LawOfSinesAmbiguousCaseRef

# LawOfSinesAmbiguousCaseRef - If angle A is acute, and , one...

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Law of Sines – The Ambiguous Case Davis 11-12 Given a triangle with sides a and b of certain lengths and height h ( ± ² ³´µ · ) these are the possible situations, depending on the lengths of a , b , and h : If angle A is acute, and ¸· ¹ · , no such triangle exists. If angle A is acute, and ¸· ± · , one possible triangle exists.
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Unformatted text preview: If angle A is acute, and , one possible triangle exists. If angle A is acute, and , two possible triangles exist. If angle A is obtuse, and or , no such triangle exists. If angle A is obtuse, and , one such triangle exists....
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## This note was uploaded on 11/19/2011 for the course MATH 180 taught by Professor Byrns during the Spring '11 term at Montgomery College.

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