Freshman chemistry - Journal of Chemical Education (ACS Publications)

Chemical boot camp, 2. Journal of Chemical Education. A closer look at the king's new clothes. Journal of Chemical Education. Patterns in undergraduat...
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letters Freshman Chemistry

To the Editor: The editorial "Patterns in Undergraduate Courses," appearing in the October issue of THIS JOURNAL deserves further comment. Accordingly, the following discussion concerns the current trend in freshman textbooks. Before proceeding, I feel a brief summary of the quality of our students and my qualifications to comment on this subject is necessary. Our school is of medium size, approximately 5500, with a freshman chemistry enrollment of nearly 1200. These students have diverse high school chemistry backgrounds, but their ACT ratings indicate that they are above the national average. My experience with freshman chemistry students includes work as a graduate teaching assistant in Oklahoma and Iowa, as well as my present position in which I teach a section of the freshman course for science-oriented students. I also teach advanced inorganic chemistry and direct undergraduate and graduate research.

With this introduction let us continue with the point a t issue. It is with ever increasing concern that I view the current trend in freshman texts. According to the authors of several of these texts, high school chemistry is considered advisable, but not necessary; nor is a chemistry related vocation necessary. These books resemble the physical chemistry course I had just ten years ago as a college senior. Certainly there are many of these topics that deserve considerable attention in the freshman course. Still the question must be asked, is this depth, with the exclusion of much conventional freshman material, necessary or advisable for the nonchemistry major? To illustrate this point, let us take the example of the difference between an acid and a base. This is a fundamental concept which is not particularly difficult. On a recent freshman exam, the students were asked if BrOH was an acid or a base. As most of the class of 150 missed this question, they were asked for an explanation, and furnished reasons of which the following are typical. "I was taught in high school that anything containing an OH was a base," and "I see now

Volume 45, Number 6, June 1968

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441

that BrOH is an acid even if the instructor wrote the formula incorrectly." Apparently the latter student thought the formula HBrO was correct. Isn't it ironic that we rush ahead with new concepts and yet cling to the Arrhenius theory of acids and bases when writing formulas? With comments such as those given above one has to ask the question, can students understand the concept of antibonding molecular orbitals when they have diiculty understanding the difference between an acid and a base? I would like to raise one final question, and then suggest a starting point for discussion. Could it be that no matter how noble our goal, we are missing a large number of students in our pel1 me11 dash to cover more and more material on a more sophisticated level? Perhaps it is time to back track part way. It may well be that some fundamental principles and their application to important problems of the day, such as pollution, are just as important as a concept like free energy. I have not attempted to propose a complete answer to the current conflict as the problem is complex. However, it is my hope that in raising these questions a dialogue can be established and a happy medium between conventional freshman material and physical chemistry topics can be realized.

like a completion to the given rule. When the author, for inequality discussions, uses the equation [HzO+] = (K.C.

valid for a solution containing two monobasic weak acids, I would raise the equation to the second power and express the result as follows [RINCBOM, A., "Complexation in Analytical Chemistry," John Wiley & Sons, Inc., New York, 1963, pp. 163, 1381: When a solution contains several weak acids, the hydrogen ion concentrations separately calculated for various acids are not additive, but the squares ofthe separately calculated hydrogen i o n concentrations of all weak acids in the solution are additive. Also water is considered an acid. A corresponding rule is valid for bases. The rule can also be used for solubilities, i.e., the equation IAgf]

T o the Editor: I n the November issue of THIS JOURNAL [44, 658 (1967)l James A. Goldman, in a paper, "Le Chatelier's Principle and Rigorous Ionic Equilibria Equations," discusses the difference between rigorous and approximate expressions for equilibrium calculations. His conclusion is that "the equilibrium concentration is always less than the sum of the individually calculated concentrations from the consideration of each individual equilibrium in the absence of others. Furthermore, the equilibrium concentration is always greater than the average of the individually oalculated concentrations." It is certainly useful to know which of two compared quantities is larger and which is smaller, and as an illustration to Le Chatelier's principle the rule offers some interest. However, I cannot help feeling that equalities are more useful than inequalities, and therefore I should

442 / lournal of Chemical Education

=

(KIi KC,)'/'

given by the author for silver halide solutions, can be stated as follows: If a solution is saturated with several binary salts containing a common ion, the individually calculated concentrations of this ion (equal to the individual molar solubilities) are not additive, but their squares are additive. The suggested formulation facilitates memorizing and-although not a rigorously valid r u l e i t is useful in many connections. As an example we may take the case that two metals, MI and MII, are titrated complexometrically with a ligand, L. Then, the additivity-ofsquares rule states that a t the equivalence point, when both metals have reacted to 111Land 1\111L,respectively, [L].,=

Le Chalelier and Ionic Equilibria

+ KbCb + KW)'/*

=

+

[ L I I ~ ILII?

Instead of [L]I and [L]IIthe corresponding metal ion concentrations, [MI] and (MII]can also be used according to the individually valid equation, where CMis the total concentration of metal and KMLis the stability constant of the metal complex. A condition for the use of the rule given above is that the individually calculated quantities are proportional to the square roots of the concentrations. If [H30+]or some other quantity is proportional to the concentration (as in solutions of strong acids or buffer solutions) the additivity-of-square rule can not be applied. More details of the suggested approach can be found in the book referred to above, where fairly complicated systems are also considered.