Logarithmick Arithmetick: Containing a New and Correct Table of Logarithms of the Natural Numbers from 1 to 10,000, Extended to Seven Places Besides the Index; and So Contrived, that the Logarithm May be Easily Found to Any Number Between 1 and 10,000,000. Also an Easy Method of Constructing a Table of Logarithms, Together with Their Numerous and Important Uses in the More Difficult Parts of Arithmetick. To which are Added a Number of Astronomical Tables ... and an Easy Method of Calculating Solar and Lunar EclipsesE. Whitman, 1818 - 251 σελίδες |
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Σελίδα 156
... July . June . May . April . March . Days . 12345 32 62 2 33 63 3 3 34 64 4 4 35 65 5 36 66 94 124 155 186 216 95 125 156 187 217 96 126 157 188 218 97 127 158 189 219 247 277 308 359 248 278 309 340 249 279310341 250 280 311 342 829 6 6 ...
... July . June . May . April . March . Days . 12345 32 62 2 33 63 3 3 34 64 4 4 35 65 5 36 66 94 124 155 186 216 95 125 156 187 217 96 126 157 188 218 97 127 158 189 219 247 277 308 359 248 278 309 340 249 279310341 250 280 311 342 829 6 6 ...
Σελίδα 164
... 28 17 June 4 28 49 58 4 28 50 July 5 28 24 8 5 28 24 Aug 6 29 57 26 6 28 57 Sept 7 29 30 44 7 29 30 Oct. 8 29 4 54 8 29 4 Nov 9 29 38 12 9 29 37 Dec 10 29 12 2210 29 11 EXAMPLE III . Required the true time of Full Moon 104 LOGARITHMICK.
... 28 17 June 4 28 49 58 4 28 50 July 5 28 24 8 5 28 24 Aug 6 29 57 26 6 28 57 Sept 7 29 30 44 7 29 30 Oct. 8 29 4 54 8 29 4 Nov 9 29 38 12 9 29 37 Dec 10 29 12 2210 29 11 EXAMPLE III . Required the true time of Full Moon 104 LOGARITHMICK.
Σελίδα 170
... 29.10 9 52 0 30.10 10 52 0 6789σ 01 6 212 5 173 55 6 591 7 202 6 153 52 7 59 8 18'2 7 123 6 49 581 9 162 8 103 746 571 10 142 9 3111 11 53 0 10 56 12 10 73 5 8 43 TABLE XIX . Concluded . July . August . Sept. 170 LOGARITHMICK.
... 29.10 9 52 0 30.10 10 52 0 6789σ 01 6 212 5 173 55 6 591 7 202 6 153 52 7 59 8 18'2 7 123 6 49 581 9 162 8 103 746 571 10 142 9 3111 11 53 0 10 56 12 10 73 5 8 43 TABLE XIX . Concluded . July . August . Sept. 170 LOGARITHMICK.
Σελίδα 171
... July . August . Sept. October . Nov. Dec. Days . S 0 1 13 9 S O 414 9 23 10 384 10 145 10 1 S 175 9 76 ୪ 66 9 S O S O 26.7 9 158 9 32 25.7 10 15'8 10 33 33 11 354 11 115 11 46 10 247 11 168 11 34 43 12 324 12 95 12 26 11 247 12 168 12 ...
... July . August . Sept. October . Nov. Dec. Days . S 0 1 13 9 S O 414 9 23 10 384 10 145 10 1 S 175 9 76 ୪ 66 9 S O S O 26.7 9 158 9 32 25.7 10 15'8 10 33 33 11 354 11 115 11 46 10 247 11 168 11 34 43 12 324 12 95 12 26 11 247 12 168 12 ...
Σελίδα 172
... July 29 22 7 25 6 28 5 4 11 26 1234 620 123456 Clock slower . Clock faster . Oct. 311 612 1013 1414 1915 Dec. 2 579 227 03 28 30 Faster This Table is near enough the truth for regulating common clocks and watches . It may be easily ...
... July 29 22 7 25 6 28 5 4 11 26 1234 620 123456 Clock slower . Clock faster . Oct. 311 612 1013 1414 1915 Dec. 2 579 227 03 28 30 Faster This Table is near enough the truth for regulating common clocks and watches . It may be easily ...
Συχνά εμφανιζόμενοι όροι και φράσεις
amount annuity Anom arithmetical arithmetical mean Arithmetick ascending node axis bushels cent per annum cent pr centre circumference common compound interest cyphers decimal degrees denomination diameter difference Divide dividend divisor dollars dols earth Eclipse Ecliptick enter Table equal errour EXAMPLES farthings feet figures fourth frustrum Full Moon gallons given number horary motion improper fraction inches July least common multiple loga Lunar Eclipse mean Anomaly mean New Moon miles minuets minutes months Moon in March Moon's orbit Multiply natural number North descending number of terms old style pence penumbra perigee pound Precept present worth principal quotient ratio Reduce remainder rithm rods RULE seconds semidiameter shillings signs simple interest solid square root Sun fro Sun's anomaly Sun's distance Sun's mean distance syzygy Tabular number tare third TROY WEIGHT twice equated VULGAR FRACTIONS weight whole numbers yards
Δημοφιλή αποσπάσματα
Σελίδα 128 - ... sought. 3. Multiply the terms of the geometrical series together belonging to those indices, and make the product a dividend, 4. Raise the first term to a power whose index is one less than the number of the terms multiplied, and make the result a divisor. 5. Divide, and the quotient is the term sought. EXAMPLES. 4. If the first of a geometrical series be 4, and the ratio 3, what is the 7th term ? 0, 1, 2, 3, Indices.
Σελίδα 107 - Operations with Fractions A) To change a mixed number to an improper fraction, simply multiply the whole number by the denominator of the fraction and add the numerator.
Σελίδα 38 - Finally, multiplying the second and third terms together, divide the product by the first, and the quotient will be the answer in the same denomination as the third term.
Σελίδα 98 - CUBIC MEASURE 1728 cubic inches = 1 cubic foot 27 cubic feet = 1 cubic yard...
Σελίδα 44 - In like manner, if any one index be subtracted from another, the difference will be the index of that number which is equal to the quotient of the two terms to which those indices belong.
Σελίδα 127 - RULE.* 1. Write down a few of the leading terms of the series, and place their indices over them, beginning with a cypher.
Σελίδα 114 - Let the farthings in the given pence and farthings possess the second and third places ; observing to increase the second place or place of hundredths, by 6 if the shillings be odd ; and the third place by 1 "when the farthings exceed 12, and by 2 when they exceed 36.
Σελίδα 125 - RULE. Multiply the sum of the extremes by the number of terms, and half the product will be the sum of the terms. EXAMPLES FOR PRACTICE. 2. If the extremes be 5 and 605, and the number of terms 151, what is the sum of the series?
Σελίδα 6 - Four points set in the middle of four numbers, denote them to be proportional to one another, by the rule of three ; as 2 : 4 : : 8 : 16 ; that is, as 2 to 4, so is 8 to 16.