计算三重积分fffzdxdydz,区域由旋转抛物面2z=x^2+y^2和平面z=1围成

2024-12-29 00:55:33
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回答1:

∫∫∫Ω z dV
= ∫(0→1) z dz ∫∫ Dxy dxdy
= ∫(0→1) z • π(2z) dz
= 2π • (1/3)[ z³ ] |(0→1)
= 2π/3

∫∫∫Ω z dV
= ∫∫Dxy dxdy ∫(r²/2→1) z dz
= ∫(0→2π) dθ ∫(0→√2) r dr • (1/2)[ z² ] |(r²/2→1)
= π • ∫(0→√2) r • [ 1 - r⁴/4 ] dr
= (π/4)∫(0→√2) (4r - r⁵) dr
= (π/4) • [ 2r² - (1/6)r⁶ ] |(0→√2)
= (π/4) • [ 4 - (1/6)(8)]
= 2π/3