Course of Civil Engineering: Comprising Plane Trigonometry, Surveying, and Levelling with Their Application to the Construction of Common Roads, Railways, Canals, Harbours...Samuel J. Machen, 1842 - 301 pages |
From inside the book
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Page vii
... given for plotting a survey and cal- culating its contents , by different methods ; also for copying , enlarging , and diminishing maps , with the description and use of the various instruments employed by surveyors , and the most ...
... given for plotting a survey and cal- culating its contents , by different methods ; also for copying , enlarging , and diminishing maps , with the description and use of the various instruments employed by surveyors , and the most ...
Page ix
... given log . 125225 27 28 29 31 • . · 34 To find the natural or log . versed sine of an arc , by the help of a table of natural or log . sines 36 • To find the degrees and minutes , or degrees , minutes , and seconds , corresponding to ...
... given log . 125225 27 28 29 31 • . · 34 To find the natural or log . versed sine of an arc , by the help of a table of natural or log . sines 36 • To find the degrees and minutes , or degrees , minutes , and seconds , corresponding to ...
Page xi
... given ratio 294 To straighten a crooked boundary between two estates , without prejudice to either proprietor 294 · To change a figure from one scale to another 296 On the division of land 298 Various Problems in Surveying . PLANE ...
... given ratio 294 To straighten a crooked boundary between two estates , without prejudice to either proprietor 294 · To change a figure from one scale to another 296 On the division of land 298 Various Problems in Surveying . PLANE ...
Page 1
... it follows that the relation of the sides must be considered , in order to determine the magnitude of angles - hence , if one angle of a triangle be given , A the other two cannot be found , without one side TRIGONOMETRY.
... it follows that the relation of the sides must be considered , in order to determine the magnitude of angles - hence , if one angle of a triangle be given , A the other two cannot be found , without one side TRIGONOMETRY.
Page 2
... given . As there may be an infinite number of equiangular triangles , all differing in magnitude , it obviously follows , that the magnitude of the sides cannot be discovered from the angles , only , unconnected with the consideration ...
... given . As there may be an infinite number of equiangular triangles , all differing in magnitude , it obviously follows , that the magnitude of the sides cannot be discovered from the angles , only , unconnected with the consideration ...
Other editions - View all
Course of Civil Engineering: Comprising Plane Trigonometry, Surveying, and ... John Gregory No preview available - 2018 |
Course of Civil Engineering: Comprising Plane Trigonometry, Surveying, and ... John Gregory No preview available - 2022 |
Course of Civil Engineering: Comprising Plane Trigonometry, Surveying, and ... John Gregory No preview available - 2022 |
Common terms and phrases
acres angles of elevation ascertain base line bisect boundary calculation centre chain chords circumferentor compasses cosecant Cosine Sine Cotang Cotang Sine Cosine deducted degrees diameter difference direction distance divided divisions equal error extend extremities feet field-book figure find the angle given ground height Hence horizontal instrument length line of numbers line of sines line of tangents logarithmic mark measure the angles meridian method minutes N.cos natural number natural sine needle object observed angles offsets Ordnance Survey parish perches perpendicular plane triangle plotted position Prop protractor quotient radius right angles right-angled triangle roods scale secant sextant sin N.cos N Sine Cosine Tang Sine Cotang Tang SINES AND TANGENTS spherical angles spherical excess spherical triangle surveyor taken theodolite three angles took the angle Townlands triangle ABC trigonometrical survey versed sine vertical yards
Popular passages
Page 1 - 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, fourths, &c.
Page 211 - All the interior angles of any rectilineal figure, together with four right angles, are equal to twice as many right angles as the figure has sides.
Page 180 - Mile, or jA« of the actual size. each inclosure, minute errors in many of which would escape observation, if not checked by comparison with the correctly ascertained whole. It is essential, in fact, to arrive at the total area of the Parish by direct admeasurement of the space included within its external boundary ; and the simplest and cheapest means by which a Survey and Plan may be made for effecting this object appear to me to be as follows : 1st.
Page 108 - I wanted to know the distance between two places, A and B, but could not meet with any station from whence I could see both objects. I measured a line CD — 200 yards ; from C the object A was visible, and from D the object B was visible, at each of which places I set up a pole. I also measured FC = 200 yards, and DE=200 yards, and at F and E set up poles. I then measured the angle AFC = 83°, ACF = 54° 31', ACD=53° 30', BDC = 156° 25', BDE=54° 30', and BED= 88° 30'.
Page 15 - ... fourth ; consequently, on the lines on the scale the distance between the first and second term will be equal to the distance between the third and fourth. And for a similar reason, because four proportional quantities are alternately proportional, the distance between the first and third terms will be equal to the distance between the second and fourth. Hence the following General Rule. The extent of the compasses from the first term to the second will reach, in this same direction, from the...
Page 11 - Pt. with which it must always be compared when used. The line of equal parts is marked from the right hand to the left with 0, 10, 20, 30, &c; each of these large divisions represents 10 degrees of the equator, or 600 miles. The first of these divisions is sometimes divided into 40 equal parts, each representing 15
Page 221 - ... for points of observation, the instrument cannot be placed exactly at the centre of the signal, and consequently the angle observed will be different from that which would have been found at the centre. The correction is generally very small, and is only necessary where great accuracy is required. The observer may be considered in three different positions with respect to the centre, viz. he is either in a line with the centre and one of the objects ; or a line drawn from the centre through his...
Page 50 - BFC, as the square of the radius is to the square of the tangent of half the angle BAC opposite to the base.
Page 198 - ... order to register all that is done relative to the survey in hand. This book every one contrives and rules as he thinks fit. It is, however, usually divided into three columns. The middle column contains the different distances on the chain-line, angles, bearings, &c., and the columns on the right and left are for the off-sets on the right and left, which are set against their corresponding distances in the middle column ; as also for such remarks as may occur, and may be proper to note in drawing...
Page 290 - As radius Is to the tangent of the latitude; So is the tangent of the sun's declination To the sine of the ascensional difference sought. This, converted into time, shows how much he rises...