Trigonometry for BeginnersMacmillan, 1896 - 147 páginas |
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Página 1
... equals two right angles in Trigonometry as well as in Geometry . 3. The line of Trigonometry differs from the line of Geometry , in that , in Trigonometry , it is sometimes of advantage to distinguish between lines drawn in opposite ...
... equals two right angles in Trigonometry as well as in Geometry . 3. The line of Trigonometry differs from the line of Geometry , in that , in Trigonometry , it is sometimes of advantage to distinguish between lines drawn in opposite ...
Página 3
... equal to angle X'OP ' ; call this position OP2 Then , ZXOP = XOP + ≤ X'OP ' . EXAMPLES . I. Give a geometrical representation of each of the following angles , the initial line being drawn in each case from the origin towards the right ...
... equal to angle X'OP ' ; call this position OP2 Then , ZXOP = XOP + ≤ X'OP ' . EXAMPLES . I. Give a geometrical representation of each of the following angles , the initial line being drawn in each case from the origin towards the right ...
Página 4
... equal . circumference of a circle d . I. The ratio is a certain fixed number . diameter of a circle II . It is an incommensurable number . III . It is 3.14159265+ .... 9. When we say that this number is incommensurable , we mean that ...
... equal . circumference of a circle d . I. The ratio is a certain fixed number . diameter of a circle II . It is an incommensurable number . III . It is 3.14159265+ .... 9. When we say that this number is incommensurable , we mean that ...
Página 6
... equal parts , each of which is called a minute ; and each minute is again sub- divided into 60 equal parts , each of which is called a second . Instruments used for measuring angles are subdivided accord- ingly ; and the size of an ...
... equal parts , each of which is called a minute ; and each minute is again sub- divided into 60 equal parts , each of which is called a second . Instruments used for measuring angles are subdivided accord- ingly ; and the size of an ...
Página 7
... equal in length to its radius , then the angles at the centres of these circles which stand on these arcs respectively , will be all of the same size . FIG . 5 . R 17. To prove that all radians are equal to one another . Since the ...
... equal in length to its radius , then the angles at the centres of these circles which stand on these arcs respectively , will be all of the same size . FIG . 5 . R 17. To prove that all radians are equal to one another . Since the ...
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Términos y frases comunes
angle of elevation angle XOP Asin Atan centre circle circular measure circumference common logarithms cos² cosec cosine cot² cotangent decimal diameter difference distance equal equation EXAMPLE Express find log find the angles find the height find the logarithm Find the number find the sine following angles formulæ fraction Geom geometrical given greatest angle Hence inverse trigonometric functions length less than 90 Let XOP log cot log log tan log magnitude mantissa miles negative number of degrees number whose logarithm observed perpendicular plane positive quadrant radians respectively right angles right triangle right-angled triangle sec² sin B sin sin² sin³ Solve the triangle spherical triangle student subtended tan log sin tan² tangent tower triangle ABC trigonometric functions trigonometrical ratios XOP₁ yards ΙΟ ΙΟΙ
Pasajes populares
Página 85 - FRACTION is a negative number, and is one more than the number of ciphers between the decimal point and the first significant figure.
Página 6 - A radian is an angle at the center of a circle, subtended by an arc equal in length to the radius of the circle.
Página 85 - The characteristic of the logarithm of a number greater than unity is one less than the number of figures in the integral part of the number.
Página 118 - To prove that sin (A - B) = sin A cos B - cos A sin B, and cos (A — £) = cos A cos B + sin A sin B.
Página 25 - At a point 200 feet from, and on a level with the base of a tower, the angle of elevation of the top of the tower is observed to be 60° : what is the height of the tower?
Página 126 - A cos 6 = cos a cos c + sin a sin c cos B cos c = cos a cos 6 + sin a sin 6 cos C Law of Cosines for Angles cos A = — cos B...
Página 117 - Express in degrees, minutes, etc., (i.) the angle whose circular measure is ^V7'"! (".) t^e angle whose circular measure is 5. If the angle subtended at the centre of a circle by the side of a regular pentagon be the unit of angular measurement, by what number is a right angle represented ? 2. Find, by geometrical constructions, the cosine of 45° and the sine of 120°. Prove that (sin 30° + cos 30°) (sin 120° + cos 120°) = sin 30°. 3. If esc A = 9, find cot A and sec A. 4. Prove that cos (180°...
Página 107 - The elevation of a steeple at a place due south of it is 45°, and at another place due west of it the elevation is 15°. If the distance between the two places be a, prove that the height of the steeple is a( \/3 — 1) -^2\/3.
Página vii - ... are not as many figures in the quotient as there are ciphers annexed to the dividend. In such a case, supply the deficiency, as in the division of decimals, by prefixing a cipher or ciphers to the quotient before annexing.