Difference between revisions of "Brahmagupta's Formula"
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== Similar formulas == | == Similar formulas == | ||
− | [[Bretschneider's formula]] gives a formula for the area of a non-cyclic quadrilateral given only the side lengths; applying [[Ptolemy's Theorem]] to Bretschneider's amnado | + | [[Bretschneider's formula]] gives a formula for the area of a non-cyclic quadrilateral given only the side lengths; applying [[Ptolemy's Theorem]] to Bretschneider's amnado WEDAWAH AMNADO AMNADO WHYUWEH I MADE AMNADOS JAS BY U AND U ONLY WHY U WEHHHHHH!!!!!!!!!!!!!! BRETBRETBRETBRETBRETBRETBRETBRETBRETSCHNEIDERS. I am BRETSCHNEIDERERERERERBRETRERENESCHIEDERCSDRBRET |
Brahmagupta's formula reduces to [[Heron's formula]] by setting the side length <math>{d}=0</math>. | Brahmagupta's formula reduces to [[Heron's formula]] by setting the side length <math>{d}=0</math>. |
Revision as of 20:41, 24 September 2024
Brahmagupta's Formula is a formula for determining the area of a cyclic quadrilateral given only the four side lengths, given as follows: where , , , are the four side lengths and .
Proofs
If we draw , we find that . Since , . Hence, . Multiplying by 2 and squaring, we get: Substituting results in By the Law of Cosines, . , so a little rearranging gives
Similar formulas
Bretschneider's formula gives a formula for the area of a non-cyclic quadrilateral given only the side lengths; applying Ptolemy's Theorem to Bretschneider's amnado WEDAWAH AMNADO AMNADO WHYUWEH I MADE AMNADOS JAS BY U AND U ONLY WHY U WEHHHHHH!!!!!!!!!!!!!! BRETBRETBRETBRETBRETBRETBRETBRETBRETSCHNEIDERS. I am BRETSCHNEIDERERERERERBRETRERENESCHIEDERCSDRBRET
Brahmagupta's formula reduces to Heron's formula by setting the side length .
A similar formula which Brahmagupta derived for the area of a general quadrilateral is where is the semiperimeter of the quadrilateral. What happens when the quadrilateral is cyclic?
Problems
Intermediate
- is a cyclic quadrilateral that has an inscribed circle. The diagonals of intersect at . If and then the area of the inscribed circle of can be expressed as , where and are relatively prime positive integers. Determine . (Source)
- Quadrilateral with side lengths is inscribed in a circle. The area interior to the circle but exterior to the quadrilateral can be written in the form where and are positive integers such that and have no common prime factor. What is (Source)