For #A + B rightleftharpoons C#, the #DeltaG_f^@# are #"402.0 kJ/mol"#, #"387.7 kJ/mol"#, and #"500.8 kJ/mol"#, respectively. What is #DeltaG_(rxn)^@#? If both entropy and enthalpy changes are positive for this reaction at #25^@ "C"#, which one drives it?
1 Answer
See the explanation below...
As with many other thermodynamic functions, they can be added together because they are extensive. This forms the basis for:
#DeltaG_(rxn)^@ = sum_(P) nu_P Delta_fG_(P)^@ - sum_(R) nu_R Delta_fG_(R)^@# ,where:
#Delta_fG^@# is the change in Gibbs' free energy due to forming the substance from its elements in their standard states. This is the Gibbs' free energy of formation.#nu# is the stoichiometric coefficient.#P# and#R# stand for product and reactant, respectively.- Standard conditions here are defined to be
#"298.15 K"# and#"1 bar"# . Check your book to see if you still use#"1 atm"# .
This gives for
#1A + 1B rightleftharpoons 1C# ,
#DeltaG_(rxn)^@#
#= overbrace((1cdot402.0))^"Products" - overbrace((1cdot387.7 + 1cdot500.8))^"Reactants"# #"kJ/mol"#
#= ???#
You should have one decimal place.
Regardless of the magnitude of
But if
#DeltaG_(rxn)^@ = DeltaH_(rxn)^@ - TDeltaS_(rxn)^@#
#= (+) - (+)(+) = (+) - (+')#
That is, if
The spontaneous reaction is driven by the remainder of the equation that is negative when one term goes to zero, i.e.
#color(blue)(ul(DeltaG_(rxn)^@)) = (0) - (+)(+) color(blue)(ul(< 0))# when#DeltaH_(rxn)^@ = 0#
#color(red)(ul(DeltaG_(rxn)^@)) = (+) - (+)(0) color(red)(ul(> 0))# when#DeltaS_(rxn)^@ = 0#
One can see that if
So, the entropy drives the spontaneous (i.e. FORWARD) reaction at
