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在△ABC中,求证:
(1)
a2+b2
c2
=
sin2A+sin2B
sin2C

(2)a2+b2+c2=2(bccosA+cacosB+abcosC)
人气:408 ℃ 时间:2020-02-03 01:28:54
解答
证明:(1)由正弦定理可得a=2RsinA,b=2RsinB,c=2RsinC,
a2+b2
c2
=
4R2sin2A+4R2sin2B
4R2sin2C
=
sin2A+sin2B
sin2C

(2)由余弦定理可得2(bccosA+cacosB+abcosC)
=2bc•
b2+c2-a2
2bc
+2ac•
a2+c2-b2
2ac
+2ab•
a2+b2-c2
2ab
=a2+b2+c2
∴a2+b2+c2=2(bccosA+cacosB+abcosC)
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