Answer : The standard entropy change is, -424.1 J/K
Explanation :
The given balanced reaction is,
[tex]CO_2(g)+2NH_3(g)\rightarrow CO(NH_2)_2(s)+H_2O(l)[/tex]
The expression used for entropy change of reaction [tex](\Delta S^o)[/tex] is:
[tex]\Delta S^o=S_{product}-S_{reactant}[/tex]
[tex]\Delta S^o=[n_{CO(NH_2)_2}\times \Delta S^0_{(CO(NH_2)_2)}+n_{H_2O}\times \Delta S^0_{(H_2O)}]-[n_{CO_2}\times \Delta S^0_{(CO_2)}+n_{NH_3}\times \Delta S^0_{(NH_3)}][/tex]
where,
[tex]\Delta S^o[/tex] = entropy change of reaction = ?
n = number of moles
[tex]\Delta S^0[/tex] = standard entropy change
[tex]\Delta S^0_{(CO(NH_2)_2)}[/tex] = 104.6 J/mol.K
[tex]\Delta S^0_{(H_2O)}[/tex] = 69.91 J/mol.K
[tex]\Delta S^0_{(CO_2)}[/tex] = 213.74 J/mol.K
[tex]\Delta S^0_{(NH_3)}[/tex] = 192.45 J/mol.K
Now put all the given values in this expression, we get:
[tex]\Delta S^o=[1mole\times (104.6J/K.mole)+1mole\times (69.91J/K.mole)}]-[1mole\times (213.74J/K.mole)+2mole\times (192.45J/K.mole)][/tex]
[tex]\Delta S^o=-424.1J/K[/tex]
Therefore, the standard entropy change is, -424.1 J/K
