An Introduction to the Theory and Practice of Plane and Spherical Trigonometry, and the Stereographic Projection of the Sphere: Including the Theory of Navigation ...author, 1810 - 420 pages |
From inside the book
Results 1-5 of 37
Page viii
... applying Baron Napier's rule to the solutions of the different cases of oblique - angled spherical triangles , from which several useful rules are derived . The sixth Chapter is , in substance , the same as the IVth Chapter of Book II ...
... applying Baron Napier's rule to the solutions of the different cases of oblique - angled spherical triangles , from which several useful rules are derived . The sixth Chapter is , in substance , the same as the IVth Chapter of Book II ...
Page xii
... problems which have been frequently applied in extensive trigonometrical sur- veys , together with general formulæ for the solutions of the different different cases of Spherical Trigonometry ; some of these for- xii PREFACE .
... problems which have been frequently applied in extensive trigonometrical sur- veys , together with general formulæ for the solutions of the different different cases of Spherical Trigonometry ; some of these for- xii PREFACE .
Page xxi
... applying BARON NAPIER'S rule to oblique spherical triangles 191 191 to 200 2. Rules for solving all the different cases of oblique- angled spherical triangles , with a perpendicular 3. Practical examples , exercising the rules in ...
... applying BARON NAPIER'S rule to oblique spherical triangles 191 191 to 200 2. Rules for solving all the different cases of oblique- angled spherical triangles , with a perpendicular 3. Practical examples , exercising the rules in ...
Page 17
... applied to a larger scale of chords as appears by Fig . III . ( F ) Equal Parts . The divisions of the line AC to form the miles of longitude may be considered as a scale of equal parts , and on some plain scales are laid down as such ...
... applied to a larger scale of chords as appears by Fig . III . ( F ) Equal Parts . The divisions of the line AC to form the miles of longitude may be considered as a scale of equal parts , and on some plain scales are laid down as such ...
Page 18
... applied it to the two feet rulers , or rather to the cross - staff . Wingate drew the logarithms on two separate rulers sliding against each other , to save the use of compasses . Oughtred applied the logarithms to concentric circles ...
... applied it to the two feet rulers , or rather to the cross - staff . Wingate drew the logarithms on two separate rulers sliding against each other , to save the use of compasses . Oughtred applied the logarithms to concentric circles ...
Other editions - View all
An Introduction to the Theory and Practice of Plain and Spherical ... Thomas Keith No preview available - 2017 |
An Introduction to the Theory and Practice of Plain and Spherical ... Thomas Keith No preview available - 2014 |
Common terms and phrases
acute adjacent angle altitude angle CAB Answer apparent altitude azimuth base centre circle co-tangent complement CONSTRUCTION cosec cosine degrees diff draw ecliptic equation Euclid find the angle formulæ given angle given side Given The side greater half the sum Hence horizon hypoth hypothenuse latitude less line of numbers line of sines logarithm logarithmical sine longitude measured meridian miles moon's Nautical Almanac North oblique observed obtuse opposite angle parallax parallel perpendicular Plate pole primitive PROPOSITION quadrant Rad x sine rad² radius right ascension right-angled spherical triangle RULE scale of chords scale of equal SCHOLIUM secant semi-tangents side AC sine A sine sine BC sine of half sine² species spherical angle spherical triangle ABC star star's straight line subtract sun's declination supplement tang tang AC tangent of half three sides Trigonometry versed sine
Popular passages
Page 25 - The circumference of every circle is supposed to be divided into 360 equal parts, called degrees ; each degree into 60 equal parts, called minutes ; and each minute into 60 equal parts, called seconds.
Page 136 - Consequently, a line drawn from the vertex of an isosceles triangle to the middle of the base, bisects the vertical angle, and is perpendicular to the base.
Page 6 - And if the given number be a proper vulgar fraction ; subtract the logarithm of the denominator from the logarithm of the numerator, and the remainder will be the logarithm sought ; which, being that of a decimal fraction, must always have a negative index.
Page xxvi - A New Treatise on the Use of the Globes; or, a Philosophical View of the Earth and Heavens : comprehending an Account of the Figure, Magnitude, and Motion of the Earth : with the Natural Changes of its Surface, caused by Floods, Earthquakes, Ac.
Page 32 - The CO-SINE of an arc is the sine of the complement of that arc as L.
Page 31 - The sine, or right sine, of an arc, is the line drawn from one extremity of the arc, perpendicular to the diameter passing through the other extremity. Thus, BF is the sine of the arc AB, or of the arc BDE.
Page 240 - The HORIZON is a great circle which separates the visible half of the heavens from the invisible ; the earth being considered as a point in the centre of the sphere of the fixed stars.
Page 240 - ... ZENITH DISTANCE of any celestial object is the arc of a vertical circle, contained between the centre of that object and the zenith ; or it is what the altitude of the object wants of 90 degrees.
Page 197 - The sum of the two sides of a triangle is to their difference as the tangent of half the sum of the angles at the base is to the tangent of half their difference.
Page 32 - The SECANT of an arc, is a straight line drawn from the center, through one end of the arc, and extended to the tangent which is drawn from the other end.