## A Treatise of Plane Trigonometry: To which is Prefixed, a Summary View of the Nature and Use of Logarithms. Being the Second Part of A Course of Mathematics, Adapted to the Method of Instruction in the American Colleges ... |

### From inside the book

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Page 46

... logarithmic , or as they are sometimes called , artificial sines , tangents , & c . are much more valuable , for ... sine of an angle , is the logarithm of the

... logarithmic , or as they are sometimes called , artificial sines , tangents , & c . are much more valuable , for ... sine of an angle , is the logarithm of the

**natural sine**of that angle . The artifi- cial tangent is the logarithm ... Page 47

...

...

**log**.**sine**of le , and the cosine of 50 ° , the sine of 20 ° , and the cosine of 70 ° , & c . The tangents and secants are arranged in a similar man- ner . Hence , 105. To find the Sine , Cosine , Tangent , & c . of any num- ber of ... Page 48

... sine , tangent , & c . of its supplement . ( Art . 98 , 99. ) The

... sine , tangent , & c . of its supplement . ( Art . 98 , 99. ) The

**log**.**sine**of 96 ° 44 ' is 9.99699 The cosine of 171 ° 16 ' 9.99494 The tangent of 130 ° 26 ' 10.06952 The cotangent of 156 ° 22 ′ 10.35894 108. To find the sine , cosine ... Page 49

... sine of 14 ° 43 ' 10 " is 9.40498 2. What is the

... sine of 14 ° 43 ' 10 " is 9.40498 2. What is the

**logarithmic cosine**of 32 ° 16 ′ 45 ′′ ? The cosine of 32 ° 16 ' is 9.92715 of 32 ° 17 ' 9.92707 Difference 8 Then 60 " : 45 " :: 8 : 6 the correction to be subtract- ed from the cosine of ... Page 50

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**logarithmic sine**9.40498 ? Sine next greater 14 ° 44 ' 9.40538 Next less 14 ° 43 ' 9.40490 Difference 48 Given sine 9.40498 Next less 9.40490 Difference 8 . Then 48 : 8 :: 60 " : 10 " ,. gives 14 ° 43 ' 10 " for the answer . which added ...### Other editions - View all

### Common terms and phrases

acute angle added angle ACB arithmetical complement arithmetical progression b+sin base calculation centre circle cosecant Cosine Cotangent Tangent decimal degrees and minutes divided division divisor equal to radius equation errour exponents extend find the angles find the logarithm fraction geometrical progression given angle given number given side Given the angle gles greater half the sum hypothenuse JEREMIAH DAY length less line of chords line of numbers lines of sines loga logarithmic sine logarithmic TANGENT metical Mult multiplied natural number natural sines number of degrees opposite angles perpendicular positive proportion quadrant quotient radix right angled triangle rithms root secant similar triangles sine of 30 sines and cosines slider square subtracting tables tabular radius tabular sine tangent of half theorem transverse distance triangle ABC trigonometrical tables Trigonometry versed sine vulgar fraction

### Popular passages

Page 68 - C' (89) (90) (91) (92) (93) 112. In any plane triangle, the sum of any two sides is to their difference as the tangent of half the sum of the opposite angles is to the tangent of half their difference.

Page 42 - ... the square of the hypothenuse is equal to the sum of the squares of the other two sides.

Page 105 - The sum of any two sides of a triangle is to their difference, as the tangent of half the sum of the angles opposite to those sides, to the tangent of half their difference.

Page 49 - ... at the head of the column, take the degrees at the top of the table, and the minutes on the left; but if the title be at the foot of the column, take the degrees at the bottom, and the minutes on the right.

Page 39 - With these the learner should make himself perfectly familiar. 82. The SINE of an arc is a straight line drawn from one end of the arc, perpendicular to a diameter which passes through the other end. Thus BG (Fig.

Page 116 - In any plane triangle, the sum of any two sides is to their difference as the tangent of half the sum of the opposite angles is to the tangent of half their difference. By Theorem II. we have a : b : : sin. A : sin. B.

Page 37 - The periphery of every circle, whether great or small, is supposed to be divided into 360 equal parts called degrees, each degree into 60 minutes, each minute into 60 seconds, each second into 60 thirds, &c., marked with the characters °, ', ", '", &c. Thus, 32° 24...

Page 72 - ... angle. The third angle is found by subtracting the sum of the other two from 180° ; and the third side is found as in Case I.