# Key to Milne's Plane and Solid Geometry (Google eBook)

American Book Company, 1899 - Geometry - 313 pages

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### Contents

 Section 1 3 Section 2 30 Section 3 62 Section 4 74 Section 5 95 Section 6 123 Section 7 133 Section 8 138
 Section 12 200 Section 13 220 Section 14 250 Section 15 261 Section 16 291 Section 17 293 Section 18 302 Section 19 309

 Section 9 143 Section 10 150 Section 11 159
 Section 20 317 Section 21 318

### Popular passages

Page 270 - If in a right triangle a perpendicular is drawn from the vertex of the right angle to the hypotenuse : I.
Page 14 - After remarking that the mathematician positively knows that the sum of the three angles of a triangle is equal to two right angles...
Page 71 - DE and on the same side of it ; but equal triangles on the same base, and on the same side of it, are between the same parallels ; [I.
Page 288 - ... that the angles which this straight line makes with the first three are together less than the sum, but greater than half the sum, of the angles which the first three make with each other.
Page 65 - O two perpendiculars OM and ON are drawn to the chords AB and CD respectively, and it is known that Z NMO = Z ONM. Prove that AB = CD. 5. Two circles intersect at the points A and B. Through A a variable secant is drawn, cutting the circles at C and D. Prove that the angle DBC is constant. 6. Let A and B be...
Page 208 - The section of a pyramid made by a plane parallel to the base is similar to the base.
Page 246 - If one of the equal sides of an isosceles triangle is produced through the vertex by its own length, the line joining the end of the side produced to the nearer end of the base is perpendicular to the base.
Page 146 - Three times the sum of the squares on the sides of a triangle is equal to four times the sum of the squares on the medians.
Page 121 - The perpendicular from any point of a circumference upon a chord is a mean proportional between the perpendiculars from the same point upon the tangents drawn at the extremities of the chord.
Page 262 - To construct a triangle, having given the base, the vertical angle, and the bisector of that angle.