Chemistry 232

Chemistry 232 Electrochemistry Notes

Electrochemical Cells • Galvanic cells – • an electrochemical cell that drives electrons through an external circuit • spontaneous redox reaction occurring inside cell. • The Zn/Cu Galvanic Cell • half-reactions Cu2+ (aq) + 2 e- Cu (s) (cathode, RHS) Zn2+ (aq) + 2 e- Zn (s) (anode, LHS)

A Schematic Galvanic Cell e- Porous Disk e- e- Reducing Agent Oxidizing Agent Anode Cathode

The Zinc/Copper galvanic cell. 1.10 V e- e- Porous Disk or Salt Bridge Cu(s) Zn(s) e- e- a(Zn2+) = 1.00 a(Cu2+) = 1.00 Anode Cathode

Cell Reactions • The difference in the RHS and the LHS reaction Cu2+ (aq) + Zn (s)  Cu (s) + Zn2+ (aq) • For each half reaction, we can write the reaction quotient as follows Cu2+ (aq) + 2 e- Cu (s) Q = 1/ a(Cu2+) Zn2+ (aq) + 2 e- Zn (s) Q = 1/ a(Zn2+) Overall  Qcell = a(Zn2+) / a(Cu2+)

Pt Cu (s) Cu2+ (aq) Zn2+ (aq) Zn (s) Pt Note phase boundary liquid junction salt bridges Cell Diagrams • A shorthand way of expressing what takes place in an electrochemical cell. • For the above electrochemical cell.

Pt H2 (g) H+ (aq) Cu2+ (aq) Cu (s) Pt Another Example • The cell reaction H2 (g) + Cu2+ (aq)  2 H+ (aq) + Cu (s) • Electrochemical cells • a cell that has not reached equilibrium can do electrical work by driving electrons through an external wire.

Reversible Electrochemical Cells • In order for us to make measurements on an electrochemical cell, it must be operating reversibly. • Place an opposing source of potential in the external circuit • Cell operates reversibly and at a constant composition. we,max = G

The Measurement of Cell Potentials • Measure the potential of an electrochemical cell when the cell is at equilibrium, i.e., the state between the galvanic and the electrolytic cell. Counter potential (load) e- Porous Disk e- e- Reducing Agent Oxidizing Agent Anode Cathode

Derivation of the Nernst Equation • Consider an electrochemical cell that approaches the equilibrium state by an infinitesimal amount d Reminder

The Work in Transporting Charge • The maximum work • For the passage d electrons from the anode (LHS) to the cathode (RHS) F = Faraday’s constant = e NA = 96485 C/mole

The Cell Potential • The work to transport charge

Standard Cell Potentials • From the reaction Gibbs energy We define

The Nernst Equation • E represents the standard cell potential, the potential of the cell when all cell components are under standard conditions. • f (all gases) = 1 • a (solutes) = 1 • T = 298.15 K • P = 1.00 bar pressure

Cells at Equilibrium • When the electrochemical cell has reached equilibrium Kcell = the equilibrium constant for the cell reaction. Knowing the E° value for the cell, we can estimate the equilibrium constant for the cell reaction.

Pt Sn2+ (aq), Sn4+ (aq) Fe3+ (aq) Fe2+ (aq) Pt Equilibrium Constant Calculations from Cell Potentials • Examine the following cell. • Half-cell reactions. Sn4+ (aq) + 2 e- Sn2+ (aq) E(Sn4+/Sn2+) = 0.15 V Fe3+ (aq) + e- Fe2+ (aq) E (Fe3+/Fe2+) = 0.771 V • Cell Reaction Sn2+ (aq) + 2 Fe3+ (aq)  Sn4+ (aq) + 2 Fe2+ (aq) Ecell = (0.771 - 0.15 V) = 0.62 V

Standard Reduction Potentials • Standard reduction potentials are intensive properties. • We cannot measure the potential of an individual half-cell! • We assign a particular cell as being our reference cell • Assign values to other electrodes on that basis.

The Standard Hydrogen Electrode • Eo (H+/H2) half-cell = 0.000 V e- f{H2(g)} = 1.00 H2 (g) a (H+) = 1.00 Pt gauze

A Galvanic Cell With Zinc and the Standard Hydrogen Electrode. 0.763 V e- e- Porous Disk or Salt Bridge Zn(s) H2 (g) Pt gauze a (H+) = 1.00 a(Zn2+) = 1.00 Source of H+ (e.g., HCl (aq), H2SO4 (aq)) Zn2+, SO42- Anode Cathode

Pt Zn (s) Zn2+ (aq),a=1 H+ (aq), a=1 H2 (g), f=1 Pt The Cell Equation for the Zinc-Standard Hydrogen Electrode. • The cell reaction 2 H+ (aq) + Zn (s)  H2 (g) + Zn2+ (aq) • When we measure the potential of this cell Ecell = ERHS - ELHS but ERHS = E(H+/H2) = 0.000 V  Ecell = E(Zn2+/Zn) = 0.763 V

The Spontaneous Direction of a Cell Reaction • Examine the magnitude the of the standard cell potential! • If the standard cell potential is positive, the rG is negative!

The Composition Dependence of the Cell Potential • Nonstandard cell potential (Ecell) will be a function of the activities of the species in the cell reaction. • To calculate Ecell, we must know the cell reaction and the value of Qcell.

