Elements of Geometry: With Practical Applications, for the Use of SchoolsRichardson, Lord & Holbrook, 1829 - 129 sider |
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Side vi
... Cone Sphere Surface of polyedrons · 57 Solidity of polyedrons 61 58 Solidity of a prism - 65 - 58 Solidity of a pyramid 59 Surface of the three round bodies 68 70 - 59 Solidity of the three round bodies 75 59 Comparison of solids - 77 ...
... Cone Sphere Surface of polyedrons · 57 Solidity of polyedrons 61 58 Solidity of a prism - 65 - 58 Solidity of a pyramid 59 Surface of the three round bodies 68 70 - 59 Solidity of the three round bodies 75 59 Comparison of solids - 77 ...
Side viii
... cone . It is also supposed that he was the inventor of the theory of geometrical proportion , as presented by Euclid , of whom we are next to speak . About 300 years before Christ , Ptolemy Lagus founded a school of philosophy at ...
... cone . It is also supposed that he was the inventor of the theory of geometrical proportion , as presented by Euclid , of whom we are next to speak . About 300 years before Christ , Ptolemy Lagus founded a school of philosophy at ...
Side 59
... cone- . Thus if the right triangle S A D ( fig . 95 ) revolve about S A as F95 an axis , the solid S - B D C E is a cone . The circle de- scribed by the revolution of A D is called the base , the point S the vertex , and the path ...
... cone- . Thus if the right triangle S A D ( fig . 95 ) revolve about S A as F95 an axis , the solid S - B D C E is a cone . The circle de- scribed by the revolution of A D is called the base , the point S the vertex , and the path ...
Side 71
... cone is found by adding together the radius of the base and the side of the cone , and multiply- ing their sum by half the circumference of the base . By the side of the cone we mean A E ( fig . 107 ) , the hy- F 107 pothenuse of the ...
... cone is found by adding together the radius of the base and the side of the cone , and multiply- ing their sum by half the circumference of the base . By the side of the cone we mean A E ( fig . 107 ) , the hy- F 107 pothenuse of the ...
Side 72
... cone is the frustum of a regular pyramid of an infinite number of faces- . There- fore its convex surface is composed of trapezoids ( 137 ) . These trapezoids all have for their common altitude the side H C of the frustum . For if H I ...
... cone is the frustum of a regular pyramid of an infinite number of faces- . There- fore its convex surface is composed of trapezoids ( 137 ) . These trapezoids all have for their common altitude the side H C of the frustum . For if H I ...
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Elements of Geometry: With Practical Applications, for the Use of Schools Timothy Walker Uten tilgangsbegrensning - 1829 |
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Elements of Geometry: With Practical Applications, for the Use of Schools Timothy Walker Ingen forhåndsvisning tilgjengelig - 2019 |
Vanlige uttrykk og setninger
A B C D A B fig adjacent angles axis B A C base and altitude base multiplied bisect called centre chord circ circumference coincide convex surface cube cylinder D E F demonstrated diameter divided draw equally distant equivalent found by multiplying frustum geometry given line gles height Hence homologous sides hundredths inches infinite number infinitely small inscribed angles inscribed circle inscribed sphere intersection line A B line drawn linear unit mean proportional method of Exhaustions number of sides parallel sides perimeter perpendicular polyedrons preceding proposition proved pyramid radii radius ratio regular polygon rence right angle right parallelogram right parallelopiped right triangle semicircumference similar triangles solid angles sphere square feet straight line Suppose tangent tion trapezoid triangles A B C triangles are equal triangular prism vertex vertices
Populære avsnitt
Side ii - Co. of the said district, have deposited in this office the title of a book, the right whereof they claim as proprietors, in the words following, to wit : " Tadeuskund, the Last King of the Lenape. An Historical Tale." In conformity to the Act of the Congress of the United States...
Side xiv - Magnitudes which coincide with one another, that is, which exactly fill the same space, are equal to one another.
Side 30 - The areas of two triangles which have 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. D c A' D' Hyp. In triangles ABC and A'B'C', ZA = ZA'. To prove AABC = ABxAC. A A'B'C' A'B'xA'C' Proof. Draw the altitudes BD and B'D'.
Side xiv - LET it be granted that a straight line may be drawn from any one point to any other point.
Side 25 - In any proportion, the product of the means is equal to the product of the extremes.
Side 38 - The perimeters of two regular polygons of the same number of sides, are to each other as their homologous sides, and their areas are to each other as the squares of those sides (Prop.
Side 25 - Multiplying or dividing both the numerator and denominator of a fraction by the same number does not change the value of the fraction.
Side xiv - Things which are equal to the same thing are equal to one another. 2. If equals be added to equals, the wholes are equal. 3. If equals be taken from equals, the remainders are equal. 4. If equals be added to unequals, the wholes are unequal. 5. If equals be taken from unequals, the remainders are unequal. 6. Things which are double of the same are equal to one another.
Side 42 - The area of a trapezoid is equal to the product of its altitude, by half the sum of its parallel bases.
Side xiv - If a straight line meets two straight lines, so as to make the two interior angles on the same side of it taken together lesi than two right angles...