The Theory and Practice of Surveying: Containing All the Instructions Requisite for the Skilful Practice of this ArtEvert Duyckinck, 1814 - 508 σελίδες |
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Αποτελέσματα 1 - 5 από τα 83.
Σελίδα 4
... beneath the other points . EXAMPLES . Add 4.7832 3.2543 7.8251 6.03 2.857 and 3,251 together . Place them thus , 4.7832 3.2543 7.8251 6.03 2.857 3.251 Sum - 28,0006 , gether . Add 6.2 121.306 .75 2.7 and .0007 to- 4 DECIMAL FRACTIONS .
... beneath the other points . EXAMPLES . Add 4.7832 3.2543 7.8251 6.03 2.857 and 3,251 together . Place them thus , 4.7832 3.2543 7.8251 6.03 2.857 3.251 Sum - 28,0006 , gether . Add 6.2 121.306 .75 2.7 and .0007 to- 4 DECIMAL FRACTIONS .
Σελίδα 5
... exactly under the other two points , EXAMPLES . From 38.765 take 25.3741 25.3741 Difference = 13.3909 From 2.4 take .8472 .8472 Diff . 1.5528 = From 71.45 take 8.4837248 . Difference = 62.9662752 . From DECIMAL FRACTIONS . 5.
... exactly under the other two points , EXAMPLES . From 38.765 take 25.3741 25.3741 Difference = 13.3909 From 2.4 take .8472 .8472 Diff . 1.5528 = From 71.45 take 8.4837248 . Difference = 62.9662752 . From DECIMAL FRACTIONS . 5.
Σελίδα 6
... from whence it arose . EXAMPLES . Multiply 48.765 by .003609 .003609 438885 292590 146295 Product = .175992885 Multiply .121 by .14 484 121 Product .01694 = Multiply 121.6 by 2.76 2.76 7296 8512 2432 Product = DECIMAL FRACTIONS .
... from whence it arose . EXAMPLES . Multiply 48.765 by .003609 .003609 438885 292590 146295 Product = .175992885 Multiply .121 by .14 484 121 Product .01694 = Multiply 121.6 by 2.76 2.76 7296 8512 2432 Product = DECIMAL FRACTIONS .
Σελίδα 7
... , annex ciphers to this remainder , and continue the operation till nothing remains , or till a sufficient number of decimals shall be found in the quotient . EXAMPLES . Divide .144 by .12 .12 ) .144 ( DECIMAL FRACTIONS .
... , annex ciphers to this remainder , and continue the operation till nothing remains , or till a sufficient number of decimals shall be found in the quotient . EXAMPLES . Divide .144 by .12 .12 ) .144 ( DECIMAL FRACTIONS .
Σελίδα 8
... EXAMPLES . Divide .144 by .12 .12 ) .144 ( 1.2 = quotient . 12 24 24 0 Divide 63.72413456922 by 2718 2718 ) 63.72413456922 ( .02344522979 = quotient . 5436 9364 8154 12101 10872 12293 10872 14214 13590 6245 5436 8096 5436 26609 24462 ...
... EXAMPLES . Divide .144 by .12 .12 ) .144 ( 1.2 = quotient . 12 24 24 0 Divide 63.72413456922 by 2718 2718 ) 63.72413456922 ( .02344522979 = quotient . 5436 9364 8154 12101 10872 12293 10872 14214 13590 6245 5436 8096 5436 26609 24462 ...
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acres altitude Answer arch base bearing blank line centre chains and links circle circle of latitude circumferentor Co-sec Co-tang column compasses contained decimal difference Dist divided divisions draw east Ecliptic edge EXAMPLE feet field-book figures fore four-pole chains geometrical series given angle given number half the sum Horizon glass hypothenuse inches instrument latitude length logarithm measure meridian distance minutes multiplied natural sine Nonius number of degrees object observed off-sets opposite parallelogram perches perpendicular plane pole pole star PROB proportion protractor Quadrant quotient radius right angles right line scale of equal SCHOLIUM screw Secant sect semicircle side sights square root station stationary distance subtracted survey taken tance Tang tangent theo theodolite trapezium triangle ABC trigonometry two-pole chains vane versed sine vulgar fraction whence
Δημοφιλή αποσπάσματα
Σελίδα 52 - The angle in a semicircle is a right angle ; the angle in a segment greater than a semicircle is less than a right angle ; and the angle in a segment less than a semicircle is greater than a right angle.
Σελίδα 39 - The Circumference of every circle is supposed to be divided into 360 equal parts, called Degrees ; and each degree into 60 Minutes, each minute into 60 Seconds, and so on.
Σελίδα 18 - DISTINGUISH the given number into periods of two figures each, by putting a point over the place of units, another over the place of hundreds, and so on, which points shew the number of figures the root will consist of. 2. " FIND the greatest square number in the first, or left hand period...
Σελίδα 120 - C' (89) (90) (91) (92) (93) 112. In any plane triangle, the sum of any two sides is to their difference as the tangent of half the sum of the opposite angles is to the tangent of half their difference.
Σελίδα 31 - DIVISION BY LOGARITHMS. RULE. From the logarithm of the dividend subtract the logarithm of the divisor, and the number answering to the remainder will be the quotient required.
Σελίδα 87 - On the line of lines make the lateral distance 10, a transverse distance between 8 on one leg, and 6 on the other leg. On the line of sines make the lateral distance 90, a transverse distance from 45 to 45 ; or from 40 to 50 ; or from 30 to 60 ; or from the sine of any degree to their complement.
Σελίδα 7 - 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.
Σελίδα 82 - ... longer than the intermediate adjacent ones, these are whole degrees ; the shorter ones, or those of the third order, are 30 minutes. From the centre, to 60 degrees, the line of sines is divided like the line of tangents ; from 60 to 70, it is divided only to every degree ; from 70 to 80, to every two degrees ; from 80 to 90, the division must be estimated by the eye.