Elements of Geometry: With Practical Applications to MensurationLeach, Shewell and Sanborn, 1863 - 320 Seiten |
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Seite 18
... Tang . | D. | Cotang . 10.000000 81 ∞ 60 .000000 6.463726 3.536274 2 .764756 5017.17 .00 .000000 .764756 5017.17 ... Tang . M. 1o M. j Sine . Cosine.D . | Tang . 89 ° 18 LOGARITHMIC SINES , COSINES ,
... Tang . | D. | Cotang . 10.000000 81 ∞ 60 .000000 6.463726 3.536274 2 .764756 5017.17 .00 .000000 .764756 5017.17 ... Tang . M. 1o M. j Sine . Cosine.D . | Tang . 89 ° 18 LOGARITHMIC SINES , COSINES ,
Seite 19
... Tang . | | Cotang . I 0123789 8.241855 9.999934 8.241921 1.758079 60 .249033 .999932 .04 .249102 .750898 59 .04 .256094 .999929 .256165 .743835 58 .04 .263042 .999927 .263115 .736885 57 .04 4 .269881 .999925 .269956 .730044 56 .04 5 ...
... Tang . | | Cotang . I 0123789 8.241855 9.999934 8.241921 1.758079 60 .249033 .999932 .04 .249102 .750898 59 .04 .256094 .999929 .256165 .743835 58 .04 .263042 .999927 .263115 .736885 57 .04 4 .269881 .999925 .269956 .730044 56 .04 5 ...
Seite 20
... Tang . | D. Cotang . 0 8.542819 9.999735 8.543084 1.456916 60 60.04 .07 60.12 1 .546422 .999731 .546691 .453309 59 ... Tang . M. ) 32 012389 Sine . Cosine . D. | Tang . 870 20 LOGARITHMIC SINES , COSINES ,
... Tang . | D. Cotang . 0 8.542819 9.999735 8.543084 1.456916 60 60.04 .07 60.12 1 .546422 .999731 .546691 .453309 59 ... Tang . M. ) 32 012389 Sine . Cosine . D. | Tang . 870 20 LOGARITHMIC SINES , COSINES ,
Seite 21
... Tang . D. | Cotang . 8.718800 9.999404 8.719396 1.280604 60 .11 40.17 .721204 .999358 .721806 .278194 59 .11 39.95 ... Tang . | M 86 ° 4 ° M Sine . Cosine . D. Tang . TANGENTS , AND COTANGENTS . 21.
... Tang . D. | Cotang . 8.718800 9.999404 8.719396 1.280604 60 .11 40.17 .721204 .999358 .721806 .278194 59 .11 39.95 ... Tang . | M 86 ° 4 ° M Sine . Cosine . D. Tang . TANGENTS , AND COTANGENTS . 21.
Seite 22
... Tang . D. Cotang . 0123∞ 8.843585 9.998941 8.844644 1.155356 60 .15 30.19 .8453-7 .958932 .846455 .153545 59 .15 ... Tang . | M. 50 M Sine . D. Cosine . D. Tang . 850 22 LOGARITHMIC SINES , COSINES ,
... Tang . D. Cotang . 0123∞ 8.843585 9.998941 8.844644 1.155356 60 .15 30.19 .8453-7 .958932 .846455 .153545 59 .15 ... Tang . | M. 50 M Sine . D. Cosine . D. Tang . 850 22 LOGARITHMIC SINES , COSINES ,
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Häufige Begriffe und Wortgruppen
A B C ABCD adjacent angles altitude angle ACB angle equal arc A B base bisect chord circle circumference circumscribed cone convex surface cosec Cosine Cotang cylinder diagonal diameter distance divided drawn equal Prop equilateral triangle equivalent exterior angle feet formed frustum gles greater half the sum hence homologous hypothenuse inches included angle inscribed isosceles less Let ABC line A B logarithmic sine measured by half multiplied number of sides parallel parallelogram parallelopipedon pendicular perimeter perpendicular polyedron prism PROBLEM PROPOSITION pyramid quadrantal radii radius ratio rectangle regular polygon right angles right-angled triangle rods Scholium secant segment side A B similar slant height solve the triangle sphere spherical polygon spherical triangle Tang tangent THEOREM triangle ABC triangle equal trigonometric functions vertex
Beliebte Passagen
Seite 59 - If two triangles have the three sides of the one equal to the three sides of the other, each to each, the triangles are congruent.
Seite 37 - 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.
Seite 120 - At a point in a given straight line to make an angle equal to a given angle.
Seite 52 - 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.
Seite 19 - In an isosceles triangle, the angles opposite the equal sides are equal.
Seite 199 - Any two rectangular parallelopipedons are to each other as the products of their bases by their altitudes ; that is to say, as the products of their three dimensions.
Seite 121 - Through a given point to draw a straight line parallel to a given straight line, Let A be the given point, and BC the given straight line : it is required to draw through the point A a straight line parallel to BC.
Seite 103 - If two triangles have two angles of the one equal to two angles of the other, each to each, and also one side of the one equal to the corresponding side of the other, the triangles are congruent.
Seite 2 - The logarithm of any POWER of a number is equal to the product of the logarithm of the number by the exponent of the power. For let m be any number, and take the equation (Art.
Seite 2 - The logarithm of any power of a number is equal to the logarithm of the number multiplied by the exponent of the power.