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accompanying adjacent adopted Appendix applied Bearing Blank Chart calculation Cape centre Changing chord circle circle which passes circle's arc circumference common construction Course Lat cross curve cutting described determined diff difference direction Dist distance draw drawn Earth edge equal Equator extremities geographical given places gives globe greater half Inclin Index points Inters intersection Intrs known Latitude of Vertex length lies Limit Long longitudes lower mark means measure meeting meridian Miles minutes Model opposite sides Panama parallel perpendicular plane points of intersection Polar Tracks poles portion position practice problem produced projection radius reckoned represents respective Rhumb line right angles route Rule Scale shews ship ship's place smaller solution sphere spherical Course spherical distance spherical triangle stages steering straight line sum reject supplement supposed surface Tables tracing transferred whole York
Page 36 - ... acute angle contained by that straight line, and another drawn from the point in which the first line meets the plane, to the point in which a perpendicular to the plane drawn from any point of the first line above the plane, meets the same plane.
Page 33 - A sphere is a solid figure described by the revolution of a semicircle about its diameter, which remains unmoved.
Page 35 - It will be seen (Prop. 2) that all circles, whether great or small, have two poles. 5. A spherical triangle is the portion of the surface of a sphere included by the arcs of three great circles.
Page 33 - Legendre's definition of the circumference of a circle as " a curved line, all the points of which are equally distant from an interior point, called the centre...
Page 38 - During an Eclipse of the Moon, the shadow of the Earth thrown on the moon is, in all positions of the Earth, circular.
Page 69 - I.) ; hence the sum of all the angles, both interior and exterior, is equal to twice as many right angles as there are sides to the polygon. But the sum of the interior angles alone, less four right angles, is equal to the same sum (Prop.
Page 57 - One latitude, course, and distance given, to find the. difference of latitude and difference of longitude. A. ship in the latitude of 42° 30' N., and longitude of 58° 51
Page 31 - NEW TABLES to facilitate the Practice of Great Circle Sailing, together with an Application of the Theory of the great Circle on the Globe to the sailing, and an Appendix, containing some mathematical demonstrations. Accompanied by a scale of great circles on a blank chart, to determine without calculation the great circle which passes through two given places, and to show the places at which the spherical courses expressed in fourths of the...
Page 34 - ... the perpendicular let fall from the centre O to the cutting plane ABD. 6. Great and small circles on a sphere. a. Definitions. The section in which a sphere is cut by a plane is called a Great Circle when the plane passes through the centre of the sphere ; the section is called a Small Circle when the cutting plane does not pass through the centre of the sphere. Thus, on a terrestrial globe the meridians and equator are great circles ; the parallels of latitude are small circles. The Axis of...