that wherein unity or 1 and 0 are only used. This was the invention of Mr. Leibnitz, who shows it to be very expeditious in discovering the properties of numbers, and in constructing tables: and Mr Dangecourt, in the history of the royal academy of sciences, gives a specimen of it concerning arithmetical progressions; where he shows, that because in binary arithmetic only two characters are used, therefore the laws of progression may be more easily discovered by it than by common arithmetic. All the characters used in binary arithmetic are 0 and 1; and the cipher multiplies every thing by 2, as in the common arithmetic by 10. Thus 1 is one; 10, two; 11, three; 100, four; 101, five; 110, six; 111, seven; 1000, eight; 1001, nine; 1010, ten; which is built on the same principles with common arithmetic. Hence immediately appears the reason of the celebrated property of the duplicate geometrical proportion in whole numbers; viz. that one number of each degree being had, we may thence compose all the other whole numbers above the double of the highest degree. It being here, v. gr. as if one should say, 111 is the sum of 4, 2, and 1, which property may serve seafarers to weigh all kinds of maffics with a little weight; and may be used in coins, to give several values with small pieces. This method of expressing numbers once established, all the operations will be easy: in multiplication particularly, there will be no need for a table, or getting any thing by heart. The author, however, does not recommend this method for common use, because of the great number of figures required to express a number; adding, that if the common progression were from 12 to 12, or from 16 to 16, it would be still more expeditious; but its use is in discovering the properties of numbers, in constructing tables, &c. What makes the binary arithmetic the more remarkable is, that it appears to have been the same with that used 4000 years ago among the Chinese, and left in anigma by Yohi, the founder of their empire, as well as of their sciences.
BINARY Measure, in Music, is a measure which is beaten equally, or where the time of rising is equal to that of falling. This is usually called common time.
BINARY Number, that composed of two units.
BINGH, a small fortified town of the Low Countries, in the county of Hainault, subject to the house of Austria. E. Long. 3° 21'. N. Lat. 50° 23'.