Manual of plane trigonometry, by J.A. Galbraith and S. Haughton |
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Página 15
... PROPOSITION I. In a right - angled triangle , either side is equal to the hypotenuse , multiplied by the sine of the opposite , or cosine of adjacent , angle . ང་ ས་ ་་་ be the malign Scent , 1992 mang RIGHT - ANGLED TRIANGLES . 15.
... PROPOSITION I. In a right - angled triangle , either side is equal to the hypotenuse , multiplied by the sine of the opposite , or cosine of adjacent , angle . ང་ ས་ ་་་ be the malign Scent , 1992 mang RIGHT - ANGLED TRIANGLES . 15.
Página 32
... proposition remains true if one of the an- gles be oblique , as in fig . 13. For in the triangle BCP , p = a sin B ... Proposition : PROPOSITION II . In a triangle the sum of the sides is to their diffe- rence , in the same ratio , as ...
... proposition remains true if one of the an- gles be oblique , as in fig . 13. For in the triangle BCP , p = a sin B ... Proposition : PROPOSITION II . In a triangle the sum of the sides is to their diffe- rence , in the same ratio , as ...
Página 38
... PROPOSITION III . The area of a triangle is equal to half the product of two sides , multiplied by the sine of the included angle . EXAMPLES . 1. Given b = 35 feet , c = 117 feet , and A = 27 ° ; find the area . 2. Given b area . 3 ...
... PROPOSITION III . The area of a triangle is equal to half the product of two sides , multiplied by the sine of the included angle . EXAMPLES . 1. Given b = 35 feet , c = 117 feet , and A = 27 ° ; find the area . 2. Given b area . 3 ...
Página 39
... ( s - a ) ( s − b ) ( s – c ) } ; ( 10 ) hence the following rule for calculating the area of a triangle , the three sides of which are given : PROPOSITION IV . 1o . Add the three sides of EXPRESSION FOR THE AREA . 39.
... ( s - a ) ( s − b ) ( s – c ) } ; ( 10 ) hence the following rule for calculating the area of a triangle , the three sides of which are given : PROPOSITION IV . 1o . Add the three sides of EXPRESSION FOR THE AREA . 39.
Página 40
Joseph Allen Galbraith. PROPOSITION IV . 1o . Add the three sides of the triangle together , and take half the sum . 2 ° . From the half sum , subtract each side sepa- rately . 3 ° . Multiply together the half sum , and the three ...
Joseph Allen Galbraith. PROPOSITION IV . 1o . Add the three sides of the triangle together , and take half the sum . 2 ° . From the half sum , subtract each side sepa- rately . 3 ° . Multiply together the half sum , and the three ...
Otras ediciones - Ver todas
Manual of Plane Trigonometry, by J.A. Galbraith and S. Haughton Joseph Allen Galbraith Sin vista previa disponible - 2016 |
Manual of Plane Trigonometry, by J. A. Galbraith and S. Haughton Joseph Allen Galbraith Sin vista previa disponible - 2015 |
Términos y frases comunes
a² 2bc angle ACB angle is equal angular unit appears from Prop Calculate the value centre Chap circle Circumference complement corresponding number cosec degrees and minutes diameter diff divide equation Euclid Express feet find the angle find the area Find the logarithm find the number Find the product Find the quotient find the value five figures following proportion four figures given angle Given log given side Given the logarithm hypotenuse log cosine log cotangent log sine log tangent Logarithmic Tables mantissa Natural Sines number is equal number of seconds obtain proceed by RULE PROPOSITION rence required to find right angle right-angled triangle secant sect sin A sin sines and cosines square root subtends subtract Tables of Natural tables the corresponding tabular difference triangle BCP TRIGONOMETRICAL MAGNITUDES value of log versin
Pasajes populares
Página ii - RULE. The characteristic of the logarithm of a number greater than unity, is one less than the number of integral figures in the given number.
Página iv - The logarithm of the product of two numbers is equal to the sum of the logarithms of the numbers.
Página 5 - ... to be divided into 60 equal parts, called minutes; and each minute into 60 equal parts, called seconds. Degrees, minutes, and seconds, are designated respectively, by the characters ° ' ". For example, ten degrees, eighteen minutes, and fourteen seconds, would be written 10° 18
Página 10 - The sine of an angle is equal to the sine of its supplement. The sine rule Consider fig.
Página iv - The logarithm of the quotient of two numbers is equal to the logarithm of the dividend minus the logarithm of the divisor.
Página ii - The Characteristic of the logarithm of a number less than unity, and reduced to the decimal form, is negative and one greater than the number of cyphers following the decimal point.
Página xi - ... will be the logarithm of the quotient. 3°. Find from the Tables the corresponding number. This will be the required quotient.
Página 2 - S3". 6. Besides the above-mentioned unit of angular measure, viz. the 90th part of a right angle, which is always used in practical applications, there is another, viz. the angle at the centre of a circle which is subtended by an arc equal to the radius of the circle, which is more convenient in analytical investigations.
Página 10 - We have, then, that the sine of an angle is equal to the cosine of its complement, and conversely.
Página 29 - Thus: sin (a + a) = sin a cos a + cos a sin a or: sin 2a = 2 sin a cos a...