Trigonometry, Plane and Spherical: With the Construction and Application of LogarithmsKimber and Conrad, 1810 - 125 páginas |
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... centre , which it subtends . Note . The degrees , minutes , seconds , & c . contained in any arch , or angle , are written in this manner , 50 ° 18 ′ 35 ′′ , which signifies that the given arch , or angle , contains 50 degrees , 18 ...
... centre , which it subtends . Note . The degrees , minutes , seconds , & c . contained in any arch , or angle , are written in this manner , 50 ° 18 ′ 35 ′′ , which signifies that the given arch , or angle , contains 50 degrees , 18 ...
Página 5
... centre , which it subtends . Note . The degrees , minutes , seconds , & c . contained in any arch , or angle , are written in this manner , 50 ° 18 ′ 35 ′′ , which signifies that the given arch , or angle , contains 50 degrees , 18 ...
... centre , which it subtends . Note . The degrees , minutes , seconds , & c . contained in any arch , or angle , are written in this manner , 50 ° 18 ′ 35 ′′ , which signifies that the given arch , or angle , contains 50 degrees , 18 ...
Página 6
... centre and the other extremity . Thus AG is the tangent of the arch AB . 10. The secant of an arch is a right line reaching , with- out the circle , from the centre to the extremity of the tan- gent . Thus CG is the secant of AB . 11 ...
... centre and the other extremity . Thus AG is the tangent of the arch AB . 10. The secant of an arch is a right line reaching , with- out the circle , from the centre to the extremity of the tan- gent . Thus CG is the secant of AB . 11 ...
Página 9
... centre A , with the radius AB , let a circle be described , intersecting CA , produced , in D and F ; so that CF may express the sum , and CD the difference of the sides AC and AB : join F , B and B , D , and draw DE parallel to FB ...
... centre A , with the radius AB , let a circle be described , intersecting CA , produced , in D and F ; so that CF may express the sum , and CD the difference of the sides AC and AB : join F , B and B , D , and draw DE parallel to FB ...
Página 26
... centre . 2. The axis of a circle is a right line passing through the centre of the sphere , perpendicular to the plane of the circle and the two points , where the axis intersects the sur- face of the sphere , are called the poles of ...
... centre . 2. The axis of a circle is a right line passing through the centre of the sphere , perpendicular to the plane of the circle and the two points , where the axis intersects the sur- face of the sphere , are called the poles of ...
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Términos y frases comunes
ABDP AC by Theor adjacent angle arch bisecting chord circle passing co-sine AC co-tangent of half common logarithm common section Comp describe the circle E. D. COROLLARY E. D. PROP equal to half extremes gent given angle given circle given point half the difference half the sum half the vertical Hence hyperbolic logarithm hypothenuse inclination intersect leg BC line of measures original circle parallel perpendicular plane of projection plane triangle ABC primitive PROB produced projected circle projected pole projecting point radius rectangle right line right-angled spherical triangle SCHOLIUM secant semi-tangents sides similar triangles sine 59 sine AC sine of half sphere spherical angle SPHERICAL PROJECTIONS spherical triangle ABC sum or difference tangent of half THEOREM THOMAS SIMPSON triangle ABC fig versed sine vertical angle whence
Pasajes populares
Página 69 - TO THEIR DIFFERENCE ; So IS THE TANGENT OF HALF THE SUM OF THE OPPOSITE ANGLES', To THE TANGENT OF HALF THEIR DIFFERENCE.
Página 79 - ... projection is that of a meridian, or one parallel thereto, and the point of sight is assumed at an infinite distance on a line normal to the plane of projection and passing through the center of the sphere. A circle which is parallel to the plane of projection is projected into an equal circle, a circle perpendicular to the plane of projection is projected into a right line equal in length to the diameter of the projected circle; a circle in any other position is projected into an ellipse, whose...
Página 25 - The cotangent of half the sum of the angles at the base, Is to the tangent of half their difference...
Página 28 - The rectangle of the radius, and sine of the middle part, is equal to the rectangle of the tangents of the two EXTREMES CONJUNCT, and to that of the cosines of the two EXTREMES DISJUNCT.
Página 7 - If the sine of the mean of three equidifferent arcs' dius being unity) be multiplied into twice the cosine of the common difference, and the sine of either extreme be deducted from the product, the remainder will be the sine of the other extreme. (B.) The sine of any arc above 60°, is equal to the sine of another arc as much below 60°, together with the sine of its excess above 60°. Remark. From this latter proposition, the sines below 60° being known, those...
Página 28 - In a right angled spherical triangle, the rectangle under the radius and the sine of the middle part, is equal to the rectangle under the tangents of the adjacent parts ; or', to the rectangle under the cosines of the opposite parts.