Navigation

• Home
• News
• Research
• Papers
• People
• Outreach
• Laboratory
• Books
• Media
• Contact
• Answers to problems in "Electrode Potentials"
• Translate Home Page into Chinese
• Translate Home Page into German
• Translate Home Page into Hebrew
• Translate Home Page into Portuguese
• Translate Home Page into Russian
• Translate Home Page into Thai
• Translate Home Page into Spanish
• Translate Home Page into Indonesian
• Translate Home Page into Bulgarian
• Translate Home Page into Italian
• Translate Home Page into Arabic
• Translate Home Page into Hindi
• Part II Projects

Links

• Current Opinion in Electrochemistry
• Electrochemistry Communications
• International Society of Electrochemistry
• ISE Tutorial Talks. Bologna 2018 - simulation of electrode process

Academic Collaborators

• Young Group, Oxford Materials (U.K.)
• Donohoe Group, Oxford Organic Chemistry (U.K.)
• Del Campo Group (Spain)
• Hardacre Group (U.K.)
• Mirčeski Group (Macedonia)
• Molina Group (Spain)

Industrial Collaborators

• Schlumberger (U.K.)
• Tomanal (Russia)
• Zimmer and Peacock (Norway)
• Honeywell Analytics (Worldwide)
• Micrux Technologies (Spain)
• Syngenta (Worldwide)

Answers to problems in "Electrode Potentials"

• Question 1
• Question 2
• Question 3
• Question 4
• Question 5
• Question 6
• Question 7
• Question 8
• Question 9
• Question 10
• Question 11
• Question 12

Question 10

The reader is advised to re-read pp. 70-72 before considering this solution.

Cell diagram:

Cd(amalgam, 4.6% Cd) | CdCl2(aq, cM) | AgCl(s) | Ag(s)

Potential determining equilibria:

RHE:	AgCl(s) + e- ⇌ Ag(s) + Cl-(aq)
LHE:	½Cd2+ + e- ⇌ ½Cd(amal)

Cell Reaction:

AgCl(s) + ½Cd(amal) ⇌ Ag(s) + ½Cd²+(aq) + Cl-(aq)

The Nernst Equation for this cell reaction is: E = E0cell - {RT/F}ln {aCl- aCd2+½}

(where the activity of cadmium in the amalgam is taken to be unity).

a_Cl^- = f_-(2c) and a_Cd²⁺ = f₊(c). Since c < 10^-2M, we can use the DHL. The ionic strength of the solution, I = ½[ 4c +2c] = 3c. Since this is the same for both Cd²⁺ and Cl^-, and since the ratio

zCd2+2/zCl-2 = 4, we can deduce that lg f+/lg f- = 4. ie., f+ = f-4. We can use this result to determine E0cell. However, it is easier and more convenient to use the mean ionic activity coefficient, f±, which is defined on p.48.

f_± ³ = f_-² f₊ = f_-⁶

Hence, f_± = f_-²

Hence, a_Cl^- = f_±(2c) = f_±[Cl^-] and a_Cd²⁺ = f_±(c) = f_±[Cd²⁺]

Therefore, E = E⁰_cell - {RT/F}ln{f_±^3/2 (2)(c)^3/2}

or,

E + {RT/F}ln{2c3/2} = E0cell - {3 RT/ 2F}ln{f±}

(*)

or, using DHL, E + {RT/F}ln{2c^3/2} = E⁰_cell - {6.909 RT A 3^1/2 / 2F} c^1/2

We plot a graph of E + {RT/F}ln{2c^3/2} against c^1/2, and extrapolate to find the ordinate intercept (ie. a value for E⁰_cell). The cell emf when a_Cd²⁺ = a_Cl^- = 1 corresponds to E_cell.

c / 10-3 mol dm-3	E / V	c1/2 / mol1/2 dm-3/2	E + {RT/F}ln{2c3/2} / V
0.1087	0.9023	0.01041	0.56861
0.1269	0.8978	0.01126	0.57007
0.2144	0.8803	0.01464	0.57277
0.3659	0.8641	0.01913	0.57715

From graph, ordinate-intercept = E⁰_cell = +0.559V

(a). E⁰_cell = E⁰_Ag|AgCl - E⁰_Cd|Cd(amal)

Therefore, E⁰_Cd|Cd(amal) = 0.2222 - 0.559 = -0.3369V

Now consider the cell:

Cd(amal, 4.6% Cd) | CdCl2(aq, 0.5M) | Cd

E = -0.0534V

For this cell, E⁰_cell = E⁰_Cd|Cd²⁺ - E⁰_{Cd²⁺|Cd(amal)}

Cell Reaction is:
Cd²⁺(aq) + Cd(amal) Cd(s) + Cd²⁺(aq)

Thus, the Nernst Equation becomes: E = E⁰_cell + {RT/ 2F} ln {a_Cd²⁺/ a_Cd²⁺}

E = E⁰_cell

Hence, E⁰_Cd|Cd²⁺ = -0.0534 + (-0.3369) = -0. 39V

Therefore, the S.E.P. for the Cd|Cd²⁺ couple is -0.39V

This result is consistent with the data supplied in Table 1.1 on p. 21.

(b). The Gibbs free energy of the formation of the hydrated ion Cd²⁺(aq) refers to the process:

Cd(s) → Cd²⁺(aq) + 2e^-

But this process corresponds to the inverse of the Cd|Cd²⁺ S.E.P.

Since DG⁰ = -nFE⁰, and this process corresponds to a two electron transfer (n = 2),

DG⁰ = -(2)(96 490)(0.3903)

DG⁰ = -75.32 kJ mol^-1

(c). Using the equation labelled with an asterix (*), we can deduce that the mean ionic activity coefficient (f_±) of 0.2144 x 10^-3 M CdCl₂ is 0.701.