Elements of Surveying and Leveling: With Descriptions of the Instruments, and the Necessary Tables |
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Page 10
... decimal part is called the mantissa . 4. If , in Equation ( 3 ) , we make p successively equal to 0 , 1 , 2 , 3 ... decimal ; if a number lies between 10 and 100 , its logarithm is equal to 1 , plus a decimal ; if between 100 and ...
... decimal part is called the mantissa . 4. If , in Equation ( 3 ) , we make p successively equal to 0 , 1 , 2 , 3 ... decimal ; if a number lies between 10 and 100 , its logarithm is equal to 1 , plus a decimal ; if between 100 and ...
Page 11
... decimal fraction is negative , and numerically 1 greater than the number of O's that immediately follow the decimal point . The characteristic alone is negative , the mantissa being always positive . This fact is indicated by writing ...
... decimal fraction is negative , and numerically 1 greater than the number of O's that immediately follow the decimal point . The characteristic alone is negative , the mantissa being always positive . This fact is indicated by writing ...
Page 13
... decimal part of the log ( n × 10o ) , is the same as that of log n ; which was to be proved . Hence , in finding the mantissa of the logarithm of a num- ber , we may regard the number as a decimal , and move the decimal point to the ...
... decimal part of the log ( n × 10o ) , is the same as that of log n ; which was to be proved . Hence , in finding the mantissa of the logarithm of a num- ber , we may regard the number as a decimal , and move the decimal point to the ...
Page 14
... decimal point after the fourth figure ( Art . 9 ) , thus converting the number into a mixed num- ber . Find the ... decimal part and add the product to the mantissa just found . The It is to be observed that when the decimal part ...
... decimal point after the fourth figure ( Art . 9 ) , thus converting the number into a mixed num- ber . Find the ... decimal part and add the product to the mantissa just found . The It is to be observed that when the decimal part ...
Page 15
... decimal part of the product just spoken of is equal to or exceeds .5 , we add 1 to the entire part ; otherwise the decimal part is rejected . EXAMPLE . To find the logarithm of 672887 . The characteristic is 5. Placing a decimal point ...
... decimal part of the product just spoken of is equal to or exceeds .5 , we add 1 to the entire part ; otherwise the decimal part is rejected . EXAMPLE . To find the logarithm of 672887 . The characteristic is 5. Placing a decimal point ...
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Common terms and phrases
adjusted Applying logarithms axis azimuth back-sight base-line bearing chord clamp-screw column compass corresponding Cosine Cosine D course curve decimal DegDeg degree of curvature degrees determined difference of level divided double meridian distance draw east error example feet field-notes fore-sight given angle given line ground hence horizontal angles horizontal distance horizontal plane inch intersection LatDeg LatDegDeg LatDegDegDegDeg latitude and departure length limb line of collimation locating M.
M. Sine M.
M. Sine D mantissa marked measured method multiplied NOTE offsets parallel passed perpendicular plane of reference plot position prismoid protractor radius reading right angles scale of equal screws secant side sights similar triangles Sine Cotang slope spider's lines stakes station subtract surface survey taken Tang tangent theodolite traverse vernier plate vertical plane yards
Popular passages
Page 56 - ... the square of the hypothenuse is equal to the sum of the squares of the other two sides.
Page 12 - The logarithm of any power of a number is equal to the logarithm of the number multiplied by the exponent of the power.
Page 17 - The minutes in the left-hand column of each page, increasing downwards, belong to the degrees at the top ; and those increasing upwards, in the right.hand column, belong to the degrees below.
Page 37 - The circumference of every circle is supposed to be divided into 360 equal parts, called degrees ; and each degree into 60 equal parts, called minutes ; and each minute into 60 equal parts, called seconds ; and these into thirds, etc.
Page 12 - The logarithm of a quotient is equal to the logarithm of the dividend minus the logarithm of the divisor.
Page 10 - When a number lies between 1 and 10, its logarithm lies between 0 and 1; that is, it is equal to 0, plus a decimal; if a number lies between 10...
Page 9 - The logarithm of a number is the exponent of the power to which it is necessary to raise a fixed number, in order to produce the first number.
Page 11 - The logarithm of the product of two numbers is equal to the sum of the logarithms of the numbers.
Page 130 - MC; hence, the double meridian distance of a course is equal to the double meridian distance of the preceding course, plus the departure of that course, plus the departure of the course itself : if .there is no preceding course, the first two terms become zero.
Page 38 - The secant of an arc is the line drawn from the centre of the circle through one extremity of the arc, and limited by the tangent passing through the other extremity. Thus, 00 is the secant of the arc AB.