Pt H2 (g) H+ (aq) Cu2+ (aq) Cu (s) Pt Example • For the following system • Calculate the value of the cell potential when the f (H2) = 0.50, a(Cu2+) = 0.20, and a(H+) = 0.40.

Concentration Cells • Electrolyte concentration cell • the electrodes are identical; they simply differ in the concentration of electrolyte in the half-cells.

Concentration Cells (II) • Electrode concentration cells • the electrodes themselves have different compositions. This may be due to. • Different fugacities of gases involved in electrode reactions (e.g., The H+ (aq)/H2 (g) electrode). • Different compositions of metal amalgams in electrode materials.

Applications of Electrochemistry • Measurement of activities and activity coefficients. • Electrochemical series. • Equilibrium constants and thermodynamic functions of cell reactions

Pt H2 (g) HCl (aq) AgCl (s) Ag (s) Pt Obtaining Standard Cell Potentials • Look at the following cell Ecell = E(AgCl/Ag) - E (H+/H2) = E(AgCl/Ag)

Ecell Values and Activity Coefficients • In dilute solution, using the DHLL Plot LHS vs. m1/2 • Once Ecell is known, we can obtain experimental estimates of the mean activity coefficients.

The Calculation of Standard Cell Potentials

Electrochemical Series • Look at the following series of reactions Cu2+ (aq) + 2 e- Cu (s) E(Cu2+/Cu) = 0.337 V Zn2+ (aq) + 2 e- Zn (s) E(Zn2+/Zn) = -0.763 V • Zn has a thermodynamic tendency to reduce Cu2+ (aq) Pb2+ (aq) + 2 e- Pb (s) E(Pb2+/Pb) = -0.13 V Fe2+ (aq) + 2 e- Fe (s) E(-Fe2+/Fe) = -0.44 V • Fe has a thermodynamic tendency to reduce Pb2+ (aq)

Thermodynamic Information • Note • And

Entropy Changes • To obtain the entropy change for the cell reaction

Enthalpy Changes • To obtain the enthalpy change for the cell reaction

The Liquid Junction Potential • Examine the following electrochemical cell • Activity difference of the HCl between compartment 1 and compartment 2 • There should be a transport of matter from one cell compartment to the other!

A Concentration Cell 0.0592V e- e- Porous Disk or Salt Bridge Ag(s) Ag(s) a(Cl-) = 0.010 a (Cl -) = 0.0010 Left Right

HCl (a2) HCl (a1) Ag/AgCl electrode The Development of Liquid Junction Potentials • The cell compartments are identical except for the activities of the electrolyte solutions.

H+ Cl- Ag/AgCl electrode • Note that we now have the migration of both cations and anions through the liquid junction.

----------- + + + + + - - - - - Ag/AgCl electrode • After a period of time

Ag AgCl Cl- (aq) a1Cl- (aq), a2AgCl (s) Ag (s) Note: liquid junction • Choose the lower compartment as our LHS electrode. • For the passage of one mole of charge through the cell -F Ecell =  GJ

The Cell Reactions • For the LHS and RHS electrodes AgCl (s) + e-  Ag (s) + Cl- (a1) LHS AgCl (s) + e-  Ag (s) + Cl- (a2) RHS • Net change Cl- (a1)  Cl- (a2) • Note that the charge at the interface is transported by the anions and cations in the cell reaction!

The Transport Numbers • How is the charge carried at the interface of the cells? • t+ moles of charge carried by the H+ (cation). • t- moles of charge carried by the Cl- (anion). • Passage of one mole of “+” charge through the interface • requires the passage of t+ moles of H+ (aq)from the LHS  RHS, and the passage of t- mole of Cl- charge from the RHS  LHS.

At the boundary t+ H+(a1) + t- Cl-(a2)  t+ H+(a2) + t- Cl-(a1) • For the entire cell Cl- (a1) t+ H+(a1) + t- Cl-(a2)  Cl- (a2) t+ H+(a2) + t- Cl-(a1) • The cell reaction involves the transport of t+ moles of HCl from the LHS to the RHs of the cell.

The Gibbs Energy Changes • For the above cell reaction, we can write the Gibbs energy expressions as follows

Cells With Transference • Note a(H+) a (Cl-) = {a (HCl)}2 Note that the cell potential with transference, Ewt is determined as follows

Cells without Transference • What if we were able to set up a cell so that the transport at the interface did not contribute to the overall G? • The potential of this cell would be the cell potential without transference, Ewot. Cl- (a1)  Cl- (a2)

The Liquid Junction Potential • The liquid junction potential is the difference in the cell potentials with and without transference!

L.J. Potentials Depend on Transport Numbers • What is the following were true? • t+  t-  0.5  ELJ would be very small and would only make a small contribution to the overall cell potential !

L.J. Potentials Depend on Transport Numbers • ELJ a potential problem any time we measure the cell potential whose electrodes have different electrolytes • How does the salt bridge help? • e.g., for species with t+  t-  0.5, the ELJ values are small and are readily established!

Chemistry 232

Chemistry 232

Presentation Transcript

Chemistry 232

Chemistry 232

Chemistry 232

Chemistry 232

Chemistry 232

Chemistry 232

Chemistry 232

Chemistry 232

Chemistry 232

Chemistry 232

Chemistry 232

CHEM 232 Inorganic Chemistry II (Spring 2006)

Chemistry 232

HM 232

Chemistry 232

HM-232

CS 232

500-232

ME 232

RS-232 Communications

Урок 232