Respuesta :
Answer: The amount of heat released is -603. kJ
Explanation:
Enthalpy change is defined as the difference in enthalpies of all the product and the reactants each multiplied with their respective number of moles.
The equation used to calculate enthalpy change is of a reaction is:
[tex]\Delta H^o_{rxn}=\sum [n\times \Delta H_f_{(product)}]-\sum [n\times \Delta H_f_{(reactant)}][/tex]
The chemical equation for the combustion of propane follows:
[tex]C_3H_8(g)+5O_2(g)\rightarrow 3CO_2(g)+4H_2O(g)[/tex]
The equation for the enthalpy change of the above reaction is:
[tex]\Delta H_{rxn}=[(3\times \Delta H_f_{(CO_2(g))})+(4\times \Delta H_f_{(H_2O(g))})]-[(1\times \Delta H_f_{(C_3H_8(g))})+(5\times \Delta H_f_{(O_2(g))})][/tex]
We are given:
[tex]\Delta H_f_{(H_2O(g))}=-241.82kJ/mol\\\Delta H_f_{(CO_2(g))}=-393.51kJ/mol\\\Delta H_f_{(C_3H_8(g))}=-103.8kJ/mol\\\Delta H_f_{(O_2(g))}=0kJ/mol[/tex]
Putting values in above equation, we get:
[tex]\Delta H_{rxn}=[(3\times (-393.51))+(4\times (-241.82))]-[(1\times (-103.8))+(3\times (0))]\\\\\Delta H_{rxn}=-2044.01kJ/mol[/tex]
To calculate the number of moles, we use the equation:
[tex]\text{Number of moles}=\frac{\text{Given mass}}{\text{Molar mass}}[/tex]
Given mass of propane = 13.0 g
Molar mass of propane = 44 g/mol
Putting values in above equation, we get:
[tex]\text{Moles of propane}=\frac{13g}{44g/mol}=0.295mol[/tex]
To calculate the enthalpy change of the reaction, we use the equation:
[tex]\Delta H_{rxn}=\frac{q}{n}[/tex]
where,
q = amount of heat released = ?
n = number of moles of propane = 0.295 moles
[tex]\Delta H_{rxn}[/tex] = enthalpy change of the reaction = -2044.01 kJ/mol
Putting values in above equation, we get:
[tex]-2044.01kJ/mol=\frac{q}{0.295mol}\\\\q=(-2044.01kJ/mol\times 0.295mol)=-602.98kJ[/tex]
Hence, the amount of heat released is -603. kJ
