Plane and Spherical TrigonometryD.C. Heath & Company, 1917 - 313 páginas |
Dentro del libro
Resultados 1-5 de 19
Página x
... third 134. Two parts determine a triangle • 135. The quadrant of any required part 136. Check formula 137. Solution of a right triangle 138. Two solutions 139. Examples 140. Quadrantal triangles 141. Isosceles triangles . 142. Examples ...
... third 134. Two parts determine a triangle • 135. The quadrant of any required part 136. Check formula 137. Solution of a right triangle 138. Two solutions 139. Examples 140. Quadrantal triangles 141. Isosceles triangles . 142. Examples ...
Página xi
... Third theorem to determine quadrant . 153. Illustrative examples 154. Two solutions 155. Area of spherical triangle 156. Examples SOLUTION WHEN ONLY ONE PART IS REQUIRED 157. Statement of problem PAGE 149 149 150 150 153 • · 154 154 ...
... Third theorem to determine quadrant . 153. Illustrative examples 154. Two solutions 155. Area of spherical triangle 156. Examples SOLUTION WHEN ONLY ONE PART IS REQUIRED 157. Statement of problem PAGE 149 149 150 150 153 • · 154 154 ...
Página 1
... third point on the line , the segments AB and BA are opposite in sign ; likewise the segments BC and CB . and Hence AB = - BA or — AB = BA , BCCB or – BC = CB . - Then for all positions of A , B , and 1 PLANE TRIGONOMETRY CHAPTER ...
... third point on the line , the segments AB and BA are opposite in sign ; likewise the segments BC and CB . and Hence AB = - BA or — AB = BA , BCCB or – BC = CB . - Then for all positions of A , B , and 1 PLANE TRIGONOMETRY CHAPTER ...
Página 2
... third by X'OY ' , and the fourth by Y'OX . 5. Coordinates of a point . From any given point P1 in the plane , draw a line parallel to the Y - axis intersecting the X - axis in some point A. Then the distance from the origin to the point ...
... third by X'OY ' , and the fourth by Y'OX . 5. Coordinates of a point . From any given point P1 in the plane , draw a line parallel to the Y - axis intersecting the X - axis in some point A. Then the distance from the origin to the point ...
Página 11
... third angle in degrees . 10. In a circle whose radius is 12 ft . , find the length of the arc intercepted by a central angle of 16 ° . 11. Find the angle between the tangents to a circle at two points whose distance apart measured on ...
... third angle in degrees . 10. In a circle whose radius is 12 ft . , find the length of the arc intercepted by a central angle of 16 ° . 11. Find the angle between the tangents to a circle at two points whose distance apart measured on ...
Contenido
82 | |
86 | |
95 | |
102 | |
105 | |
108 | |
121 | |
123 | |
9 | |
10 | |
12 | |
20 | |
26 | |
42 | |
48 | |
55 | |
61 | |
66 | |
67 | |
73 | |
79 | |
127 | |
129 | |
143 | |
149 | |
150 | |
156 | |
162 | |
36 | |
42 | |
91 | |
117 | |
Otras ediciones - Ver todas
Términos y frases comunes
angle opposite angles of depression colog COMMON LOGARITHMS complex number computed cos a cos cos-¹ cos¹ cos² cos³ cot-¹ cot² cotangent coty csc² cube root decimal point determine difference Equating the real Find the height find the value flagpole four-place tables fundamental relations given angles greater than 90 Hence interpolation inverse function law of cosines law of sines law of tangents less than 180 line values Log Cot log sin ẞ loga logarithms of numbers mantissa Moivre's theorem negative number of degrees quadrant radians roots of unity sec-¹ sec² sides are given Similarly sin a cos sin a sin sin-¹ sin(a+b sin¹ sin² sin³ solution Solve the following spherical right triangle spherical triangle square root ẞ cot tan-¹ tan² tangent terminal line tower trigonometric functions Va² α α απ π π ייד
Pasajes populares
Página 4 - The logarithm of a quotient is equal to the logarithm of the dividend minus the logarithm of the divisor. , M , ,• , . logi — = log
Página 130 - ... cos a = cos b cos с + sin b sin с cos A ; (2) cos b = cos a cos с + sin a sin с cos в ; ^ A. (3) cos с = cos a cos b + sin a sin b cos C.
Página 4 - The logarithm of the product of two numbers is equal to the sum of the logarithms of the numbers.
Página 111 - From the top of a hill the angles of depression of two successive milestones, on a straight level road leading to the hill, are observed to be 5° and 15°.
Página 3 - If the number is less than 1, make the characteristic of the logarithm negative, and one unit more than the number of zeros between the decimal point and the first significant figure of the given number.
Página 85 - B is negative, and BD — — a cos B. The substitution of this in (4) leads us again to (3). Thus we see that (3) is true in all cases. THE LAW OF COSINES. The square of any side .of a plane triangle is equal to the sum of the squares of the other two sides minus twice their product times the cosine of the included angle. This may be regarded as a generalization of the Pythagorean Theorem to which it reduces when the included angle is a right angle. These two laws are among the most important of...
Página 2 - If the number is greater than 1, the characteristic is one less than the number of places to the left of the decimal point.
Página 131 - By (150) and (152) we have cos a = cos b cos c -\- sin b sin c cos A, cos c = cos a cos b...
Página 31 - The product of all the lines, that can be drawn from one of the angles of a regular polygon of n sides, inscribed in a circle whose radius is a, to all the other angular points = no.
Página 111 - From the top of a cliff 150 ft. high the angles of depression of the top and bottom of a tower are 30° and 60°, respectively.