Treatise on Geometry and Trigonometry: For Colleges, Schools and Private Students |
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Page v
... CLASSIFICATION OF SURFACES , 24 DIVISION OF THE SUBJECT , 26 PART SECOND . - PLANE GEOMETRY . CHAPTER III . PROBLEMS , BROKEN LINES , ANGLES , STRAIGHT LINES . 28 31 32 PAGE . PERPENDICULAR AND OBLIque Lines , 38 PARALLEL LINES ( v )
... CLASSIFICATION OF SURFACES , 24 DIVISION OF THE SUBJECT , 26 PART SECOND . - PLANE GEOMETRY . CHAPTER III . PROBLEMS , BROKEN LINES , ANGLES , STRAIGHT LINES . 28 31 32 PAGE . PERPENDICULAR AND OBLIque Lines , 38 PARALLEL LINES ( v )
Page vi
... PARALLELOGRAMS , 123 MEASURE OF AREA , . 128 EQUIVALENT SURFACES , 135 CHAPTER VII . POLYGONS . GENERAL PROPERTIES OF POLYGONS , SIMILAR POLYGONS , • 143 147 • REGULAR POLYGONS , ISOPERIMETRY , CHAPTER VIII . CIRCLES . vi CONTENTS .
... PARALLELOGRAMS , 123 MEASURE OF AREA , . 128 EQUIVALENT SURFACES , 135 CHAPTER VII . POLYGONS . GENERAL PROPERTIES OF POLYGONS , SIMILAR POLYGONS , • 143 147 • REGULAR POLYGONS , ISOPERIMETRY , CHAPTER VIII . CIRCLES . vi CONTENTS .
Page 17
... surface . A surface is like a solid in having only these two properties , extent and form ; but a surface differs from a solid in having no thickness or depth , so that a solid has one kind of extent which a surface has not . As solids and ...
... surface . A surface is like a solid in having only these two properties , extent and form ; but a surface differs from a solid in having no thickness or depth , so that a solid has one kind of extent which a surface has not . As solids and ...
Page 18
... surfaces may meet or cut each other . 29. The limits or boundaries of a surface are lines . The intersection of two surfaces , being the limit of the parts into which each divides the other , is a line . A line has these two properties ...
... surfaces may meet or cut each other . 29. The limits or boundaries of a surface are lines . The intersection of two surfaces , being the limit of the parts into which each divides the other , is a line . A line has these two properties ...
Page 19
... surfaces , or solids , which do not extend beyond the limits of the smallest spot which represents a point ; or , we may conceive them of such extent as to reach across the universe . The astronomer knows that his lines reach to the ...
... surfaces , or solids , which do not extend beyond the limits of the smallest spot which represents a point ; or , we may conceive them of such extent as to reach across the universe . The astronomer knows that his lines reach to the ...
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Common terms and phrases
adjacent angles altitude angles equal apothem axis base bisect chord circle circumference circumscribed coincide cone Corollary Corollary.-The cosine Cotang curved surface cylinder demonstrated diagonals diameter dicular diedral angles diedral whose edge distance divided draw equal angles equally distant equivalent faces figure formula four right angles frustum functions Geometry given angle given line given point given straight line given triangle gles greater Hence homologous lines hypotenuse included angle inscribed intersection Join less let fall logarithm mantissa number of sides opposite sides parallel lines parallelogram parallelopiped perimeter perpen perpendicular polyedral prism Problem.-Given proportional pyramid quadrilateral radii radius ratio regular polygon respectively equal right angled triangle secant similar similarly arranged sine slant hight sphere spherical excess spherical polygon spherical triangle square student subtracting symmetrical Tang tangent tetraedrons theorem Theorem.-The triedral vertex vertices
Popular passages
Page 98 - If two triangles have two sides of the one equal to two sides of the...
Page 182 - ... the plane at equal distances from the foot of the perpendicular, are equal...
Page 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.
Page 91 - Conversely, if two angles of a triangle are equal, the sides opposite them are also equal, and the triangle is isosceles.
Page 84 - If a circle have any number of equal chords, what is the locus of their points of bisection? 21. If any point, not the center, be taken in a diameter of a circle, of all the chords which can pass through that point, that one is the least which is at right angles to the diameter. 22. If from any point there extend two lines tangent to a circumference, the angle contained by the tangents is double the angle contained by the line joining the points of contact and the radius extending to one of them....
Page 117 - ABC, so that DE shall be equal to the difference of BD and CE. 22. In a given circle, to inscribe a triangle similar to a given triangle. 23. In a given circle, find the locus of the middle points of those chords which pass through a given point. 25. If a line bisects an exterior angle of a triangle, it divides the base produced into segments ^A which are proportional to the adjacent sides.
Page 307 - The sum of any two sides of a triangle is to their difference, as the tangent of half the sum of the angles opposite to those sides, to the tangent of half their difference.
Page 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'.
Page 233 - The volume of a rectangular parallelepiped is equal to the product of its three dimensions.
Page 126 - Theorem. — Two parallelograms are equal when two adjacent sides and the included angle in the one, are respectively equal to those parts in the other.