The Elements of Plane and Spherical Trigonometry ... |
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Resultat 1-5 av 11
Side 2
... suppose it to revolve still further to P , midway between A and B , it has described four and a - half right angles , and if we suppose C P to be in its third revolution , it will have described eight and a - half right angles , and so ...
... suppose it to revolve still further to P , midway between A and B , it has described four and a - half right angles , and if we suppose C P to be in its third revolution , it will have described eight and a - half right angles , and so ...
Side 2
... suppose it to revolve still further to P , midway between A and B , it has described four and a - half right angles , and if we suppose CP to be in its third revolution , it will have described eight and a - half right angles , and so ...
... suppose it to revolve still further to P , midway between A and B , it has described four and a - half right angles , and if we suppose CP to be in its third revolution , it will have described eight and a - half right angles , and so ...
Side 15
... suppose the line OP , by its revolution about O upwards from O A , to describe the angle AOP , and let the angles described in this manner be considered positive . Then if the line revolve downwards from OA , to describe the angle AOP ...
... suppose the line OP , by its revolution about O upwards from O A , to describe the angle AOP , and let the angles described in this manner be considered positive . Then if the line revolve downwards from OA , to describe the angle AOP ...
Side 41
... suppose C an obtuse angle ( fig . 2 ) . Then by Euc . II , 12 , AB2 BC2 + AC2 + 2BC . CD , CD = AC ( Cos . 180 ° C ) = — AC . Cos . C. ( 15 ) - - .. AB2 BC2 + AC2 - 2 BC . AC . Cos . C , = i.e. , c2 = a + b2 - 2 ab Cos . C. ( B ) Cor ...
... suppose C an obtuse angle ( fig . 2 ) . Then by Euc . II , 12 , AB2 BC2 + AC2 + 2BC . CD , CD = AC ( Cos . 180 ° C ) = — AC . Cos . C. ( 15 ) - - .. AB2 BC2 + AC2 - 2 BC . AC . Cos . C , = i.e. , c2 = a + b2 - 2 ab Cos . C. ( B ) Cor ...
Side 68
... suppose , For 60 41 :: 216 : x X = 216 × 41 60 = + 148 . ... Log . Sin . 30 ° 20 ′ 41 ′′ = 9.703317 + 148 9703465 . To find Log . Cos . 40 ° 30 ′ 52 " . = The Log . Cosine is found in a similar manner . Log . Cos . 40 ° 30 ′ = 9.881045 ...
... suppose , For 60 41 :: 216 : x X = 216 × 41 60 = + 148 . ... Log . Sin . 30 ° 20 ′ 41 ′′ = 9.703317 + 148 9703465 . To find Log . Cos . 40 ° 30 ′ 52 " . = The Log . Cosine is found in a similar manner . Log . Cos . 40 ° 30 ′ = 9.881045 ...
Andre utgaver - Vis alle
The Elements of Plane and Spherical Trigonometry Alfred Challice Johnson Ingen forhåndsvisning tilgjengelig - 2019 |
The Elements of Plane and Spherical Trigonometry: Theoretical and Practical ... Alfred Challice Johnson Ingen forhåndsvisning tilgjengelig - 2018 |
The Elements of Plane and Spherical Trigonometry: Theoretical and Practical ... Alfred Challice Johnson Ingen forhåndsvisning tilgjengelig - 2015 |
Vanlige uttrykk og setninger
altitude angle being given angle of depression angle of elevation azimuth Cape Cape Clear Cape Race circle Colatitude Cosec Cosine Cotangent CP CP Diff equal equation Examples for Practice find side find the angle find the area find the distance find the height find the latitude find the sides Find the value flagstaff formula Given Log greater than 90 Haversine headlands horizontal plane hour angle included angle latitude 50 lighthouse Logarithms longitude meridian miles negative observes the angle perp perpendicular place in latitude prime vertical required the distance right angles right-angled triangle Secant ship sides are given sine spherical triangle Spherical Trigonometry station subtracted from 180 Sun's altitude Sun's declination Tangent tower trigonometrical ratios Vers Versine Vertex yards دو وو
Populære avsnitt
Side 85 - IF a side of any triangle be produced, the exterior angle is equal to the two interior and opposite angles ; and the three interior angles of every triangle are equal to two right angles.
Side 85 - The angles which one straight line makes with another upon one side of it, are either two right angles, or are together equal to two right angles.
Side 75 - To raise a number to any power, multiply the Log. of the number by the index of the power; the result will be the Log.
Side 62 - Suppose a* =n, then x is called the logarithm of n to the böge a ; thus the logarithm of a number to a given base is the index of the power to which the base must be raised to be equal to the number. The- logarithm of n to the base a is written Iog0 n ; thus log„ii = a; expresses the same relation, as a* = n.
Side 85 - IF a straight line fall upon two parallel straight lines, it makes the alternate angles equal to one another; and the exterior angle equal to the interior and opposite upon...
Side 40 - The sides of a triangle are proportional to the sines of the opposite angles.
Side 72 - See the table at the end of this number. To find from the table the length of any given number of degrees and minutes, look for the degrees at the top of the page, and the minutes on the side; then against the minutes, and under the degrees, will be the length of the arc in nautical miles. 67. Meridional Difference of Latitude. — An arc of Mercator's meridian contained between two parallels of latitude, is called meridional difference of latitude. It is found by subtracting...
Side 53 - The RADIUS of a sphere is a straight line drawn from the centre to any point in surface, as the line C B.
Side 41 - In any triangle, the square of the side opposite an acute angle is equal to the sum of the squares of the other two sides, minus twice the product of one of these sides and the projection of the other side upon it.
Side 76 - Divide the logarithm of the number by the index of the root; the result will be the logarithm of the root. EXAMPLE.— Extract (a) the square root of 77,851; (6) the cube root of 698,970; (c) the 2.4 root of 8,964,300.