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(180°<x<270°)
sinx<0
√[sin^2(500°)+sin^2(770°)-cos^2(1620°-x)]
=√[sin^2(360°+140°)+sin^2(720°+50°)-cos^2(1440°+180°-x)]
=√[sin^2(140°(+sin^2(50°)-cos^2(180°-x)]
=√[sin^2(180°-40°)+sin^2(50°)-cos^2(180°-x)]
=√[sin^2(40°)+sin^2(90°-40°)-cos^2(180°-x)]
=√[sin^2(40°)+cos^2(40°)-cos^2(180°-x)]
=√[1-(-cosx)^2]
=√[1-(cosx)^2]
=√[(sinx)^2]
=-sinx
sinx<0
√[sin^2(500°)+sin^2(770°)-cos^2(1620°-x)]
=√[sin^2(360°+140°)+sin^2(720°+50°)-cos^2(1440°+180°-x)]
=√[sin^2(140°(+sin^2(50°)-cos^2(180°-x)]
=√[sin^2(180°-40°)+sin^2(50°)-cos^2(180°-x)]
=√[sin^2(40°)+sin^2(90°-40°)-cos^2(180°-x)]
=√[sin^2(40°)+cos^2(40°)-cos^2(180°-x)]
=√[1-(-cosx)^2]
=√[1-(cosx)^2]
=√[(sinx)^2]
=-sinx
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