## Trigonometry, Plane and Spherical: With the Construction and Application of Logarithms |

### Inni boken

Resultat 1-5 av 19

Side 3

The Tangent of an Arch is a Right - line touching the Circle in one Extremity of

that Arch , produced from thence till it meets a Right - line passing thro ' the

Center and ... B 2 THE1 THEOREM I. : ' In any

Trigonometry .

The Tangent of an Arch is a Right - line touching the Circle in one Extremity of

that Arch , produced from thence till it meets a Right - line passing thro ' the

Center and ... B 2 THE1 THEOREM I. : ' In any

**right**-**angled**plane PlaneTrigonometry .

Side 4

THEOREM I. : ' In any

Hypotkenuse is to the Perpendicular , jó is the Radius ( of the Table ) to the Sine

of the Angle at the Bafe . 16 For , let A E or AF E be the Radius to which the Table

of ...

THEOREM I. : ' In any

**right**-**angled**plane Triangle ABC , it will be as theHypotkenuse is to the Perpendicular , jó is the Radius ( of the Table ) to the Sine

of the Angle at the Bafe . 16 For , let A E or AF E be the Radius to which the Table

of ...

Side 8

B Α . The Solutions of the Cafes of

Sought Solution The Hyp . One Leg As Radius is to the Sine of I AC and BC A , so

is the Hyp . AC to the Angles the Leg BC ( by Theor . I. ) The Hyp The An- As AC ...

B Α . The Solutions of the Cafes of

**right**-**angled**plane Triangles . Case 2 GivenSought Solution The Hyp . One Leg As Radius is to the Sine of I AC and BC A , so

is the Hyp . AC to the Angles the Leg BC ( by Theor . I. ) The Hyp The An- As AC ...

Side 23

Hence it is also F manifest , that the Angles B and E , of the Complemental

Triangles ABC and FCE , are both

Complement of AC , CF of BC , BD A ( or the Angle F ) of A B , and EF of ED ( or

the Angle A ) .

Hence it is also F manifest , that the Angles B and E , of the Complemental

Triangles ABC and FCE , are both

**Right**-**angles**; and that CĚ is theComplement of AC , CF of BC , BD A ( or the Angle F ) of A B , and EF of ED ( or

the Angle A ) .

Side 25

D : Sin . AC . COROLLARY 2 . It follows , moreover , that , in

spherical Triangles ABC , DBC , having one Leg BC common , the Tangents of

the Hypothenuses are to each other , inversely , as the Co - lines of the adjacent

Angles .

D : Sin . AC . COROLLARY 2 . It follows , moreover , that , in

**right**-**angled**spherical Triangles ABC , DBC , having one Leg BC common , the Tangents of

the Hypothenuses are to each other , inversely , as the Co - lines of the adjacent

Angles .

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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 - 1765 |

Trigonometry, Plane and Spherical: With the Construction and Application of ... Thomas Simpson Uten tilgangsbegrensning - 1799 |

### Vanlige uttrykk og setninger

added alſo appears Arch Bafe balf Baſe becauſe Caſe Center Chord Circle Co-f Co-fine Co-ſine AC Co-tang common conſequently COROLLARY Demonſtration determine Diameter Difference drawn equal equal to Half evident Exceſs Extremes fame firſt follows Form gent given gives gles greater half the Difference Half the Sum Hence hyperbolic Logarithm Hypothenuſe Index laſt Logarithm manifeſt meeting Method Minute Moreover Note Number oppoſite parallel perpendicular plane Triangle ABC preceding Product Progreſſion PROP Proportion propoſed Radius Rectangle Remainder reſpectively right-angled ſame Secant ſecond ſee Series ſhall Sides ſince Sine Sine ACD Solution ſuppoſed Table Tang Tangent of Half Tbeor Terms Theor THEOREM thereof theſe thoſe Unity Value verſed Sine vertical Angle whence whoſe

### Populære avsnitt

Side 1 - The circumference of every circle is supposed to be divided into 360 equal parts, called degrees; and each degree into 60 minutes, each minute into 60 seconds, and so on.

Side 3 - Canon, is a table showing the length of the sine, tangent, and secant, to every degree and minute of the quadrant, with respect to the radius, which is expressed by unity or 1, with any number of ciphers.

Side 6 - In every plane triangle, it will be, as the sum of any two sides is to their difference...

Side 41 - The sum of the logarithms of any two numbers is equal to the logarithm of their product. Therefore, the addition of logarithms corresponds to the multiplication of their numbers.

Side 13 - If the sine of the mean of three equidifferent arcs' dius being unity) be multiplied into twice the cosine of the common difference, and the sine of either extreme be deducted from the product, the remainder will be the sine of the other extreme. (B.) The sine of any arc above 60°, is equal to the sine of another arc as much below 60°, together with the sine of its excess above 60°. Remark. From this latter proposition, the sines below 60° being known, those of arcs above 60° are determinable...

Side 31 - ... is the tangent of half the vertical angle to the tangent of the angle which the perpendicular CD makes with the line CF, bisecting the vertical angle.

Side 73 - BD, is to their Difference ; fo is the Tangent of half the Sum of the Angles BDC and BCD, to the Tangent of half their Difference.

Side 28 - As the sum of the sines of two unequal arches is to their difference, so is the tangent of half the sum of those arches to the tangent of half their difference : and as the sum...

Side 68 - In any right lined triangle, having two unequal sides ; as the less of those sides is to the greater, so is radius to the tangent of an angle ; and as radius is to the tangent of the excess of...