Elements of Plane and Solid GeometryGinn, Heath, 1877 - 398 σελίδες |
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Σελίδα 37
... ISOSCELES . EQUILATERAL . 83. DEF . A Scalene triangle is one of which no two sides are equal . 84. DEF . An Isosceles triangle is one of which two sides are equal . 85. DEF . An Equilateral triangle is one of which the three sides are ...
... ISOSCELES . EQUILATERAL . 83. DEF . A Scalene triangle is one of which no two sides are equal . 84. DEF . An Isosceles triangle is one of which two sides are equal . 85. DEF . An Equilateral triangle is one of which the three sides are ...
Σελίδα 46
... acute angle of the one are equal respectively to an homologous side and acute angle of the other . of the one are equal of the other ) . Q. E. D. PROPOSITION XXVIII . THEOREM . 112. In an isosceles triangle 46 BOOK I. GEOMETRY .
... acute angle of the one are equal respectively to an homologous side and acute angle of the other . of the one are equal of the other ) . Q. E. D. PROPOSITION XXVIII . THEOREM . 112. In an isosceles triangle 46 BOOK I. GEOMETRY .
Σελίδα 47
George Albert Wentworth. PROPOSITION XXVIII . THEOREM . 112. In an isosceles triangle the angles opposite the equal sides are equal . C B E Let ABC be an isosceles triangle , having the sides AC and CB equal . We are to prove LA ZB ...
George Albert Wentworth. PROPOSITION XXVIII . THEOREM . 112. In an isosceles triangle the angles opposite the equal sides are equal . C B E Let ABC be an isosceles triangle , having the sides AC and CB equal . We are to prove LA ZB ...
Σελίδα 48
... isosceles triangle divides the triangle into two equal triangles , is perpendicular to the base , and bisects the base . C Let the line CE bisect the ACB of the isosceles ДАСВ . We are to prove = I. AACE ABCE ; II . line CEL to AB ; III ...
... isosceles triangle divides the triangle into two equal triangles , is perpendicular to the base , and bisects the base . C Let the line CE bisect the ACB of the isosceles ДАСВ . We are to prove = I. AACE ABCE ; II . line CEL to AB ; III ...
Σελίδα 49
... isosceles . B D C In the triangle ABC , let the △ B = ≤ C. We are to prove = AB AC . Draw A D 1 to BC . In the rt . A ADB and A DC , AD = AD , LB = LC , .. rt . △ A D B = rt . △ A DC , Iden . $ 111 ( having a side and an acute of ...
... isosceles . B D C In the triangle ABC , let the △ B = ≤ C. We are to prove = AB AC . Draw A D 1 to BC . In the rt . A ADB and A DC , AD = AD , LB = LC , .. rt . △ A D B = rt . △ A DC , Iden . $ 111 ( having a side and an acute of ...
Άλλες εκδόσεις - Προβολή όλων
Συχνά εμφανιζόμενοι όροι και φράσεις
A B C D AABC ABCD altitude apothem arcs A B axis base and altitude centre centre of symmetry chord circumference circumscribed coincide conical surface COROLLARY cylinder denote diagonals diameter dihedral angle distance divided draw equal respectively equally distant equilateral equivalent frustum given point Hence homologous sides hypotenuse intersection isosceles lateral area lateral edges lateral faces Let A B Let ABC line A B measured by arc middle point number of sides opposite parallel lines parallelogram parallelopiped perimeter perpendicular plane MN polyhedral angle prove Q. E. D. PROPOSITION radii ratio rect rectangles regular inscribed regular polygon right angles right section SCHOLIUM similar polygons slant height sphere spherical angle spherical polygon spherical triangle straight line drawn surface tangent tetrahedron THEOREM trihedral upper base vertex vertices volume
Δημοφιλή αποσπάσματα
Σελίδα 188 - Two triangles having an angle of the one equal to an angle of the other are to each other as the products of the sides including the equal angles.
Σελίδα 347 - A sphere is a solid bounded by a surface all points of which are equally distant from a point within called the centre.
Σελίδα 134 - In a series of equal ratios, the sum of the antecedents is to the sum of the consequents as any antecedent is to its consequent.
Σελίδα 201 - To construct a parallelogram equivalent to a given square, and having the sum of its base and altitude equal to a given line.
Σελίδα 221 - The area of a regular inscribed hexagon is a mean proportional between the areas of the inscribed and circumscribed equilateral triangles.
Σελίδα 217 - The area of a regular polygon is equal to onehalf the product of its apothem and perimeter.
Σελίδα 44 - Two triangles are equal if the three sides of the one are equal, respectively, to the three sides of the other. In the triangles ABC and A'B'C', let AB be equal to A'B', AC to A'C', BC to B'C'. To prove that A ABC = A A'B'C'.
Σελίδα 186 - In any triangle, the square of the side opposite an acute angle is equal to the sum of the squares of the other two sides diminished by twice the product of one of those sides and the projection of the other upon that side.
Σελίδα 346 - A frustum of any pyramid is equivalent to the sum of three pyramids whose common altitude is the altitude of the frustum, and whose bases are the lower base, the upper base, and a mean proportional between the bases, of the frustum. For, let ABCDE-F be a frustum of any pyramid S-ABCDE. Let S'-A'B'C' be a triangular pyramid, having the same altitude as the pyramid S-ABCDE, and a base A'B'C' equivalent to the base ABCDE, and in the same plane with it.
Σελίδα 95 - BAC, inscribed in a segment greater than a semicircle, is an acute angle ; for it is measured by half of the arc BOC, less than a semicircumference.