Dear Cecil: In Science magazine a while back an article about the latest attempts to calculate pi to the umpteen zillionth decimal place made a passing reference to a curious Oklahoma law. It said Oklahoma legislators had passed a law making pi equal to 3.0. I also remember Robert Heinlein in one of his novels mentioning that Tennessee had passed a similar law. Did either of these states ever pass such a law? Are they still on the books? What are the penalties if I proclaim that pi equals 3.14159 … ? Wulf Losee, Andover, Connecticut

Cecil replies:

Cecil had heard this story too, only the state in question was Kansas, leading him to believe the whole thing was made up by big-city sharpies having a little fun at the expense of the rustics. However, with the help of Joseph Madachy, editor of the Journal of Recreational Mathematics, I’ve learned the story does have a germ of truth to it.

It happened in Indiana. Although the attempt to legislate pi was ultimately unsuccessful, it did come pretty close. In 1897 Representative T.I. Record of Posen county introduced House Bill #246 in the Indiana House of Representatives. The bill, based on the work of a physician and amateur mathematician named Edward J. Goodwin (Edwin in some accounts), suggests not one but three numbers for pi, among them 3.2, as we shall see. The punishment for unbelievers I have not been able to learn, but I place no credence in the rumor that you had to spend the rest of your natural life in Indiana.

Just as people today have a hard time accepting the idea that the speed of light is the speed limit of the universe, Goodwin and Record apparently couldn’t handle the fact that pi was not a rational number. “Since the rule in present use [presumably pi equals 3.14159…] fails to work …, it should be discarded as wholly wanting and misleading in the practical applications,” the bill declared. Instead, mathematically inclined Hoosiers could take their pick among the following formulae:

(1) The ratio of the diameter of a circle to its circumference is 5/4 to 4. In other words, pi equals 16/5 or 3.2

(2) The area of a circle equals the area of a square whose side is 1/4 the circumference of the circle. Working this out algebraically, we see that pi must be equal to 4.

(3) The ratio of the length of a 90 degree arc to the length of a segment connecting the arc’s two endpoints is 8 to 7. This gives us pi equal to the square root of 2 x 16/7, or about 3.23.

There may have been other values for pi as well; the bill was so confusingly written that it’s impossible to tell exactly what Goodwin was getting at. Mathematician David Singmaster says he found six different values in the bill, plus three more in Goodwin’s other writings and comments, for a total of nine.

Lord knows how all this was supposedly to clarify pi or anything else, but as we shall see, they do things a little differently in Indiana. Bill #246 was initially sent to the Committee on Swamp Lands. The committee deliberated gravely on the question, decided it was not the appropriate body to consider such a measure and turned it over to the Committee on Education. The latter committee gave the bill a “pass” recommendation and sent it on to the full House, which approved it unanimously, 67 to 0.

In the state Senate, the bill was referred to the Committee on Temperance. (One begins to suspect it was silly season in the Indiana legislature at the time.) It passed first reading, but that’s as far as it got. According to The Penguin Dictionary of Curious and Interesting Numbers, the bill “was held up before a second reading due to the intervention of C.A. Waldo, a professor of mathematics [at Purdue] who happened to be passing through.” Waldo, describing the experience later, wrote, “A member [of the legislature] then showed the writer [i.e., Waldo] a copy of the bill just passed and asked him if he would like an introduction to the learned doctor, its author. He declined the courtesy with thanks, remarking that he was acquainted with as many crazy people as he cared to know.”

The bill was postponed indefinitely and died a quiet death. According to a local newspaper, however, “Although the bill was not acted on favorably no one who spoke against it intimated that there was anything wrong with the theories it advances. All of the Senators who spoke on the bill admitted that they were ignorant of the merits of the proposition. It was simply regarded as not being a subject for legislation.”

As for Representative T.I. Record — well, I haven’t been able to confirm this. But some say he changed his name to Quayle.

The wisdom of Solomon: Not what it’s cracked up to be

Dear Cecil:

Your response to the question about attempts to legislate pi suggests not only that your scholarship is weak but that you are a heathen. When King Solomon constructed the Temple of Jerusalem, the Second Book of Chronicles, chapter 4, verses 2 and 5, tells us:

“Then he made the Sea [a big tub] of cast bronze, ten cubits from one brim to the other; it was completely round. Its height was five cubits and a line of thirty cubits measured its circumference. It was a handbreadth thick; and its brim was shaped like the brim of a cup….. It contained three thousand baths.”

The ratio of 30 cubits for the circumference to 10 cubits for the diameter “from one brim to the other” of the “completely round” circle gives the value of pi as being exactly 3. Perhaps reliance on the Word of God motivated the Indiana legislators you trashed. You should have checked with the ultimate reference.

— H.K.S., Springfield, Virginia

Cecil replies:

Some of the mail I get is unbelievable. As I attempted to point out, the Indiana legislature did not consider making pi equal to 3, but rather to 3.2, 4, or approximately 3.23, depending on which formula you used. Neither the text of the bill nor any of the commentaries regarding it refer to the Bible. Perhaps Tennessee, Oklahoma, Kansas or one of the other states I mentioned was the one that attempted to a legislate a pi of biblical proportions.

Interesting you should bring this up, though. In 150 A.D. a Hebrew rabbi and scholar named Nehemiah attempted to explain away the anomaly in Chronicles by saying that the diameter of the tub was 10 cubits from outer rim to outer rim, whereas the 30 cubit circumference was measured around the inner rim. In other words, the difference between the biblical notion of pi and the actual value may be accounted for by the width of the tub’s walls. How’s that for tap dancing, eh? Nehemiah lived a long time ago, but I feel he’s my spiritual kin.

Cecil Adams

Send questions to Cecil via cecil@straightdope.com.