Elements of Geometry, Part 1Harper & Brothers, 1896 - Geometry |
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Page 35
... decagon , of ten , a dodecagon , of twelve , a pentedecagon , of fifteen . 68. Exercise . The sum of the angles of a quadrilateral equals what ? of a pentagon ? of a hexagon ? PROPOSITION XVII . THEOREM 69. If the sides of any polygon ...
... decagon , of ten , a dodecagon , of twelve , a pentedecagon , of fifteen . 68. Exercise . The sum of the angles of a quadrilateral equals what ? of a pentagon ? of a hexagon ? PROPOSITION XVII . THEOREM 69. If the sides of any polygon ...
Page 211
... decagon . Divide a radius OA internally in extreme and mean ratio , i . e . , so that OA OX = OX XA § 335 With A as a centre and OX as a radius , describe an arc cutting the circumference at B. AB is a side of the required regular ...
... decagon . Divide a radius OA internally in extreme and mean ratio , i . e . , so that OA OX = OX XA § 335 With A as a centre and OX as a radius , describe an arc cutting the circumference at B. AB is a side of the required regular ...
Page 231
... decagon . ( 2. ) What is the area of a regular pentagon inscribed in a circle whose radius is 12 cm . ? ( 3. ) If the side of a regular hexagon is 10 m . , find the number of square feet in its area . ( 4. ) Find the area of a regular ...
... decagon . ( 2. ) What is the area of a regular pentagon inscribed in a circle whose radius is 12 cm . ? ( 3. ) If the side of a regular hexagon is 10 m . , find the number of square feet in its area . ( 4. ) Find the area of a regular ...
Page 232
... decagon . A B CRR D ( 10. ) What is the apothem of the above decagon ? ( 11. ) Find the side of a regular hexagon circumscribed about a circle whose radius is R. E A B D F M ( 12. ) If the radius of a circle is R , prove that the area ...
... decagon . A B CRR D ( 10. ) What is the apothem of the above decagon ? ( 11. ) Find the side of a regular hexagon circumscribed about a circle whose radius is R. E A B D F M ( 12. ) If the radius of a circle is R , prove that the area ...
Page 234
... seg- ment subtended by the side of ( a ) an inscribed equilateral triangle , ( b ) an inscribed regular octagon , ( c ) an inscribed regular decagon . EXERCISES BOOK I PROBLEMS OF DEMONSTRATION 1. The bisector of 234 PLANE GEOMETRY.
... seg- ment subtended by the side of ( a ) an inscribed equilateral triangle , ( b ) an inscribed regular octagon , ( c ) an inscribed regular decagon . EXERCISES BOOK I PROBLEMS OF DEMONSTRATION 1. The bisector of 234 PLANE GEOMETRY.
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Common terms and phrases
ABCD adjacent angles altitude angles are equal angles of parallel apothem assigned quantity bisecting centre chord circumference circumscribed circle coincide decagon diagonals diameter distance divided Draw equal circles equilateral triangle Exercise exterior angle figure Find the area GEOMETRY given circle given line given point given straight line GIVEN TO PROVE given triangle GIVEN-the Hence homologous sides hypotenuse included angle intersection isosceles triangle length line parallel lines are parallel locus mean proportional measured by arc middle points number of sides opposite sides parallel axiom parallel to BC parallelogram perimeter PLANE GEOMETRY Q. E. D. PROPOSITION quadrilateral radii ratio of similitude rectangle regular inscribed regular polygon right angles right triangle segment similar polygons straight line joining tangent THEOREM third side third straight line triangle ABC triangle whose sides triangles are equal unequal vertex vertices
Popular passages
Page 248 - The area of a regular inscribed hexagon is a mean proportional between the areas of the inscribed and circumscribed equilateral triangles.
Page 215 - The areas of two regular polygons of the same number of sides are to each other as the squares of their radii or as the squares of their apothems.
Page 63 - To draw a straight line through a given point parallel to a given straight line. Let A be the given point, and BC the given straight line ; it is required to draw a straight line through the point A, parallel to the straight hue BC. In BC take any point D, and join AD; and at the point A, in the straight line AD, make (I.
Page 49 - If, from a point within a triangle, two straight lines are drawn to the extremities of either side, their sum will be less than the sum of the other two sides of the triangle.
Page 148 - In any obtuse triangle, the square of the side opposite the obtuse angle is equal to the sum of the squares of the other two sides, increased by twice the product of one of these sides and the projection of the other side upon it.
Page 47 - ... the third side of the first is greater than the third side of the second.
Page 149 - Sines that the bisector of an angle of a triangle divides the opposite side into parts proportional to the adjacent sides.
Page 47 - If two triangles have two sides of one equal respectively to two sides of the other...
Page 100 - At a given point in a straight line to erect a perpendicular to that line. Let AB be the straight line, and let c D be a given point in it.
Page 140 - If in a right triangle a perpendicular is drawn from the vertex of the right angle to the hypotenuse : I.