Plane and Solid GeometryLongmans, Green and Company, 1898 - 210 sider |
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Resultat 1-5 av 25
Side 23
... Isosceles triangle is one of which two sides are equal . 69. An Equilateral triangle is one of which the three sides are equal . 70. The Base of a triangle is the side on which the triangle is supposed to stand . In an isosceles ...
... Isosceles triangle is one of which two sides are equal . 69. An Equilateral triangle is one of which the three sides are equal . 70. The Base of a triangle is the side on which the triangle is supposed to stand . In an isosceles ...
Side 26
... isosceles triangle is 46 ° 18 ' , what will be the value of each of the angles at the base ? 6. Show that the sum of the distances of any point in a triangle from the three angles is greater than half the sum of the three sides of the ...
... isosceles triangle is 46 ° 18 ' , what will be the value of each of the angles at the base ? 6. Show that the sum of the distances of any point in a triangle from the three angles is greater than half the sum of the three sides of the ...
Side 29
... of the acute angles is less than a right angle . 2. Prove that in any acute - angled triangle the sum of any two acute angles is greater than a right angle . PROPOSITION XVII . THEOREM . 93. In an isosceles triangle § 92. ] 29 TRIANGLES .
... of the acute angles is less than a right angle . 2. Prove that in any acute - angled triangle the sum of any two acute angles is greater than a right angle . PROPOSITION XVII . THEOREM . 93. In an isosceles triangle § 92. ] 29 TRIANGLES .
Side 30
James Howard Gore. PROPOSITION XVII . THEOREM . 93. In an isosceles triangle the angles opposite the equal sides are equal . Let ABC be an isosceles triangle in which AC and BC are the equal sides . = To prove that A △ B. Draw CD ...
James Howard Gore. PROPOSITION XVII . THEOREM . 93. In an isosceles triangle the angles opposite the equal sides are equal . Let ABC be an isosceles triangle in which AC and BC are the equal sides . = To prove that A △ B. Draw CD ...
Side 31
... isosceles . 4. How many degrees are there in the ex- terior angle at each vertex of an equiangular triangle ? 5. Show that the bisectors of the equal B angles of an isosceles triangle form with the base another isosceles triangle ; that ...
... isosceles . 4. How many degrees are there in the ex- terior angle at each vertex of an equiangular triangle ? 5. Show that the bisectors of the equal B angles of an isosceles triangle form with the base another isosceles triangle ; that ...
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Vanlige uttrykk og setninger
ABCD AC² acute angle AD² adjacent adjacent angles altitude angle formed angles are equal apothem arc BC base and altitude bisect bisector called centre chord circumference circumscribed cone cylinder diagonals diameter diedral angles distance divided draw drawn ECDH equally distant equilateral equivalent EXERCISES faces four right angles frustum given point given straight line hence homologous homologous sides hypotenuse inscribed polygon interior angles intersection isosceles triangle join lateral area lateral edges Let ABC lune mean proportional measured by one-half middle point number of sides parallelogram parallelopiped perimeter perpendicular polyedral angle polyedron PROPOSITION XI prove pyramid Q.E.D. PROPOSITION quadrilateral radii radius ratio rectangle rectangular parallelopiped regular polygon right triangle SCHOLIUM segments semiperimeter sphere spherical angle spherical polygon spherical triangle surface tangent THEOREM triangle ABC triangles are equal triangular triangular prism V-ABC vertex vertical angle
Populære avsnitt
Side 46 - PERIPHERY of a circle is its entire bounding line ; or it is a curved line, all points of which are equally distant from a point within called the centre.
Side 105 - ... any two parallelograms are to each other as the products of their bases by their altitudes. PROPOSITION V. THEOREM. 403. The area of a triangle is equal to half the product of its base by its altitude.
Side 82 - If any number of quantities are proportional, any antecedent is to its consequent as the sum of all the antecedents is to the sum of all the consequents. Let a : b = c : d = e :f Now ab = ab (1) and by Theorem I.
Side 192 - A sphere is a solid bounded by a surface all points of which are equally distant from a point within called the centre.
Side 108 - 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.
Side 146 - A STRAIGHT line is perpendicular to a plane, when it is perpendicular to every straight line which it meets in that plane.
Side 30 - In an isosceles triangle, the angles opposite the equal sides are equal.
Side 80 - In any proportion the terms are in proportion by Composition ; that is, the sum of the first two terms is to the first term as the sum of the last two terms is to the third term.
Side 79 - If the product of two quantities is equal to the product of two others, one pair may be made the extremes, and the other pair the means, of a proportion. Let ad = ос.
Side 148 - Equal oblique lines from a point to a plane meet the plane at equal distances from the foot of the perpendicular ; and of two unequal oblique lines the greater meets the plane at the greater distance from the foot of the perpendicular.