Plane and Spherical Trigonometry |
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Page xiv
... circle he divided into sixty equal parts . Each of these he divided again into sixty equal parts , called , in the Latin translation of his work the Almagest , " partes minutae primae " ; and each of these in turn into sixty , called ...
... circle he divided into sixty equal parts . Each of these he divided again into sixty equal parts , called , in the Latin translation of his work the Almagest , " partes minutae primae " ; and each of these in turn into sixty , called ...
Page 26
... circle , a circle with unit radius , which need not be actually drawn but merely visualized . Draw such a circle , Fig . 16 , with its center at the origin of co- ordinates , and let XOP be any angle . Drop the perpendicu- lar PM upon ...
... circle , a circle with unit radius , which need not be actually drawn but merely visualized . Draw such a circle , Fig . 16 , with its center at the origin of co- ordinates , and let XOP be any angle . Drop the perpendicu- lar PM upon ...
Page 43
... circle is 835.4 feet , what is the length of the chord which subtends an arc of 45 ° 37 ′ ? 26. In a circle whose radius is 35.37 inches is inscribed a regular polygon of fifteen sides . Find the length of a side . 27. A tree 214.8 feet ...
... circle is 835.4 feet , what is the length of the chord which subtends an arc of 45 ° 37 ′ ? 26. In a circle whose radius is 35.37 inches is inscribed a regular polygon of fifteen sides . Find the length of a side . 27. A tree 214.8 feet ...
Page 44
... Circle , latitude 66 ° 32 ′ N. ? 34. Taking the earth as a sphere of radius 3956 miles , what is the latitude of a place which is 2113 miles from the earth's axis ? 35. A vessel sailing due south at a uniform rate observes at 7.15 A.M. ...
... Circle , latitude 66 ° 32 ′ N. ? 34. Taking the earth as a sphere of radius 3956 miles , what is the latitude of a place which is 2113 miles from the earth's axis ? 35. A vessel sailing due south at a uniform rate observes at 7.15 A.M. ...
Page 59
... circle whose sul tending arc is equal to the radius of the circle . B O A FIG . 20 . It is obvious that the radian is a constant angle , is the same in all circles , since the ratio of the circumference of a circle to its radius is ...
... circle whose sul tending arc is equal to the radius of the circle . B O A FIG . 20 . It is obvious that the radian is a constant angle , is the same in all circles , since the ratio of the circumference of a circle to its radius is ...
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Common terms and phrases
13 co-function 15 read 9 Prop abscissa angle of elevation angle XOP antilogarithms axis base bottom c d L Ctn characteristic colog cologarithm column COMMON LOGARITHMS computation cos² cotangent Ctn c d decimal places decimal point distance equations Example exponent feet Find the value formulæ hence L Cos d L Sin d law of cosines law of sines log cot log csc log sin Log10 Value Log10 loga loge Logo Value mantissa miles multiple negative OA OA opposite ordinate perpendicular polar triangle positive quadrant radians radius read as printed read co-function result right triangles sec² significant figures sin b sin sin² SOLUTION OF RIGHT spherical triangle tabular difference tan-¹ tan² tangent terminal side theorem tion trigonometric functions Va² Value Log10 Value Value Logo Whence write zero
Popular passages
Page 71 - In the same way it may be proved that a : b : : sin. A : sin. B, and these two proportions may be written a : 6 : c : : sin. A : sin. B : sin. C. THEOREM III. t8. In any plane triangle, the sum of any two sides is to their difference as the tangent of half the sum of the opposite angles is to the tangent of half their difference. By Theorem II. we have a : b : : sin. A : sin. B.
Page 151 - I. The logarithm of a product is equal to the sum of the logarithms of the factors : log ab = log a + log b. This follows from the fact that if 10¡ = a and lO1- = 6, 101+£ = a • b.
Page 98 - The law of sines states that in any spherical triangle the sines of the sides are proportional to the sines of their opposite angles: sin a _ sin b __ sin c _ sin A sin B sin C...
Page 151 - The characteristic of a number less than 1 is found by subtracting from 9 the number of ciphers between the decimal point and the first significant digit, and writing — 10 after the result.
Page 34 - The logarithm of a quotient is equal to the logarithm of the dividend minus the logarithm of the divisor.
Page 129 - The spherical excess of any spherical polygon is equal to the excess of the sum of its angles over two right angles taken as many times as the polygon has sides, less two.
Page xx - The proportional parts are stated in full for every tenth at the right-hand side The logarithm of any number of four significant figures can be read directly by addN...
Page 35 - The logarithm of a root of a number is equal to the logarithm of the number divided by the index of the root.
Page 97 - But a' = 180° - a, c' = 180° - c, and CAB' = 180° - A Hence cos (180° — a) =cos b cos (180° - c) + sin b sin (180° - c) cos (180a- A)9 or, cos a = cos b cos с -f- sin b sin с cos A, which- proves the law of cosines for all cases.
Page 32 - ... consists of two parts, an integral part and a decimal part. The integral part is called the characteristic of the logarithm, and may be either positive or negative.