 | John Bonnycastle - 1806 - 464 páginas
...perpendicular to the diameter which passes through the other end. Thus BD is the sine of AB, or of B «. The cosine of an arc is the sine of the complement of that arc, or the part of the diameter which lies between the centre of the circle and the sine. Thus BF, or its... | |
 | Thomas Keith - 1810 - 478 páginas
...between the -versed sine of that arc, and (he dianieter. For be = bn — GB ; or, GB = bn — be,. (O) The co-sine of an arc is the sine of the complement of that arc; or it is that part of the diameter contained between the centre of the circle and the sine. Thus FE... | |
 | Charles Hutton - 1811 - 404 páginas
...one of its extremities upon the diameter of the circle which passes through the other extremity. The The COSINE of an arc, is the sine of the complement of that arc, and is equal to the part of the radius comprised between the centre of the circle and the foot of the sine."^ The TANGENT... | |
 | Charles Hutton - 1812 - 624 páginas
...from one of its extremities upon the diameter of the circle which passes through the other extremity. The COSINE of an arc, is the sine of the complement of that arc, and is equal to the part of the radius comprised between the centre of the circle and the foot of the sine. The TANGENT... | |
 | Charles Hutton - 1816 - 618 páginas
...its extremities upon the diameter of the circle which passes through the other extremity. The COMNE of an arc, is the sine of the complement of that arc, and is equal to the part of the radius comprised between the centre of the circle and the foot of the sine. The TANGENT... | |
 | Charles Hutton - 1822 - 680 páginas
...extremities upon the diameter of the circle which passes .through the other extremity. The COSINE of ah arc, is the sine of the complement of that arc, and is equal to the part of the radius comprised betweeji the centre of the circle and the foot of the sine. The TANGENT... | |
 | Peter Nicholson - 1823 - 210 páginas
...sine of the arc AB ; and here it is evident that an arc and its supplement have the same sine. 230. The CO-SINE OF AN ARC is the sine of the complement of that arc. Hence, BO or IM is the co-sine of the arc AB ; and, therefore, the sine of the complement BC. 231.... | |
 | Charles Hutton - 1826 - 682 páginas
...from one ' its extremities upon the diameter of the circle which passes rough the other extremity. The COSINE of an arc, is the sine of the complement of that •c, and is equal to the part of the radius comprised between ,e centre of the circle and the foot... | |
 | Thomas Keith - 1826 - 504 páginas
...between the versed sine of that arc and the diameter* For ¿G ±= OB — GB; or, GB = OB — ¿>G. (O) The co-sine of an arc is the sine of the complement of that arc ; or it is that part of the diameter contained between the centre of the circle and the sine. Thus... | |
 | Silvestre François Lacroix - 1826 - 190 páginas
...well as their equals CP, CP', CP", &c. under the name of cosines of the arcs AM, AM', AM", &c. Whence the cosine of an arc is the sine of the complement of this arc, and is equal to that part of the radius comprehended between the centre and the foot of the... | |
| |
The COSINE of an arc, is the sine of the complement of that arc, and is equal to the part of the radius comprised between the centre of the circle and the foot of the sine. 
