## Elements of Geometry, Geometrical Analysis, and Plane Trigonometry: With an Appendix, Notes and IllustrationsJames Ballantyne and Company, 1809 - 493 pages |

### From inside the book

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Page 125

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**decagon**. Let AB be the straight line , on which it is required to describe a regular**decagon**. On AB construct an isosceles triangle having each of the angles at its base double of the vertical angle ( IV . 4. ) , and about the point O ... Page 140

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**decagon**in a given circle . Let ADH be a circle , in which it is required to inscribe a regular**decagon**. Draw the radius OA , and with OA as its side describe the isosceles triangle AOB , having each of its angles at the base double of ... Page 141

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**decagon**. Let ABCDEF be a portion of a**decagon**inscribed in a circle , of which AF is the diameter ; the square of AC , the side of the inscribed pentagon , is equivalent to the square of AB the side of the inscribed**decagon**and the ... Page 142

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**decagon**, is equal to the sides AO and AB of the inscribed hexagon and deca- gon . For AO being equal to DO , the angle OAD is equal to ODA ( I. 8. ) ; but OAD , or FAD , is equal to the angle DOC ( III . 19. ) , and consequently the ... Page 143

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**decagon**, and AD the side of a hexagon inscribed ; the arc BD will be the fifteenth part of the circumference of the circle , and DC the thirtieth part . For , if the circumference were divided into thirty equal portions , the arc AB ...### Other editions - View all

### Common terms and phrases

ABCD ANALYSIS angle ABC angle ACB angle BAC bisect centre chord circumference COMPOSITION conse consequently the angle decagon describe a circle diameter distance diverging lines drawn equal to BC exterior angle fall the perpendicular given angle given circle given in position given point given ratio given space given straight line greater hence hypotenuse inflected inscribed intercepted intersection isosceles triangle join let fall mean proportional parallel perpendicular point F polygon porism PROB PROP quently radius rectangle rectangle contained regular polygon rhomboid right angles right-angled triangle Scholium segments semicircle semiperimeter sequently side AC similar sine square of AB square of AC tangent THEOR triangle ABC twice the square vertex vertical angle whence wherefore

### Popular passages

Page 28 - ... if a straight line, &c. QED PROPOSITION 29. — Theorem. If a straight line fall upon two parallel straight lines, it makes the alternate angles equal to one another ; and the exterior angle equal to the interior and opposite upon the same side ; and likewise the two interior angles upon the same side together equal to two right angles.

Page 147 - The first and last terms of a proportion are called the extremes, and the two middle terms are called the means.

Page 92 - THE angle at the centre of a circle is double of the angle at the circumference, upon the same base, that is, upon the same

Page 458 - The first of four magnitudes is said to have the same ratio to the second, which the third has to the fourth, when any equimultiples whatsoever of the first and third being taken, and any equimultiples whatsoever of the second and fourth ; if the multiple of the first be less than that of the second, the multiple of the third is also less than that of the fourth...

Page 99 - ... a circle. The angle in a semicircle is a right angle; the angle in a segment greater than a semicircle is less than a right angle; and the angle in a segment less than a semicircle is greater than a right angle. The opposite angles of any quadrilateral inscribed in a circle are supplementary; and the converse.

Page 155 - Componendo, by composition ; when there are four proportionals, and it is inferred that the first together with the second, is to the second, as the third together with the fourth, is to the fourth.

Page 408 - C' (89) (90) (91) (92) (93) 112. In any plane triangle, the sum of any two sides is to their difference as the tangent of half the sum of the opposite angles is to the tangent of half their difference.

Page 16 - PROP. V. THEOR. The angles at the base of an isosceles triangle are equal to one another; and if the equal sides be produced, the angles -upon the other side of the base shall be equal. Let ABC be an isosceles triangle, of which the side AB is equal to AC, and let the straight lines AB, AC, be produced to D and E: the angle ABC shall be equal to the angle ACB, and the angle...

Page 36 - All the interior angles of any rectilineal figure, together with four right angles, are equal to twice as many right angles as the figure has sides.

Page 60 - Prove, geometrically, that the rectangle of the sum and the difference of two straight lines is equivalent to the difference of the squares of those lines.