Respuesta :
This is an incomplete question, here is a complete question.
The heat of combustion of bituminous coal is 2.50 × 10² J/g. What quantity of the coal is required to produce the energy to convert 106.9 pounds of ice at 0.00 °C to steam at 100 °C?
Specific heat (ice) = 2.10 J/g°C
Specific heat (water) = 4.18 J/g°C
Heat of fusion = 333 J/g
Heat of vaporization = 2258 J/g
A) 5.84 kg
B) 0.646 kg
C) 0.811 kg
D) 4.38 kg
E) 1.46 kg
Answer : The correct option is, (A) 5.84 kg
Explanation :
The process involved in this problem are :
[tex](1):H_2O(s)(0^oC)\rightarrow H_2O(l)(0^oC)\\\\(2):H_2O(l)(0^oC)\rightarrow H_2O(l)(100^oC)\\\\(3):H_2O(l)(100^oC)\rightarrow H_2O(g)(100^oC)[/tex]
The expression used will be:
[tex]Q=[m\times \Delta H_{fusion}]+[m\times c_{p,l}\times (T_{final}-T_{initial})]+[m\times \Delta H_{vap}][/tex]
where,
[tex]Q[/tex] = heat required for the reaction = ?
m = mass of ice = 106.9 lb = 48489.024 g (1 lb = 453.592 g)
[tex]c_{p,l}[/tex] = specific heat of liquid water = [tex]4.18J/g^oC[/tex]
[tex]\Delta H_{fusion}[/tex] = enthalpy change for fusion = [tex]333J/g[/tex]
[tex]\Delta H_{vap}[/tex] = enthalpy change for vaporization = [tex]2258J/g[/tex]
Now put all the given values in the above expression, we get:
[tex]Q=145903473.2J[/tex]
Now we have to calculate the quantity of the coal required.
[tex]m=\frac{Q}{\Delta H}[/tex]
[tex]m=\frac{145903473.2J}{2.50\times 10^4J/g}[/tex]
[tex]m=5836.138929g=5.84kg[/tex] (1 g = 0.001 kg)
Thus, the quantity of the coal required is, 5.84 kg
