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Analytic geometry
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02-19-2019, 10:23 PM
(This post was last modified: 02-20-2019 09:48 PM by Albert Chan.)
Post: #6
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RE: Analytic geometry
Trivia: If triangle inscribed unit circle, Δarea = Δhalf-perimeter
Prove: Again, assume t1=0, and normalized t2, t3, such that 2Pi > t3 > t2 > 0 To have unit circle inside triangle require these conditions: 0 < t2 < Pi ; made triangle angle Pi - t2 Pi < t3 < Pi + t2 ; made triangle angle t3 - Pi -> tan(t2/2) > 0, tan(t3/2) < 0, tan((t3-t2)/2) > 0 a = | tan(t3/2) - tan(t2/2) | = tan(t2/2) - tan(t3/2) b = | tan(-t2/2) - tan(½(t3-t2)) | = tan(t2/2) + tan(½(t3-t2)) c = | tan(-t3/2) - tan(½(t2-t3)) | = -tan(t3/2) + tan(½(t3-t2)) s = ½(a + b + c) = tan(t2/2) - tan(t3/2) + tan(½(t3-t2)) = tan(½(t3-t2)) * (1 - (1 + tan(t2/2) tan(t3/2))) = - tan(t2/2) tan(t3/2) tan(½(t3-t2)) Add back absolute function to remove sign, and remove t1=0 restriction: s = |tan(½(t2-t1))| + |tan(½(t3-t1))| + |tan(½(t3-t2))| = |tan(½(t2-t1)) tan(½(t3-t1)) tan(½(t3-t2))| Match previously derived Δarea formula. QED Comment: |tan(...)| peices are length of circle tangents to triangle vertice. |
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Analytic geometry - yangyongkang - 02-18-2019, 09:27 AM
RE: Analytic geometry - yangyongkang - 02-18-2019, 12:09 PM
RE: Analytic geometry - Albert Chan - 02-18-2019, 08:48 PM
RE: Analytic geometry - Albert Chan - 02-18-2019, 03:16 PM
RE: Analytic geometry - Albert Chan - 02-18-2019, 05:51 PM
RE: Analytic geometry - Albert Chan - 02-19-2019 10:23 PM
RE: Analytic geometry - Albert Chan - 02-20-2019, 09:33 PM
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