zero-point, with reference to the divisions of the scale, gives the result as correctly as the mechanical graduation permits, and the number of the division of the vernier which coincides with a division of the scale supplements this result by the addition of a fractional part of the smallest subdivision of the scale. Thus in Fig. 2 suppose the
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Fig. 2. retrograde vernier showing method of reading.
scale divisions to be degrees, then the reading by the graduation alone gives a result between 15° and 16°; but as the fourth division of the vernier coincides with a graduation on the scale, it follows that the zoro-point of the vernier is 0.4 of a division to the left of 15°, and that the correct reading is 15.4°. It will be seen that by merely increasing the length of the vernier, as, for example, making 20 divisions of it coin- cide with 21 on the scale, the latter may be read to twentieths ; and a still greater increase in the length of the vernier would secure further accuracy. Verniers like the above in which the number of its divisions is less than the corresponding number on the scale are called retrograde or reverse verniers. But some instruments are provided with direct verniers, that is, those in which the number of divisions exceeds the corresponding number on the scale. The principle of operation is the same as in the retro-
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Fig. 3. direct vernier.
grade veniier, except that one must look forward along the vernier to find the coinciding line. Fig. 3 shows a direct vernier, and the principle of its construction is the same as for reverse
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Fig. 4. direct vernier showing method of reading.
verniers, only the vernier division is greater by a tenth of a scale division instead of being smaller. Fig. 4 shows a direct vernier where the coincidence comes at 3 giving a reading of 5.3. In general, if v is the length of a vernier division, s the length of a scale part, and n the number of divisions on the vernier, then nv = (n − 1)s for the direct vernier and nv = (n + l)s for the reverse vernier. Therefore s − v = ⋅s, v −
s = ⋅s respectively, which shows the comparative size of the divisions of the two scales and to what fraction of a division any vernier will read. E.g. we wish a direct vernier, attached to a scale graduated to read half-degrees, to read minutes; what must be the relation between a vernier and a scale division? Here s = 30′, and, since the vernier is to read minutes, s − v = 1′ and v = 29′, s − v = 1n⋅s = 1′ and n = 30. Therefore, a space equal to 29 scale divisions is to be subdivided on the vernier into 30 equal parts.
Of the various methods for subdivision which were in use before the introduction of the vernier, the most important were the diagonal scale (q.v.) and the nonius. The latter is so called from its inventor, Petrus Nonius (Pedro Nuñez), a Portuguese mathematician (1492-1577), who described it in a treatise Dee Crepusculis Liber Unus (Lisbon, 1542). It consists of 45 concentric circles described on the limb, and divided into quadrants by two diameters intersecting at right angles. The outermost of these quadrants was divided into 90, the next into 89, the third into 88, etc., and the last into 40 equal parts, giving, on the whole, a quadrantal division into 2532 separate and unequal parts (amounting on an average to about 2′ intervals). The edge of the bar which carried the sights passed, when produced, through the centre, and served as an index-limb; and whichever of the 45 circles it crossed at a graduation, on that circle was the angle read; for instance, if it cut the seventh circle from the outside as its forty-third graduation, the angle was read as 4384 of 90°, or 46° 4′ 1717″. Consult Ludlow, “Subscales, Including Verniers,” in Van Nostrand's Engineering Magazine (1882).
VERNIER, vâr′nyā̇, Pierre (1580-1637). A French geometer, born at Ornans, in Burgundy. His father was a mathematician and director-general of currency to the Count de Bourgogne. Vernier was commandant of the castle in his native town and director of the mint. His chief work was La construction, l'usage et les propriétés du quadrant nouveau de mathématiques (1631), which contains the description of the instrument bearing his name. See Vernier.
VER'NON, Diana. A beautiful and talented girl in Scott's Rob Roy, whose peculiar education has trained her to vie with men in their sports. She is loved by all the Osbaldistones, including the villainous Rashleigh. The latter threatens to expose her father's plot if she will not marry him, but is killed by Rob Roy, and she is hap- pily married to Frank Osbaldistone.
VERNON, Edward (1684-1757). An English admiral. He was born in Westminster; was educated at Westminster School, and in 1700 entered the navy, and saw much active service during the War of the Spanish Succession. In 1722 he was returned to Parliament. In 1739, as commander of six ships, and with the rank of vice-admiral, he captured Porto Bello, with a loss of only seven men. Owing to the inefficiency of the military support, he was repulsed from Cartagena in 1741, and lost heavily by sickness. This action has been described in Roderick Random by Smollett, who was serving in the expedition as assistant surgeon. Lawrence, the eldest brother of George Washington, was also a member of the expedition, and his estate Mount Vernon was named in honor of the admiral. Vernon returned to England in 1742; was several times reelected to Parliament; in 1745 was promoted to be admiral, and during the expected invasion by the Pretender commanded on the Kent and Sussex coasts. For criticising the Admiralty in two
