Elements of Geometry and Trigonometry from the Works of A.M. Legendre: Adapted to the Course of Mathematical Instruction in the United States |
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Page 23
... cotang at the bottom . USE OF THE TABLE . To find the logarithmic functions of an arc which is ex- pressed in degrees and minutes . 34. If the arc is less than 45 ° , ook for the degrees at the top of the page , and for the minutes in ...
... cotang at the bottom . USE OF THE TABLE . To find the logarithmic functions of an arc which is ex- pressed in degrees and minutes . 34. If the arc is less than 45 ° , ook for the degrees at the top of the page , and for the minutes in ...
Page 24
... cotang , as the case may be ; the number there found is the logarithm required . log sin 19 ° 55 ' log tan 19 ° 55 ' Thus , • • • 9.532312 · · • 9.559097 45 ° , look for the degrees at for the minutes in the right corresponding ...
... cotang , as the case may be ; the number there found is the logarithm required . log sin 19 ° 55 ' log tan 19 ° 55 ' Thus , • • • 9.532312 · · • 9.559097 45 ° , look for the degrees at for the minutes in the right corresponding ...
Page 19
... Cotang . 119.6 11 758279 60 249102 117.72 750898 256094 115.80 999929 .04 256165 115.84 743835 263042 113.98 999927 ... Cotang D. Tang ( 88 DEGREES . ) M. Sine D. Cosine D. Tang . D. Cotang . SINES AND TANGENTS . ( 1 DEGREE . ) 19.
... Cotang . 119.6 11 758279 60 249102 117.72 750898 256094 115.80 999929 .04 256165 115.84 743835 263042 113.98 999927 ... Cotang D. Tang ( 88 DEGREES . ) M. Sine D. Cosine D. Tang . D. Cotang . SINES AND TANGENTS . ( 1 DEGREE . ) 19.
Page 20
... Cotang . 0123456790 8.542819 60.04 9.999735 07 8.543084 6c.12 11.456916 60 546422 59.55 999731 ⚫07 546691 59.62 453309 59 2 549995 59.06 999725 .07 550268 59.14 449732 58 3 . 553539 58.58 999722 .08 553817 58.66 446183 57 557054 58.11 ...
... Cotang . 0123456790 8.542819 60.04 9.999735 07 8.543084 6c.12 11.456916 60 546422 59.55 999731 ⚫07 546691 59.62 453309 59 2 549995 59.06 999725 .07 550268 59.14 449732 58 3 . 553539 58.58 999722 .08 553817 58.66 446183 57 557054 58.11 ...
Page 21
... Cotang . 52 53 8.718800 40.06 721204 39.84 8.719396 40.17 11.280604 60 278194 59 723595 39.62 999391 II 275796 725972 39.41 999384 .11 726588 39.52 273412 728337 39.19 999378 II 271041 730688 38.98 999371 731317 30.00 268683 733027 ...
... Cotang . 52 53 8.718800 40.06 721204 39.84 8.719396 40.17 11.280604 60 278194 59 723595 39.62 999391 II 275796 725972 39.41 999384 .11 726588 39.52 273412 728337 39.19 999378 II 271041 730688 38.98 999371 731317 30.00 268683 733027 ...
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Common terms and phrases
AB² ABCD AC² adjacent angles altitude apothem Applying logarithms centre chord circle circumference circumscribed complement cone consequently convex surface cosec cosine Cotang cylinder decimal denote diameter difference distance divided draw drawn edges equal to AC Equation feet find the area Find the logarithmic following RULE frustum given angle greater hence homologous hypothenuse included angle inscribed intersection isosceles less Let ABC log sin lower base lune mantissa number of sides opposite parallel parallelogram parallelopipedon perimeter perpendicular plane MN polar triangle pole polyedral angle polyedron prism proportional PROPOSITION proved pyramid quadrant radii radius rectangle regular polygon right-angled triangle Scholium segment semi-circumference side BC similar sine six right slant height solution sphere spherical angle spherical excess spherical polygon spherical triangle square straight line subtracting Tang tangent THEOREM triangle ABC triedral angle upper base vertex vertices volume whence
Popular passages
Page 101 - The area of a parallelogram is equal to the product of its base and altitude.
Page 92 - PROBLEM XV. To inscribe a circle in a given triangle. Let ABC be the given triangle. Bisect the angles A and B, by the lines AO and BO, meeting in the point 0 (Prob.
Page 48 - 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.
Page 45 - In any triangle, the sum of the two sides containing either angle, is to their difference, as the tangent of half the sum of the two other angles, to the tangent of half their difference.
Page 106 - The square described on the hypothenuse of a rightangled triangle is equal to the sum of the squares described on the other two sides.
Page 33 - THEOREM. If two angles of a triangle are equal, the sides opposite to them are also equal, and consequently, the triangle is isosceles.
Page 18 - A SCALENE TRIANGLE is one which has no two of its sides equal ; as the triangle GH I.
Page 30 - If two triangles have two sides of the one equal to two sides of the other, each to each, and the included angles unequal, the third sides will be unequal; and the greater side will belong to the triangle which has the greater included angle.
Page 8 - The logarithm of any power of a number is equal to the logarithm of the number multiplied by the exponent of the power.
Page 156 - DE, are like parts of the circumferences to which they belong, and similar sectors, as A CH and 'D OE, are like parts of the circles to which they belong : hence, similar arcs are to each other as their radii, and similar sectors are to each other as the squares of their radii.