本题需要先积y,若先积x计算量会很大。
∫∫(y√1+x²-y²)dxdy
=∫[-1--->1] dx ∫[x--->1](y√1+x²-y²)dy
=(1/2)∫[-1--->1] dx ∫[x--->1](√1+x²-y²)d(y²)
=(-1/2)∫[-1--->1] (2/3)(1+x²-y²)^(3/2) |[x--->1] dx
=(-1/3)∫[-1--->1] [|x|³-1] dx 注意这里不能写x³,因为x有负值
被积函数是偶函数,由奇偶对称性
=(-2/3)∫[0--->1] [|x|³-1] dx
=(2/3)∫[0--->1] [1-x³] dx
=(2/3)(x-x⁴/4) |[0--->1]
=(2/3)(1-1/4)
=1/2
∫∫(y√1+x²-y²)dxdy
=∫[-1--->1] dx ∫[x--->1](y√1+x²-y²)dy
=(1/2)∫[-1--->1] dx ∫[x--->1](√1+x²-y²)d(y²)
=(-1/2)∫[-1--->1] (2/3)(1+x²-y²)^(3/2) |[x--->1] dx
=(-1/3)∫[-1--->1] [|x|³-1] dx 注意这里不能写x³,因为x有负值
被积函数是偶函数,由奇偶对称性
=(-2/3)∫[0--->1] [|x|³-1] dx
=(2/3)∫[0--->1] [1-x³] dx
=(2/3)(x-x⁴/4) |[0--->1]
=(2/3)(1-1/4)
=1/2
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第1个回答 2012-04-14
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