Trigonometry, Plane and Spherical;: With the Construction and Application of Logarithms |
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Resultat 1-5 av 5
Side 3
The periphery of every circle is supposed to be divided into 360 equal parts ,
called degrees ; and each degree into 69 equal parts , called ainutes ; and each
minute into 60 equal parts , called Leconds , or second minutes ,, & c . B 2 3.
The periphery of every circle is supposed to be divided into 360 equal parts ,
called degrees ; and each degree into 69 equal parts , called ainutes ; and each
minute into 60 equal parts , called Leconds , or second minutes ,, & c . B 2 3.
Side 4
Any part AB of the periphery of the circle is called an arch , and is said to be the
measure of the angle ACB at the center , which it fubtends . E Nore , The degrees
, minutes , seconds , & c . conéciseid in ary arch , er angle , are wrote in this ...
Any part AB of the periphery of the circle is called an arch , and is said to be the
measure of the angle ACB at the center , which it fubtends . E Nore , The degrees
, minutes , seconds , & c . conéciseid in ary arch , er angle , are wrote in this ...
Side 23
The axis of a great - circle is a right - line passing through the center ,
perpendicular to the plane of the circle : and the two points , where the axis
interfects the surface of the sphere , are called the poles of the circle . 3 : A
spherical angle is the ...
The axis of a great - circle is a right - line passing through the center ,
perpendicular to the plane of the circle : and the two points , where the axis
interfects the surface of the sphere , are called the poles of the circle . 3 : A
spherical angle is the ...
Side 39
Then are the indices of those terms called logarithms of the numbers to which the
terms thenselves are equal . Thus , if am = 2 , and an = 3 , then will m and n be
logarithms of the numbers 2 and 3 respectively . Hence it is evident , that what ...
Then are the indices of those terms called logarithms of the numbers to which the
terms thenselves are equal . Thus , if am = 2 , and an = 3 , then will m and n be
logarithms of the numbers 2 and 3 respectively . Hence it is evident , that what ...
Side 40
But the most simple kind of all , is Neiper's , otherwise called the byperbolical .
The byperbolical logarithm of any number is the index , of ihat term of the
logarithmic progreffion agreeing with the proposed number , multiplied by the
excess of ...
But the most simple kind of all , is Neiper's , otherwise called the byperbolical .
The byperbolical logarithm of any number is the index , of ihat term of the
logarithmic progreffion agreeing with the proposed number , multiplied by the
excess of ...
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Trigonometry, Plane and Spherical: With the Construction and Application of ... Thomas Simpson Uten tilgangsbegrensning - 1748 |
Trigonometry: Plane and Spherical; with the Construction and Application of ... Thomas Simpson Uten tilgangsbegrensning - 1799 |
Trigonometry, Plane and Spherical: With the Construction and Application of ... Thomas Simpson Uten tilgangsbegrensning - 1799 |
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 determine diameter difference divided drawn equal equal to half evident exceſs extremes fide AC fine fines firſt follows given gives gles greater half the ſum half their difference Hence hyperbolic logarithm hypothenuſe laſt logarithm manifeft meeting method minute moreover Note oppoſite parallel perpendicular plane triangle ABC preceding progreſſion PROP proportion propoſed radius rectangle reſpectively right-angled ſame ſecant ſee ſeries ſhall ſides ſince ſine ſpherical Spherical triangle ABC ſubtracted 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 Trigonometry, Plane and Spherical;: With the Construction and Application of Logarithms, Thomas Simpson |
| Forfatter | Thomas Simpson |
| Bidragsyter | John Nourse |
| Utgiver | J. Nourse, bookseller in ordinary to his Majesty., 1765 |
| Original fra | Oxford University |
| Digitalisert | 27. feb 2009 |
| Lengde | 79 sider |
| Eksporter sitat | BiBTeX EndNote RefMan |