1 liter of cold water mass of water is = m = 1.0kg
heat lost by body is Qwater =mc_{water} ΔT
= mc{water} ( T_ice - T_body)
= 1.0×4186× (0 -37)
= -154.882 ×10^3 J
here negative sign indicates the energy lost by body in metabolic process energy expended due to brisk - hour long walk is Q_{walk} = 286 kilocalories
= 286×4186J
so number of liters of ice water have to drink is
n×Q_{water} =Q_{walk} n= Q_{walk}/ Q_{water}
= 286×4186J/154.882×10^3 J
= 7.72 Liters
Answer:
[tex]V=7.73\ L[/tex]
Explanation:
Given:
Initial temperature of water, [tex]T_i=0^{\circ}C[/tex]
final temperature of water, [tex]T_f=37^{\circ}C[/tex]
energy spent in one hour of walk, [tex]286\ kilocal=(286\times 4186)\ J[/tex]
volumetric capacity of stomach, [tex]V=1\ L[/tex]
Now, let m be the mass of water at zero degree Celsius to be drank to spend 286 kilo-calories of energy.
[tex]\therefore Q=m.c_w.\Delta T[/tex] .....................................(1)
where:
m = mass of water
Q = heat energy
[tex]c_w=4186\ J\ (specific\ heat\ of\ water)[/tex]
[tex]\Delta T[/tex]= temperature difference
Putting values in the eq. (1):
[tex]286\times 4186=m\times 4186\times 37[/tex]
[tex]m=7.73\ kg[/tex]
Since water has a density of 1 kilogram per liter, therefore the volume of water will be:
[tex]V=7.73\ L[/tex]
