神马作文网微分 导数an=∫[0,π/2]x(sinnx)^4/(sinx)^4*dx求n→∞,lim an/n^2
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微分 导数
an=∫[0,π/2]x(sinnx)^4/(sinx)^4*dx
求n→∞,lim an/n^2
an=∫[0,π/2]x(sinnx)^4/(sinx)^4*dx
求n→∞,lim an/n^2
![微分 导数an=∫[0,π/2]x(sinnx)^4/(sinx)^4*dx求n→∞,lim an/n^2](/uploads/image/z/12705898-58-8.jpg?t=%E5%BE%AE%E5%88%86+%E5%AF%BC%E6%95%B0an%3D%E2%88%AB%5B0%2C%CF%80%2F2%5Dx%28sinnx%29%5E4%2F%28sinx%29%5E4%2Adx%E6%B1%82n%E2%86%92%E2%88%9E%EF%BC%8Clim+an%2Fn%5E2)
应用两次施笃兹定理
lim an/n^2变为
(0,+∞)∫xsin[(3n-3)x]sin[(n-1)x]/(sinx)^2dx+(0,+∞)∫xcos[(4n-4)x]dx
=(0,+∞)∫xsin[(3n-3)x]sin[(n-1)x]/(sinx)^2dx
=(0,+∞)∫x{cos[(2n-2)x]-cos[4(n-1)x]}/(sinx)^2dx
(sinx)^2=-(cotx)'
洛朗级数展开得
(sinx)^2=1/x^2+1/3+x^/15+2x^4/189+o(x^4),高阶项的积分为0
同时(0,+∞)∫{cos[(2n-2)x]-cos[4(n-1)x]}x^2m=0
所以
=(0,+∞)∫x{cos[(2n-2)x]-cos[4(n-1)x]}/(sinx)^2dx
=(0,+∞)∫{cos[(2n-2)x]-cos[4(n-1)x]}/xdx
用收敛因子法解出
收敛因子e^(-tx)
(0,+∞)∫{cos[(2n-2)x]-cos[4(n-1)x]}/xdx=ln2
lim an/n^2变为
(0,+∞)∫xsin[(3n-3)x]sin[(n-1)x]/(sinx)^2dx+(0,+∞)∫xcos[(4n-4)x]dx
=(0,+∞)∫xsin[(3n-3)x]sin[(n-1)x]/(sinx)^2dx
=(0,+∞)∫x{cos[(2n-2)x]-cos[4(n-1)x]}/(sinx)^2dx
(sinx)^2=-(cotx)'
洛朗级数展开得
(sinx)^2=1/x^2+1/3+x^/15+2x^4/189+o(x^4),高阶项的积分为0
同时(0,+∞)∫{cos[(2n-2)x]-cos[4(n-1)x]}x^2m=0
所以
=(0,+∞)∫x{cos[(2n-2)x]-cos[4(n-1)x]}/(sinx)^2dx
=(0,+∞)∫{cos[(2n-2)x]-cos[4(n-1)x]}/xdx
用收敛因子法解出
收敛因子e^(-tx)
(0,+∞)∫{cos[(2n-2)x]-cos[4(n-1)x]}/xdx=ln2
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