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Question 13.10.2: Calculate the equilibrium oxygen content of an Fe–C–O alloy ...

Calculate the equilibrium oxygen content of an Fe–C–O alloy which, at 1600°C, contains 1 wt% C and is under a pressure of 1 atm of CO.

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For C_{(gr)}+‰ O_{2(g)}=CO_{(g)},   \Delta G^\circ =-111,700-87.65TJ

For C_{(gr)}=C_{(1  wt\%  in  Fe)},   \Delta G^\circ =22,600-42.26TJ

For ½O_{2(g)}=O_{(1  wt\%  in  Fe)},   \Delta G^\circ =-111,300-6.41TJ

Thus, for

C_{(1  wt\%)}+O_{(1  wt\%)}=CO_{(g)},   \Delta G^\circ =-23,000-38.98TJ

Therefore,

\Delta G^\circ _{1873  K}=-96,010  J

and

\frac{p_{CO}}{h_{C}h_{O}}=476

Thus,

h_{C}h_{O}=f_{C}[wt\%  C]f_O[wt\%  O]=2.1\times 10^{-3}p_{CO}

At 1600°C,

e^{C}_{C}=0.22

 

e^{O}_{O}=-0.2

 

e^{O}_{C}=-0.097

 

e^{C}_{O}=-0.13

Thus, for 1 wt% C and  p_{CO}=1  atm,

\log [wt\%  O]-0.297[wt\%  O]=-2.768

solution of which gives [wt% O] = 0.00171. If all of the interaction parameters had been ignored, the weight percentage of O would have been calculated as 0.00210.

 

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