Trigonometry: Plane and Spherical; with the Construction and Application of Logarithms. By Thomas Simpson, F.R.S. |
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Resultat 1-5 av 5
Side 17
Although what has been hitherto laid down for constructing the trigonometrical -
canon , is abundantly fufficient for that purpose , and is also very easily
demonstrated ; yet , as the first fine , from whence the rest are all derived , must
be carried ...
Although what has been hitherto laid down for constructing the trigonometrical -
canon , is abundantly fufficient for that purpose , and is also very easily
demonstrated ; yet , as the first fine , from whence the rest are all derived , must
be carried ...
Side 18
( betwixt which you would find all the intermediate fines ) by the fraction ,
0000000423 , for a first product ; and this , again , by 22 , for a second product ; to
which last , let it's of the difference of the two proposed fines ( or extremes ) be
added ...
( betwixt which you would find all the intermediate fines ) by the fraction ,
0000000423 , for a first product ; and this , again , by 22 , for a second product ; to
which last , let it's of the difference of the two proposed fines ( or extremes ) be
added ...
Side 19
From this excess let the first product be continually subtracted ; that is , first , from
the excess itself ; then from the remainder ; then from the last remainder , and so
on 44 times . 3 ° . To the leffer extreme add the forementioned excefs ; and , to ...
From this excess let the first product be continually subtracted ; that is , first , from
the excess itself ; then from the remainder ; then from the last remainder , and so
on 44 times . 3 ° . To the leffer extreme add the forementioned excefs ; and , to ...
Side 57
1 B M Let AN and AM be the two arches , and AB B and AC their N F M tangents ;
i alfo N let NE be the tangent of their fum , in the first D D cafe , and the tangent of
their difference , in the second , and let CF , perpendicular to the radius DN , be ...
1 B M Let AN and AM be the two arches , and AB B and AC their N F M tangents ;
i alfo N let NE be the tangent of their fum , in the first D D cafe , and the tangent of
their difference , in the second , and let CF , perpendicular to the radius DN , be ...
Side 68
Plane and Spherical; with the Construction and Application of Logarithms. By
Thomas Simpson, F.R.S. Thomas Simpson. : BF ( BE ) , the value of x in the first
case , wherë to2 + ax = b . Again , radius : co - tang . BAF ( tang . F ) :: BF ( BE ) :
AB ...
Plane and Spherical; with the Construction and Application of Logarithms. By
Thomas Simpson, F.R.S. Thomas Simpson. : BF ( BE ) , the value of x in the first
case , wherë to2 + ax = b . Again , radius : co - tang . BAF ( tang . F ) :: BF ( BE ) :
AB ...
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Vanlige uttrykk og setninger
added alſo appears arch balf baſe becauſe called caſe chord circle co-f co-fine AC co-tang common complement conſequently COROL COROLLARY demonſtrated determine diameter difference divided drawn Edition equal equal to half evident exceſs extremes fame fides fine fines firſt follows given gives gles great-circles greater half the difference half the ſum Hence hyperbolic logarithm hypothenuſe known laſt logarithm manifeſt meeting method minute Moreover natural Note oppoſite parallel perpendicular plane triangle ABC preceding PROP proportion propoſed radius reſpectively ſame ſecant ſee ſeries ſhall ſides ſince ſine ſum ſuppoſed tang tangent of half Tbeor Theor THEOREM thereof theſe thoſe unity verſed vertical angle whence
Bibliografisk informasjon
| Tittel | Trigonometry: Plane and Spherical; with the Construction and Application of Logarithms. By Thomas Simpson, F.R.S. Eighteenth century collections online |
| Forfatter | Thomas Simpson |
| Utgave | 5 |
| Utgiver | F. Wingrave, successor to Mr. Nourse, 1799 |
| Original fra | The British Library |
| Digitalisert | 30. sep 2016 |
| Lengde | 79 sider |
| Eksporter sitat | BiBTeX EndNote RefMan |