∫∫ln(x^2+y^2)dxdy,其中1
问题描述:
∫∫ln(x^2+y^2)dxdy,其中1
数学人气:362 ℃时间:2020-10-01 18:32:51
优质解答
∫∫ln(x^2+y^2)dxdy
=∫[0,2π]dθ ∫[1,3] ln(r^2)*rdr
= 2π * { 1/2 ∫[1,3] ln(r^2)dr^2 }
= π*∫[1,9] lntdt
= π*{tlnt|[1,9] - ∫[1,9] 1dt }
= π*{9ln9 -8}
= π*{18ln3 - 8 }
=∫[0,2π]dθ ∫[1,3] ln(r^2)*rdr
= 2π * { 1/2 ∫[1,3] ln(r^2)dr^2 }
= π*∫[1,9] lntdt
= π*{tlnt|[1,9] - ∫[1,9] 1dt }
= π*{9ln9 -8}
= π*{18ln3 - 8 }
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答
∫∫ln(x^2+y^2)dxdy
=∫[0,2π]dθ ∫[1,3] ln(r^2)*rdr
= 2π * { 1/2 ∫[1,3] ln(r^2)dr^2 }
= π*∫[1,9] lntdt
= π*{tlnt|[1,9] - ∫[1,9] 1dt }
= π*{9ln9 -8}
= π*{18ln3 - 8 }