First Lessons in Geometry: With Practical Applications in Mensuration, and Artificers' Work and Mechanics |
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Page 26
... pentagon . 5 A polygon of six sides , is called a hexagon . 6. A polygon of seven sides , is called a heptagon . 7. A polygon of eight sides , is called an octagon . S. A polygon of nine sides , is called a nonagon . QUEST . - 2 . What ...
... pentagon . 5 A polygon of six sides , is called a hexagon . 6. A polygon of seven sides , is called a heptagon . 7. A polygon of eight sides , is called an octagon . S. A polygon of nine sides , is called a nonagon . QUEST . - 2 . What ...
Page 65
... pentagon ABCDE , terminates in an equal and paral- lel pentagon FGHIK , which is called the upper base . The side F A K. I ΤΗ E D B C faces of the prism are the parallelograms_ DH , DK , EF , AG and BH . These are called the convex or ...
... pentagon ABCDE , terminates in an equal and paral- lel pentagon FGHIK , which is called the upper base . The side F A K. I ΤΗ E D B C faces of the prism are the parallelograms_ DH , DK , EF , AG and BH . These are called the convex or ...
Page 66
... pentagon , a pentagonal prism : if a hexagon it is called a hexagonal prism , & c . 8. A prism whose base is a parallelogram , and all of whose faces are also parallelograms , is called a parallelopipedon . If all the faces are ...
... pentagon , a pentagonal prism : if a hexagon it is called a hexagonal prism , & c . 8. A prism whose base is a parallelogram , and all of whose faces are also parallelograms , is called a parallelopipedon . If all the faces are ...
Page 69
... pentagon , it is called a pentagonal pyramid - if the base is a hexagon , it is called a hexagonal pyramid , & c . 16. In every prism , the sections formed by parallel planes , are equal polygons . Thus , if the prism , whose base is ...
... pentagon , it is called a pentagonal pyramid - if the base is a hexagon , it is called a hexagonal pyramid , & c . 16. In every prism , the sections formed by parallel planes , are equal polygons . Thus , if the prism , whose base is ...
Page 113
... pentagon . 38. For the decagon , bisect the arcs which subtend the sides of the pentagon , and join the points of bisection ; and the lines so drawn will form the regular decagon . QUEST . - 37 . Explain the manner of inscribing a ...
... pentagon . 38. For the decagon , bisect the arcs which subtend the sides of the pentagon , and join the points of bisection ; and the lines so drawn will form the regular decagon . QUEST . - 37 . Explain the manner of inscribing a ...
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Common terms and phrases
12 feet 20 feet acres altitude bisect bounded by Planes breadth called centre of gravity chord circular sector circumfer circumference cone convex surface cubic feet cubic foot cubic inches cylinder decimal diagonals diameter distance divide draw equilateral triangle EXAMPLES Explain the manner feet 6 inches figure find the area find the solidity frustum given angle given line given point gles half hypothenuse intersect line be drawn linear unit lower base manner of inscribing Mensuration of Surfaces multiplied number of square parallel planes parallelogram parallelopipedon pentagon pentagonal pyramid perpendicular Practical Geometry.-Problems PROBLEM pulley pyramid radius rectangle regular polygon regular solids Required the area rhombus right angled triangle Round Bodies RULE scale of equal secant line segment similar polygons similar triangles slant height solid content solid feet Solids bounded specific gravity sphere square feet square yards straight line tangent thickness upper base weight
Popular passages
Page 20 - Every circumference of a. circle, whether the circle be large or small, is supposed to be divided into 360 equal parts called degrees. Each degree is divided into 60 equal parts called minutes, and each minute into 60 equal parts called seconds.
Page 32 - The area of a rectangle is equal to the product of its base and altitude. Given R a rectangle with base b and altitude a. To prove R = a X b. Proof. Let U be the unit of surface. .R axb U' Then 1x1 But - is the area of R.
Page 40 - Similar triangles are to each other as the squares described on their homologous sides. Let ABC, DEF be two similar triangles...
Page 82 - A zone is a portion of the surface of a sphere included between two parallel planes.
Page 235 - An equilibrium is produced in all the levers, when the weight multiplied by its distance from the fulcrum is equal to the product of the power multiplied by its distance from the fulcrum. That...
Page 84 - The convex surface of a cylinder is equal to the circumference of its base multiplied by its altitude.
Page 34 - The area of a triangle is equal to half the product of the base and height.
Page 35 - 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 in all their parts." Axiom 1. "Things which are equal to the same thing, are equal to each other.
Page 20 - For this purpose it is divided into 360 equal parts, called degrees, each degree is divided into 60 equal parts called minutes, and each minute into 60 equal parts called seconds. The degrees, minutes, and seconds, are marked thus, °, ', " ; and 9° 18' 10", are read, 9 degrees, 18 minutes, and 10 seconds.
Page 83 - The surface of a sphere is equal to the product of its diameter by the circumference of a great circle.