计算二重积分ff(xy+yz+xz),其中积分区域为锥面z=根号下x平方+y平方被柱面x平
对面积的曲面积分 弄到快晕了.
∫∫(xy+yz+xz)dS 其中Σ是锥面z=√(x^2+y^2)被柱面x^2+y^2=2ax所截得得有限部分 好的追加分数
简单计算一下即可,答案如图所示
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第1个回答 2020-04-24
原式=∫∫(xy+yz+xz)√[1+(αz/αx)²+(αz/αy)²]dxdy (S:x²+y²=2ax)
=∫∫(xy+yz+xz)√[1+(x/√(x²+y²))²+(y/√(x²+y²))²]dxdy
=√2∫∫(xy+yz+xz)dxdy
=√2∫dθ∫(r²sinθcosθ+r²sinθ+r²cosθ)rdr (做极坐标变换)
=√2∫dθ∫(sinθcosθ+sinθ+cosθ)r³dr
=(√2/4)∫(sinθcosθ+sinθ+cosθ)(cosθ)^4dθ
=(√2/4)∫[(1-2sin²θ+(sinθ)^4)cosθ+((cosθ)^5+(cosθ)^4)sinθ]dθ
=(√2/4)[sinθ-(2/3)sinθ+(1/5)(sinθ)^5-(1/6)(cosθ)^6-(1/5)(cosθ)^5]│
=(√2/4)(1-2/3+1/5+1-2/3+1/5)
=4√2/15.
=∫∫(xy+yz+xz)√[1+(x/√(x²+y²))²+(y/√(x²+y²))²]dxdy
=√2∫∫(xy+yz+xz)dxdy
=√2∫dθ∫(r²sinθcosθ+r²sinθ+r²cosθ)rdr (做极坐标变换)
=√2∫dθ∫(sinθcosθ+sinθ+cosθ)r³dr
=(√2/4)∫(sinθcosθ+sinθ+cosθ)(cosθ)^4dθ
=(√2/4)∫[(1-2sin²θ+(sinθ)^4)cosθ+((cosθ)^5+(cosθ)^4)sinθ]dθ
=(√2/4)[sinθ-(2/3)sinθ+(1/5)(sinθ)^5-(1/6)(cosθ)^6-(1/5)(cosθ)^5]│
=(√2/4)(1-2/3+1/5+1-2/3+1/5)
=4√2/15.
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