Law of cosines: Difference between revisions

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The law of cosines is a useful identity for determining an angle or the length of one side of a triangle, when given two angles and three lenghts or three angles and two lengths, respectively.  When dealing with a right triangle, the law of cosines reduces to the [[Pythagorean theorem]] because the cos(90) is zero.  To determine the areas of triangles, see the [[Law of sines]].
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[[Image:Triangle.jpg|thumb|frame|Figure 1: A generic triangle with sides of length <math>a</math>, <math>b</math>, and <math>c</math> opposite the angles <math>A</math>, <math>B</math>, and <math>C</math>.]]
In [[geometry]] the '''law of cosines''' is a useful identity for determining an angle or the length of one side of a triangle when given either two angles and three lengths or three angles and two lengths.  When dealing with a right triangle, the law of cosines reduces to the [[Pythagorean theorem]] because of the fact that cos(90&deg;)=0.  To determine the areas of triangles, see the [[law of sines]]. The law of cosines can be stated as


  <math> c^2 = \left(a^2 + b^2\right) - \left(2ab\right)cos(C) </math>
:<math> c^2 = \left(a^2 + b^2\right) - 2ab\cos(C) </math>
 
where <math>a</math>, <math>b</math>, and <math>c</math> are the lengths of the sides of the triangle opposite to angles <math>A</math>, <math>B</math>, and <math>C</math>, respectively (see Figure 1).[[Category:Suggestion Bot Tag]]

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Figure 1: A generic triangle with sides of length , , and opposite the angles , , and .

In geometry the law of cosines is a useful identity for determining an angle or the length of one side of a triangle when given either two angles and three lengths or three angles and two lengths. When dealing with a right triangle, the law of cosines reduces to the Pythagorean theorem because of the fact that cos(90°)=0. To determine the areas of triangles, see the law of sines. The law of cosines can be stated as

where , , and are the lengths of the sides of the triangle opposite to angles , , and , respectively (see Figure 1).