A Concise System of Mathematics ... |
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Page 12
... Cosine of an Arc , .. .336 Of Fluents or Integrals , .. .337 Of the Lengths and Areas of Curves , .. .339 Of Solids , .. .346 SPHERICAL TRIGONOMETRY . Definitions and Principles , .. .357 Stereographic Projection of the Sphere ,. 360 ...
... Cosine of an Arc , .. .336 Of Fluents or Integrals , .. .337 Of the Lengths and Areas of Curves , .. .339 Of Solids , .. .346 SPHERICAL TRIGONOMETRY . Definitions and Principles , .. .357 Stereographic Projection of the Sphere ,. 360 ...
Page 97
... AB or ACB . 8. The sine , versed sine , tangent , and secant of the com- plement of an arc or angle , are called the cosine , coversed sine , cotangent , and cosecant of the arc or I PLANE TRIGONOMETRY . 97 PLANE TRIGONOMETRY Definitions,
... AB or ACB . 8. The sine , versed sine , tangent , and secant of the com- plement of an arc or angle , are called the cosine , coversed sine , cotangent , and cosecant of the arc or I PLANE TRIGONOMETRY . 97 PLANE TRIGONOMETRY Definitions,
Page 98
... cosine of AB or ACB , DH is its coversed sine , DK its cotangent , and CK its cosecant . Cor . 1. The cosine CG , together with the versed sine AG , is equal to the radius AC . Cor . 2. The sine BG of an arc AB , is half of BL , the ...
... cosine of AB or ACB , DH is its coversed sine , DK its cotangent , and CK its cosecant . Cor . 1. The cosine CG , together with the versed sine AG , is equal to the radius AC . Cor . 2. The sine BG of an arc AB , is half of BL , the ...
Page 99
... cosine . But if the centre be at C , and the circle pass through A , then AB is the sine of C , and BC its cosine . Hence when the hypo- tenuse is radius , the other sides are the sines of their opposite angles , or the cosines of their ...
... cosine . But if the centre be at C , and the circle pass through A , then AB is the sine of C , and BC its cosine . Hence when the hypo- tenuse is radius , the other sides are the sines of their opposite angles , or the cosines of their ...
Page 100
... cosine . Wherefore , R : sin . A :: AC : CB , and R : cos . A :: CA : AB . Sin . A 48 ° 17 ′ log . 9-8729976 cos . A log . 9.8231138 log . 2.5105450 AC 324 Sum Radius CB 241.85 12.3835426 log . 10-0000000 2-5105450 12.3336588 10-0000000 ...
... cosine . Wherefore , R : sin . A :: AC : CB , and R : cos . A :: CA : AB . Sin . A 48 ° 17 ′ log . 9-8729976 cos . A log . 9.8231138 log . 2.5105450 AC 324 Sum Radius CB 241.85 12.3835426 log . 10-0000000 2-5105450 12.3336588 10-0000000 ...
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Common terms and phrases
9 inches ABCD angle ABC axes axis balls base breadth cask centre chord circle circumference Cosine Cotang cubic feet cubic inches curve cylinder Degrees depth diagonal diameter difference directrix distance divided divisor draw ellipse equal feet 6 inches feet long field field-book find the area fleur-de-lis fluxion foot frustum Gauge-Points girt given hyperbola hypotenuse imperial gallons inches broad logarithm mean proportional measured multiply opposite parabola parallel perches perpendicular poles PROB PROP quantity quotient radius ratio rectangle Required the area Required the content Required the height right angles right ascension RULE segment side AC solid specific gravity spherical triangle square root square yard station straight line subtract taken Tang tangent Theodolite thickness triangle ABC ullage wet inches
Popular passages
Page 30 - In each succeeding term the coefficient is found by multiplying the coefficient of the preceding term by the exponent of a in that term, and dividing by the number of the preceding term.
Page 19 - Divide the first term of the dividend by the first term of the divisor, and write the result as the first term of the quotient. Multiply the whole divisor by the first term of the quotient, and subtract the product from the dividend.
Page 58 - The sum of any number of terms in arithmetical progression is equal to the sum of the extremes multiplied by half the number of terms.
Page 335 - A sphere is a solid bounded by a curved surface, every point of which is equally distant from a point within called the center.
Page 336 - 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.
Page 19 - Powers of the same quantity are divided by subtracting the exponent of the divisor from that of the dividend ; the remainder is the exponent of the quotient.
Page 58 - In any series of numbers in arithmetical progression, the sum of the two extremes is equal to the sum of any two terms equally distant from them; as in the latter of the above series 6 + 1=4+3, and =5+2.
Page 13 - C, indicates that the sum of A and B is to be multiplied by C ; and (A + B) -=- C, indicates that the sum of A and B is to be divided by C.
Page 130 - So IS THE AREA OF THE CIRCLE, TO THE AREA OF THE SECTOR.
Page 141 - ... containing ten pounds avoirdupois weight of distilled water, weighed in air, at the temperature of 62...