三角形ABC中,角C=30度,求(sinA)^2+(sinB)^2-2sinAsinBcosC的值

发布时间:2021-02-21 17:46:40

三角形ABC中,角C=30度,求(sinA)^2+(sinB)^2-2sinAsinBcosC的值

网友回答

(sinA)^2+(sinB)^2-2sinAsinBcosC
= [sin(B+30°)]^2+(sinB)^2-2sin(B+30°)sinBcos30°
= 3/4(sinB)^2+√3/2sinBcosB+1/4(cosB)^2+(sinB)^2-3/2(sinB)^2-√3/2sinBcosB
= 1/4(注:sinA=sin(180°-B-C)=sin(B+C)=sin(B+30°)
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