来自刁成海的问题
【设an=∫(0-π/4)(tanx)^ndx.求级数∑(an+a(n+2))/n的和.证明当λ>0时,∑an/n^λ收敛】
设an=∫(0-π/4)(tanx)^ndx.求级数∑(an+a(n+2))/n的和.证明当λ>0时,∑an/n^λ收敛
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2020-07-24 04:04
【设an=∫(0-π/4)(tanx)^ndx.求级数∑(an+a(n+2))/n的和.证明当λ>0时,∑an/n^λ收敛】
设an=∫(0-π/4)(tanx)^ndx.求级数∑(an+a(n+2))/n的和.证明当λ>0时,∑an/n^λ收敛
a[n]+a[n+2]=∫{0,π/4}(tan(x))^ndx+∫{0,π/4}(tan(x))^(n+2)dx=∫{0,π/4}(tan(x))^n·(1+tan²(x))dx=∫{0,π/4}(tan(x))^n·(1/cos²(x))dx=∫{0,π/4}(tan(x))^n·(tan(x))'dx=(tan(...