Difference between revisions of "Law of Sines"
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| − | Given a triangle with side lengths a, b, and c, opposite angles A, B, and C, and a circumcircle with radius R, <math>\frac{a}{\sin{A}}=\frac{b}{\sin{B}}=\frac{c}{\sin{C}}=2R</math>. | + | Given a [[triangle]] with side lengths a, b, and c, opposite angles A, B, and C, and a [[circumcircle]] with radius R, <math>\frac{a}{\sin{A}}=\frac{b}{\sin{B}}=\frac{c}{\sin{C}}=2R</math>. |
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| + | ==See also== | ||
| + | * [[Trigonometry]] | ||
| + | * [[Trigonometric identities]] | ||
| + | * [[Geometry]] | ||
Revision as of 10:05, 23 June 2006
Given a triangle with side lengths a, b, and c, opposite angles A, B, and C, and a circumcircle with radius R, 
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