Elements of Geometry and Trigonometry |
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Page 158
... determine the position of a plane . Hence , a triangle BAC , determines the posi- tion of a plane . Cor . 2. Hence , also , two paral- lels AB , CD , determine the posi- tion of a plane ; for , drawing the secant EF , the plane of the ...
... determine the position of a plane . Hence , a triangle BAC , determines the posi- tion of a plane . Cor . 2. Hence , also , two paral- lels AB , CD , determine the posi- tion of a plane ; for , drawing the secant EF , the plane of the ...
Page 168
... determining a plane , and the three will deter- mine three planes . Now , each line is perpendicular to the plane of the other two , and the three planes are perpen- dicular to each other . ་ PROPOSITION XVII . THEOREM . Conversely : If ...
... determining a plane , and the three will deter- mine three planes . Now , each line is perpendicular to the plane of the other two , and the three planes are perpen- dicular to each other . ་ PROPOSITION XVII . THEOREM . Conversely : If ...
Page 213
... determine the position of a plane . But if the two given points were at the extremi- ties of a diameter , these two points and the centre would then lie in one straight line , and an infinite number of great circles might be made to ...
... determine the position of a plane . But if the two given points were at the extremi- ties of a diameter , these two points and the centre would then lie in one straight line , and an infinite number of great circles might be made to ...
Page 239
... determine the third . Cor . 2. A spherical triangle may have two , or even three of its angles right angles ; also two , or even three of its angles obtuse . Cor . 3. If the triangle ABC is bi - rectan- gular , in other words , has two ...
... determine the third . Cor . 2. A spherical triangle may have two , or even three of its angles right angles ; also two , or even three of its angles obtuse . Cor . 3. If the triangle ABC is bi - rectan- gular , in other words , has two ...
Page 249
... determine certain other parts . When it is proposed to solve a geometrical problem by means of Algebra , the given parts are represented by the first letters of the alphabet , and the required parts by the final letters , and the ...
... determine certain other parts . When it is proposed to solve a geometrical problem by means of Algebra , the given parts are represented by the first letters of the alphabet , and the required parts by the final letters , and the ...
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Elements of Geometry and Trigonometry: From the Works of A. M. Legendre Adrien Marie Legendre,Charles Davies No preview available - 2016 |
Common terms and phrases
adjacent angles altitude angle ACB angle BAD bisect centre chord circ circumference circumscribed common comp cone consequently convex surface cos² Cosine Cosine D Cotang cylinder diagonal diameter distance divided draw drawn equations equivalent feet figure find the area frustum given angle given line gles greater hence homologous homologous sides hypothenuse included angle inscribed circle intersect less Let ABC let fall logarithm magnitudes measured by half middle point number of sides opposite parallel parallelogram parallelopipedon pendicular perimeter perpendicular plane MN polyedral angle polyedron PROBLEM PROPOSITION pyramid quadrant radii radius ratio rectangle regular polygon right angles right-angled triangle Scholium secant segment side BC similar sin² sine slant height solidity sphere spherical polygon spherical triangle square described straight line Tang tangent THEOREM triangle ABC triangular prism triedral angles vertex vertices ΙΟ
Popular passages
Page 24 - If two triangles have two sides and the included angle of the one, equal to two sides and the included angle of the other, each to each, the two triangles will be equal.
Page 38 - That, if a straight line falling on two straight lines make the interior angles on the same side less than two right angles, the two straight lines, if produced indefinitely, meet on that side on which are the angles less than the two right angles.
Page 227 - A spherical triangle is a portion of the surface of a sphere, bounded by three arcs of great circles.
Page 271 - The circumference of every circle is supposed to be divided into 360 equal parts, called degrees...
Page 43 - Hence, the interior angles plus four right angles, is equal to twice as many right angles as the polygon has sides, and consequently, equal to the sum of the interior angles plus the sum of the exterior angles.
Page 215 - The surface of a sphere is equal to the product of its diameter by the circumference of a great circle.
Page 107 - If two triangles have two angles of the one equal to two angles of the other, each to each, and also one side of the one equal to the corresponding side of the other, the triangles are congruent.
Page 93 - The area of a parallelogram is equal to the product of its base and altitude.
Page 231 - The angles of spherical triangles may be compared together, by means of the arcs of great circles described from their vertices as poles and included between their sides : hence it is easy to make an angle of this kind equal to a given angle.
Page 232 - F, be respectively poles of the sides BC, AC, AB. For, the point A being the pole of the arc EF, the distance AE is a 'quadrant ; the point C being the pole of the arc DE, the distance CE is likewise a quadrant : hence the point E is...