Answer to Question #247364 in Geometry for M.l

Question #247364

Point M lies on side AC of an equilateral triangle ABC; circles \Omega _1 and \Omega _2 are circumcircles of triangles MAB and MBC respectively. It is known that point A divides arc MAB of circle in the ratio of \Omega _1 that MA:AB = 28:41. Find the ratio on which point C devides arc MCB of circle \Omega _2 . In the answer indicate MC:CB

Expert's answer

given

According to problem, figure is

Since ∇ABC

∇ABC is equilateral triangle, so AB=BC=CA=a

AB=BC=CA=a

Given that

"MA:AB=28:41"

We can write

"MA:AC=28:41"

"\u21d2\\frac{MA}{AC}=\\frac{28}{41}"

Since

"MA=AC\u2212MC"

"\\frac{AC\u2212MC}{AC}=\\frac{28}{41}"

"\\\\\u21d21\u2212\\frac{MC}{AC}=\\frac{28}{41}"

"\\\\\u21d2\\frac{MC}{AC}=1\u2212\\frac{28}{41}"

"\\\\\u21d2\\frac{MC}{AC}=\\frac{13}{41}"

Since "AC=CB"

"AC=CB"

"MC:CB=13:41"

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Answer to Question #247364 in Geometry for M.l

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