## The Complete Mathematical and General Navigation Tables: Including Every Table Required with the Nautical Almanc in Finding the Latitude and Longitude: with an Explanation of Their Construction, Use, and Application to Navigation and Nautical Astronomy, Trigonometry, Dialling, Gunnery, Etc |

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### Innhold

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The Complete Mathematical and General Navigation Tables: Including ..., Volum 2 Thomas Kerigan Uten tilgangsbegrensning - 1838 |

### Vanlige uttrykk og setninger

according added angle answering apparent altitude applied approximate arch base circle co-secant co-sine co-tangent column computed Constant log contained correction corresponding course decimal declination degrees departure determined Diff difference of latitude difference of longitude distance divided earth east equal equator Example expressed feet figures given gives greater Greenwich half hence horizontal parallax hypothenuse interval less logarithmic longitude manner mean measure meridian middle miles minutes moon moon's multiplied natural noon observation opposite parallel perpendicular plane points polar PROBLEM prop proportional quadrant radius reduced refraction represent respective right ascension right hand rising rule sailed secant seconds semidiameter setting ship side spherical star star's subtracted sun's Table tabular taken tangent term third transit triangle true

### Populære avsnitt

Side 61 - Also, between the mean, thus found, .and the nearest extreme, find another geometrical mean, in the same manner ; and so on, till you are arrived within the proposed limit of the number whose logarithm is sought.

Side 208 - For the purpose of measuring angles, the circumference is divided into 360 equal parts, called degrees ; each degree into 60 equal parts, called minutes ; each minute into 60 equal parts called seconds.

Side 260 - If two triangles have two angles of the one equal to two angles...

Side 61 - ... progression, to which those indices belong. Thus, the indices 2 and 3, being added together, make 5 ; and the numbers 4 and 8, or the terms corresponding to those indices, being multiplied together, make 32, which is the number answering to the index 5.

Side 61 - And, if the logarithm of any number be divided by the index of its root, the quotient will be equal to the logarithm of that root. Thus the index or logarithm of 64 is 6 ; and, if this number be divided by 2, the quotient will be = 3, which is the logarithm of 8, or the square root of 64.

Side 154 - RULE. Divide as in whole numbers, and from the right hand of the quotient point off as many places for decimals as the decimal places in the dividend exceed those in the divisor.

Side 155 - When there happens to be a remainder after the division ; or when the decimal places in the divisor are more than those in the dividend ; then ciphers may be annexed to the dividend, and the quotient carried on as far as required.

Side 156 - REDUCTION OF DECIMALS. CASE I. . To reduce a Vulgar Fraction to a Decimal Fraction of equal value.

Side 179 - II. The sine of the middle part is equal to the product of the cosines of the opposite parts.

Side 245 - II. the difference of latitude and departure corresponding to each course and distance, and set them in their respective columns : then the difference between the sums of the northings and southings will be the difference of latitude made good, of the same name with the greater ; and the difference between the sums of the eastings and westings will be the departure made good, of the same name with the greater quantity.