A Treatise on Plane and Spherical Trigonometry: With Their Most Useful Practical Applications |
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Page 24
... adjacent to that angle to the leg opposite to it ; and vice versâ . Or , As radius is to the cotangent of either of the acute angles , so is the leg opposite to that angle to the leg adjacent to it ; and vice versâ ( m ) . It may also ...
... adjacent to that angle to the leg opposite to it ; and vice versâ . Or , As radius is to the cotangent of either of the acute angles , so is the leg opposite to that angle to the leg adjacent to it ; and vice versâ ( m ) . It may also ...
Page 25
... adjacent to that angle to the hypothenuse . Or , As radius is to the cosecant of either of the acute angles , so is the leg opposite to that angle to the hypothenuse . But the rule for this case is as readily performed by the sines and ...
... adjacent to that angle to the hypothenuse . Or , As radius is to the cosecant of either of the acute angles , so is the leg opposite to that angle to the hypothenuse . But the rule for this case is as readily performed by the sines and ...
Page 90
... angle is said to be opposite to another angle or leg , it will be adjacent to the remaining one ; and vice versâ ( a ) . AFFECTIONS OF RIGHT - ANGLED SPHERICAL TRIANGLES . 1. The legs are of the same kind as their opposite angles ; and ...
... angle is said to be opposite to another angle or leg , it will be adjacent to the remaining one ; and vice versâ ( a ) . AFFECTIONS OF RIGHT - ANGLED SPHERICAL TRIANGLES . 1. The legs are of the same kind as their opposite angles ; and ...
Page 91
... adjacent angle , or the two legs , or the two angles , are like or unlike . 3. A leg is less or greater than 90 ° , according as its adjacent angle and the hypothenuse , or the other leg and the hypothenuse , are like or unlike . 4. An ...
... adjacent angle , or the two legs , or the two angles , are like or unlike . 3. A leg is less or greater than 90 ° , according as its adjacent angle and the hypothenuse , or the other leg and the hypothenuse , are like or unlike . 4. An ...
Page 96
... adjacent angle are given , to find the rest . 1. To find the other leg . As cot given tan other leg . sin adjacent , or given leg :: rad : Which leg is like its opposite 2 . 2. To find the other L. As rad sin given :: cos adjacent , or ...
... adjacent angle are given , to find the rest . 1. To find the other leg . As cot given tan other leg . sin adjacent , or given leg :: rad : Which leg is like its opposite 2 . 2. To find the other L. As rad sin given :: cos adjacent , or ...
Other editions - View all
A Treatise on Plane and Spherical Trigonometry: With Their Most Useful ... John Bonnycastle No preview available - 2014 |
A Treatise on Plane and Spherical Trigonometry: With Their Most Useful ... John Bonnycastle No preview available - 2018 |
Common terms and phrases
acute adjacent angle altitude ambiguous centre chord of 60 comp complement cos² cosec cosine describe a circle diff difference distance draw the diameters ecliptic equal Example Extend the compasses extent will reach find the rest formulæ given leg given side Given The side greater than 90 Greenwich height horizon hypothenusal angle latitude less than 90 logarithms longitude meridian moon's object oblique-angled spherical triangle observed obtuse opposite angle parallax perpendicular points pole quadrantal spherical triangle radius required to find right ascension right-angled spherical triangle RULE scale of chords semitangent side A B side B C side is less sides and angles sin a sin sin² sines sphere spherical triangle A B C spherical trigonometry star subtracted sun's declination supplement tangents THEOREM three angles three sides trigonometry whence yards
Popular passages
Page 1 - 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 9 - ... for the second term, and the greater for the first ; and in either case multiply the second and third terms together, and divide the product by the first for the answer, which will always be of the same denomination as the third term.
Page 352 - 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.
Page 388 - The sum of any two sides of a spherical triangle is greater than the third side, and their difference is less than the third side.
Page vii - The rectangle contained by the diagonals of a quadrilateral inscribed in a circle is equal to the sum of the two rectangles contained by its opposite sides.
Page 17 - To find the other side: — as the sum of the two given sides is to their difference, so is the tangent of half the sum of their opposite angles to the tangent of half their difference...
Page 20 - As the base or sum of the segments Is to the sum of the other two sides, So is the difference of those sides To the difference of the segments of the base.
Page 8 - C 76° 45i'. 2. Given the three sides 58, 39, and 46 ; to find the angles. 173. Any right lined figure whatever, whose sides and angles are given, may be constructed, by laying down the sides from a scale of equal parts, and the angles from a line of chords. Ex. Given the sides AB (Fig.
Page 3 - Sine, or Right Sine, of an arc, is the line drawn from one extremity of the arc, perpendicular to the diameter which passes through the other extremity. Thus, BF is the sine of the arc AB, or of the supplemental arc BDE.
Page 411 - From the logarithm of the area of the triangle, taken as a plane one, in feet, subtract the constant log 9-3267737, then the remainder is the logarithm of the excess above 180°, in seconds nearly.* 3.