Plane TrigonometryLongmans, Green, and Company, 1906 |
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Page xi
... sine and cosine of the sum of two angles when each of the angles is less than a right angle . 47. Derivation of the sine and cosine of the difference of two angles when each of the angles is less than a right angle 48. Proof of the ...
... sine and cosine of the sum of two angles when each of the angles is less than a right angle . 47. Derivation of the sine and cosine of the difference of two angles when each of the angles is less than a right angle 48. Proof of the ...
Page xii
... 137 138 · 82. Graphs of the trigonometric functions 139 83. Relations between the radian measure , the sine , and the tangent of an angle 143 • CHAPTER XI . ART . GENERAL VALUES . INVERSE TRIGONOMETRIC xii CONTENTS .
... 137 138 · 82. Graphs of the trigonometric functions 139 83. Relations between the radian measure , the sine , and the tangent of an angle 143 • CHAPTER XI . ART . GENERAL VALUES . INVERSE TRIGONOMETRIC xii CONTENTS .
Page xiii
... sine 86. General expression for all angles which have the same cosine 87. General expression for all angles which have the same tangent 88. Inverse trigonometric functions · • PAGE 146 • · • 146 148 • 149 • · 151 · 152 154 · 89. Sum and ...
... sine 86. General expression for all angles which have the same cosine 87. General expression for all angles which have the same tangent 88. Inverse trigonometric functions · • PAGE 146 • · • 146 148 • 149 • · 151 · 152 154 · 89. Sum and ...
Page 21
... sine of the angle A ; AP AM is called the cosine of the angle A ; is called the tangent of the angle A ; ( 1 ) * is called the cotangent of the angle A ; is called the secant of the angle 4 ; AM AM MP AP AM AP MP is called the cosecant ...
... sine of the angle A ; AP AM is called the cosine of the angle A ; is called the tangent of the angle A ; ( 1 ) * is called the cotangent of the angle A ; is called the secant of the angle 4 ; AM AM MP AP AM AP MP is called the cosecant ...
Page 22
... sine first appeared in the twelfth century in a Latin translation of an Arabian work on astronomy , and was first used in a published work by a German mathematician , Regiomontanus ( 1436-1476 ) . The terms secant and tangent were ...
... sine first appeared in the twelfth century in a Latin translation of an Arabian work on astronomy , and was first used in a published work by a German mathematician , Regiomontanus ( 1436-1476 ) . The terms secant and tangent were ...
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Common terms and phrases
A+B+C acute angle algebraic centre CHAPTER circumscribing computation cos² cosec cotangent deduced denoted Derive diedral angle draw equal equator EXAMPLES expression figure Find the distance formulas geometry given Hence hypotenuse included angle inscribed circle intersection latitude law of cosines law of sines length logarithms mantissa mathematics meridian method NOTE number of degrees number of sides opposite perpendicular plane triangle Plane Trigonometry polar triangle pole positive quadrant radian measure radii radius regular polygon relations respectively right angles right triangles right-angled triangle secant Show sides and angles sin² solid angle solution Solve ABC sphere spherical angle spherical degree spherical excess spherical polygon spherical triangle spherical trigonometry subtended surface tables tan² tangent terminal line three angles tower triangle ABC trigono trigonometric functions trigonometric ratios π π
Popular passages
Page 52 - A sin B sin C Cosine Law: cos a = cos b cos c + sin b sin c cos A cos b = cos c cos a + sin c sin a cos B cos c = cos a cos b...
Page 42 - I. The sine of the middle part is equal to the product of the tangents of the adjacent parts.
Page 108 - The sum of the angles of a spherical triangle is greater than two and less than six right angles ; that is, greater than 180° and less than 540°. (gr). If A'B'C' is the polar triangle of ABC...
Page 74 - The area of the surface of a sphere is four times the area of a great circle.
Page 108 - In any triangle the square of any side is equal to the sum of the squares of the other two sides minus twice the product of these two sides and the cosine of their included angle.
Page 72 - The lateral area of a frustum of a cone of revolution is equal to one-half the sum of the circumferences of its bases multiplied by its slant height. Hyp. S is the lateral area, C and C...
Page 62 - Geometry that the area of a triangle is equal to one-half the product of the base by the altitude. Therefore, if a and b denote the legs of a right triangle, and F the area, F THE RIGHT TRIANGLE.
Page 128 - It follows that the ratio of the circumference of a circle to its diameter is the same for all circles.
Page 200 - Show that the area of a regular polygon inscribed in a circle is a mean proportional between the areas of an inscribed and circumscribing polygon of half the number of sides.
Page 202 - Find the area of a regular polygon of n sides inscribed in a circle, and show, by increasing the number of sides of the polygon without limit, how the expression for the area of the circle may be obtained. 13. (a) Find the distance at which a building 50 ft. wide will subtend an angle of 3'. (6) A church spire 45 ft. high subtends an angle of 9