Page:Biometrika - Volume 6, Issue 1.djvu/24

“and the quality of the resulting barley is inferior though the yield may be greater.”

			lbs. head corn per acre			​ Price of head corn in shillings per quarter ​			cwts. straw per acre			Value of crop per acre in shillings[*]
			​ N. K. D. ​	K. D.	Diff.	N. K. D.	K. D.	Diff.	N. K. D.	K. D.	Diff.	N. K. D.	K. D.	Diff.
​
	1899		1903	2009	+106	261/2	261/2	0	191/4	25	+53/4	1401/2	152	+111/2
			1935	1915	−020	280	261/2	−11/2	223/4	240	+11/4	1521/2	1450	−71/2
			1910	2011	+101	291/2	281/2	−10	230	240	+10	1581/2	1610	+21/2
			2496	2463	−033	300	290	−10	230	280	+5	2041/2	1991/2	−5
			2108	2180	+072	271/2	270	−1/20	221/2	221/2	0	1620	1640	+2
			1961	1925	−036	260	260	0	193/4	191/2	−1/40	1420	1391/2	−21/2
			2060	2122	+062	290	260	−3	241/2	221/4	−21/4	1680	1550	−13
	1900		1444	1482	+038	291/2	281/2	−10	151/2	160	+1/20	1180	1171/2	−1/2
			1612	1542	−070	281/2	280	−1/2	180	171/4	−3/4	1281/2	1210	−71/2
			1316	1443	+127	300	290	−10	141/4	153/4	+11/2	1091/2	1161/2	+7
			1511	1535	+024	281/2	280	−1/20	170	171/4	+1/40	1200	1201/2	+1/2
​
​ Average ​			1841.5	1875.2	+33.7	28.45	27.55	−.91	19.95	21.05	+1.10	145.82	144.68	+1.14
Standard Deviation			—	—	63.1	—	—	.79	—	—	2.25	—	—	6.67
Standard Deviation ÷√8			—	—	22.3	—	—	.28	—	—	0.80	—	—	2.40

^[*] Straw being valued at 15s. per ton.

In this case I propose to use the approximation given by the normal curve with standard deviation ${\displaystyle {\frac {s}{\sqrt {(n-3)}}}}$ and therefore use Sheppard’s tables, looking up the difference divided by ${\displaystyle {\frac {s}{\sqrt {8}}}}$. The probability in the case of yield of corn per acre is given by looking up ${\displaystyle {\frac {33.7}{22.3}}=1.51}$ in Sheppard’s tables. This gives ${\displaystyle p=.934}$, or the odds are about 14:1 that kiln-dried corn gives the higher yield.

Similarly ${\displaystyle {\frac {.91}{.28}}=3.25}$, corresponding to ${\displaystyle p=.9994}$,^[1] so that the odds are very great that kiln-dried seed gives barley of a worse quality than seed which has not been kiln-dried.

Similarly it is about 11 to 1 that kiln-dried seed gives more straw and about 2:1 that the total value of the crop is less with kiln-dried seed.

1. As pointed out in Section V. the normal curve gives too large a value for ${\displaystyle p}$ when the probability is large. I find the true value in this case to be ${\displaystyle p=.9976}$. It matters little however to a conclusion of this kind whether the odds in its favour are 1,660:1 or merely 416:1.