一道50悬赏分的题,高手帮帮我!!!
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发布时间:2023-10-20 14:04
共1个回答
热心网友
时间:2024-02-23 18:04
解:
xsinβ+ycosα=sinα
①
xsinα+ycosβ=sinβ
②
①×sinα,得
xsinαsinβ+ysinαcosα=(sinα)^2
③
②×sinβ,得
xsinαsinβ+ysinβcosβ=(sinβ)^2
④
③-④,得
(sinαcosα-sinβcosβ)y=(sinα)^2-(sinβ)^2
0.5(sin2α-sin2β)y=(sinα)^2-(sinβ)^2
0.5×2cos(α+β)sin(α-β)y=sin(α+β)sin(α-β)
y=sin(α+β)÷cos(α+β)
所以,y=tan(α+β)
①×cosβ,得
xsinβcosβ+ycosαcosβ=sinαcosβ
⑤
②×cosα,得
xsinαcosα+ycosαcosβ=cosαsinβ
⑥
⑥-⑤,得
(sinαcosα-sinβcosβ)x=-(sinαcosβ-cosαsinβ)
0.5(sin2α-sin2β)x=-(sinαcosβ-cosαsinβ)
0.5×2cos(α+β)sin(α-β)x=-sin(α-β)
x=(-1)÷cos(α+β)
所以,x=-sec(α+β)
所以,原方程组的解为x=-sec(α+β),y=tan(α+β)
所以,
x^2-y^2
=[sec(α+β)]^2-[tan(α+β)]^2
={1÷[cos(α+β)]^2}-{[sin(α+β)]^2÷[cos(α+β)]^2}
={1-[sin(α+β)]^2}÷[cos(α+β)]^2
=[cos(α+β)]^2÷[cos(α+β)]^2
所以,x^2-y^2=1
附录:解题过程中用到的公式及其推导证明过程与说明
和差化积公式:sin2α-sin2β=2cos(α+β)sin(α-β)
证明:
令p+q=2α,p-q=2β,得p=α+β,q=α-β
所以,
sin2α-sin2β
=sin(p+q)-sin(p-q)
=sinpcosq+cospsinq-(sinpcosq-cospsinq)
=2cospsinq
所以,sin2α-sin2β=2cos(α+β)sin(α-β)
(sinα)^2-(sinβ)^2=sin(α+β)sin(α-β)
证明:
因为(sinα)^2+(cosα)^2=1
所以,(sinα)^2-(sinβ)^2=(sinα)^2-(sinβ)^2×[(sinα)^2+(cosα)^2]
所以,(sinα)^2-(sinβ)^2=(sinα)^2[1-(sinβ)^2]-[(cosα)^2×(sinβ)^2]
所以,(sinα)^2-(sinβ)^2=[(sinα)^2×(cosβ)^2]-[(cosα)^2×(sinβ)^2]
所以,(sinα)^2-(sinβ)^2=(sinα×cosβ)^2-(cosα×sinβ)^2
所以,(sinα)^2-(sinβ)^2=(sinαcosβ+cosαsinβ)×(sinαcosβ-cosαsinβ)
因为
sinαcosβ+cosαsinβ=sin(α+β)
sinαcosβ-cosαsinβ=sin(α-β)
所以,(sinα)^2-(sinβ)^2=sin(α+β)sin(α-β)
