Treatise on Plane and Solid Geometry: For Colleges, Schools and Private Students : Written for the Mathematical Course of Joseph RaySargent, Wilson & Hinkle, 1864 - 276 sider |
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Side iii
... direction , which is , in- deed , the essence of form . This thought , employed in all these leading definitions , adds clearness to the science and simplicity to the study . In the present work , it is sought to combine these ideas ...
... direction , which is , in- deed , the essence of form . This thought , employed in all these leading definitions , adds clearness to the science and simplicity to the study . In the present work , it is sought to combine these ideas ...
Side v
... 11 12 DEFINITIONS , 17 POSTULATES OF EXTENT AND FORM , 19 CLASSIFICATION OF LINES ,. 22 AXIOMS OF DIRECTION AND DISTANCE , 23 CLASSIFICATION OF SURFACES , DIVISION OF THE SUBJECT , 24 26 PART SECOND . - PLANE GEOMETRY . CHAPTER III . ( v )
... 11 12 DEFINITIONS , 17 POSTULATES OF EXTENT AND FORM , 19 CLASSIFICATION OF LINES ,. 22 AXIOMS OF DIRECTION AND DISTANCE , 23 CLASSIFICATION OF SURFACES , DIVISION OF THE SUBJECT , 24 26 PART SECOND . - PLANE GEOMETRY . CHAPTER III . ( v )
Side 20
... directions of the points . Every change of form consists in changing the relative directions of the points of the figure . Every geometrical conception , however simple or com- plex , is composed of only two kinds of elementary thoughts ...
... directions of the points . Every change of form consists in changing the relative directions of the points of the figure . Every geometrical conception , however simple or com- plex , is composed of only two kinds of elementary thoughts ...
Side 23
... direction , and of any extent . These two propositions are corollaries of the post- ulates . 49. From a point , straight lines may extend in all directions . But we can not conceive that two separate straight lines can have the same ...
... direction , and of any extent . These two propositions are corollaries of the post- ulates . 49. From a point , straight lines may extend in all directions . But we can not conceive that two separate straight lines can have the same ...
Side 24
... direction , determine the position of a straight line . 53. If a straight line were turned upon two of its points as ... direction . A PLANE is a surface which never varies in direction . A CURVED SURFACE is one in which there is a ...
... direction , determine the position of a straight line . 53. If a straight line were turned upon two of its points as ... direction . A PLANE is a surface which never varies in direction . A CURVED SURFACE is one in which there is a ...
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Treatise on Plane and Solid Geometry for Colleges, Schools, and Private Students Eli Todd Tappan Uten tilgangsbegrensning - 1873 |
Treatise on Plane and Solid Geometry: For Colleges, Schools, and Private ... Eli Todd Tappan Ingen forhåndsvisning tilgjengelig - 2017 |
Treatise on Plane and Solid Geometry: For Colleges, Schools, and Private ... Eli Todd Tappan Ingen forhåndsvisning tilgjengelig - 2016 |
Vanlige uttrykk og setninger
adjacent angles altitude angles are equal angles equal angles formed apothem arc BD bisect called chord circle circumference circumscribed coincide cone Corollary Corollary.-The Corollary.-When demonstration diagonals diameter dicular distance divided edges equal angles equally distant equivalent extend exterior angles faces figure four right angles frustum geometry given angle given line given point given straight line given triangle gles greater Hence homologous lines hypotenuse inscribed inscribed angle intersection isosceles triangle less let fall measured by half number of sides opposite sides parallel lines parallelogram parallelopiped perimeter perpen perpendicular plane polyedral polyedron prism Problem.-To draw PROBLEMS IN DRAWING produced proportional pyramid quadrilateral radii radius ratio rectangle regular polygon respectively equal rhombus right angled triangle secant similar triangles similarly arranged slant hight sphere spherical square described tangent tetraedrons theorem Theorem.-The triangle ABC triangles are equal triedral vertex vertices
Populære avsnitt
Side 98 - If two triangles have two sides of the one respectively equal to two sides of the other, and the included angles unequal, the triangle which has the greater included angle has the greater third side.
Side 52 - A circle is a plane figure bounded by a curved line, every point of which is equally distant from a point within called the center.
Side 141 - The square described on the hypothenuse of a right-angled triangle is equivalent to the sum of the squares described on the other two sides.
Side 263 - The area of the surface of a sphere is equal to the area of the...
Side 258 - The sum of the angles of a spherical triangle is greater than two and less than six right angles ; that is, greater than 180° and less than 540°. (gr). If A'B'C' is the polar triangle of ABC...
Side 137 - The squa/re described on the difference of two straight lines is equivalent to the sum of the squares described on the two lines, diminished by twice the rectangle contained by the lines.
Side 227 - ... the two planes are equal polygons. Each side of one of the sections is parallel to the corresponding side of the other section, since they are the intersections of two parallel planes by a third. Hence, that portion of each side of the prism which is between the secant planes, is a parallelogram. Since the sections have their sides respectively equal and parallel, their angles are respectively equal. Therefore, the polygons are equal. 674. Corollary — The section of a prism made by a plane...
Side 237 - The volume of any prism is equal to the product of its base by its altitude. Let V denote the volume, B the base, and H the altitude of the prism DA'.
Side 191 - Theorem. — The intersections of two parallel planes by a third plane are parallel lines. Let AB and CD be the intersections of the two parallel planes M and N, with the plane P.
Side 251 - Every section of a sphere, made by a plane, is a circle, Let AMB be a section, made by a plane, in the sphere whose centre is C.